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2013-09-24

Low-cost Triangular Lattice Towers for Small Wind

Turbines

Adhikari, Ram Chandra

Adhikari, R. C. (2013). Low-cost Triangular Lattice Towers for Small Wind Turbines (Unpublished

master's thesis). University of Calgary, Calgary, AB. doi:10.11575/PRISM/26794

http://hdl.handle.net/11023/1018

master thesis

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UNIVERSITY OF CALGARY

Low-cost Triangular Lattice Towers for Small Wind Turbines

by

Ram Chandra Adhikari

A THESIS

SUBMITTED TO THE FACULTY OF GRADUATE STUDIES

IN PARTIAL FULFILMENT OF THE REQUIREMENTS FOR THE

DEGREE OF MASTER OF SCIENCE

DEPARTMENT OF MECHANICAL AND MANUFACTURING ENGINEERING

CALGARY, ALBERTA

September, 2013

© Ram Chandra Adhikari 2013

Abstract

This thesis focuses on the study of low-cost steel and bamboo triangular lattice towers for small

wind turbines. The core objective is to determine the material properties of bamboo and assess

the feasibility of bamboo towers. Using the experimentally determined buckling resistance,

elastic modulus, and Poisson’s ratio, a 12 m high triangular lattice tower for a 500W wind

turbine has been modeled as a tripod to formulate the analytical solutions for the stresses and

tower deflections, which enables design of the tower based on buckling strength of tower legs.

The tripod formulation combines the imposed loads, the base distance between the legs and

tower height, and cross-sectional dimensions of the tower legs. The tripod model was used as a

reference for the initial design of the bamboo tower and extended to finite element analysis. A 12

m high steel lattice tower was also designed for the same turbine to serve as a comparison to the

bamboo tower. The primary result of this work indicates that bamboo is a valid structural

material.

The commercial software package ANSYS APDL was used to carry out the tower analysis,

evaluate the validity of the tripod model, and extend the analysis for the tower design. For this

purpose, a 12 m high steel lattice tower for a 500 W wind turbine was examined. Comparison of

finite element analysis and analytical solution has shown that tripod model can be accurately

used in the design of lattice towers. The tower designs were based on the loads and safety

requirements of international standard for small wind turbine safety, IEC 61400-2. For

connecting the bamboo sections in the lattice tower, a steel-bamboo adhesive joint combined

with conventional lashing has been proposed. Also, considering the low durability of bamboo,

periodic replacement of tower members has been proposed. The result of this study has

established that bamboo could be used to construct cost-effective and lightweight lattice towers

for wind turbines of 500 Watt capacity or smaller. This study concludes that further work on

joining of bamboo sections and weathering is required to fully utilize bamboo in practice. In

comparison to steel towers, bamboo towers are economically feasible and easy to build. The

tower is extremely lightweight, which justifies its application in remote areas, where the

transportation is difficult.

ii

Acknowledgements

First of all, I would like to express my gratitude to my supervisor, Professor David Wood, for his

constant support and guidance throughout my master’s. Without David’s strong support, this

thesis would not have been possible. David has been more than an academic supervisor to me.

Thank you so much for everything you have done to support me. I would also like to thank my

co-supervisor, Professor Les Sudak, for his invaluable advice from the beginning of this

research.

I would like to thank all my friends in the EES specialization office space for their comradery

and exchanging ideas on interdisciplinary research. I would also like to thank ISEEE, SSAF,

SAF at the U of C and the NSERC/ENMAX Industrial Research Chair in Renewable Energy for

providing the financial support in my experimental work in Nepal.

On a more personal level, I am deeply indebted to my whole family for their endless support and

encouragement. I specially thank my wife Sushma, for her unwavering love and support

throughout the years of my master’s.

Last but not least, I am very grateful to Rajendra Pant, Lab Incharge at Pulchowk Campus, TU,

Nepal and Donald F. Anson at the University of Calgary for their support in the experimental

tests on bamboo. Particular thanks go to Pramod Ghimire and Kimon Silwal at KAPEG, Nepal

for their support during my experimental work in Nepal.

iii

Dedication

This piece of research is dedicated to the loving memory of my mother, Keshar Devi Adhikari.

iv

Table of Contents

Abstract ............................................................................................................................... ii Acknowledgements.............................................................................................................iii Dedication .......................................................................................................................... iv Table of Contents .................................................................................................................v List of Tables ................................................................................................................... viii List of Figures .................................................................................................................... ix List of Symbols and Abbreviations.................................................................................. xiv

CHAPTER 1: INTRODUCTION ........................................................................................1 1.1 Context of the Thesis .................................................................................................1 1.2 Small Wind Power Systems .......................................................................................2 1.3 Motivation for the Thesis ...........................................................................................3

1.3.1 Lattice Tower for Small Wind Turbines ...........................................................4 1.3.2 Bamboo for Wind turbine Towers .....................................................................4

1.4 Thesis Objectives and Approach ...............................................................................5 1.5 Organization of the Thesis .........................................................................................6

CHAPTER 2: LITERATURE REVIEW .............................................................................7 2.1 Chapter Overview ......................................................................................................7 2.2 Wind Turbine Towers ................................................................................................7 2.3 Types of Wind Turbine Towers .................................................................................8

2.3.1 Monopole or Tubular Tower .............................................................................9 2.3.2 Lattice Tower ...................................................................................................10 2.3.3 Hybrid Tower ..................................................................................................10

2.4 Towers for Small Wind Turbines ............................................................................10 2.5 Costs of Small Towers .............................................................................................11 2.6 Materials for Wind Turbine Towers ........................................................................12 2.7 Bamboo ....................................................................................................................14 2.8 Physical Structure of Bamboo .................................................................................15 2.9 Micro-structure of Bamboo .....................................................................................16 2.10 Mechanical Properties of Bamboo .........................................................................19 2.11 Joining Methods for Bamboo ................................................................................22 2.12 Durability of Bamboo ............................................................................................27 2.13 Further Comments .................................................................................................28 2.14 Adhesives Joints ....................................................................................................29

CHAPTER 3: EXPERIMENTAL TESTS ON MECHANICAL PROPERTIES OF BAMBOO .................................................................................................................32

3.1Chapter Overview .....................................................................................................32 3.2 Related Works ..........................................................................................................32 3.3 Testing Protocol .......................................................................................................34

v

3.3.1 Test Specimens for the Buckling Experiment .................................................34 3.3.2 Buckling Test Procedure .................................................................................35 3.3.3 Compression Test Procedures .........................................................................37

3.4 Results and Analysis ................................................................................................39 3.4.1 Buckling Strength ............................................................................................39 3.4.2 Compression Strength .....................................................................................43 3.4.3 Modulus of Elasticity and Poisson Ratio .........................................................46

3.5 Joint Testing .............................................................................................................49

CHAPTER 4: LOADS AND DESIGN REQUIREMENTS FOR WIND TURBINE TOWERS ..................................................................................................................53

4.1 Chapter Overview ....................................................................................................53 4.2 Design Standards and Requirements .......................................................................53 4.3 Loads on Wind Turbine Tower ................................................................................55

4.3.1 Gravity Loads ..................................................................................................55 4.3.2 Aerodynamic Thrust on Rotor Blades .............................................................56 4.3.3 Drag on the Tower ...........................................................................................56

4.4 Load Safety Factors .................................................................................................57 4.5 Tower Design Methods ............................................................................................57

4.5.1 Allowable Strength Design ..............................................................................57 4.5.2 Allowable Buckling Strength ..........................................................................58 4.5.3 Allowable Tower Deflection and Natural Frequency .....................................58

CHAPTER 5: DESIGN AND OPTIMIZATION OF LATTICE TOWERS FOR SMALL WIND TURBINES ...................................................................................................59

5.1Chapter Overview .....................................................................................................59 5.2 Overview of Design Optimization and Objectives ..................................................59 5.3 The Triangular Lattice Tower ..................................................................................60 5.4 Design Procedure .....................................................................................................63 5.5 Structural Analysis of the Lattice Tower .................................................................64

5.5.1 Analysis of the Tripod Model ..........................................................................65 5.5.2 Failure Criteria .................................................................................................71 5.5.3 Tower Deflection .............................................................................................75

5.6 Optimization of the Tripod Model ...........................................................................78 5.7 Finite Element Analysis ...........................................................................................78

5.7.1 The Methods of FEA .......................................................................................78 5.7.2 The FEA of the Lattice Tower .........................................................................78 5.7.3 FE Model of the Tower ...................................................................................79

CHAPTER 6: DESIGN OF STEEL LATTICE TOWER ..................................................82 6.1 Chapter Overview ....................................................................................................82 6.2 The Steel Lattice Tower ...........................................................................................82 6.3 Design Optimization Procedure ...............................................................................82 6.4 Optimization of the Tripod Model ...........................................................................83

vi

6.4.1 Tower Loading ................................................................................................83 6.4.2 Optimization of Tower Legs ...........................................................................84 6.4.3 Results of Tripod Analysis ..............................................................................86

6.5 Finite Element Analysis of Tower ...........................................................................88 6. 6 Results and Discussion ...........................................................................................90

6.6.1 Design Examples with Horizontal Bracings ....................................................96 6.6.2 Design Example including Cross-bracings .....................................................98

6.7 Design Loads for Foundation ................................................................................100 6.8 Tower Manufacture ................................................................................................102

CHAPTER 7: OPTIMAL DESIGN OF BAMBOO TOWER .........................................104 7.1 Chapter Overview ..................................................................................................104 7.2 The Bamboo Tower ...............................................................................................105 7.3 Design Requirements for Bamboo Tower .............................................................107 7.4 The Proposed Joint .................................................................................................108 7.5 Design Procedure for the Bamboo Lattice Tower .................................................109

7.5.1 Structural Analysis of the Tripod Model .......................................................110 5.5.2 Results of Tripod Analysis ............................................................................111 5.5.3 Finite Element Analysis of the Tower ...........................................................114

7.5.3.1 FE Model of the Bamboo Tower .........................................................115 7.5.3.2 Results of Finite Element Analysis ......................................................116

7.5.4 Results and Assumptions of the Analysis .....................................................123 7.5.5 The Optimal Tower Design ...........................................................................123

CHAPTER 8: SUMMARY, CONCLUSIONS AND FUTURE WORK ........................127 8.1 Summary of Thesis ................................................................................................127 8.2 Conclusions ............................................................................................................129 8.3 Future Work ...........................................................................................................131

REFERENCES ................................................................................................................133

APPENDICES .................................................................................................................139

vii

List of Tables

Table 2.1 Mechanical properties of bamboo ................................................................................. 20

Table 3.1 Test Results: Buckling Experiment (TU, Nepal) .......................................................... 39

Table 3.2 Test Results: Buckling Experiment (University of Calgary) ........................................ 41

Table 3.3 Test Results: Compression Experiment ........................................................................ 44

Table 3.4 Results of Pull-out Tests on Steel-bamboo Adhesive Joints ........................................ 52

Table 4.1 Extreme Wind Speeds for Different Classes of Wind Turbines [6]………………......53

Table 4.2 Load safety factors for the design loads [6]…………………………………………...57

Table 5.1 Values of Q [63]…………………………………………………………………....…73

Table 6.1 Optimum D for tower legs (t = 3 mm)………………………………………………...87

Table 6.2 Comparison of FEA, numerical and analytical results (Tripod tower)…………….…92

Table 6.3 Comparison of FEA and numerical results (Tower with horizontal bracings)……….93

Table 6.4 Results of FEA with horizontal bracings (b =1.2 m)………………………………….97

Table 6.5 Recommended tower design (tower with horizontal bracings)……………………….98

Table 6.6 Recommended tower design with cross-bracings……………………………………100

Table 7.1 Buckling strengths of 1.5 m long columns (t = 6 mm) (equation 3.6)………………112

Table 7.2 Tower configurations for the FEA (t=6 mm)………………………………………..114

Table 7.3 Comparison of the results of FEA and tripod analysis……………………………....119

Table 7.4 Optimized design of the bamboo tower……………………………………………...123

viii

List of Figures and Illustrations

Figure 1.1 A hybrid wind-photovoltaic power system in a remote village in Nepal (Photo: by

the Author) .............................................................................................................................. 3

Figure 2.1 Types of wind turbine towers ........................................................................................ 8

Figure 2.2 A small turbine tower with guy-wires [17] ................................................................... 9

Figure 2.3 Relative costs of lattice and other tower designs for a 10 kW wind turbine [7] ......... 12

Figure 2.4 World’s first 100 m high proto-type timber tower (left) made with timber

composite panels (right) [11]. ............................................................................................... 13

Figure 2.5 A bamboo plantation in Nepal (Photo: by the Author) ............................................... 15

Figure 2.6 A bamboo culm (left) and longitudinal cross-section of the culm (right) showing

its physical structure (Photos: by the Author) ....................................................................... 16

Figure 2.7 Density of vascular bundles in the wall [26] ............................................................... 17

Figure 2.8 Cross-section of bamboo culm perpendicular to the longitudinal axis, showing

wall and diaphragm (Photo: by the Author).......................................................................... 17

Figure 2.9 Fraction of fibre-density with respect to distance from outer to the inner wall [24]... 18

Figure 2.10 Micro-structure of bamboo wall showing the vascular bundles [26] ........................ 18

Figure 2.11 Arrangements of fibres in the nodes [29] .................................................................. 19

Figure 2.12 Strength and stiffness comparison of bamboo with different materials [39] ............ 21

Figure 2.13 Methods of connecting two or more bamboos culms, the friction tight method

[42] ........................................................................................................................................ 23

Figure 2.14 Connection with ropes [42] ....................................................................................... 23

ix

Figure 2.15 Bamboo scaffoldings in construction (photos taken from [35]) ................................ 23

Figure 2.16 Space frame (left) and connection of bamboo columns by metallic joint (right)

[44] ........................................................................................................................................ 24

Figure 2.17 Connection with steel wire to a steel plate [46] ........................................................ 24

Figure 2.18 Interlocking with metal anchors [42] ........................................................................ 24

Figure 2.19 Bamboo-wood glued joint [39] ................................................................................. 25

Figure 2.20 Double layer grid (DLG) with PVC-bamboo joints .................................................. 26

Figure 2.21 Pull-out test of the joint ............................................................................................. 26

Figure 2.22 Load-deflection curve of the joint ............................................................................. 26

Figure 2.23 Components of an adhesive joint .............................................................................. 30

Figure 2.24 Single lap tubular joint .............................................................................................. 31

Figure 3.1 Freshly cut bamboo culms (left) and dried bamboo specimens (right)……………... 35

Figure 3.2 Experimental set-up for the buckling test in the MTS-100 test machine ……………37

Figure 3.3 Buckling mode of the bamboo column during the buckling test…………………….37

Figure 3.4 Experimental set-up for the compression test (left) and split bamboo………………38

Figure 3.5 Relationship between buckling strength and slenderness ratio of bamboo columns...42

Figure 3.6 Load-deflection behaviour of bamboo columns in buckling tests ……………………43

Figure 3.7 Load-deformation of bamboo in compression……………………………………….45

Figure 3.8 Load-deformation behaviour of bamboo in compression ………………………….. 45

Figure 3.9 Stress-strain of bamboo in compression……………………………………………..47

x

Figure 3.10 Specifications of the bamboo (left) and cylindrical steel caps (right)……………...50

Figure 3.11 Specimen setup for the pull-out test on bamboo joints………………………….….51

Figure 3.12 Failure of the joint by slippage of bamboo culm from the steel cap…………….…51

Figure 5.1 Structural model of the Triangular Lattice Tower ………………………………..….61

Figure 5.2 Design optimization procedures for the lattice tower………………………….….....64

Figure 5.3 Free Body Diagram (FBD) of the tripod tower. Bracings are not included. The legs

are denoted by AD, BD, and CD. The turbine is mounted at point D. The arrows indicate the

direction of forces and moments in the tower ………………………………………………...…66

Figure 5.4 Lattice tower as a cantilever beam……………………………………………….…..67

Figure 5.5 Base cross-section of the tower as a composite beam of legs and bracings………....67

Figure 5.6 2-node 188 beam element [13]………………………………………………………80

Figure 5.7 3-node 189 element [13]……………………………………………………………..81

Figure 6.1 Loads on the Tower…………………………………………………………………..84

Figure 6.2 Optimum diameters of legs (D) for various base distances (b) and wall thickness (t) of

3 mm using (ASCE standard) ……………………………………………………………………87

Figure 6.3 Bottom section of the FE model of the lattice tower showing drag forces and

boundary conditions……………………………………………………………………………...90

Figure 6.4 Convergence test for stress with different lengths of beam elements (Tower with b =

1m, D =64 mm and 64 mm horizontal bracings)………………………………………………...91

Figure 6.5 Convergence test for deflection with different lengths of beam elements (Tower with

b = 1m, D =64 mm and 64 mm horizontal bracings) ……………………………………………91

Figure 6.6 Maximum stress and deflection of the tower at b =1m and D =64 mm……………...94

xi

Figure 6.7 Maximum stress and deflection at b =1.2 m and D =45 mm………………………...94

Figure 6.8 Maximum stress and tower-top deflection at b =1.4 m and D =35 mm……………..95

Figure 6.9 Maximum stress and deflection at b = 1.6 m and D =29 mm………………………..95

Figure 6.10 Maximum stress and deflection at b = 1.2 m, D =40 mm and 20 mm diameter

bracings ………………………………………………………………………………………..97

Figure 6.11 Maximum stress and tower deflection for D =35 mm, 20 mm diameter horizontal

bracings, and 10 mm cross-bracings…………………………………………………………….99

Figure 6.12 Schematic of the loads on tower foundation………………………………………102

Figure 6.13 Jig to make tubular lattice tower used by Kijito Windpower, Kenya. Photo taken

from [7]…………………………………………………………………………………………103

Figure 7.1 Study approach for the bamboo lattice tower…………………………………….....104

Figure 7.2 Bottom section of the proposed bamboo lattice tower………..………………...…..106

Figure 7.3 Joining methods for the leg sections………………………………………………..106

Figure 7.4 Steel connector cap for the adhesive joints…………………………………………106

Figure 7.5 Proposed joining methods in the lattice tower……………………………………...109

Figure 7.6 Maximum compressive stresses in tower legs for various leg diameters and base

distances………………………………………………………………………………………...112

Figure 7.7 Diameters of 1.5 m long bamboo columns that are marginally safe against buckling

for various base distances……………………………………………………………………....113

Figure 7.8 Maximum tensile forces on tower legs for various b…………………………….…113

Figure 7.9 Finite element models of the tower with horizontal bracings (left), with horizontal-

and cross-bracings (centre), and bottom section of the tower showing wind loading on the tower

(right)…………………………………………………………………………………………...116

xii

Figure 7.10 Tower-top deflection and compressive stress (b=1.6 m and D=70 mm)………….117

Figure 7.11 Tower-top deflection and compressive stress (b=1.85 m and D = 65 mm for legs and

bracings)………………………………………………………………………………………...117

Figure 7.12 Tower-top deflection and compressive stress (b=2.15 m and D = 60 mm for legs and

bracings…………………………………………………………………………………………118

Figure 7.13 Tower-top deflection and compressive stress (b=2.6 m and D =55 mm for legs and

bracings)………………………………………………………………………………………...118

Figure 7.14 Tower-top deflection and compressive stress in the tower with horizontal- and cross-

bracings (b= 1.85 m, D=65 mm)………………………………………………………………..120

Figure 7.15 Tensile forces in the tower legs at b= 2.6 m, D = 65 mm and 30 mm diameter for

bracings…………………………………………………………………………………………121

Figure 7.16 Effect of bracing sizes on maximum tensile forces in legs at b= 2.6 m (obtained from

FEA)…………………………………………………………………………………………….121

Figure 7.17 Lattice tower of 2.6 m with 65 mm leg size and 30 mm for horizontal- and cross-

bracings…………………………………………………………………………………………122

xiii

List of Symbols and Abbreviations

Symbols

Definition

ASC cross-sectional area of tower legs

b base distance between the tower legs

Cd drag coefficient

CT thrust coefficient of rotor blades

D diameter of the tower legs

D1 external diameter of the bamboo culm at the larger end

d1 internal diameter of the bamboo culm at the larger end

D2 external diameter of the bamboo culm at the smaller end

d2 internal diameter of the bamboo culm at the smaller end

df diameter of the foundation

E elastic modulus of the material

F thrust on rotor blades at extreme wind speed of 50 m/s

Fcr buckling strength of bamboo column

Fb allowable bending stress

g acceleration due to gravity (9.81 m/s2)

h height of the tower

hf depth of the foundation

I(y) moment of inertia of the tower section at ‘y’ from the tower top

l length of the test specimen, tower leg section

li length of the ith tower member

MC moisture content

M(y) bending moment at section ‘y’ from the tower top

Mf resultant moment at the foundation

Mo overturning moment at the foundation

MRS resisting moment of the foundation

N number of nodes in the bamboo specimen

Nt thickness of the node of the bamboo culm

xiv

Pcr critical buckling load

q drag force per unit length of the tower leg

R1 internal radius of tower legs

R2 external radius of tower legs

RHF resultant horizontal force on the foundation

t thickness of tower legs and bracings

U extreme wind speed

W weight of turbine and nacelle

Wt weight of tower

y distance of a tower section from the tower top

ρ density of the tower material

v deflection of tower section at distance ‘y’ from the tower top

𝝈𝝈𝒄𝒄 compressive strength of bamboo

𝜺𝜺 longitudinal strain

ρ density of air

Abbreviations

AISC

Definitions

American Institute of Steel Construction

ASCE American Society of Civil Engineers

IEA International Energy Agency

IEC International Electrotechnical Commission

INBAR International Network for Bamboo and Rattan

ISO International Organization for Standardization

xv

“The central activity of engineering,

as distinguished from science,

is the design of new devices, processes

and systems''

- Myron Tribus (1969)

xvi

Chapter 1

INTRODUCTION

1.1 Context of the Thesis

Universal access to clean, secure and sustainable energy systems is one of the biggest

development challenges today. In a recent report released by International Energy Agency (IEA)

[1], more than 1.3 billion people in the world lack access to electricity; about 95% of them are

from Asian developing countries and sub-Saharan Africa. Similarly, more than 2.6 billion people

rely on traditional biomass sources1 for cooking and heating and about 84% of people live in

rural areas [1]. This energy poverty has depressingly impacted many areas of human endeavour

(health, education, food, water etc...), particularly in the developing world.

To respond to energy poverty, the United Nations secretary general announced in “Rio+20” [2],

the United Nations conference on sustainable development, a major initiative, “Sustainable

energy for all (SE4all)”, to provide electricity to all people by 2030 [3].The “SE4all” has stated

three major goals: ensuring universal access to modern energy services, doubling the share of

renewable energy in the global energy mix, and doubling the global rate of improvement in

energy efficiency by 2030.To achieve the target of universal access to energy services,

significant cost reductions and rapid deployment of current energy technologies, along with

commercialization of renewable energy technologies, will be needed.

Continuous research and development is essential for the technological innovation to bring down

the costs of energy systems [4]. While a set of policy instruments enable transitioning the energy

sectors to a more sustainable one, “technological development will significantly enhance the

portfolio options available and will bring down the costs of energy technologies” [4].

1 Traditional biomass energy sources include firewood, animal dung, and agricultural residues [1]

1

Consequently, there is an urgent need to establish clean and affordable energy systems, with

particular emphasis on the exploitation of renewable energy sources.

Among many renewable energy technologies, wind energy offers an immense potential to extract

clean energy; and its rapidly growing installations worldwide have shown that wind energy could

play a significant role in the future energy supply systems. In developing countries, such as

Nepal, where the “SE4all” is targeted, wind energy technologies are not fully developed due to

many barriers. The key barriers include lack of profitable markets and well-adapted technologies

to end user needs, inability to manufacture and manage technologies, high capital and life-cycle

costs, technological limitations, financing risks etc [5].

1.2 Small Wind Power Systems

Small wind turbines, which have rotor swept area smaller than 200 m2 [6] or rated power less

than about 50 kW [7], are increasingly relevant in rural or off-grid areas for generating cost-

effective electricity [5,8,9]. They can be installed on their own or in combination with

photovoltaic (PV) modules, to supply electricity to a small village, a health clinic, or a small

industry, by using a local transmission and distribution network. Figure 1.1 shows an example of

a small wind power system installed with photovoltaic (hybrid mode) in a remote village in

Nepal.

Small wind turbines are often installed in remote locations, where the best wind resources exist

but grid extension requires significant investment in building electricity transmission

infrastructure. Along with the opportunities, there are also many challenges to development of

small wind power systems. These include: high capital costs, lack of capabilities on design and

manufacturing of wind energy components, and difficulty in transportation and installation of

towers. Today’s small wind turbines are mostly installed on monopole towers, similar to those

shown in Figure 1.1,which are expensive, manufactured from steel, and are often difficult to

transport to remote locations.

2

1.3 Motivation for the Thesis

After the blades, the support structure or tower is the most critical part of the wind power system.

It is the most material-consuming structural unit that bears significant portion of the total cost [8,

10]. Cliffton-Smith and Wood [8] reported that the cost of manufacturing the towers could be 30

to 40% of the installation cost in the case of small wind turbines. In remote locations, where

there is no access to road transportation, the cost of transporting the tower would be even higher

and may be physically impossible in some cases.

The materials currently used in wind turbine towers are steel and concrete. Very recently, timber

has been successfully used to build wind turbine towers for large wind turbines [11].

Investigations on new materials, such as ultra-high reinforced concrete (UHRC) [12] and

composites [13], have been undergoing for developing environmentally sustainable, economic,

Figure 1.1 A hybrid wind-photovoltaic power system

in a remote village in Nepal (Photo: by the Author)

3

and light wind turbine towers. As far as the author is aware, steel is the only material being used

in small wind turbine towers and timber and concrete have not been yet used.

Within this broader context of sustainable energy and materials, it is relevant to look at

possibilities for minimizing the costs of towers using existing materials as well as using more

sustainable and low-cost materials, such as bamboo. The current research is aimed at minimizing

the costs of small wind power systems through: 1) design of light-weight and low-cost lattice

tower and 2) investigation on the applicability of renewable material, bamboo to lattice towers.

1.3.1 Lattice Tower for Small Wind Turbines

The biggest challenges in developing wind power system in remote areas are the high capital

costs of towers and the difficulty in transporting the towers from manufacturing facilities, which

are often located in urban areas. Lattice towers are an alternative to the conventional monopoles

[7]. Lattice towers provide a lighter and stiffer tower design, which can be easily manufactured,

installed and maintained with minimum equipment and workmanship and mostly at lower costs

[7]. This work proposes a triangular lattice tower because of: 1) ease of design, manufacture,

transport, and install and 2) economic competitiveness.

1.3.2 Bamboo for Wind turbine Towers

Bamboo is a superior natural material that has been used widely in various engineering structures

throughout the human history. As a cheap and sustainable material with impressive tensile,

compressive, and buckling strengths, bamboo shows its suitability for lattice towers for small

wind turbines. Until now, there is no engineering investigation about its use in wind turbine

towers. If bamboo is capable of meeting the loads and safety requirements of International

Electrotechnical Commission (IEC) IEC61400-2 [6] and the problem of connecting bamboo

sections is solved, then there is a significant potential for utilizing this material to reduce the cost

of small wind power systems in the developing countries. This thesis investigates the mechanical

strengths of bamboo through material testing. To assess the suitability of bamboo for small

4

towers, a design example of 12 m high bamboo lattice tower for a 500 W wind turbine is

presented and compared to a steel lattice tower design. The advantages of bamboo from

engineering design point of view are summarized below:

• High tensile and buckling strengths

• High growth rate and sustainable material

• Easily available and low-cost material

• Simple technology for processing

1.4 Thesis Objectives and Approach

The core objectives of this thesis are 1) to establish the mechanical properties of bamboo

required for the design and analysis of a bamboo lattice tower, 2) to develop a design

optimization methodology for the lattice tower in accordance with IEC61400-2 safety standard

for small wind turbines, and 3) to determine whether bamboo towers are feasible for small wind

turbines.

The specific objectives are:

1. To determine experimentally the buckling and compression strengths and elastic properties

of bamboo to determine its suitability for application in small wind turbine towers.

2. To develop a design procedure for a cheap, lightweight, and easily-manufactured lattice

tower using analytical methods and finite element (FE) modelling tool, ANSYS [13].

3. To design and optimize a 12 m high steel lattice tower for a 500 W wind turbine using

analytical and FE modeling.

4. To carry out the design assessment of a 12 m high bamboo lattice tower for the same 500 W

wind turbine using analytical and FE modeling on the basis of experimental results on

bamboo’s mechanical properties and load requirements of IEC61400-2 and compare with

steel tower.

5

1.5 Organization of the Thesis

This thesis is organized into 8 chapters as follows:

Chapter 1 introduced the context, motivation, and objectives of the thesis. Chapter 2 presents two

literature reviews: the first on tower design types for small wind turbines and the second on

bamboo’s mechanical properties and its applicability to lattice towers for small wind turbines.

Chapter 3 describes the experimental work on bamboo’s mechanical properties and steel-bamboo

adhesive joint and summarizes the main results. Chapter 4 discusses the main loads acting on

wind turbine towers and IEC design requirements for small wind turbine towers. Chapter 5

introduces the approximate mathematical analysis for triangular lattice towers and describes the

design procedure through FE modeling. Chapter 6 presents the design optimization of a 12 m

high steel lattice tower for 500W wind turbine. Chapter 7 presents the design and feasibility

analysis of a 12 m high bamboo lattice tower for 500W wind turbine. Finally, Chapter 8

summarizes the main conclusions of the thesis work and provides a brief summary for future

works.

6

Chapter 2

LITERATURE REVIEW

2.1 Chapter Overview

The literature review is divided into two sections. The first section presents an overview of wind

turbine towers and their design types. The second section presents an overview of bamboo as an

engineering material, past experimental research on bamboo’s mechanical properties, and its

potential for use in wind turbine towers.

2.2 Wind Turbine Towers

A wind turbine tower has two primary functions. First, it supports the wind turbine and

accessories at a desired height [10]. Second, it transfers the loads acting on the wind turbine and

the tower to the foundation. In addition, wind turbine tower often houses the electrical

components and accessories and also provides access to wind turbine [10].

Wind turbine towers must meet the functional requirements, which are the specifications that

define the intended functions of the tower, throughout the life-span, typically 20 years. The

functional requirements include withstanding the turbine and wind loads and the self-weight, and

vibration. Structural performance is defined as an acceptable structural behaviour, such as

minimal tower top deflection under ultimate loads, with reference to the specified functional

requirements.

7

2.3 Types of Wind Turbine Towers

There exists a great variety of wind turbine towers, which can be broadly classified into three

types:

1. Monopole or tubular tower

2. Lattice tower

3. Hybrid tower

The first two types of towers are commonly used in both large and small wind turbines, while the

hybrid towers are recently conceptualized by National Renewable Energy Laboratory (NREL)

[14] for large off-shore wind turbines. The towers can be installed with or without guy-wires;

towers without guy-wires are called free-standing or self-supporting towers. The purpose of guy-

wires (Figure 2.2) is to reduce the bending stress at the tower base, but it requires more ground

space and may be subject to vandalism [7]. Therefore, self-supporting towers are desired.

Figure 2.1 Types of wind turbine towers

a) Hybrid tower [14] b) Monopole tower [15] c) Lattice tower [16]

8

2.3.1 Monopole or Tubular Tower

The monopole or tubular designs are the most popular types of tower for both large and small

wind turbines (Figure 2.1 (a)). These towers require less ground space to install and are

aesthetically pleasing; however, they require more steel to manufacture [7] than the lattice tower

in Figure 2.1 (b). They are usually made from circular hollow sections for ease to manufacture as

well as for transportation and installation at sites. Small tubular towers are either made in single

sections or multiple sections that are slip-fit together or have flanges that are bolted. However,

they tend to be expensive to transport to remote locations. For example, Wood [7] described the

design of a three-sectioned 18 m monopole tower for a 5 kW turbine that weighs 530 kg.

Figure 2.2 A small turbine tower with guy-wires [17]

9

2.3.2 Lattice Tower

Lattice towers are manufactured as truss or frame structure with the sectional or tubular members

connected through welding or use of mechanical fasteners (Figure 2.1 (b)). Lattice towers are

cheaper and easier to manufacture than monopoles and can be easily assembled on site, but their

life-span is often shorter than monopole towers due to corrosion at joints [7]. Despite the fact

that lattice towers are aesthetically less pleasing than monopoles, low-cost, longer life-span, and

light and stiffer towers can be manufactured using circular tubular members [7]. Also the

foundation cost is lower than the monopoles. The factors that make the cost of lattice towers

lower than monopoles are summarized below.

• Manufacturing cost is lower, as it can be easily manufactured with less equipment and

processes

• The material cost of tower is lower as the material use is less

• Transportation cost is lower as it’s easy to transport light and smaller tower sections and

can be assembled easily on site

2.3.3 Hybrid Tower

The hybrid tower, shown in Figure 2.1 (c), combines a truss, tube, guy-wires, and cables to build

tall towers while avoiding requirement of large base diameter for tubular towers [14]. It

incorporates the advantages of both tubular and lattice tower structures in respects of stiffness

and cost [14]. It is also called the “guyed design” because it consists of truss, tube, and guy-

wires. The hybrid towers are specifically intended for large wind turbines.

2.4 Towers for Small Wind Turbines

Free-standing triangular or square lattice towers and monopoles are popular for both off-grid and

grid-connected small wind turbines. Lattice towers are more common in off-grid or remote

10

applications, while monopoles are in grid-connected applications because of the aesthetics. Cost

is always the determining factor in choosing the wind power system over its alternative,

photovoltaic technology for off-grid applications. In remote or off-grid locations, the cost of

tower is often significantly higher due to higher transportation costs than in urban locations

where the transportation is easier.

There are also another variety of towers similar to wind turbine towers that should be mentioned:

electricity transmission towers or poles and telecommunications or meteorological masts.

Transmission towers carry mainly the weight of transmission wires and horizontal tension loads

and so the design is dictated by these loads. Masts are slender structures that are designed with

guy-wires. They are very sensitive to dynamic wind loads and the structural response is often

non-linear that require dynamic analysis. As such, the functional requirements of wind turbine

towers are different than these tower types. Consequently, the design methodology is different.

2.5 Costs of Small Towers

The process of estimating the cost of a tower is challenging as it depends upon the specific site

and its socio-economic context. Therefore, economic aspects can be judged only on the basis of

relative merits of design aspects and capital costs.

Wood [7] presented a cost comparison between the lattice towers and monopole towers as shown

in Figure 2.3 for a typical 10 kW wind turbine with reference to various tower heights. It is

evident that self-supporting lattice towers are the cheapest option for small wind turbines. These

costs exclude the foundation costs which are too site-specific to be included. This thesis will also

exclude detailed consideration of foundation costs.

11

2.6 Materials for Wind Turbine Towers

The tower is the most material-consuming component of a wind turbine structure. Presently, the

dominant materials for manufacturing the towers are steel and concrete, the latter for large

towers only. With the issues of climate change and raising costs of tower materials along with

their environmental impacts, investigations into new and sustainable materials for low-cost

towers have become very pertinent.

Very recently, timber has been successfully used to manufacture a prototype100 m high tower,

shown in Figure 2.4, to support a 1.5 MW wind turbine, installed in Hannover, Germany. Its full

potential is yet to be assessed but current industry reports [11] have indicated that wood is an

economic and sustainable material alternative to steel and concrete. Another potential material

being investigated is ultra-high performance fibre reinforced concrete (UHPC) [12].

Figure 2.3 Relative costs of lattice and other tower

designs for a 10 kW wind turbine [7]

12

When considering new materials for wind turbine towers, the tower design must satisfy certain

loads and safety requirements that the tower may encounter during its life-span. The tower

design is governed by the loads imposed on the tower, the strength of the tower materials, and

the stiffness requirement for the tower [10]. The main loads acting on the tower are the turbine

thrust, wind and gravity loads. The tower design should ensure that the tower response is linear

elastic under the imposed loads [10]. This can be achieved by ensuring that the tower top

deflection is a small proportion of the height, the maximum stress is below the allowable stress,

no tower section or component will buckle, and the tower’s natural frequency is not excited by

the blade passing frequency of the turbine [7, 10]. Almost all towers are designed against

extreme static loads that are expected to occur during the life-span of the tower, which are often

specified by the standards, such as IEC. The basis of the tower design presented here is the

ultimate load analysis for extreme wind speeds.

Figure 2.4 World’s first 100 m high proto-type timber tower (left) made

with timber composite panels (right) [11].

13

2.7 Bamboo

Bamboo is a member of the grass family “gramineae” that has more than 1200 known species

around the world. A typical bamboo plant is shown in Figure 2.5. Bamboo grows mostly in

tropical and sub-tropical regions of the world, particularly in South Asia and Africa, but it can be

grown almost everywhere. Bamboo grows very quickly; it has a remarkable growth rate,

sometimes reaching 15 to 18 cm in a day and gains its full height in 4 to 6 months [18]; some

species are reported to grow at up to 5 cm per hour [19]. Bamboo’s strength is fully developed

between three to five years and can then be used as structural material.

Bamboo is nature’s superior product; it was the first plant that grew in Hiroshima after the

bombing [19]. It is also the first material used in the filament of the electric light bulb developed

by Thomas Edison [19]. Bamboo can grow at an altitude of 3800 m in all types of lands and soils

[19]. Sometimes bamboo is planted on sloping lands to prevent landslides. Bamboo is recognized

as one of the highest carbon dioxide (CO2) sequesters amongst plants [20].

Bamboo is very similar to wood at a macro-scale, such as appearance and material properties.

However, at the micro-scale, the outer layer of bamboo is harder than the inner, whereas it is the

opposite for wood. Bamboo is a versatile material; its uses span from foods and clothes to

building structures. As a low-cost, strong, and easily available material, bamboo has been

extensively used throughout human civilization. With the growing interest on eco-friendly and

sustainable materials in recent years, significant research has been focused on characterizing the

mechanical properties of bamboo to utilize its potential in modern structures.

Modern structural applications include: footbridges [19], scaffolding [21], composites for wind

turbine blades [22], reinforcement of concrete [23], laminated beams and composites [20] etc.

Bamboo is particularly suitable where high tensile, bending, and compression strengths are

required. Bamboo presents advantages in comparison to other construction materials for its

lightness, high bending capacity and low cost because it requires simple and low-cost processing

techniques with minimal workmanship [24].

14

2.8 Physical Structure of Bamboo

Bamboo grows as a cylindrical hollow structure with thin transversal diaphragms spaced along

its length (Figure 2.6), forming closed cylindrical cavities called “lacuna” [24]. The bamboo

plant body or stem is called a “culm”. The outer part of the culm where these diaphragms are

present is called the node and the inter-nodal portion is a hollow circular section. The diaphragm

closes the hollow structure. Bamboo naturally exhibits dimensional variability along the length

to counteract natural loads; i.e. the diameters and thicknesses of bamboo decrease towards the tip

during its growth, but the variation is not significant for a short section of bamboo. The thickness

of the wall remains constant in the inter-nodal region and increases slightly near the diaphragms.

Figure 2.5 A bamboo plantation in Nepal

(Photo: by the Author)

15

2.9 Micro-structure of Bamboo

Bamboo is a natural fibre-composite material, in which cellulosic fibres are reinforced

longitudinally into the lignin matrix [25, 26]. The cellulose fibres run in the longitudinal

direction and the walls possess a graded structure; fibre density increases from the inner to the

outer wall [26, 27, 28] as illustrated in Figures 2.7-2.10. It is important to note that the

distributions of fibres in the walls and nodal sections or diaphragms are different and so is their

strength. The reported tensile strengths of outer fibres, middle, and inner fibres are given in

Table 2.1. It is noted that outer layer is stronger than that of steel in tension. Liese [29] observed

that the bamboo fibres are essentially vascular bundles Figure 2.10, which are composed of veins

and cellulose micro-fibres reinforced with lignin. The fibres are arranged in both transverse and

longitudinal directions in the nodal region as shown in Figure 2.11.

Wall

Node

Inter-nodal region

Diaphragm

Figure 2.6 A bamboo culm (left) and longitudinal cross-section of the

culm (right) showing its physical structure (Photos: by the Author)

16

Outer wall

Inner wall

Figure 2.7 Cross-section of bamboo

culm perpendicular to the longitudinal

axis, showing wall

(Photo: by the Author)

Figure 2.8 Density of vascular

bundles in the wall [26]

Outer wall

Inner wall

17

Figure 2.9 Fraction of fibre-density with respect to

distance from outer to the inner wall [24]

Figure 2.10 Micro-structure of bamboo wall

showing the vascular bundles [26]

18

It is important to note that bamboo has acquired this graded composite structure through many

years’ of evolutionary processes to resist bending and compression loads, such as wind and self-

weight [26, 30, 31] as well as various natural loads in its environment. Due to its graded structure

for the function of resisting different types of loads, bamboo is known as functionally graded

material (FGM) [26]. Silva et al. [28] used FE modelling to study the composite structure as a

homogenized material domain and concluded that bamboo can be modeled as a homogeneous

material to determine its effective mechanical properties.

2.10 Mechanical Properties of Bamboo

Bamboo exhibits excellent tensile, compressive, and buckling strengths and stiffness properties

in the longitudinal direction [25, 26, 31]. This is attributed to the longitudinal reinforcement of

fibres into the lignin matrix, which form a hollow tubular composite structure with the

diaphragms spaced along its length. Due to the graded composite structure, bamboo is an

anisotropic material having low mechanical strength in the transverse direction [26, 31, 32]. The

general mechanical properties of bamboo are summarized in Table 2.1. Table 2.1 shows

considerable variation in mechanical properties within and across the species of bamboo. This is

typical of natural materials.

Figure 2.11 Arrangements of fibres

in the nodes [29]

19

Table 2.1 Reported Mechanical Properties of Bamboo

Material Properties Values Source and Remarks

Tensile strength (MPa)

- Inner layer

- middle layer

- outer layer

- average strength

135-163

165-275

306-357

162-275

[17]

Compression strength (MPa) 63-86

35-79

44 -117

45-65

46- 68

[34]

Kao Jue for wet and dry [21]

Mao Jue for wet and dry[21]

Kao and Mao Jue [33]

Bambusa Stenostachya (Tre

Gai) [32]

Buckling strength (MPa) 12-37 [21]

Bending strength (MPa) 50-75 Kao Jue [21]

Shear strength (MPa) 9.6

8

16-23

9-14

For nodal region [32]

For inter-nodal region [32]

[34]

[35]

Elastic Modulus (GPa) 12-22 [28, 34]

Poisson’s Ratio 0.30- 0.35 [28]

20

Bamboo is an extremely light material that has a dry density between 600-800 kg/m3 [36].

Bamboo’s specific modulus of elasticity (22889 k m2/s2) is comparable to mild steel (25316 k

m2/s2) and specific strength (214 k m2/s2) four times higher than mild steel (50 k m2/s2) [37]. A

comparison of strength and stiffness of bamboo with different materials is shown in Figure 2.12.

Although bamboo has excellent mechanical properties in the longitudinal direction, it is weak in

the transverse direction (about 10% of the tensile strength [40]) due to the predominantly axial

orientation of the fibres; that is why bamboo is susceptible to splitting or fracturing along the

longitudinal axis. Cracks appear in the hollow section along fibre directions as the nodal section

consists of diaphragms. When a crack or split occurs in the internodal region, it spreads to the

nodal sections but the nodal section prevents further spreading; hence it is safe from the fracture

of the whole culm [19]. Therefore, nodes increase the splitting or fracture strengths of bamboo

culms.

Mitch [32] studied the splitting characteristics of bamboo using a “split-pin” method. Tan et al.

[31] studied the micro-structure crack phenomena. Their results suggest that the low fracture

resistance of bamboo must be taken into account while designing bamboo structures.

Figure 2.12 Relative strength and stiffness of bamboo with

different materials [39]

21

Since bamboo is not an isotropic material, the elastic modulus is different in tension, shear, and

compression. As a graded composite material, it can be viewed as a stack of several concentric

layers with varying properties [19, 28]. The material properties vary between the nodes and

around nodes. The nodes increase the compression and buckling strength in the culm.

The material properties of bamboo depend on a number of parameters, such as diameter,

thickness, inter-nodal distance, straightness, moisture content, species, age, and preservation

techniques [39, 40].

2.11 Joining Methods for Bamboo

Several joining methods are available for bamboo columns; some of the relevant joints to the

lattice tower are discussed here. Different types of joints have been investigated by Arce [39] and

Janssen [40]. Laraque [19] divided joints into two groups: traditional and modern connectors.

The most common traditional method of joining is the lashing technique or wrapping the ropes

or fibres or plastic cords around two or more bamboo columns (Figures 2.13 and 2.14). These

joints are also called friction-tight joints. They are highly effective and provide high strength and

stiffness when two or more bamboo columns are connected at right angles. This is the cheapest

way to connect bamboo in structures and is the most commonly used in scaffoldings,

footbridges, houses, and other structures. The most successful application of lashings or ropes is

scaffoldings [21] of bamboo columns (Figure 2.15) and puja pandals [41]. It is important to note

that these structures or columns fail in buckling rather than in joints [21] under compressive

loads, validating that the lashing of joints are sufficiently strong and stiff. Although lattice towers

are self-supporting structures, unlike scaffolding which needs support, the lashing of joints could

be effectively utilized for bracings and legs in lattice towers. That means the load directions must

be carefully analyzed in the joints that utilize lashing.

22

Figure 2.15 Bamboo scaffoldings in construction (photos taken from [35])

Figure 2.13 Methods of connecting two or more

bamboos culms, the friction tight method [42]

Figure 2.14 Connection

with ropes [42]

23

There are some modern trends in bamboo joining with the aim to transfer loads in an efficient

and reliable way without compromising with the limitations of bamboo culms. These are

illustrated in Figures (2.16-2.18).

Arce [39] investigated the bamboo-wood glued joint, shown in Figure 2.19, and carried out

experimental tests to determine the strength of joints (Figure 2.19) under static loads and load

Figure 2.16 Space frame (left) and connection of bamboo columns by

metallic joint (right) [44]

Figure 2.17 Connection with

steel wire to a steel plate [46]

Figure 2.18 Interlocking with metal

anchors [42]

24

reversals. In this joint, a round piece of wood is glued inside the bamboo culm. Experimental

results showed that there is no impact on the joint strengths by static loads and load reversals;

however, it was not understood at what stress levels the joint would fail under cyclic-loads. The

parameters, bamboo density and bamboo thickness showed no significant influence on the

strength of joints, and bamboo was found to show the weakest bonding in the joint. Glued joints,

between wood and bamboo, were found among the best joints and Arce recommends that stress

design levels should be kept in the elastic range for the safe design of structures.

In a recent work by Albermani et al. [18], the pull-out resistance or strength of the Polyvinyl

Chloride (PVC) - bamboo glued joints, shown in Figures 2.20-2.22, was investigated . In this

joint, a grooved bamboo end is encased inside the PVC cylindrical connector using megapoxy

grouting material. The results of the pull-out tests with and without grooves show that the pull-

out or tensile resistance of the grooved joints is significantly higher than the non-grooved ones.

The reported maximum pull-out resistance was about 18 kN for the grooved specimens of 61

mm diameter bamboo.

Figure 2.19 Bamboo-wood glued joint [39]

25

Figure 2.21 Pull-out test of the joint [18]

Figure 2.20 Double layer grid (DLG) with

PVC-bamboo joints [18]

Figure 2.22 Load-deflection curve of the

joint [18]

26

2.12 Durability of Bamboo

As a natural biological material, bamboo has inherently low resistance to weathering (drying and

wetting processes) and biological decay (ageing and insects and fungi). Under open

environmental conditions without any protection, bamboo can last upto 3-5 years. However, in

protected and indoor applications, the durability is considerably higher depending upon the use.

The longevity of bamboo can be improved if certain protective measures are applied. However,

cost is always the determining factor in deciding whether the preservative techniques should be

used or not.

Since moisture content has influence on the mechanical strength of bamboo, it should be kept as

low as possible and it should not change due to weathering effects when it is used in wind

turbine tower. As a biological material, bamboo is attacked by insects or other micro-organisms

if not treated properly. Insects and fungi degrade the micro-structure of bamboo, which reduces

the mechanical strength over time [29]. There is a strong correlation between insects and fungi

attacks and harvesting time, humidity and starch content (nutrition for insects) of bamboo [46].

In order to reduce the nutrition and moisture contents, bamboo should be harvested in dry

seasons and dried properly [46]. Use of driers and smokers are effective and low-cost methods to

dry bamboo poles. There are many commercial preservative techniques available [46, 47]; but a

low-cost and effective method is to spray the bamboo with borax salt [46, 47]. Surface coatings

may be applied to reduce the effect of humidity or moisture absorption. The details of drying and

curing can be found in [46].

Lima et al. [48] investigated experimentally bamboo’s durability and changes with time in

material properties such as tensile strength and Young’s Modulus when it was used as concrete

reinforcement. Tensile strength and Young’s Modulus showed little difference over time. This

verified that the durability of bamboo does not change in concrete reinforcement. However, in

many applications, weathering often leads to splitting and degradation of bamboo.

27

2.13 Further Comments

Systematic engineering investigations that focused on the design of bamboo structures were

carried out by Arce [39] and Janssen [40], who determined material properties and examined

joint designs. Arce explored various material and design constraints, design objectives, and

developed general design approaches for bamboo structures along with the options for joints.

The conclusions of their studies relevant to this thesis are summarized below:

• Moisture content has significant effect on the strength of bamboo [40]

• The dimensional variation and modulus of elasticity along the length of bamboo does not

reduce bending and axial stiffness by more than 15% [39]

• The critical value of buckling load on bamboo columns can be determined as a

conservative estimate by assuming bamboo is a hollow section [39]

• Splitting is the dominant limit state or failure mode for most bamboo in structural

applications [39,40]

• Tensile strength and density of bamboo are correlated in longitudinal direction but not in

the transverse direction. Tension modulus in the transverse direction is about 1/8th of the

longitudinal modulus [40]

• Use of pins, screws, bolts, or drilling for joints would concentrate stress and induce

splitting of the culm [39,40]

• For designing joints, insertions and gluing of wooden plugs inside the bamboo ends

would eliminate the splitting and weathering effects in the joints [39]

• In glued joints, such as wood and bamboo, stress levels should be kept in the elastic

range for safe design of the structure [39]

• In glued joints, the bamboo density, thickness, and initial diameter, and type of wood did

not influence the strength of joints. It was determined that bamboo was the weakest phase

in the joint and there is no impact on the joint by load reversals, but it was not understood

at what stress levels the joint would fail under cyclic-loads [39]

• Use of “steel fittings as central elements in bamboo connections in bamboo structures” is

recommended [39]

28

Overall, bamboo is a versatile structural material that has been used throughout the human

history. It is a natural material that is cheap and readily available and grows quickly. It possesses

excellent mechanical properties. However, until recently, it is mostly used in temporary

structures (e.g. scaffoldings, footbridges, houses etc...). The main advantages of bamboo for

lattice towers are summarized below:

• grows quickly and is easily available

• low-cost structural material for support structures

• natural composite with excellent mechanical properties along the longitudinal axis

• high strength to weight ratio, superior than steel

• sustainable material and excellent CO2 sequester

There are also limitations that make challenging to use bamboo in lattice towers.

• Lack of appropriate joining techniques due to circular hollow structure and dimensional

variability along the length

• Variability in physical and mechanical properties

• Low durability compared to the life-span of wind turbines

In order to address above challenges, steel-bamboo adhesive joint for leg sections and periodic

replacement of tower members are proposed.

2.14 Adhesives Joints

Adhesives are materials that join two similar or dissimilar structural materials (either metallic or

non-metallic) through surface attachment. A typical physical configuration of an adhesive joint is

illustrated in Figure 2.23 [53]. The materials being joined together are called adherends. The

advantages of adhesive joints are: minimum stress concentration in the joint (than in welded and

riveted joints), high resistance to moisture, light-weight, and easily producible [53]. Adhesive

29

joints are mostly used in aircraft and marine structures. A detailed theory on adhesive joints can

be found in [53].

The joint design involves the calculation of adhesive thickness and the joint length or the overlap

length [53]. Most of the structural adhesives have shear strength in the range 13 MPa-38MPa

[53].

Most adhesive joints are loaded in tension. When an adhesive joint is loaded, shear stresses and

strains are developed within the adhesive and interface rather than in the adherends. Assuming

that a tensile load (F) is applied to the joint of width b and length l, the shear stress (𝜏𝜏𝑦𝑦) in the

joint is given by [53]:

𝜏𝜏𝑦𝑦 = 𝐹𝐹/𝑏𝑏𝑏𝑏 (2.1)

The minimum joint length is given by:

𝑏𝑏 = 𝐹𝐹/𝜏𝜏𝑦𝑦𝑏𝑏 (2.2)

By knowing the shear strength of the adhesive (𝜏𝜏𝑦𝑦) and the load on the joint (F), the length and

width of the joint can be selected. From this simple formula, it is evident that the strength of the

Figure 2.23 Components of an adhesive joint

30

joint can be improved by increasing the bonding area of the joint. The required thickness of the

adhesive can be found by using the Volkerson’s equation [54]:

𝐹𝐹 = 2𝑏𝑏𝜏𝜏𝑦𝑦�𝐸𝐸 𝑡𝑡 𝑡𝑡𝑎𝑎2𝐺𝐺

tanh� 𝐺𝐺𝑙𝑙2

𝐸𝐸𝑡𝑡𝑡𝑡𝑎𝑎 (2.3)

Where, E is the elastic modulus of the adherend, t is the thickness of the adherend, l is the

overlap length, G is the elastic modulus of adhesive, and ta is the adhesive thickness. For the

joint with two dissimilar materials, t and E should be taken of the weaker adherend. It is evident

from equation (2.3) that strength is proportional to �𝑡𝑡𝑎𝑎 .Volkerson [54] assumed that adhesives

deform only in shear whereas adherends deform in tension.

Due to the polymeric layer in the joint, the adhesives have good damping property or fatigue

strength and good resistance to vibration. Also stress concentration is much smaller than in

welded and riveted joints [55]. Among the wide variety of joint designs, those commonly found

in engineering structures are: single lap, double lap, scarf, bevel, step, single butt, double butt,

and tubular lap [54]. However, only the tubular single lap joint, shown in Figure 2.24, was found

an appropriate option for connecting circular bamboo sections in the lattice tower, described in

Chapter 7. The fabrication and testing of the joint strength is described in Chapter 3.

Figure 2.24 Single lap tubular joint

31

Chapter 3

EXPERIMENTAL TESTS ON MECHANICAL PROPERTIES OF BAMBOO

3.1Chapter Overview

In order to assess the feasibility of bamboo for designing lattice towers for small wind turbines, it

is crucial to establish the mechanical properties of bamboo columns. The essential mechanical

properties for design and analysis of the bamboo lattice tower are the compression and buckling

strengths and elastic constants (elastic modulus and Poisson’s ratio). It is first necessary to

establish linear behaviour of bamboo. These material properties provide basic input data and

ultimate design limits for the analysis of the tower. Tensile strength was not determined as the

literature review in Chapter 2 established that bamboo is stronger in tension and due to the fact

that the main design criteria are expected to be the buckling strength and the tensile strength of

the proposed joint. This chapter describes the experimental work on bamboo’s mechanical

properties and strength of steel-bamboo adhesive joints.

3.2 Related Works

As a natural material, both similarity and variation on physical and mechanical properties of

bamboo are evident across different species. Moreover, as bamboo grows under various natural

loads, variation in physical and mechanical properties exists even within the same species.

Therefore, researchers have focused their studies on a specific species. Here, a brief review of

past experimental studies on compression and buckling strengths of different species is

presented.

Cylindrical columns subjected to compressive loading become structurally unstable well below

the yield strength of the material [49]. This phenomenon is called buckling. In the context of

industrial materials such as steel, material properties are well established through theory and

experimental investigations over a long period of time [50]. However, in the case of bamboo,

32

very little information is available and therefore it is required to determine their values through

material testing when a specific species of bamboo is considered.

Arce Villabos [39] evaluated the critical buckling strengths of bamboo columns by considering

variation of second moment of inertia and Young’s Moduli along their length and derived a

mathematical equation, using the “Southwell Plot” procedure, to account for the variation of

elastic and moment of inertia. However, this procedure is too complex to be applied in practice.

Yu et al. [21] investigated the axial buckling behavior of bamboo columns in scaffolding. They

conducted experimental tests on two bamboo species, Kao Jue and Mao Jue, and established the

buckling strengths by calibrating against the characteristic compressive strengths. The Perry-

Robertson interaction formula was used to take into account the modified slenderness ratio and

initial imperfections in the columns.

Richard and Harries [51] determined the buckling strengths of bamboo columns of the species

Bambusa Stenostachya. The experimental results were also compared with the theoretical values

predicted using Euler’s formula for column buckling taking into account the dimensional

variability on diameter, straightness, and material properties along the length. Normalized critical

stress (critical stress times slenderness ratio) and slenderness ratio were used for comparing the

theoretical and experimental results. The slenderness ratio is the ratio of the length and the radius

of gyration of the column. Their results showed that initial out of straightness and tapering

should be taken into account in the buckling analysis.

Yu et al. [21] determined the compressive strengths of two species of bamboo, Kao Jue and Mao

Jue and the mean values reported are 79 MPa and 117 MPa respectively. Chung and Chan [35]

showed that moisture content is important in determining the compressive strengths of culms;

properly dried bamboo ( < 5% moisture content) can have three times higher strengths than the

wet bamboo. Moreover, dried bamboo will have consistent properties. Mitch [32] reported

average compression strength of 56.7 MPa for the bamboo species Bambusa Stenostachya (Tre

Gai).

33

3.3 Testing Protocol

In view of the practical context of this study in developing countries such as in Nepal, the

experimental tests were carried out on the Nepalese bamboo species, bambusa arundinacea,

known as Tama bamboo in Nepal. This species is one of the strongest available and grows in

most parts of the country. The mechanical properties of this species of bamboo have not been

studied prior to this investigation.

3.3.1 Test Specimens for the Buckling Experiment

The bamboo specimens for this experiment were collected by the author in May, 2012 from a

village in Kavre district of Nepal. Straight bamboo culms were obtained from plantations of

about 3-4 years of age, as specified in International Organization for Standardization (ISO)

22156 (2004(b)) test protocol [52], for preparing the test specimens. In general, bamboo starts to

develop mechanical strengths by lignifying and silicating processes after reaching this age [34].

For the test specimens, straight sections of the culms were cut into lengths, ranging from 700 to

1500 mm with diameters from 40 mm to 64 mm. The specimens were cut from fairly straight

sections based on visual inspection (Figure 3.1).

Since bamboo does not possess perfect circular cross-sections and varies in diameter and

thickness along the length, the diameters were measured at four different sections and averaged.

Only specimens with less than 5 mm variation in external diameters between the two ends were

used in the buckling tests. The wall thickness was measured by splitting each specimen after the

buckling tests. Similarly the thickness of diaphragms was measured to get the net cross-sectional

areas of specimens. The ends of the test specimens have nodes at both ends, as shown in Figure

3.1.

34

Since bamboo exhibits higher strengths as well as consistent material properties at moisture

levels below 20% [35], the specimens were air-dried in a natural drying chamber for one and half

month until the moisture levels reduced below 20% before conducting the tests. 20% moisture

level is taken as a reference for experimental tests. It is assumed that about 20% moisture level

would be maintained when bamboo is used in lattice towers.

3.3.2 Buckling Test Procedure

The buckling experiment was accomplished in two phases. The first phase was carried out at

Tribhuvan University (TU), Nepal using a Universal Testing Machine (UTM) having 100 tons

load testing capacity. In this machine, the maximum testing loads can be set at 20, 40, 60, 80,

and 100 tons limits. The machine has a data logging capability of 20 kg/division. The axial

deformations could not be measured during this test due to lack of measuring instruments in the

UTM and so only the critical buckling load could be measured. So, the author brought a few test

specimens to the University of Calgary to determine the load-deflection behaviour of columns,

Figure 3.1 Freshly cut bamboo culms (left) and dried bamboo specimens

for the buckling tests (right) (Photos: by the Author)

35

compression strength, and elastic modulus and Poisson ratio. An MTS-100 test machine, shown

in Figure 3.2, rated at 10 tons was used for these tests.

In the experiment conducted at TU, the test specimen was vertically aligned in the UTM as

illustrated in Figure 3.2. Both ends of the test specimens were fixed on flat metal plates to avoid

rotation and translation when loaded. These types of end conditions were chosen to simulate the

rigidly fixed end connections of the tower members. An axial compressive load was then applied

at a rate of 500 N/sec until buckling failure was observed in the specimen. The critical load was

recorded when the specimens began to buckle. A typical indication of buckling failure was a

small indentation in the surface (see Figure 3.3) along the transverse axis. No longitudinal

splitting was observed in any sample at any time.

In the second phase of the experiment, the buckling tests were carried out at the University of

Calgary (Figure 3.2) in the same manner. An MTS-100 Test Machine was used with two test

specimens to determine the load-deflection behaviour of the columns. These measurements were

not possible in Nepal.

For the buckling test, the specimens were aligned axially in the machine as shown in Figure 3.2

and axial compressive load was gradually applied at a rate of 1mm/min until the buckling failure

was noticed in the specimen. The loads and deformations were recorded at every 15 seconds with

a FlexTest® SE Controller-MTS used to control the load. A typical buckling failure mode of the

bamboo column is shown in Figure 3.3.

36

3.3.3 Compression Test Procedures

The compression tests were carried out at the University of Calgary. The test specimens were

obtained from the same bamboo culms that were used to prepare buckling test specimens in

Nepal. The test specimens were prepared according to the ISO 22157-1:2004 (b), which

prescribes that the length of the test specimens must be between D (diameter of the culm) and

2D. Ten test specimens without nodes were prepared and both ends were finely grinded.

According to [38, 39], there is no effect of nodes in the compressive strength. ISO 22157-1:2004

(b) also outlines that nodes are not required in the test specimens. Therefore, only the specimens

without nodes were tested.

Figure 3.2 Experimental set-up for the

buckling test in the MTS-100 test machine

(Photo: by the Author)

Figure 3.3 Buckling mode of the bamboo

column during the buckling test

(Photo: by the Author)

37

In order to establish the deformation behaviour of bamboo, load and deformation were measured.

Two strain gauges were fixed at mid-height in each diagonally opposite side of the specimens to

measure the strains in the specimens as illustrated in Figure 3.4. Two strain gauges measured the

longitudinal strains (labelled 2 in Figure 3.4) and the other two measured lateral strains (labelled

1 in the Figure 3.4) due to compressive load. The outputs of the strain gauges were used to

determine Poisson’s ratio. Thin rubber pads were placed at each end of the specimens to ensure

uniform loading in the specimen during compressive loading. ISO 22157-1:2004(b) emphasized

that uniform compressive loads must be applied to test specimens. The experimental set-up is

illustrated in figure 3.4.The loads and deformations were recorded at every 15 seconds by

applying load at the rate of 1mm/min in the load head until the failure was noticed in the

specimen. The compressive failure was initiated by splitting along the longitudinal direction as

shown in Figure 3.4.

Figure 3.4 Experimental set-up for the compression test

(left) and split bamboo after the compression test (right)

(Photos: by the Author)

38

3.4 Results and Analysis

3.4.1 Buckling Strength

The physical dimensions of the test specimens and the corresponding test results of the buckling

experiment are presented in Table 3.1 and Table 3.2. The load-deformation curve is depicted in

Figure 3.5.

Table 3.1 Test Results: Buckling Experiment (TU, Nepal)

Specimen MC

(%)

L

(mm)

D1

(mm)

d1

(mm)

D2

(mm)

d2

(mm)

N Nt

(mm)

Pcr

(N)

Fc

(MPa)

BT01 20 880 60 47 56 46 3 6 41225 41

BT02 17 1060 55 45 52 44 3 4 37345 48

BT03 20 1000 59 45 57 44 3 10 32980 29

BT04 19 1070 64 52 62 50 3 7 36375 33

BT05 15 1060 43 29 42 28 3 3 28130 36

BT06 16 1300 49 39 48 38 3 5 19400 28

BT07 18 1160 59 44 58 44 4 14 31525 26

BT08 18 1220 60 50 58 48 3 5 37345 43

BT09 18 1280 54 44 52 43 3 4 30070 39

BT10 18 1170 59 45 57 43 4 5 44135 39

BT11 19 1240 58 44 56 43 3 6 58685 52

BT12 19 1320 47 38 46 36 3 4 16490 27

BT13 19 1050 64 50 63 48 3 6 69840 56

39

BT14 18 1170 57 44 56 42 3 6 42195 41

BT15 20 1160 56 44 54 42 3 5 32980 35

BT16 18 1100 50 42 49 40 3 4 21340 37

BT17 17 1140 47 35 46 33 3 4 25220 33

BT18 19 1280 50 38 48 36 3 4 25220 30

BT19 18 1220 47 39 45 37 3 3 22795 42

BT20 17 1410 42 34 40 32 3 4 11155 23

BT21 19 1100 47 37 46 36 3 3 27160 41

BT22 17 1210 41 31 40 29 3 4 12610 22

BT23 16 1200 53 43 52 41 3 5 40827 54

BT24 17 1060 45 35 44 33 3 3 28130 45

BT25 14 670 62 49 60 48 3 2 52000 52

BT26 12 960 72 62 71 61 3 3 49400 48

BT27 15 1010 76 63 74 61 3 3 77600 57

BT28 16 1080 69 58 67 56 3 3 49800 45

BT29 15 1120 72 58 69 56 3 4 54000 43

BT30 12 1110 73 58 69 57 4 3 56000 46

BT31 13 1100 71 53 69 51 3 2 77000 45

BT32 13 1200 71 57 69 56 3 3 75000 52

BT33 15 1010 61 44 58 43 4 3 47000 58

BT34 12 1200 68 57 65 55 3 4 50600 55

BT35 11 1250 69 55 67 54 3 3 68000 54

40

BT36 11 1340 70 57 68 56 3 2 46000 37

Table 3.2 Test Results: Buckling Experiment (University of Calgary)

Specimen MC

(%)

L

(mm)

D1

(mm)

d1

(mm)

D2

(mm)

d2

(mm)

N Nt

(mm)

Pcr (N) Fc

(MPa)

BT01 15 640 57 49 53 45 2 2.5 38730 60

BT02 17 655 52 42 47 39 2 3.0 27050 50

To assess the buckling strengths of columns, Euler’s formula for column buckling was adopted

by incorporating the variation in second moment of inertia along the length (due to the variation

of diameter and thickness), as suggested by previous studies, eg. [21] and [51]. The cross-

sectional area and second moment of inertia were computed at the smallest cross-section of the

column. The cross-sectional area (A) and the second moment of inertia (I) of the bamboo column

are given by:

𝐴𝐴 = 𝜋𝜋�𝐷𝐷𝑒𝑒2 − 𝐷𝐷𝑖𝑖2� 4⁄ = 𝜋𝜋[𝐷𝐷2 − (𝐷𝐷 − 2𝑡𝑡)2] 4⁄ (3.1)

𝐼𝐼 = 𝜋𝜋[𝐷𝐷4 − (𝐷𝐷 − 2𝑡𝑡)4] 64⁄ (3.2)

The slenderness ratio (λ) was computed at the smallest section of the column, given by:

λ = 𝐿𝐿𝑒𝑒 𝑟𝑟⁄ (3.3)

Here, Le is the effective length of the column and r is the radius of gyration given by:

𝑟𝑟 = �𝐼𝐼 𝐴𝐴⁄ (3.4)

41

In the tests, the column was supported at both ends that simulate the pinned-pinned column

supports. So the effective length of column is taken as equal to the actual length of the bamboo

specimens. The Euler’s elastic buckling strength (Fcr) for the column is given by:

𝐹𝐹𝑐𝑐𝑐𝑐 = 𝜋𝜋2𝐸𝐸 λ2⁄ (3.5)

As shown in Tables 3.1 and 3.2 above, various column sizes were tested in the buckling

experiment. Buckling strengths of bamboo columns as a function of slenderness ratio are plotted

in Figure 3.5. The least squares method was used to fit a quadratic equation to the data at 95%

confidence level as required by [6], so that buckling strength for any bamboo column with

known slenderness ratio, i.e. length, diameter and thickness, can be determined using the lower

bound in Figure 3.5.

The quadratic equation of the lower bound at 95% confidence level is:

𝐹𝐹𝑐𝑐𝑐𝑐 = −0.0061λ2 + 0.47λ + 24.77 (3.6)

40 50 60 70 80 90 100 11010

20

30

40

50

60

Slenderness Ratio

Buc

klin

g St

reng

th (M

Pa)

2rd order polynomialPred bounds (95% confidence interval)BucklingStrength vs. SlendernessRatio

Figure 3.5 Relationship between buckling strength and slenderness

ratio of bamboo columns

42

The results of buckling tests obtained above are comparable to the results obtained by Yu et al

[21] on similar bamboo columns of the Kao Jue and Mao species. It is also observed from Figure

3.6 that the load-deflection behaviour of bamboo columns is approximately linear, which is a

useful material property for designing lattice towers. It is also evident that there exists a

significant variation in the buckling strengths. This variation was taken into account by

considering the 95% confidence level values, as required by IEC.

3.4.2 Compression Strength

The test results obtained from the compression experiment are presented in Table 3.3. The load-

deflection behaviour is depicted in Figure 3.7. According to ISO22157-1:2004(b), the

compression strength (σc) of the culm is determined by using equation (3.7):

𝜎𝜎𝑐𝑐 = 𝐹𝐹𝑐𝑐𝐴𝐴𝑐𝑐𝑐𝑐𝑐𝑐𝑐𝑐

(3.7)

Figure 3.6 Load-deflection behaviour of bamboo

columns in buckling tests

43

where, Fc is the maximum compressive load and Aculm is the cross-sectional area of the culm,

given by equation (3.1).

Table 3.3 Test Results: Compression Experiment

Specimen No

MC (%) Outside Diameter (mm)

Thickness (mm)

Length (mm)

Load (kN)

Compression Strength (MPa)

CT01 12 56.62 8.03 56.30 73.41 59.86

CT02 13 56.66 8.19 57.00 86.57 69.36

CT03 11 61.11 5.77 67.17 74.83 74.53

CT04 14 61.72 5.10 61.30 70.81 77.98

CT05 11 62.02 5.19 60.50 70.06 75.59

CT06 9 61.85 5.46 59.80 72.00 74.43

CT07 10 56.57 10.36 62.61 82.35 54.74

CT08 11 63.32 6.05 65.66 56.47 51.87

CT09 12 56.77 8.68 59.40 71.60 54.58

CT10

10 56.50 9.02 55.28 74.05 55.00

From Table 3.3, the compressive strength of bamboo was found in the range, 51-77 MPa, which

gives compressive strength of 44 MPa at 95% confidence level. The results compare well with

the reported compressive strengths by various authors for different species of bamboo, e.g. Yu et

al. [21], Mitch [32], and Chung and Chan [35].

The load-deformation behaviour of bamboo in compression is shown in Figure 3.7. It is

important to note that a non-linear section of the curve is observed at the beginning. This should

not be treated as the material behaviour because it is due to the initial deformation of rubber pads

at both ends of the specimens before the test specimens take the compressive loads. After this

44

region, the overall load-deformation is approximately linear. Previous studies performed by

Chung and Chan [35] have also shown the linear load-deformation behaviour (Figure 3.8).

Figure 3.8 Load-deformation behaviour of bamboo

in compression (adapted from [35])

Figure 3.7 Load-deformation of bamboo in compression

Linear region

45

3.4.3 Modulus of Elasticity and Poisson Ratio

Stress-strain curves are an important measure of material’s mechanical properties. The

longitudinal strains were measured using strain gauges installed in four different test specimens.

It is important to note that a non-linear section of the curve is observed at the beginning;

otherwise the results can be misleading. This should not be treated as the material behaviour, but

due to the effect of test-setup. This is due to the initial deformation of rubber pads used at both

ends of the specimens until the test specimens started taking the actual loads. The elastic

modulus Ec was determined by the slope of stress-strain graph in the linear region (Figure 3.9).

𝐸𝐸𝑐𝑐 = 𝜎𝜎𝑐𝑐𝜀𝜀

(3.8)

From the stress-strain graph, elastic modulus was computed in the linear-elastic region as 16.2

GPa at 95% confidence level as required by [6] in tower design. This value is similar to the

reported values for other species of bamboo [28].

The Poisson ratio,ν, is the ratio of lateral to longitudinal strain measured in the linear region

during compression loading and is expressed as:

ν = 𝑙𝑙𝑎𝑎𝑡𝑡𝑒𝑒𝑐𝑐𝑎𝑎𝑙𝑙 𝑠𝑠𝑡𝑡𝑐𝑐𝑎𝑎𝑖𝑖𝑠𝑠𝑙𝑙𝑙𝑙𝑠𝑠𝑙𝑙𝑖𝑖𝑡𝑡𝑙𝑙𝑙𝑙𝑖𝑖𝑠𝑠𝑎𝑎𝑙𝑙 𝑠𝑠𝑡𝑡𝑐𝑐𝑎𝑎𝑖𝑖𝑠𝑠

(3.9)

The lateral and longitudinal strains were measured by strain gauges installed in the test

specimens. Poisson’s ratio was computed in the linear region. The average Poisson’s ratio for

each specimen was 0.29, 0.33, 0.35, and 0.36. The average Poisson ratio is determined as 0.33.

For most engineering materials, such as steel and aluminum, the values lie between 0.25-0.35. A

Poisson’s ratio of 0.35 is reported in [28].

46

It is evident from the results of buckling (Table 3.2 and Figure 3.5) and compression tests (Table

3.4) that the buckling strengths of bamboo column for slenderness ratio below 60 are comparable

to the compressive strengths. For the longer columns the failure occurs due to bending across the

transverse axis rather than splitting along the longitudinal axis (due to shear stress), whereas for

the short columns, the failure occurs due to splitting along the longitudinal axis (due to shear

stress).

In order to determine the dominant failure criteria (i.e. shear or yield) in buckling of columns,

maximum shear stress criterion was used. The principal stresses in a biaxial loading are

expressed as:

𝜎𝜎1,2 = 𝜎𝜎𝑥𝑥+𝜎𝜎𝑦𝑦2

± ��𝜎𝜎𝑥𝑥+𝜎𝜎𝑦𝑦2

�2

+ 𝜏𝜏𝑥𝑥𝑦𝑦2 (3.10)

Figure 3.9 Stress-strain of bamboo in compression

Linear region

47

Maximum shear stress is given by:

𝜏𝜏𝑚𝑚𝑎𝑎𝑥𝑥 = ��𝜎𝜎𝑥𝑥+𝜎𝜎𝑦𝑦2

�2

+ 𝜏𝜏𝑥𝑥𝑦𝑦2 (3.11)

Alternatively, maximum shear stress is expressed as: 𝜏𝜏𝑚𝑚𝑎𝑎𝑥𝑥 = max

⎣⎢⎢⎢⎡�𝜎𝜎1−𝜎𝜎22

�

�𝜎𝜎2−𝜎𝜎32

�

�𝜎𝜎1−𝜎𝜎32

�⎦⎥⎥⎥⎤ (3.12)

In a uniaxial compressive loading, the buckling failure is dominated by yield rather than shear

stress ( or splitting along the longitudinal axis) if the maximum shear stress is less than the

maximum shear stress of the test specimen in tension at yield.

𝜏𝜏𝑚𝑚𝑎𝑎𝑥𝑥 < 𝜏𝜏𝑌𝑌 = 𝜎𝜎𝑌𝑌2

(3.13)

In the present experimental study, the tensile strength of the species, bambusa arundinacea, was

not measured. The tensile strengths of different bamboo species have been reported in the range

162-275 MPa (Table 2.1). For the purpose of this analysis, the minimum average tensile stress

(𝜎𝜎𝑌𝑌) of 162 MPa is used. Similarly, the minimum average shear stress (𝜏𝜏𝑥𝑥𝑦𝑦) is taken as 10.6 MPa

(Table 2.1). In the compression test, 𝜎𝜎𝑦𝑦 = 0.

From Table 3.4, the maximum compressive stress was experimentally determined as: 𝜎𝜎𝑥𝑥 = 77.98

MPa. Using equations (3.10-3.13):

𝜏𝜏𝑚𝑚𝑎𝑎𝑥𝑥 = ��𝜎𝜎𝑥𝑥+𝜎𝜎𝑦𝑦2

�2

+ 𝜏𝜏𝑥𝑥𝑦𝑦2 = ��77.98+02

�2

+ 10.62 = 40.40 MPa < 81 MPa

From this analysis, it is evident that the shear failure is not the dominant failure mode in bamboo

columns. In other words, the design of bamboo lattice towers should be based on buckling

strength, which is the dominant failure mode of bamboo columns.

48

3.5 Joint Testing

As far as the author is aware, no previous experimental studies on steel-bamboo adhesive joints

have been carried out. This experimental study on joints focused on measuring the tensile or

pull-out resistance of a particular size of steel-bamboo adhesive joint. The analysis and modeling

of the joints were not performed due to the requirement of extensive experimental works.

As an initial step to calculate the size of the test specimens, a 12 m high tripod model, described

in Chapter 7, was optimized against buckling strength of leg sections for various base distances.

The minimum possible diameter of tower legs, that is safe against buckling, was computed. The

dimensions used in the fabrication of steel-bamboo adhesive joints are presented in Table 3.4.

Five test specimens of bamboo-steel adhesive joints were fabricated using structural epoxy resin.

Each joint was fabricated by encasing the ends of 52 cm long and 65 mm diameter bamboo

sections into the cylindrical steel cap as shown in Figure 3.10. A 68.6 mm diameter steel cap was

chosen based on the available size of steel pipe in the market, whereas the length of the steel

caps was chosen as 46 mm by assuming the practicable size of the joint in the lattice tower.

As reported in [18], surface roughening and grooves could improve the strengths of the adhesive

joints by more than 50%. The surface of the bamboo ends was first roughened using sand paper

and 3 groves (4 mm wide by 2 mm depth) were made at each end of bamboo. Each groove was

made at 10 mm apart. Epoxy resin was mixed with the hardener and then applied around the

external surface of the bamboo ends and internal surface of the steel cap. Bamboo ends were

then encased inside the cylindrical cap by applying slight pressure until epoxy was properly

filled in the gap. The joint sections were clamped to ensure straightness and uniform gluing until

the joint was properly cured. The joints were cured for one and half day before the test was

carried out. The normal curing time of the used epoxy is about 8 hours.

49

The pull-out experiment was carried out in a UTM at Tribhuvan University, Nepal .The solid

rods welded at the ends of steel caps were clamped in the UTM (Figure 3.11) and axial tensile

load was gradually increased until failure was noticed in the joint. The load-deflection graph

could not be measured due to lack of measuring instrument in the UTM. Only the ultimate

failure loads were measured (Table 3.4). The failure occurred in the joints mostly by slippage of

the culm (Figure 3.12), and no crack and splitting were observed in the bamboo surface. It is

evident from Figure 3.12 that the bonding between epoxy-steel is stronger than that of between

the epoxy-bamboo.

Figure 3.10 Specifications of the bamboo (left) and cylindrical steel caps (right)

used in the fabrication of epoxy grouting joint specimens

50

Figure 3.12 Failure of the joint by

slippage of bamboo culm from the

steel cap (Photo: by the Author)

Figure 3.11 Specimen setup for the pull-out

test on bamboo joints in a Universal Testing

Machine (Photo: by the Author)

Steel-bamboo adhesive joint

51

Table 3.4 Results of Pull-out Tests on Steel-bamboo Adhesive Joints

Test specimens

Length of bamboo(cm)

Dia. of bamboo, D1 (mm)

Dia. of bamboo, D2 (mm)

Steel cap diameter

and length (mm)

Joint length (mm)

Pull-out resistance

(kN)

TS1 52 64.7 64.4 68.6×46 46 21.46

TS2 52 64.1 64.3 68.6×46 46 22.45

TS3 52 62.8 62.6 68.6×46 46 23.23

TS4 52 63.4 63.3 68.6×46 46 22.91

TS5 52 63.4 63.3 68.6×46 46 22.58

Pull-out resistance at 95% confidence level 20.32

It is noted that the results of this study are in close agreement with the pull-out strength (18 kN)

of the PVC-bamboo adhesive joint reported in [18]. Further, it was experimentally determined

that the load-deformation of PVC-bamboo adhesive joint is linear-elastic (Figure 2.22). This

indicates that the load-deformation behavior of the bonding between bamboo-adhesive is linear-

elastic.

From this experimental work, it is concluded that the tubular single lap joints have good pull-out

strengths, which is about one half of the buckling strength reported above. Further, this is the

simplest type of adhesive joint that is easy to fabricate. The joints can be produced easily at low

cost by encasing the bamboo ends inside the steel tubular caps and using structural adhesives

(e.g. epoxy resins) between the outer surface of bamboo and inner surface of steel. Steel tubular

caps of desired diameter and thickness are easily available in the market.

52

Chapter 4

LOADS AND DESIGN REQUIREMENTS FOR WIND TURBINE TOWERS

4.1 Chapter Overview

This chapter outlines the design standards and requirements for small wind turbine towers and

different loads acting on wind turbine towers.

4.2 Design Standards and Requirements

The design of wind turbine towers is governed by the loads acting on the tower and the strength

of materials. The loads should consider the extreme load-cases that the wind turbine tower may

encounter during its life-span. Standards such as IEC 61400-2 and Germanischer Lloyd (GL)

certification guidelines [56] for wind turbines require that ultimate and fatigue strengths of

structural elements must ensure structural integrity of wind turbines and components during

extreme wind loads. IEC 61400-2 is the most commonly used safety standard for small wind

turbines.

IEC61400-2 has categorized wind turbines into four classes in terms of maximum wind speed

and turbulence parameters. Extreme wind speeds, which are 3-second gust wind speed with 50

years’ recurrence period, are given in Table 4.1 for different classes of wind turbines.

Table 4.1 Extreme Wind Speeds for Different Classes of Wind Turbines [6]

Class of wind turbines 50-years, 3-Second gust wind speed (m/s)

I 70

II 59.5

III 52.5

IV 42

53

The simple load model (SLM) of IEC 61400-2 ensures safety by setting different load cases for

designing small wind turbines. The different load cases of the SLM are:

1. Load case A: Normal operation – fatigue load due to rotating blades

2. Load case B: Yawing – gyroscopic forces and moments

3. Load case C: Yaw error – flap wise bending moment is caused due to yaw error

4. Load case D: Maximum thrust – maximum thrust on rotor blades

5. Load case E: Maximum rotational speed- centrifugal forces are created due to rotation of

blades

6. Load case F: Short at load connection – high moment is created due to the short circuit

torque of the generator

7. Load case G: Shutdown (braking) – maximum blade load during shutdown

8. Load case H: Parked wind loading – the loads on the parked blades are calculated using

the extreme wind speed, which is the 3-second 50 years recurrence wind speed.

9. Load case I: Parked wind loading, maximum exposure – in the case of failure of yaw

mechanism, the turbine may be exposed to wind loads from all directions, which must be

considered

According to the SLM, load case H gives the maximum bending stress on the tower. It is an

extreme load case due to the maximum thrust on turbine blades and the drag on the tower at the

extreme wind speed, taken here as 50 m/s. This is close to the 3-second 50 years recurrence wind

speed specified for class III wind turbines, 52.5 m/s, and is consistent with the limited

measurements of extreme wind speeds in Nepal. IEC 61400-2 also requires that the drag on

tower is calculated using the same extreme wind speed.

It is important to note that Load case A gives the fatigue load on tower; however, the stress on

tower due to fatigue load is relatively small compared to the load case H. Therefore, the design

of tower should be based on the extreme load case H. Other load cases are only useful in the

design of wind turbines.

54

4.3 Loads on Wind Turbine Tower

Wind turbine towers are subjected to a combination of three main types of loads throughout their

life-span, which define the final size of the tower [10]. These are:

• Gravity or dead loads due to turbine, nacelle, and tower masses

• Aerodynamic thrust on turbine blades

• Aerodynamic drag forces on tower structure

Almost all wind turbine towers are designed to withstand these loads. In addition, there are also

loads generated by the steady and unsteady blade torque transmitted to the tower. Fatigue loads

are caused by the fluctuating thrust on turbine blades. Gyroscopic loads occur as a result of

yawing the rotating blades. Only fast yawing rates lead to significant gyroscopic moments in the

vertical plane at the top of the tower. However, as yawing rate is relatively slow in small

turbines, the effect is relatively small and is not usually considered in the design of tower [7].

For the SLM of IEC61400-2, the main load is the ultimate load due to the extreme wind speeds,

for which the deflection of the tower should be small. The descriptions of the main loads are

summarized below.

4.3.1 Gravity Loads

Gravity or dead loads are comprised of the lumped mass of the rotor and nacelle and the

distributed mass of the tower. These loads are static and do not change throughout the service

period of the tower. Gravity loads contribute to both the axial and bending stresses in the tower.

The centre of mass of a wind turbine is usually off-set from the tower axis. The clearance

between the rotational plane of the blades and the tower is kept as small as possible in order to

minimize the length of the nacelle and to avoid the bending moment induced due to turbine

overhang. As the design should ensure linear elastic deflection, the secondary effect, which is

known as load-deflection (P-δ) magnification, is not considered in this study.

55

4.3.2 Aerodynamic Thrust on Rotor Blades

The aerodynamic thrust is generated by the blades. It acts in the horizontal direction at the tower

top. It is determined by multiplying the turbine thrust coefficient and the swept area of the rotor:

𝐹𝐹 = 𝐶𝐶𝑇𝑇 𝜌𝜌𝐴𝐴𝑈𝑈2

2 (4.1)

where, F is the thrust on turbine, CT is the thrust coefficient of blades, A is the projected area of

the blades in the plane of rotation, and U is the extreme wind speed (m/s).

To calculate the maximum thrust on rotor blades using equation (4.1), load case H of IEC 61400-

2 is used [6, 7]. In this load case, the rotor is assumed stationary at extreme winds, in which case

the torque coefficient is equal to the drag coefficient of the blades [7]. For the stationary rotor

blades, the drag coefficient is 1.5 [6].

4.3.3 Drag on the Tower

Drag forces are caused by the flow of wind around the tower. The tower components can be

considered as bluff bodies. The drag, which is force per unit length of tower component, is

expressed as:

𝑞𝑞 = 𝐶𝐶𝑑𝑑𝜌𝜌𝜌𝜌𝑈𝑈2

2 (4.2)

IEC 61400-2 has recommended the drag coefficient of 1.3 for circular cylindrical members. This

value is used here. Despite the fact that wind speed varies along the tower height, it is easier and

conservative to assume the extreme wind speed to be constant throughout the tower height to

calculate the drag forces. The drag force in a tower member is computed by using equation (4.2).

The drag on each tower members is applied as uniformly distributed loads.

56

4.4 Load Safety Factors

In designing the wind turbine tower, load safety factors are applied in order to provide the safety

margins of the tower. IEC load safety factors are the most commonly used factors in the design

of wind turbine towers, which are given in Table 4.2. Here, we use these factors in the tower

design.

Table 4.2 Load safety factors for the design loads [6]

Sources of loading Load safety factors

Wind loads 1.35

Gravity loads 1.10

4.5 Tower Design Methods

Once the loads acting on the tower are determined, resultant stresses and deflections within the

structure are determined. These values are then analyzed to determine the optimum dimensions

of the structure and to minimize the material cost of the structure. The commonly used tower

design methods are described below.

4.5.1 Allowable Strength Design

The allowable strength design (ASD) is the most commonly used criterion in the design of

structures and the only one to be used in the context of the SLM. In this method, the stresses

developed within the structural elements are compared with the allowable stress of the material

[7] using factor of safety (FS) or its inverse, the capacity factor (CF).The design stresses and

allowable stresses are expressed as:

𝜎𝜎𝑙𝑙𝑒𝑒𝑠𝑠𝑖𝑖𝑙𝑙𝑠𝑠 ≤𝜎𝜎𝑦𝑦𝐹𝐹𝐹𝐹

= 𝜎𝜎𝑎𝑎𝑙𝑙𝑙𝑙𝑙𝑙𝑎𝑎𝑎𝑎𝑎𝑎𝑙𝑙𝑒𝑒 (4.4)

57

where, 𝜎𝜎𝑙𝑙𝑒𝑒𝑠𝑠𝑖𝑖𝑙𝑙𝑠𝑠 is the design tensile or compressive stress for the structural element, 𝜎𝜎𝑦𝑦 is the

yield strength of the material, 𝐹𝐹𝐹𝐹 is the factor of safety (=1/ CF), and 𝜎𝜎𝑎𝑎𝑙𝑙𝑙𝑙𝑙𝑙𝑎𝑎𝑎𝑎𝑎𝑎𝑙𝑙𝑒𝑒 is the allowable

stress of the structural element.

An ultimate strength is the maximum strength beyond which the structure subjected to extreme

loads is assumed to fail to meet the design requriements or lose stability.

4.5.2 Allowable Buckling Strength

Since wind turbine towers are slender structures subjected to compressive loading, buckling is

often the governing design criterion. IEC 61400-2 does not give detailed specification for

buckling, but it requires the tower to satisfy relevant local codes as well and hence its buckling

analysis must be based on those codes. This study uses the standards, ASCE [57], the Eurocode 3

[58], and the AISC [59] for the steel tower. Small tower designs, e.g. [7] and [8], have used the

ASCE and Eurocode 3 to assess the buckling strengths.

4.5.3 Allowable Tower Deflection and Natural Frequency

Most of the tower designs are governed by allowable stress and buckling or stability criteiria of

the tower. In addition, tower top deflection or stiffness and natural frequency of tower vibration

are also considered.Although there are no standards that set the limit for tower-top deflection, it

is mentioned in [8] that 5% of the tower heigth is acceptable for small wind turbine towers to

ensure linear-elastic response for the worst case loads. It is also important to ensure that natural

frequency of the tower should not be excited by the blade passing frequency.

58

Chapter 5

DESIGN AND OPTIMIZATION OF LATTICE TOWERS FOR SMALL WIND TURBINES

5.1 Chapter Overview

This chapter introduces the proposed lattice tower, the analytical formulation of the tower, and

then describes the design optimization procedure using analytical and FE analysis techniques.

5.2 Overview of Design Optimization and Objectives

According to Dieter [60], to design a product is “to pull together something new or arrange

existing things in a new way to satisfy a recognized need of society that has never been done

before”. Designing a new thing is primarily driven by society’s needs to solve problems or

modify the current design due to design inadequacy. In [60], it has been emphasized that “design

is a multifaceted process and encompasses various considerations: design requirements, life-

cycle issues, and regulatory and social issues”. In general, design is governed by the choice of

materials or their properties and design needs. In the context of this thesis, we investigate the

application of a new material bamboo and optimization procedure of wind turbine tower with an

objective of minimizing the cost of material and manufacture while satisfying the safety

requirements of IEC41400-2.

Multiple design objectives are combined in the design of wind turbine towers. These

fundamentally arise from different design requirements, such as: maximizing structural

performance and minimizing weight, costs, and maintenance. In the process of tower design, it is

critical to synthesize these objectives simultaneously for the design to be ultimately successful in

practical situations. However, simultaneous optimization is a complicated design process and

therefore trade-offs between design objectives are often required.

59

As outlined in Chapter 1, the underlying motivation of this study is to reduce the costs of

material, manufacture, transportation, and installation and maintenance of tower. In order to

achieve those objectives, triangular lattice tower is proposed, which can be manufactured using

steel tubular sections or bamboo. Clearly, it is entirely feasible to make lattice towers from steel

pipe, but the feasibility of bamboo lattice towers has not been established. A major aim of this

chapter is to establish this feasibility.

To design a low-cost and easily transported lattice tower, mass minimization as well as load and

safety are important for steel towers, whereas load and safety requirements are important for a

bamboo tower. Two tower design examples each having 12 m height considering the load cases

of same 500 W wind turbine are examined. These sizes of wind turbines are typical for remote

power systems in off-grid applications or in rural areas of developing countries, such as in Nepal.

The basic load information for this turbine is taken from [7].

5.3 The Triangular Lattice Tower

The structural model of the proposed triangular lattice tower is shown in Figure 5.1. The tower is

basically a tripod. The tower consists of three circular hollow columns (legs or pods) as the main

load-carrying structural elements, positioned at the corners of an equilateral triangle at the base

and fixed together into the turbine mounting flange at the tower top. The tower-top width is kept

as minimum as possible. The legs are braced to each other with horizontal and cross bracings at

intermediate heights in order to prevent buckling and to enhance stiffness of the tower.

Horizontal- and cross-bracings are joined to the legs either by welding or use of mechanical

fasteners that constitute the lattice structure.

The key structural feature of the lattice structure is that the legs carry axial and bending loads

and the horizontal and cross-bracings increase the lateral stability of the legs by resisting shear

forces and bending moments between the legs. Once the tower height is fixed, the load carrying

capability of the tower is determined by the base distance between tower legs (b) and the cross-

60

sectional dimensions, D and t, of legs and bracings. It is important to note that for any given

tower height (h) and tower-top width, there is no unique base distance between the legs or sizes

of legs and bracings. As the legs are columns, the governing design criteria are the buckling

strengths of legs and the tensile strengths of joints connecting the tower members.

Lattice towers can be designed with different bracing configurations. The commonly used

configurations are the x- bracings with horizontal bracings as shown in Figure 5.1. Alternatively,

only x-bracings are used without horizontal bracings. The cross-section of the bracings may be

angular or circular hollow sections, which can be joined by welding or using mechanical

fasteners. Wood [7] mentioned that corrosion could occur at the joints of angular sections and

recommended galvanized tubular sections. The present study for steel tower considers the

Z

Figure 5.1 Structural model of the triangular

lattice tower

Y

X

b

Tower top width

A lattice section

Cross-bracing

Horizontal bracing

Leg section

Base distance

61

galvanized circular hollow steel sections for legs and bracings, whereas round and solid steel

rods for cross-bracings.

The triangular lattice tower presents significant advantages over monopole towers. First, it is

structurally efficient in transferring the loads to the foundation due to its increasing cross-section

towards the base (lower stress and higher stiffness). So the tower can be designed lighter with

minimum use of material even if the monopole is manufactured in sections with varying

thickness. Second, it is easy to manufacture, transport, and install and repair lattice towers with

short and smaller tubular sections as tower components. Furthermore, the spacing between the

legs means lattice towers require small foundations. This would further reduce the cost of

building the towers. The main design features of the triangular lattice tower are summarized

below:

The design of the triangular lattice tower is governed by several variables and design constraints

which are summarized below:

• Tower height (h)

• Number of tower sections or lattices

• Tower top width

• Base distance between the tower legs (b)

• Diameters (D) and thicknesses (t) of the legs and bracings

• Loads and boundary constraints imposed on the tower

• Strength of the materials used

Among these variables, h, the number of lattice sections, and the tower top width are assumed to

be specified at the initial stage of tower design. The remaining design parameters are b, D, and t,

which depend on the loads and boundary constraints and the strength of materials. The loads are

specified by the standards such as IEC61400-2. To assess the strength of tower, this study uses

the ASCE, Eurocode 3, and AISC codes for steel tower, whereas for the bamboo tower, material

properties determined from the experimental tests are used.

62

5.4 Design Procedure

Self-supporting lattice towers are indeterminate structures. Consequently, it is not possible to

obtain exact analytical solutions for stresses and deflections in the structure to apply directly to

the design of tower. However, the structural model of the tower can be simplified to obtain

approximate analytical solutions, which can then be extended to a more detailed analysis by FE

modeling.

In the first step, structural analysis is carried out to obtain approximate analytical solutions by

assuming a simplified structural model of the lattice tower. Equations are formulated to

determine the stresses on tower legs and tower-top deflection for various base distances. Using

these analytical solutions, a simple optimization is carried out to get the first approximations on

tower dimensions. In the second step, FEA using ANSYS APDL is used to extend the

approximate analytical solutions and to provide detailed tower analysis and design. The

methodology adopted in the tower design optimization is briefly summarized in Figure 5.2.

63

Figure 5.2 Design optimization procedures for the lattice tower

5.5 Structural Analysis of the Lattice Tower

Assuming that the tower top width is relatively small compared to the base distance between the

tower legs, the triangular lattice tower was modeled as a tripod structure consisting of three legs

as its main structural elements as shown in Figure 5.3. This simplifies the analysis for tower

design and optimization.

Calculation of ultimate loads on tower

• Gravity loads • Wind loads

Structural analysis of the lattice tower

Approximation of the tower dimensions using

analytical solutions

Design validation using FE modeling

Optimum Tower Design

64

5.5.1 Analysis of the Tripod Model

Chapter 4 described the main loads acting on the tower along with the design requirements.

Using these loads, structural analysis is carried out to compute the internal forces, stresses, and

deflections in the tower.

A free-body diagram (FBD) of the lattice tower as a tripod consisting of three legs is shown in

Figure 5.3.The bracing elements are not included in the model. The tower loads are due to the

lumped mass of turbine and nacelle and horizontal thrust at the tower top, gravity load due to

tower mass, and uniform drag forces along the lengths of tower legs.

For any h, the design variables are D, t, and b. So the total mass of the tower depends on the base

distance and dimensions of legs. The FBD shown in Figure 5.3 is now used to find the analytical

solutions for the axial and bending stresses on tower legs.

Assumptions made in the analysis:

• The drag coefficient of 1.3 was obtained from IEC61400-2 by assuming the tower

members to be circular cylinders. IEC61400-2 has specified the extreme wind speed of

52.5 m/s for class III wind turbines. As discussed in Chapter 4, we used the extreme wind

speed of 50 m/s to calculate the turbine thrust and drag on tower legs, which was

assumed to be constant throughout the tower height.

• The bending moment due to drag on the tower was calculated by assuming the tower as a

cantilever beam.

• The response of the tower to the imposed loads is linear elastic, i.e. secondary effects,

also known as moment amplification or P-δ effects are negligible for the small deflection

of the tower. In other words, it is assumed that “A static-linear-three dimensional

structural analysis is sufficient for almost all lattice tower structures” is valid as

mentioned in SCI (2003) [7].

65

• Aerodynamic damping [57], which arises due to the relative motion between the tower

and the wind, is negligible as the tower deflection is linear elastic and static ultimate

analysis is sufficient for lattice tower structures as discussed above.

• The maximum compressive stress occurs in the single rear leg, CD, when the wind is

normal to the line drawn between the two front legs, AD and BD, and the maximum

tensile stress occurs when the wind direction changes by 180° (Figure 5.3). These are the

two extreme load cases that are examined here. It is further assumed that the maximum

compressive and tensile stresses occur at the base of the tower and are therefore

determined by the reactions of the foundations.

Figure 5.3 Free Body Diagram (FBD) of the tripod tower.

Bracings are not included. The legs are denoted by AD, BD,

and CD. The turbine is mounted at point D. The arrows

indicate the direction of forces and moments in the tower

h

y

66

x

Choosing x - , y - , and z - axes as a set of mutually perpendicular directions in Figure 5.3, the

positions of the tower legs at the base and top are expressed as:

A (x, y, z) = 0, 0, 0

B (x, y, z) = b, 0, 0

C (x, y, z) = 𝑏𝑏 2⁄ ,ℎ,√3 𝑏𝑏 2⁄

D (x, y, z) = 𝑏𝑏 2⁄ ,ℎ,√3 𝑏𝑏 2⁄

The external and internal forces acting on the tower legs can be expressed as vectors:

𝑭𝑭𝑨𝑨𝑨𝑨 = 𝐹𝐹𝐴𝐴𝜌𝜌

𝑏𝑏 𝒊𝒊2 + ℎ 𝒋𝒋 + 𝑏𝑏 𝒌𝒌

2√3�ℎ2 + 𝑏𝑏2 3⁄

𝑭𝑭𝑩𝑩𝑨𝑨 = 𝐹𝐹𝐵𝐵𝜌𝜌

−𝑏𝑏2 𝒊𝒊 + ℎ𝒋𝒋 + 𝑏𝑏 𝒌𝒌2√3

�ℎ2 + 𝑏𝑏2 3⁄

5.5 Base cross-section of the tower

as a composite beam of legs and

bracings

Figure 5.4 Lattice tower as a

cantilever beam

67

𝑭𝑭𝑨𝑨𝑫𝑫 = 𝐹𝐹𝜌𝜌𝐶𝐶

−ℎ 𝒋𝒋 + 𝑏𝑏 𝒌𝒌√3

�ℎ2 + 𝑏𝑏2 3⁄

𝑭𝑭 = 𝐹𝐹 𝒌𝒌

𝑾𝑾 = −𝑊𝑊𝒋𝒋

𝑾𝑾𝒕𝒕 = −𝑊𝑊𝑡𝑡𝒋𝒋

𝒒𝒒 = 𝑞𝑞 𝒌𝒌

and the unit vectors (i, j, k) are in the x, y, and z directions respectively, as defined in Figure 5.3.

Assuming that the tower legs are vertical cantilever beams, the bending moment M(y) at a

section ‘y’ from the tower base due to turbine thrust (F) and drag forces (q) is computed by:

𝑀𝑀(𝑦𝑦) = 𝐹𝐹(ℎ − 𝑦𝑦) + 3𝑞𝑞(ℎ − 𝑦𝑦)2 2⁄ (5.1)

The governing equations for the static equilibrium of the tower are:

Σ 𝑭𝑭𝒙𝒙 = 0 , Σ 𝑴𝑴𝒙𝒙 = 0

Σ 𝑭𝑭𝒚𝒚 = 0 ,Σ 𝑴𝑴𝒚𝒚 = 0 (5.2)

Σ 𝑭𝑭𝒛𝒛 = 0 ,Σ 𝑴𝑴𝒛𝒛 = 0

To find the bending stresses in tower legs, force and moment equations (5.2) are applied at the

equilibrium point or an element of the FBD.

From the FBD (Figure 5.3), summing the moments about the positive x–axis (assumed to lie

along AB) gives the value of the reaction force at point C. Writing the moment equilibrium

equation Σ MAB =0 and omitting the zero moment terms gives:

√3 𝑎𝑎2𝒌𝒌 × 𝑅𝑅𝐶𝐶𝑌𝑌𝒋𝒋 + ℎ𝒋𝒋 × 𝐹𝐹𝒌𝒌 − 𝑎𝑎

2√3𝒌𝒌 × 𝑊𝑊𝒋𝒋 − 𝑎𝑎

2√3𝒌𝒌 × 𝑊𝑊𝑡𝑡𝒋𝒋 + 3𝑞𝑞ℎ2

2𝒊𝒊 = 0 (5.3)

68

Equation (5.3) contains a single unknown, the reaction force RCY, which can be computed for

any given base distance and tower loads.

The compressive force in the tower leg DC (FDC ) due to bending loads can be computed by

assuming static equilibrium of forces at point C.

𝐹𝐹𝜌𝜌𝐶𝐶 = 𝑅𝑅𝐶𝐶𝑌𝑌 �ℎ2 + 𝑏𝑏2 3⁄ ℎ⁄ = 𝑅𝑅𝐶𝐶𝑌𝑌�1 + 𝑏𝑏2 3ℎ2⁄ (5.4)

Similarly, the tensile forces 𝐹𝐹𝐵𝐵𝜌𝜌 and 𝐹𝐹𝐴𝐴𝜌𝜌 in legs AD and BD can be computed by summing the

moments about the point C. These forces are required to determine the loads on the foundation.

Writing the moment equilibrium equation (Σ MC =0) at point C and omitting the zero moment

terms gives:

𝒓𝒓𝐴𝐴𝐶𝐶 × 𝑭𝑭𝐴𝐴𝜌𝜌 + 𝒓𝒓𝐵𝐵𝐶𝐶 × 𝑭𝑭𝐵𝐵𝜌𝜌 + ℎ𝒋𝒋 × 𝐹𝐹𝒌𝒌 − 𝑎𝑎2√3

𝒌𝒌 × 𝑊𝑊𝒋𝒋 − 𝑎𝑎2√3

𝒌𝒌 × 𝑊𝑊𝑡𝑡𝒋𝒋 + 3𝑞𝑞ℎ2

2𝒊𝒊 = 0 (5.5)

where, 𝒓𝒓𝐴𝐴𝐶𝐶 = 𝑎𝑎2𝒊𝒊 + 𝑎𝑎√3

2𝒌𝒌 and 𝒓𝒓𝐵𝐵𝐶𝐶 = −𝑎𝑎

2𝒊𝒊 + 𝑎𝑎√3

2𝒌𝒌

It is important to note that the front legs AD and BD share equal tensile or compressive forces

due to symmetry of the load cases shown in Figure 5.3. Forces in the members can be computed

by solving the equation (5.3) and (5.5) for any b and tower loads. It is important to note that the

wind and self-weight loads would change when the size of tower members and b are changed.

The maximum compressive stress due to bending loads (thrust, drag, and gravity) can be

determined from equations (5.3) and (5.4) and cross-sectional area of each leg, ACS:

σ𝑎𝑎 = 𝐹𝐹𝜌𝜌𝐶𝐶/𝐴𝐴𝐶𝐶𝐹𝐹 (5.6)

Alternative to the above analysis, the maximum bending stress in the most compressed tower leg

can be determined by assuming the tower as a composite cantilever beam (Figure 5.4 and 5.5),

69

which gives the same result for the bending stress as obtained above. It is noted that the

maximum bending stress occurs in the back-leg at the base section of the tower.

σ𝑎𝑎 = 𝑀𝑀𝑀𝑀 𝐼𝐼⁄ (5.7)

where, M is given by equation (5.1), z is the distance of the back leg from the centroidal axis,

𝑀𝑀 = 𝑏𝑏 √3⁄ , and I is the moment of inertia of the section. Referring to the figure (5.5), the

moment of inertia of the composite beam is computed by assuming the tower legs as an

equivalent beam [61]. The moment of inertia of the beam about the centroidal axis of tower is

obtained by:

𝐼𝐼 = 2𝐴𝐴𝐶𝐶𝐹𝐹 (𝑏𝑏 2√3 ⁄ )2 + 𝐴𝐴𝐶𝐶𝐹𝐹 (𝑏𝑏 √3 ⁄ )2 + 3𝐴𝐴𝐶𝐶𝐹𝐹�𝑅𝑅22 + 𝑅𝑅12� 4⁄ (5.8)

𝐼𝐼 = 2𝐴𝐴𝐶𝐶𝐹𝐹𝑏𝑏2/2 + 3𝐴𝐴𝐶𝐶𝐹𝐹�𝑅𝑅22 + 𝑅𝑅12� 4⁄ (5.9)

where, ACS, R1 and R2 are the cross-sectional area, inner and outer radius of the tower legs

respectively. The last term on the right of equation (5.8) is the moment of the three cylinders

about their axes, and the first two come from the parallel axis theorem.

Assuming that the three legs share equally the gravity loads (turbine and tower mass), despite the

fact that most turbines have their centre of mass offset from the tower apex, the axial stress in

each leg can be computed by:

𝜎𝜎𝑎𝑎 = (𝑊𝑊 + 𝑊𝑊𝑡𝑡) 3𝐴𝐴𝐶𝐶𝐹𝐹⁄ = (𝑤𝑤 + 𝜌𝜌𝜌𝜌∑𝐴𝐴𝐶𝐶𝐹𝐹𝑖𝑖𝑏𝑏𝑖𝑖) 3𝐴𝐴𝐶𝐶𝐹𝐹⁄ (5.10)

70

5.5.2 Failure Criteria

A lattice tower subjected to axial compression and bending loads often fails by buckling rather

than yielding. Consequently, the design of the tower is controlled by their buckling strengths.

Therefore, the key design problem in lattice towers is to prevent the buckling of tower members,

particularly the legs, which otherwise may lead to overall collapse of the tower.

Some manufacturing defects always occur in real towers [7]. However, linear buckling analysis,

which is based on theoretical buckling strength, does not take into account these factors. Also,

buckling is not explicitly covered by IEC 61400-2, but it requires meeting the local standards and

codes, such as ASCE, Eurocode3, and AISC. These standards and codes have incorporated the

practical aspects of buckling, e.g. manufacturing imperfections. For the 18 m high monopole

tower design described in [7] considering on ASCE and Eurocode 3, the manufacturing defects

reduced the buckling strength nearly by one half of the ideal structure, which is very important to

take into account while designing towers.

To assess the buckling strength of the steel lattice tower, described in Chapter 6, ASCE (1990)

guidelines, Eurocode 3, and AISC 360-05 are used. Assuming the tower legs as circular hollow

pipes, the limiting stresses are determined by combined axial and bending stresses. The

combined axial and bending stresses in the tower legs must satisfy the interaction equation

(5.11):

σ𝑎𝑎 𝐹𝐹𝑎𝑎⁄ + σ𝑎𝑎 𝐹𝐹𝑎𝑎⁄ ≤ 1 (5.11)

where, σa is the axial compressive stress due to turbine and tower weight, Fa is the allowable

axial stress or buckling stress, σb is the bending (compressive or tensile) stress on tower legs due

to turbine thrust and drag forces, and Fb is the allowable bending stress of tower legs. It is noted

that equation (5.11) should include required safety factors or capacity factors.

71

ASCE (1990) gives the limiting axial and bending stresses (MPa) for steel circular tubes in terms

of outer diameter (D) and thickness (t) are given by equations (5.12) and (5.13):

𝐹𝐹𝑎𝑎 = �𝐹𝐹𝑦𝑦 for 𝐷𝐷/𝑡𝑡 ≤ 26203/𝐹𝐹𝑦𝑦

0.75𝐹𝐹𝑦𝑦 + 6550𝑡𝑡/𝐷𝐷 for 26203/𝐹𝐹𝑦𝑦 < 𝐷𝐷/𝑡𝑡 ≤ 82745/𝐹𝐹𝑦𝑦 (5.12)

𝐹𝐹𝑎𝑎 = �𝐹𝐹𝑦𝑦 for 𝐷𝐷/𝑡𝑡 ≤ 41372/𝐹𝐹𝑦𝑦

0.7𝐹𝐹𝑦𝑦 + 12411𝑡𝑡/𝐷𝐷 for 41372/𝐹𝐹𝑦𝑦 < 𝐷𝐷/𝑡𝑡 ≤ 82745/𝐹𝐹𝑦𝑦 (5.13)

where, 𝐹𝐹𝑦𝑦 is the yield strength.

Using the equations (5.12 - 5.13), an optimum size (diameter and thickness) of the most stressed

tower leg can be computed for minimum possible tower mass. It is noted that the axial stress has

no correlation with the slenderness ratio.

Annex (D) of Eurocode 3 provides the equations for determining the critical linear meridional

buckling stress for cylindrical shells of constant wall thickness. The symbols used in the code are

also used here.

The critical meridional buckling stress is given by:

𝜎𝜎𝑥𝑥𝑐𝑐𝑐𝑐 = 0.605𝐸𝐸𝐶𝐶𝑥𝑥𝑎𝑎𝑡𝑡 𝑟𝑟⁄ (5.14)

where, r is the mid radius of the cylinder.

Here, the unknown Cxb is calculated as follows:

Non-dimensional length parameter is given by:

𝑤𝑤 = 𝑏𝑏 �(𝐷𝐷 − 𝑡𝑡)𝑡𝑡 2⁄⁄ (5.15)

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where, l is length of the column

𝐶𝐶𝑥𝑥 = max (0.6,1 + 0.2 �1 − 2𝑎𝑎𝑡𝑡𝑐𝑐� 𝐶𝐶𝑥𝑥𝑎𝑎� ) (5.16)

For clamped-clamped end conditions in lattice towers, 𝐶𝐶𝑥𝑥𝑎𝑎 = 6

After the meridional buckling stress is calculated, it should be multiplied with the “meridional

imperfection reduction factor”, αx:

𝛼𝛼𝑥𝑥 = 0.62/[1 + 1.91(𝑤𝑤𝑘𝑘 𝑡𝑡⁄ )1.44] (5.17)

𝑤𝑤𝑘𝑘 = √𝑟𝑟𝑡𝑡 𝑄𝑄⁄ (5.18)

where, Q is the fabrication quality factor given in Tablem5.1.

Table 5.1 Values of Q [63]

Fabrication quality class Description Q

A Excellent 40

B High 25

C Normal 16

The critical meridional buckling stress is multiplied with the imperfection reduction factor to get

the critical buckling stress.

If the relative slenderness ratio, λ = �𝐹𝐹𝑦𝑦 𝛼𝛼𝑥𝑥𝜎𝜎𝑥𝑥𝑐𝑐𝑐𝑐⁄ ≤ 0.2, the characteristic buckling strength is

equal to the yield strength, Fy , of the material.

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For round hollow structural sections (HSS), AISC 360-05 equations can also be used to assess

the buckling strength. In compression loading, AISC classifies a structural section as compact or

slender based on D/t and a limiting value as follows:

The structural sections are categorized as compact if 𝐷𝐷/𝑡𝑡 ≤ 0.11𝐸𝐸/𝐹𝐹𝑦𝑦.

The structural sections are categorized as slender if 𝐷𝐷/𝑡𝑡 > 0.11𝐸𝐸/𝐹𝐹𝑦𝑦.

The sizes of lattice tower members fall within the compact sections. So, only the governing

design equations for compact sections are presented below:

Critical buckling strength (𝐹𝐹𝑐𝑐𝑐𝑐) is computed as follows.

Elastic buckling stress = 𝐹𝐹𝑒𝑒 = 𝜋𝜋2𝐸𝐸/(𝑘𝑘𝑏𝑏 𝑟𝑟⁄ )2 (5.19)

Inelastic buckling occurs if 𝐹𝐹𝑒𝑒 ≥ 0.44𝐹𝐹𝑦𝑦. Then the critical buckling stress is given by:

𝐹𝐹𝑐𝑐𝑐𝑐 = (0.658 𝐹𝐹𝑦𝑦 𝐹𝐹𝑒𝑒⁄ )𝐹𝐹𝑦𝑦 (5.20)

Elastic buckling occurs if 𝐹𝐹𝑒𝑒 < 0.44𝐹𝐹𝑦𝑦. Then the critical buckling stress is given by:

𝐹𝐹𝑐𝑐𝑐𝑐 = 0.877𝐹𝐹𝑒𝑒 (5.21)

It is noted that any one of the above standards or codes can be used to assess the buckling

strength of tower legs. In this study, the standard that gives the lowest value of the critical

buckling stress is used in the design of the steel tower. For the bamboo tower, buckling of tower

legs is assessed by using equation (5.11) with the experimentally determined buckling strengths

of bamboo columns.

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5.5.3 Tower Deflection

As discussed in section 5.5.1, a linear static three-dimensional structural analysis is sufficient for

tower analysis. Consequently, the tower deflection must be kept as small as possible to ensure

the adequacy of the linear static analysis using linearized material properties. A small tower

deflection ensures that structural shape of the tower is maintained and does not amplify the

effects of load [7]. In tower designs, the key design criterion is the requirement of tower

strengths. Limiting criteria for tower top deflections are not found in standards (e.g. IEC61400-

2).

Clifton-Smith and Wood [8] optimized an octagonal tower for a 5 kW wind turbine based on

buckling stability and concluded that tower top deflection might not be the “critical factor” in

tower design. It is mentioned that tower top deflection of 5% of tower height is adequate for the

design of small towers. In the present tower design, this limiting value is used.

From the tripod analysis, the tower top deflection could be determined by assuming the tripod

tower as a composite cantilever beam of three legs (Figures 5.4 and 5.5). It is assumed that the

lateral stability of the legs is maintained, i.e. the legs do not distort significantly from the

centroidal axis of the tower. The tower is loaded as described in the previous section. It is further

assumed that Euler-Bernoulli beam theory is valid for the tripod model. According to this theory,

the plane sections of the beam remain plane during deformation and perpendicular the axis of the

beam. Also the shear deformation is negligible and beam deflections are small. The best check

on the validity of the theory is to determine that the tower top deflection is a small fraction of h.

The tower deflection (v) is computed from the moment-curvature relationship given by:

𝑙𝑙2𝑣𝑣𝑙𝑙𝑦𝑦2

= 𝑀𝑀(𝑦𝑦)𝐸𝐸 𝐼𝐼(𝑦𝑦)

(5.22)

Equation (5.22) can be solved for the deflection ‘v’ by applying the boundary conditions of zero

slope and deflection at the base (y=0) of the tower.

75

The bending moment, M(y), is given by equation (5.1).

Referring to Figure (5.5) and equations (5.8) and (5.9), the second moment of inertia of the tower

section about the centroidal axis at a distance ‘y’ from the tower base is expressed as:

𝐼𝐼(𝑦𝑦) = 𝐴𝐴𝐶𝐶𝐶𝐶[ 3�𝑅𝑅22+𝑅𝑅12�/4+[(𝑎𝑎−𝜌𝜌)(ℎ−𝑦𝑦) ℎ⁄ +𝜌𝜌]2] 2

(5.23)

Integration of the equation (5.22) gives the derivative of the deflection as:

𝑑𝑑𝑑𝑑 𝑑𝑑𝑦𝑦⁄ = ∫ 2(𝐹𝐹(ℎ−𝑦𝑦)+3𝑞𝑞(ℎ−𝑦𝑦)2 2⁄ )𝐸𝐸𝐴𝐴𝐶𝐶𝐶𝐶[1.5�𝑅𝑅22+𝑅𝑅12�+[(𝑎𝑎−𝜌𝜌)(ℎ−𝑦𝑦) ℎ⁄ +𝜌𝜌]2 ]

𝑑𝑑𝑦𝑦 (5.24)

The boundary conditions are:

At y =0,

𝑑𝑑𝑑𝑑 𝑑𝑑𝑦𝑦⁄ = 0 (5.25)

To integrate the equation (5.25) second time to get the deflection requires:

At y =0,

𝑑𝑑(𝑦𝑦) = 0 (5.26)

To reduce the complexity of integration of the equation (5.24), the second term in the

denominator of (5.24) is replaced by b (h-y)/h. Integrating the equation (5.24) twice using

Mathematica and applying the boundary conditions, given by equations (5.25) and (5.26), the

equation for the tower deflection, 𝑑𝑑(𝑦𝑦), is obtained as:

76

𝑑𝑑(𝑦𝑦) = ℎ2

2𝐸𝐸𝐴𝐴𝐶𝐶𝐶𝐶𝑎𝑎4�𝑅𝑅22+𝑅𝑅12�−2√6𝑏𝑏ℎ𝑞𝑞�𝑅𝑅22 + 𝑅𝑅12 (2𝐹𝐹 − 3𝑞𝑞𝑦𝑦) tan−1 � 𝑎𝑎�2 3⁄

ℎ�𝑅𝑅22+𝑅𝑅12� +

2√6 𝑏𝑏ℎ�𝑅𝑅22 + 𝑅𝑅12(2𝐹𝐹 − 3𝑞𝑞(ℎ − 𝑦𝑦)) tan−1 �𝑎𝑎(ℎ−𝑦𝑦)�2 3⁄

ℎ�𝑅𝑅22+𝑅𝑅12� + �𝑅𝑅22 + 𝑅𝑅12 �2𝑏𝑏2𝑦𝑦(4𝐹𝐹 + 3ℎ𝑞𝑞 −

3𝑞𝑞𝑦𝑦) + 2𝐹𝐹(ℎ − 𝑦𝑦) �−𝑏𝑏𝑙𝑙𝜌𝜌�ℎ2�2𝑏𝑏2 + 3(𝑅𝑅22 + 𝑅𝑅12�� + 𝑏𝑏𝑙𝑙𝜌𝜌�3ℎ2�𝑅𝑅22 + 𝑅𝑅12� + 2(ℎ − 𝑦𝑦)2𝑏𝑏2�� +

9ℎ2𝑞𝑞(𝑅𝑅22 + 𝑅𝑅12) �−𝑏𝑏𝑙𝑙𝜌𝜌 �1 + 2𝑎𝑎2

3(𝑅𝑅22+𝑅𝑅12)� + 𝑏𝑏𝑙𝑙𝜌𝜌 �1 + 2𝑎𝑎2(ℎ−𝑦𝑦)2

3ℎ2(𝑅𝑅22+𝑅𝑅12)���� (5.27)

Tower-top deflection occurs when y=h in equation (5.27). The exact equation for the tower-top

deflection is:

𝑑𝑑(𝑦𝑦 = ℎ) = ℎ3

12𝐸𝐸𝐴𝐴𝐶𝐶𝐶𝐶(𝑎𝑎−𝜌𝜌)4�𝑅𝑅22+𝑅𝑅12�−2√6�2𝑏𝑏𝐹𝐹(2𝐷𝐷2 − 3(𝑅𝑅2

2 + 𝑅𝑅12)� + 𝐷𝐷[−2𝐷𝐷2(2𝐹𝐹 +

3ℎ𝑞𝑞)] + 3�2𝐹𝐹 + 9ℎ𝑞𝑞(𝑅𝑅22 + 𝑅𝑅12)� tan−1 � 𝑎𝑎�2 3⁄

ℎ�𝑅𝑅22+𝑅𝑅12� + 3(𝑅𝑅2

2 + 𝑅𝑅12)�−2(𝑏𝑏 −

𝐷𝐷)[4(𝑏𝑏 − 𝐷𝐷)𝐹𝐹 + 3(𝑏𝑏 − 5𝐷𝐷)ℎ𝑞𝑞]� + �8𝑏𝑏𝐷𝐷𝐹𝐹 − 2𝐷𝐷2(4𝐹𝐹 + 9ℎ𝑞𝑞) + 9ℎ𝑞𝑞�𝑅𝑅22 + 𝑅𝑅12�� �𝑏𝑏𝑙𝑙𝜌𝜌�2𝑏𝑏2 +

3(𝑅𝑅22 + 𝑅𝑅12)� − 𝑏𝑏𝑙𝑙𝜌𝜌�2𝐷𝐷2 + (𝑅𝑅22 + 𝑅𝑅12)��� (5.28)

Considering the complexity of the above equations, a MATLAB program TowerDef.m

(Appendix B) was written to calculate the tower deflection from the equation (5.24).

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5.6 Optimization of the Tripod Model

The structural analysis of the tripod model in the previous section forms the basis for the design

of lattice tower. The objective of the design optimization is to minimize the D, t, and b and to

minimize the mass while minimally satisfying the material strengths with appropriate safety

factors.

The tripod optimization gives the first approximation to the optimal dimensions of tower legs for

various b for the given loads. As this model does not take into account the bracings in the lattice

tower, a more accurate analysis, FEA, is used to finalize the design of the tower considering the

bracing elements.

5.7 Finite Element Analysis

5.7.1 The Methods of FEA

FEA is one of the most powerful computational methods for solving structural problems. In this

method, a structure is subdivided into geometrically smaller units, which are called finite

elements [62]. In each finite element, unknown quantities (e.g. stress, deflections, forces etc) are

approximated by linear combinations of algebraic equations and unknown parameters [62].

Algebraic equations among those parameters are obtained from the governing equations of the

problem. The unknown parameters represent the values at nodes of the elements. Then all

algebraic equations are assembled using the principles of continuity and equilibrium to get the

solutions of the problem. One of the widely used FEA tool utilized in modeling wind turbine

towers is ANSYS. In this study, the FEA of the lattice tower used ANSYS APDL.

5.7.2 The FEA of the Lattice Tower

In the tripod model of the lattice tower, bracing elements were ignored in the structural analysis.

Since exact analytical solutions are not possible to obtain for the structural analysis, FEA is an

78

appropriate approach to determine the internal stresses in members and tower deflection and to

simulate the structural behaviour of the tower considering bracings.

In order to carry out the FEA of the lattice tower, following steps were applied in ANSYS

APDL.

1. Create the FE model of the tower geometry with realistic assumptions for geometry,

loads, and boundary conditions

2. Discretize the tower structure into finite elements using appropriate beam elements and

meshing

3. Apply the material properties, loads, and boundary conditions to the finite element model

of the tower

4. Solve the problem and verify the results

5.7.3 FE Model of the Tower

The lattice tower is a three-dimensional structure consisting of hollow structural elements. One

of the important structural characteristics of such elements is that longitudinal dimension is

larger than the cross-sectional dimension, and hence they can be modeled as one-dimensional (1-

D) beams [49]. In 1-D beams subjected to axial and bending loads, longitudinal mechanical

properties such as tensile, compressive, and bending strengths, determine the structural

behaviour of the beams. In other words, longitudinal stresses and lateral deflections are always

critical. To simplify the FEA, some modeling assumptions were made, which are summarized

below:

1. Three-dimensional linear static analysis is sufficient for the lattice towers. The tower

design is governed by the extreme static loads.

2. Turbine weight and thrust on blades act as point loads at the tower top.

3. Drag forces and weight of the tower act as uniformly distributed loads.

4. The joints connecting the tower members are perfectly rigid.

79

5. Tower legs are rigidly fixed to the foundation.

A three-dimensional geometry of the tower was created in ANSYS APDL using beam elements.

There are two types of beam elements available in ANSYS: 2-node with 188 and 3-node with

189 elements. The usefulness of each element is discussed here.

2-node with188 beam element is a linear, quadratic or cubic two node element based on

Timoshenko beam theory and can “accurately model slender and moderately thick beam

structures” [13]. The beam element has six or seven degrees of freedom at each node, which

includes translation in x, y, and z directions and rotation about x, y and z directions, having an

option for the seventh degree of freedom. This element has the capability to model linear and

large rotations as well as large strain nonlinear problems.

3-node 189 beam element has 3 nodes and is a quadratic element in three-dimensions. This

element is based on Timoshenko beam theory having capability to model large shear

deformations [13] and is suitable for non-linear analysis.

Figure 5.6 2-node 188 beam element [13]

80

For modeling the legs and bracings in steel and bamboo lattice towers, 2-node with188 elements

have been used because the analysis is limited to static linear and the tower members are slender

beam elements which are, effectively, one dimensional. No other element in ANSYS is suitable.

ANSYS has a wide range of material models depending upon their properties and nature of the

response of the structure under imposed loads. As the tower should function in the linear elastic

region, the beam is modeled as linear elastic. The material is modeled as an isotropic material for

both steel and bamboo. The validity of the model for bamboo is discussed in Chapter 7. The

material properties required for this model are the Modulus of Elasticity (E) and Poisson’s ratio

(ν ). The density of the material is also required to account for the effect of tower weight on

stress and deflection.

The turbine thrust and weight were applied as point loads at the tower top as shown in Figure

5.3. Drag forces due to wind act in the horizontal direction on beam elements. They were applied

as uniformly distributed loads on beam elements. It is assumed that the joints are perfectly rigid

and tower legs are rigidly fixed to the foundation.

Figure 5.7 3-node 189 element [13]

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Chapter 6

DESIGN OF STEEL LATTICE TOWER

6.1 Chapter Overview

The motivation behind the design of the 12 m high steel lattice tower has been described in

chapter 1. Chapter 5 presented a design optimization procedure for lattice towers. In this

Chapter, these procedures are implemented to design a 12 m high steel tubular lattice tower for a

500W wind turbine.

6.2 The Steel Lattice Tower

As discussed in Chapter 5, the tower is composed of steel circular pipes for legs and bracings.

Circular tubular sections have been chosen because they are easily available, are galvanized to

resist corrosion, and are easy to manufacture and transport to remote locations. The tower is built

with six sections, i.e. each lattice section has 2 m height. Steel sections are used for legs and

horizontal bracings, whereas circular steel rods are used for cross-bracings as shown in Figure

5.1. The leg sections and horizontal bracings are connected by welding and mechanical fasteners,

which will be described in later sections because their details are unimportant for FEA. Small

cross-section is sufficient for cross-bracings, which reduces the wind loads. They can be easily

joined to tower legs by mechanical fastening.

6.3 Design Optimization Procedure

As discussed in Chapter 5, the design optimization of lattice tower involves determining the

optimum dimensions, D and t, of the tower legs and bracings to minimize tower mass and b. This

is accomplished in two steps: 1) determine the approximate values of b, D, and t from the tripod

model (equation 5.11) and 2) conduct FEA using those parameters to obtain the intended design.

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6.4 Optimization of the Tripod Model

As the first step to tower design, all the loads imposed on the tower, as shown in Figure 6.1, are

computed according to the requirements of IEC 61400-2 using the turbine load cases

documented in [7] and as described in Chapter 5. The analytical solutions presented in Chapter 5

are used to compute the stresses in tower legs and the tower-top deflection to determine the

optimum D, t, and b.

6.4.1 Tower Loading

Using the simple load model (SLM) of IEC61400-2, extreme static wind loads acting on the

tower were calculated. The loads considered in the analysis are summarized here:

• Tower top weight (W): mass of turbine and nacelle is 30 kg and the mass of turbine

mounting flange and accessories has been assumed to be 20 kg. Considering the IEC load

factor 1.10 for gravity loads, the total weight at the tower-top is 550 N.

• Rotor thrust (F): 1592 N [7] considering the IEC load factor 1.35 for wind loads, the rotor

thrust is 2150 N.

• From equation (4.4) with drag coefficient, Cd =1.3, density of air, ρ =1.225kg/m3, and

extreme wind speed, U = 50 m/s, uniformly distributed wind load per unit length, q

(N/m) = 1990D. Considering the IEC load factor 1.35 for wind loads, q is 2687D. It is

noted that drag force is dependent upon the diameter of tower legs.

• Tower weight, Wt (N) = 3ρs g ACS�ℎ2 + 𝑏𝑏2 3⁄ ; where, density of steel = ρs =7800

kg/m3, g = 9.81m/s2, cross-sectional area of the leg =ACS = π (D t - t2 ), and h = 12 m.

IEC load factor 1.10 is multiplied to this load to get the effective tower weight in the

analysis.

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6.4.2 Optimization of Tower Legs

The cross-sectional dimensions, D and t, of tower legs and b are determined as the main

optimization variables that define the tripod geometry.

In the analytical solution, the governing design criterion is the buckling strength of tower legs.

The allowable buckling strength of leg sections is determined by the combined compressive and

bending equation (5.11). D and t of tower legs are determined from equation (5.11). Axial and

bending stresses along with their allowable values are computed below.

• Axial stress: σ𝑎𝑎 = (mass of turbine and tower legs)/3𝐴𝐴𝐶𝐶𝐹𝐹

= �550+3×12×0.0078×10𝜋𝜋(𝜌𝜌𝑡𝑡−𝑡𝑡2)�ℎ3𝜋𝜋(𝜌𝜌𝑡𝑡−𝑡𝑡2)�ℎ2+𝑎𝑎2/3

= �550+8.82(𝜌𝜌𝑡𝑡−𝑡𝑡2)�ℎ3𝜋𝜋(𝜌𝜌𝑡𝑡−𝑡𝑡2)�ℎ2+𝑎𝑎2/3

(6.1)

√3𝑏𝑏/2

Figure 6.1 Loads on the Tower

84

• Allowable buckling strength of tower legs, 𝐹𝐹𝑎𝑎: equation (5.10) of the ASCE guidelines,

equations (5.14) - (5.18) of the Eurocode 3 and AISC equations (5.19) - (5.21) are used

to determine the allowable axial stress. Then the smallest value of the buckling strength

is used in the tower analysis.

• Bending stress due to thrust and drag: σ𝑎𝑎 = 2𝑀𝑀√3 𝑎𝑎𝜋𝜋(𝜌𝜌𝑡𝑡−𝑡𝑡2)

= 2(25800+584𝜌𝜌)√3 𝑎𝑎𝜋𝜋(𝜌𝜌𝑡𝑡−𝑡𝑡2)

(6.2)

• Allowable bending stress (equation 5.13): 𝐹𝐹𝑎𝑎 = Fy (6.3)

Following design constants have been used in the analysis:

• Modulus of elasticity for steel: E = 200 GPa

• Allowable bending strength: Fy =255 MPa

• Linear buckling factor: BF: 2

By inserting the equations (6.1 - 6.3) and design constants into equation (5.11), then equation

(5.11) can be written as:

�550+8.82�𝜌𝜌𝑡𝑡−𝑡𝑡2��ℎ

3𝜋𝜋(𝜌𝜌𝑡𝑡−𝑡𝑡2)𝐹𝐹𝑎𝑎�ℎ2+𝑎𝑎2/3+ 2(25800+584𝜌𝜌)

√3 𝑎𝑎𝜋𝜋(𝜌𝜌𝑡𝑡−𝑡𝑡2)𝐹𝐹𝑏𝑏≤ 1R (6.4)

Solving the equation (6.4), an equally optimum set (or Pareto front) of D for any desired value of

t and b can be obtained. These values of D are the minimum to make the tower safe from

buckling. It is noted that the compressive stress due to axial forces is relatively small compared

to the bending stress. The calculation for the optimum values of D using ASCE, Eurocode 3, and

AISC equations are shown in Appendix A.

Since thickness is the main input variable in the optimization, it is critical to consider the

practicable size of steel pipes based on their availability in the market or that can be easily

manufactured. For example, the author inquired of several manufacturers in Nepal in order to

find out what sizes of steel pipes are manufactured and available in the market. It was found that

the most commonly used galvanized steel pipes of different outside diameters have 2 to 6 mm

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wall thickness. Here, the author arbitrarily assumed the wall thickness of 3 mm, which is

commonly available in the market.

6.4.3 Results of Tripod Analysis

Figure 6.2 shows the resulting optimum values of D for various b obtained from equation (6.4)

using t =3 mm. For the allowable axial and bending stresses, ASCE equations (5.10) and (5.11)

were used. The Eurocode 3 and AISC calculations for the optimum D are shown in Appendix A.

It is observed from Figure 6.2 that the slope of the graphs is decreasing with increasing b. This

indicates that D or mass of the tower can be minimized more effectively if higher values of base

distance are selected. Consequently, it requires more ground space but less mass for the

foundation.

It is noted that the tripod analysis has given the optimal solution for D for various b, but not a

unique minimum. To achieve the best design, it is intended to minimize the D by increasing b.

However, it requires more ground space, which is linked with the cost of land; and moreover, it

is very site specific. So these factors are not considered in this study.

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In order to carry out the FEA of the lattice tower, values of D were computed at some specific b

using ASCE, Eurocode 3 and AISC equations, which are shown in Table 6.1. The basic

calculations are shown in Appendix A. It is noted that the ASCE and Eurocode 3 have given the

same values for D, whereas AISC has given slightly higher values.

Table 6.1 Optimum D for tower legs (t = 3 mm)

b (m) 1 1.2 1.4 1.6

ASCE: D (mm) 64 45 35 29

Eurocode 3: D (mm) 64 45 35 29

AISC: D (mm) 65 47 37 31

Figure 6.2 Optimum diameters of legs (D) for various base distances

(b) and wall thickness (t) of 3 mm (ASCE standard)

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It is noted that increasing t in equation (6.4) decreases both D and tower mass because this

increases the strength without increasing the wind load. Therefore, the best design strategy to

minimize the tower mass is to increase t considering the availability of those sizes of steel pipes

in the market.

6.5 Finite Element Analysis of Tower

The analytical solutions of the tripod model has given a set of optimum results for D at t = 3mm

(Figure 6.2). Using these results, the FEA described in Chapter 5 is implemented to check the

validity of the tripod optimization procedure and use the results for the design and analysis of the

lattice tower using FEA. Following design examples were considered:

• Lattice tower with legs and horizontal bracings: In this configuration, the tower was

modeled with legs and horizontal bracings using the values of D and b obtained from the

analytical solution. Initially, the legs and horizontal bracings were modeled with same D

and t. Then some of the minimum possible sizes for legs and horizontal bracings were

investigated for minimum mass of the tower. The results of FEA are compared to the

results of tripod analysis.

• Lattice tower with horizontal- and cross-bracings: In this configuration, the tower was

modeled with horizontal- and cross-bracings. Some of the possible sizes for legs and

horizontal bracings were investigated for minimum mass of the tower, buckling strength,

and stiffness.

Each tower configuration was analyzed for various b as given in Table 6.1.

In order to carry out the FEA of the towers in ANSYS APDL, three-dimensional FE models

were created using key points and line elements (Figure 6.3) for the tower geometry. The tower

base distance and leg cross-sections (D and t) were obtained from Table 6.1 (Figure 6.2). Excel

spreadsheet was used to determine the coordinates of the key points for modeling the tower. 2

nodes with 288 beam elements were used to model the tower members. As the tower top width

should be kept as minimum as possible to avoid the turbine blades hitting the tower, the width

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was set to 0.15 m for fixing the turbine mounting flange. The turbine mounting flange, flanges in

the leg sections, and the base plates are not included in the FE model.

The material model for steel was chosen as linear elastic and isotropic with the elastic modulus

and Poisson ratio of 200 GPa and 0.3 respectively. The density of steel was taken as 7800 kg/m3.

The tower legs were assumed to be rigidly fixed to the steel base plates at the foundation; no

rotation and displacement were assumed during extreme loads. The turbine thrust (2.15k N) and

weight (550 N) were applied at the tower-top in the horizontal and vertical directions

respectively. The drag forces per unit length were computed in legs, horizontal- and cross-

bracings and then applied at each nodal point of the beam elements. This simulates the uniformly

distributed loads as illustrated in Figure 6.3. The gravity load due to tower mass was applied as

“inertia in global coordinates” by using the value of acceleration due to gravity as 9.81 m/s2.

Since buckling is the main failure criterion in steel lattice tower design, the analysis was carried

out in the maximum compression mode of the tower, which is explained in Chapter 5. Maximum

tensile mode was not considered.

In order to investigate the convergence of the FEA results, the beam elements were meshed with

different lengths. Then the resulting values of both the stresses and deflections were compared

for consistency. Convergence on values of stress and tower-top deflection was obtained when the

tower was meshed with element lengths of 10 mm or less. In the analysis, element length of 5

mm was used. To verify the results, the results of stress and deflections were also compared with

the results of tripod analysis.

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6. 6 Results and Discussion

In order to compare the results of the analytical solutions (tripod analysis) and the FEA, the

stresses on tower legs and tower-top deflections were determined from the tripod analysis, as

shown in Table 6.2.

To achieve convergence and consistency in the FEA, the convergence test for stress and

deflection for the tower with horizontal bracings was carried out with different lengths of beam

elements as shown in Figures 6.4 and 6.5. It was found that deflections converged more quickly

than the stresses.

Figure 6.3 Bottom section of the FE model

of the lattice tower showing drag forces and

boundary conditions

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Figure 6.4 Convergence test for stress with different

lengths of beam elements (Tower with b = 1m, D =64

mm and 64 mm horizontal bracings)

Figure 6.5 Convergence test for deflection with

different lengths of beam elements (Tower with b = 1m,

D =64 mm and 64 mm horizontal bracings)

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The numerical solution of the equation 5.25 for the tower top deflection was obtained by using a

MATLAB program, TowerDef.m, given in Appendix B. Also, the calculation was done with the

analytical solution for the tower-top deflection, given by the equation (5.28). The results were

compared with the results of FEA of the tripod model and the tower with horizontal bracings.

For the later, the tower legs and horizontal bracings were modeled with the same D and t. The

results of ANSYS simulations at b = 1, 1.2, 1.4 and 1.6 m for the tower with horizontal bracings

are shown in Figures 6.6- and 6.9. The results of FEA and numerical and analytical solutions for

the two tower models are summarized in Table 6.2 and Table 6.3 respectively.

Table 6.2 Comparison of FEA, numerical and analytical results (Tripod tower)

Base distance, b (m) 1 1.2 1.4 1.6

Leg diameter, D (mm) 64 45 35 29

Maximum compressive stress on tower legs

(MPa): FEA

113 111.05 110.86 107.3

Maximum compressive stress (MPa) on tower

legs: analytical solution

127.5 127.5 127.5 127.5

Maximum tower-top deflection (mm): FEA 118.08 109.22 105.46 93.83

Maximum tower-top deflection (mm): numerical

solution

91.15 85.12 78.45 71.83

Maximum tower-top deflection (mm): analytical

solution (equation 5.28)

91.17 85.13 78.46 71.83

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Table 6.3 Comparison of FEA and numerical results (Tower with horizontal bracings)

Base distance, b (m) 1 1.2 1.4 1.6

Leg diameter, D (mm) 64 45 35 29

Maximum compressive stress (MPa): FEA 131.11 128.15 127.44 125.77

Maximum compressive stress (MPa): analytical

solution

127.5 127.5 127.5 127.5

Maximum tower-top deflection (mm): FEA 109.28 103.31 96.22 88.42

Maximum tower-top deflection (mm): numerical

solution

91.15 85.12 78.45 71.83

From the tripod model, the results of FEA for the stresses on legs were obtained about 13 %

lower than the predicted buckling strength, 127.5 MPa. However, the tower-top deflections from

FEA were obtained about 22% higher than the numerical solutions. From the FEA of the tower

with horizontal bracings, the results of FEA for the maximum compressive stresses on tower legs

were found in good agreement to the results of numerical solutions. It is noted that the leg

stresses have decreased slightly with increase in b. However, the results for the tower-top

deflections showed about 16-18 % difference in values. In an 18m high monopole tower

analyzed in [7], about 10% variation in analytical and ANSYS results was obtained. As buckling

is the governing design criteria and the tower-top deflections are only less than 1% of the tower

height, it indicates that linear static assumption is valid and therefore errors in FEA and

numerical solutions would not make a significant difference in the design of tower legs (D).

93

Figure 6.6 Maximum stress and deflection of the tower at b =1m and

D =64 mm

Figure 6.7 Maximum stress and deflection at b =1.2 m and

D = 45 mm

94

Figure 6.9 Maximum stress and deflection at b = 1.6 m and

D =29 mm

Figure 6.8 Maximum stress and tower-top deflection at b =1.4 m

and D =35 mm

95

6.6.1 Design Examples with Horizontal Bracings

A few design examples of 12 m high steel lattice towers with horizontal bracings were shown in

the previous section. Here, a design example of the lattice tower, with different diameters for

legs and bracings are considered. As the change in D with b is rapid around b = 1.2 m (Figure

6.2), the author has chosen the base distance of tower as 1.2 m. At b =1.2 m, the tripod analysis

gives an optimum D as 45 mm (Table 6.1); and assuming that the tower-top width is 15 cm, the

length of each leg section was computed as 2003.3 mm for each 2 m high lattice section of the

tower.

Figure 6.7 shows that the maximum stress of 128 MPa and tower-top deflection of 103 mm for

the tower with b =1.2 m, D = 45 mm, and t = 3mm. The corresponding mass of the tower was

computed as 144 kg. Since allowable tower-top deflection is 600 mm, both the diameters of legs

and bracings could be reduced to minimize the tower mass provided that the leg stress does not

exceed the allowable buckling stress of 127.5 MPa.

To examine a tower with different D and bracing diameters, the tower was modeled with D =40

mm and 20 mm diameter horizontal bracings. The maximum compressive stress on legs and

tower-top deflection were obtained as 127.75 MPa and 129 mm respectively as shown in Figure

6.10. The tower is marginally safe from buckling. For this tower model, the mass is computed

as112 kg, which is only slightly lower than 144 kg for the tower with D =45 mm. It is noted that

the reduction of diameters of legs and bracings has resulted in slight increase in tower-top

deflection. Further optimization of legs and bracings may result in lighter towers, but it is

requires an extensive work with FEA. However, the reduction in mass will be only slightly.

When stiff tower designs are desired, same size of legs and horizontal bracings, as obtained from

the tripod analysis, are recommended. It was shown in the above example that tower mass could

be minimized by reducing both the diameters of legs and horizontal bracings; however, it results

into significant increase in tower-top deflection. It is concluded that same size of legs and

bracings should be used if stiffer tower designs are desired. If tower mass is an important factor

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in the design, the diameters of legs and bracings can be reduced from the values, as obtained

from the analytical solution, but the design requires FEA for the design optimization process.

Also, empirical equations of ASCE, Eurocode 3 and AISC should be used to verify the final

design. A comparison of two tower models analyzed here is given in Table 6.4. From this

analysis, both tower designs can be used. Here, the light weight tower design is recommended

despite its larger tower-top deflection (Table 6.5).

Table 6.4 Results of FEA with horizontal bracings (b =1.2 m)

D (mm) Diameter of bracings (mm)

Stress (MPa)

Tower-top deflection (mm)

Tower mass (kg)

45 45 128 103 144

40 20 127.7 129 112

Figure 6.10 Maximum stress and deflection at b = 1.2 m, D =40 mm

and 20 mm diameter bracings

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Table 6.5 Recommended tower design (tower with horizontal bracings)

Description

Base distance between the tower legs (mm) 1.2

Length of leg sections (mm) 2003

Outer diameter of leg (mm) 40

Outer diameter of horizontal bracing (mm) 20

Pipe wall thickness (mm) 3

Maximum tower top deflection (mm) 129

Maximum stress (MPa) 128

Total tower mass (kg) 112

Assumed tower mass including accessories (kg) 142

6.6.2 Design Example including Cross-bracings

A design example of the tower with horizontal- and cross-bracings is presented here. As the

simultaneous selection of D and bracing diameters using FEA is a time consuming task, the

diameter of cross-bracing, which is a round steel rod, was assumed to be 10 mm for all tower

configurations. This reference is taken from the 12 mm diameter steel rods used as cross-

bracings in the design of an 18 m high triangular lattice tower in [7]. Consequently, the

optimization of D and bracings is required using FEA.

The design example considers the case of the tower model presented in Table 6.4. The tower has

b =1.2m, D = 40 mm and bracing diameter of 20 mm. The corresponding tower top deflection

and mass are 129 mm and 112 kg respectively. Further reduction of leg diameter will increase

the tower-top deflection, but reduces the tower mass. To design this tower for minimum tower-

top deflection, cross-bracings are used. As the cross-bracings increase tower mass, the tower was

designed with smaller values of D = 35 mm, 20 mm diameter horizontal bracings, and 10 mm

diameter round solid steel rods. Here 20 mm diameter is assumed as the minimum size of hollow

steel pipe for horizontal bracings. The result of FEA for the tower with D=35 mm, 20 mm

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diameter horizontal bracings, and 10 mm diameter cross-bracings is shown in Figures 6.11. The

result showed that by including the cross-bracings, the tower deflection reduced significantly

from 129mm to 81 mm. The corresponding stress on tower leg is 128 MPa, which gives the

linear buckling factor of about 2 as assumed in the analytical solution. The total tower mass is

computed as 124 kg, which is slightly greater than the previous model of the tower. In

comparison with the tower having equal leg and bracing diameters of 45 mm (Table 6.4), this

tower is slightly lighter and stiffer. However, the maximum stress on legs has increased in

comparison to the previous tower, but less than the tower having equal diameters for legs and

bracings. This is due to the increased drag on cross-bracings.

It is concluded that the tower with D = 35 mm, 20 mm diameter horizontal bracings, and 10 mm

diameter cross-bracings (Figure 6.11) gives a good design in terms of weight and stiffness.

Further reduction in tower mass is possible, but it requires an extensive finite element modeling.

The proposed tower design with cross-bracings are compiled Table 6.6.

Figure 6.11 Maximum stress and tower deflection for D =35 mm, 20 mm

diameter horizontal bracings, and 10 mm cross-bracings

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Table 6.6 Recommended tower design with cross-bracings

Description

Base distance between legs, b (m) 1.2

Length of leg sections (mm) 2003

Diameter of legs, D (mm) 35

Diameter of horizontal bracing (mm) 20

Thickness of legs and bracings, t (mm) 3

Diameter of cross-bracing (mm) 10

Total tower mass of tower members (kg) 136

Buckling capacity factor 0.5

Maximum tower top deflection (mm) 104

From the above analysis of different tower models, it is concluded that cross-bracings are not

required to design light-weight and stiff towers. Simple tower designs with only horizontal

bracings are recommended. Such tower designs can be easily designed with the results of tripod

analysis and do not require extensive work on FEA.

6.7 Design Loads for Foundation

After the tower dimensions of the lattice tower are defined, foundation analysis is carried out.

Steel reinforced concrete is the most commonly used material for tower foundations. Foundation

for lattice tower can be built in two ways. It can be built as either single spread footing or

individual footing for each tower leg. Rectangular and cylindrical foundations are commonly

used in lattice towers. However, the cost of a specific type of foundation depends upon the base

distance between the tower legs. For the tower with small base distance, single foundation may

be an economic option, whereas for the tower with large base distance, foundations at each leg

may be economic.

100

Foundation design is site specific due to the local soil conditions and their bearing capacity. The

dimensions of the foundation are determined by the reaction forces and the moments imposed on

the foundation. The forces and moments consist of total vertical load and overturning and

resisting moments on the foundation (Figure 6.12). The resisting capacity of the foundation

depends upon its own weight and bearing capacity of the soil. The vertical load (V) is the total

gravity load of the turbine (W), the tower (Wt), and the foundation (Wf). It is expressed as:

𝑉𝑉 = 𝑊𝑊 + 𝑊𝑊𝑡𝑡 + 𝑊𝑊𝑓𝑓 (6.5)

For a cylindrical foundation, the total resisting moment of the foundation is the total vertical load

multiplied by the radius of the foundation. The total overturning moment is the sum of the

resultant moment and the resultant horizontal force multiplied by the depth of the foundation.

Σ 𝑀𝑀𝑅𝑅𝐹𝐹 = 𝑉𝑉𝑑𝑑𝑓𝑓/2 (6.6)

Σ 𝑀𝑀 = 𝑀𝑀𝑓𝑓 + 𝐻𝐻 ℎ𝑓𝑓 (6.7)

By solving equations 6.5, 6.6 and 6.7, appropriate diameter and depth of the cylindrical

foundation can be determined. For the tower example presented in Table 6.5, the total vertical

load due to turbine and tower mass is 1420 N and the base overturning moment was determined

as 81,385 Nm by using equation (5.1).

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6.8 Tower Manufacture

Galvanized circular hollow steel sections of required diameters and thicknesses are readily

available in the market or can be produced easily.

An important design consideration in lattice towers is the joining technique for the circular

HSSs. As described in [7], the lattice tower can be manufactured very simply and accurately with

the help of a jig, like that shown in Figure 6.13. For the designed tower (Table 6.4), the leg

sections have 42 mm diameter steel pipes, whereas horizontal bracings have diameter 20 mm.

Both sections have the same wall thickness. The bracings are welded to the leg sections as shown

in the jig. The top section of a tower is fixed in the jig and the white arrow indicates one of the

three base plates for the bottom section of the tower.

Figure 6.12 Schematic of the loads on tower foundation

102

Figure 6.13 Jig to make tubular lattice tower used by

Kijito Windpower, Kenya. Photo taken from [7]

103

Chapter 7

OPTIMAL DESIGN OF BAMBOO TOWER

7.1 Chapter Overview

The basic design optimization procedures for lattice towers have been described in Chapter 5.

This chapter describes the main aspects of design and analysis of bamboo lattice tower.

This study aims to investigate bamboo’s suitability for small wind turbine towers using the

mechanical properties of bamboo experimentally established in Chapter 3. As a design example,

the design and analysis of a 12 m high bamboo tower for the 500 W wind turbine used in

Chapter 6 was carried out to compare to the steel lattice tower. On the basis of mechanical

properties of bamboo and IEC61400-2 safety requirements, the design of the tower was assessed

using analytical and FEA techniques. The study was focused on safety requirements, rather than

detailed economic analysis. The methodology adopted in the study is illustrated in Figure 7.1.

Figure 7.1 Study approach for the bamboo lattice tower

Experimental tests on mechanical properties of

bamboo

Design of 12 m high lattice tower for a 500 W

wind turbine

Joint design and testing

Design optimization and finite element analysis

104

7.2 The Bamboo Tower

As discussed in Chapter 5, buckling strength of tower members is the design criterion for lattice

towers. Consequently, the most desired property for the lattice tower members is their ability to

withstand compressive loads without buckling. One of the remarkable mechanical properties of

bamboo is its high buckling and tensile strengths in the longitudinal direction, which should

make bamboo a suitable material for lattice towers. In addition, it’s a natural material that is

cheap, easily available, and sustainable.

The proposed bamboo tower is composed of bamboo columns, connected together as beam

elements constituting the lattice structure as shown in Figure 7.2. The tower is built with 8 lattice

sections, each of 1.5 m height. The reasons for using short leg sections are that the dimensional

variability along the length should be minimized and the fact that shorter leg sections would have

better buckling strengths, as required in lattice towers. For the tower legs, approximately1.5 m

long bamboo columns (depending upon the base distance) are joined co-axially in the

longitudinal axis by using steel-bamboo adhesive joints. In steel-bamboo adhesive joints,

lashings are applied to add strength and stiffness in the joint. Horizontal- and cross-bracings are

connected to the tower legs by using lashings to add stiffness to the tower. The legs are

connected together into the turbine mounting flange (using both bolts and lashings) at the top of

the tower, whereas the steel caps in the bottom of leg sections would connect to the base plates

bolted at the foundation. The bottom sections of the legs are also tied up with ropes to the steel

caps, which are bolted to the foundation.

105

Figure 7.2 Bottom section of the proposed

bamboo lattice tower

Bamboo-steel adhesive joint for legs and lashings for both legs and bracings

Figure 7.3 Joining methods for the leg sections

Figure 7.4 Steel connector cap for the adhesive

joints

106

7.3 Design Requirements for Bamboo Tower

The purpose of the bamboo tower is to offer an economic and technological alternative to steel

towers for small wind turbines in off-grid remote regions of the developing countries. To verify

bamboo’s validity as a low-cost material, the tower design should meet certain requirements,

which are summarized below:

1) The bamboo tower will meet the load and safety requirements of the “SLM” of

IEC61400-2 for small wind turbines

2) The compressively loaded tower members will not buckle during extreme wind loads

determined by IEC61400-2

3) The tensile strengths of the joints connecting the bamboo columns will withstand the

tensile loads induced in the tower during extreme wind loads determined by IEC61400-2

4) The response of the structure will be linear elastic during extreme wind loads

5) The mechanical properties of the bamboo columns and joints will not change over the

designed life due to the effects of weathering or loadings

6) The design of joints for connecting bamboo columns will take into account the

dimensional variability of bamboo columns at the two ends, will protect splitting of

bamboo in the transverse axis, and will provide barrier to moisture ingression into the

joints

7) The joint design should ensure that the forces and moments acting in the joints would be

transmitted along the longitudinal axis of the columns so that excessive shear stress is not

developed in the joints leading to the splitting of bamboo columns

8) Due to the low-durability of bamboo, the joint design will allow flexibility for periodic

replacement of tower members or when required to meet the turbine service life-span

9) The tower will be cost-effective over the life-span of the project

With regard to the above requirements, bamboo can meet several design requirements. As

discussed in Chapter 2 and Chapter 3, bamboo is strong in tension, compression and bending that

the strengths are adequate to lattice tower. Moreover, its structural response is linear-elastic

107

when subjected to those loads. Since the failure criterion of lattice towers is mainly the buckling

of tower members, bamboo should be a suitable structural material as it exhibits excellent

buckling strength. From the above requirements, the issues of joints and durability become

apparent when bamboo is considered for lattice towers.

For bamboo towers, the main challenge is the need to connect the leg sections co-axially. It is not

possible to join the bamboo sections by welding or machining to a desired shape. Also, drilling

of holes for mechanical fasteners would induce splitting and conventional lashing alone cannot

effectively join two bamboo sections co-axially. The proposed solution to this challenge is to use

steel-bamboo adhesive joints, which would connect the bamboo co-axially in the longitudinal

direction. Then lashings will be used in the joint to strengthen the steel-bamboo adhesive joints.

However, the bracings are connected to legs by lashings only as they do not need to be connected

co-axially.

Bamboo has a low durability, e.g. 3-5 years, in open conditions due to weathering, whereas the

typical design life of a wind turbine is 20 years. In addition, due to weathering effects,

mechanical properties might change over time, if not protected properly. Longevity can be

improved if appropriate coatings or paints are applied, but it adds more costs to the material. To

address these issues, the proposed solution is to periodically replace the tower members after few

years of service. Consequently, this requires close monitoring of the tower members.

7.4 The Proposed Joint

As mentioned in earlier sections, steel-bamboo adhesive joints combined with lashings are

proposed to connect leg sections co-axially as required in lattice tower (Figures 7.3 and 7.5). As

the bamboo sections are connected co-axially, the compressive strength of the joint is equal to

that of the bamboo culm, but the tensile strength of the adhesive joint alone is less than the

tensile strength of the bamboo. To increase the tensile strength and stiffness of the joint in

tension, it is proposed to strengthen the joints by using lashings. Steel is chosen for the joint

because it is readily available as circular pipes and it would provide rigidity at the joints to

108

prevent splitting of bamboo columns. In addition, steel protects the vulnerable ends of the culms

from external damage and splitting at the joints. It is noted that adhesive joint does not require

drilling the bamboo columns for connecting different members. Moreover, it prevents moisture

ingression into the joint. More importantly, it will preserve the mechanical properties of the

culms as well as accommodate the dimensional variability along the length of bamboo column.

This study has focused on fabrication and testing of steel-bamboo epoxy joint. Detailed joint

design, which involves characterization of adhesive thickness and the joint length or overlap

length [53], was not carried out in this study. The experimental program on joint testing has been

described in Chapter 3.

7.5 Design Procedure for the Bamboo Lattice Tower

In the design of bamboo tower, the objective is to determine the minimum possible D of bamboo

columns, which are safe against buckling, for the minimum b. As discussed in section 3.4.3,

buckling is the only failure mode for the bamboo columns. Using the equations (5.9- 5.11), the

buckling stress on tower legs can be determined for any b. By knowing the buckling stress on

tower legs, l , and t, it is possible to determine the minimum D by using the equation (3.6). It is

Figure 7.5 Proposed joining methods in the lattice tower

109

assumed that the variation of buckling strength of bamboo columns with D, t, and l is given by

the equation (3.6).

7.5.1 Structural Analysis of the Tripod Model

The basic equations for determining the forces and stresses in the tower legs have been

formulated in Chapter 5. Optimum values of D, which are the values satisfying the maximum

compressive loads on tower legs, can be obtained from the experimentally determined buckling

strength of bamboo. In other words, the tower legs under compression loads should be

marginally safe from buckling.

The loads considered in the tower analysis are summarized below.

• Maximum thrust on turbine, F: 2150 N

• Weight of turbine + turbine mounting flange, W: 550 N

• Weight of tower, Wt: ∑𝜌𝜌𝜌𝜌𝐴𝐴 �ℎ2 + 𝑏𝑏2 3⁄ where, h =12 m; density of bamboo= 𝜌𝜌 = 800

kg/m3 [36]; and g =9.81 m/s2. The IEC load factor of 1.1 is applied in the analysis.

• Uniformly distributed wind load: 1.35q (N/m) (equation 4.4)

In scaffoldings described in Chapter 2, lashing joints are sufficiently strong that the main failure

criterion is the buckling of bamboo columns. Similarly, in lattice towers, if the adhesive joints

combined with lashings are assumed to be sufficiently strong to resist maximum tensile loads in

tower legs, the design of the tower is governed by the buckling strengths of bamboo columns.

The bamboo tower is designed with 1.5 m high lattice sections. Therefore, the length of tower

legs is about 1.5 m depending upon the choice of b. The buckling strengths of legs for a

particular diameter can be determined from the experimental results by computing the

slenderness ratio of the leg sections. With a known slenderness ratio, the buckling strength is

computed by using equation (3.6).

110

To prevent buckling of tower legs under combined axial and bending loads, the strength of tower

leg must satisfy the equation (5.11). The axial and bending stresses are computed as follows.

• Axial stress, σ𝑎𝑎 , is given by equation (5.10)

• Allowable buckling strength of tower legs, 𝑓𝑓𝑎𝑎 , is given by equation (3.6)

• Bending stress, σ𝑎𝑎 , is given by equation 5.5 and 5.8

• Yield strength of bamboo in compression is 𝑓𝑓𝑎𝑎= 44 MPa (Table 3.4)

It is noted that the axial stress in tower legs is much smaller than the bending stress. Using

equation (5.11), an equally optimum set of D is obtained, which are safe from buckling.

In another case, if lashing is not considered in the joints of leg sections, the tower will fail if the

maximum tensile load in leg sections exceeds the ultimate strength of the steel-bamboo adhesive

joints. Consequently, the optimum D and b should be determined based on the maximum pull-

out resistance of the joint. In other words, the adhesive joints will have lower pull-out strengths

than the buckling strengths of tower members. To examine the tower design with tensile strength

criterion, first the optimum values of D were obtained using the buckling strength criteria. Then

a particular size of bamboo was chosen for the fabrication of steel-bamboo adhesive joint. This

was necessary because characteristic values of pull-out strengths of steel-bamboo are not

available and the study is based on the experimental result. As a reference, the pull-out strength

of 19 kN for the PVC-bamboo adhesive joint [18] was taken. The size of the bamboo used was

61.18 mm. In this study, 65 mm diameter bamboo was chosen for the fabrication of the adhesive

joint.

7.5.2 Results of Tripod Analysis

In order to assess the buckling of tower, the combined maximum compressive stresses in the

tower legs were determined for different bamboo diameters as shown in Figures 7.6. The average

thickness of 6 mm was assumed for all sizes of bamboo columns, which was obtained from the

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average thickness of tests specimens, given in Table 3.1. Table 7.1 shows the buckling strengths

of 1.5 m long bamboo columns for different diameters obtained from the results of buckling tests

(Figure 3.5).

Table 7.1 Buckling strengths of 1.5 m long columns (t = 6 mm) (equation 3.6)

Diameters (mm) 50 55 60 65 70 75

Slenderness Ratio 95 86 78 71 66 61

Buckling Strength (MPa) 15.5 20.5 24 27.5 30 31.5

Figure 7.7 shows the minimum possible diameters of bamboo, obtained from Figure 7.6 and

Table 7.2, for the leg sections that are safe against buckling. It is observed that there is an equally

optimum set of D for various b, which can be chosen to design the tower. However, the design

goal is to design a tower with minimum possible D at minimum b, appropriate b should be

selected based on buckling strength of bamboo.

Figure 7.6 Maximum compressive stresses in tower

legs for various leg diameters and base distances

112

Figure 7.7 Diameters of 1.5 m long bamboo columns that

are marginally safe against buckling for various base

distances

Figure 7.8 Maximum tensile forces on tower legs for various b

113

It is noted that the experimental tests on pull-out strength of steel-bamboo adhesive joints were

carried out only for D =65 mm. The pull-out strength for this size of joint was 20.32 kN (Table

3.4). So the design of tower based on tensile strength criterion was examined only for this size of

bamboo. The effective tensile forces (combined axial and bending) on tower legs in the

maximum tensile mode are shown in Figure 7.8 for a 65 mm diameter bamboo. It is observed

that the minimum b = 2.7 m to withstand the tensile loads if only the adhesive joints are used in

the tower. However, such a large base distance would increase the tower top width and may not

be feasible for mounting the turbine unless special turbine mounting arrangements are made.

7.5.3 Finite Element Analysis of the Tower

FEA was carried out to determine the maximum stresses and forces in the tower legs and the

tower-top deflection. Using the results of tripod analysis, FEA was carried out in the maximum

compression and tensile modes of the tower as discussed in section 5.5.1. Two examples of

tower designs were examined as discussed above.

In the first example, the design of tower is based on the buckling strengths of tower legs. Here,

the joints are assumed sufficiently strong and stiff to withstand maximum tensile loads on the

tower legs and buckling is the failure criterion. The tower configurations considered for the FEA

are shown in Table 7.2.

Table 7.2 Tower configurations for the FEA (t=6 mm)

b (m) 1.6 1.85 2.15 2.6

D (mm) 70 65 60 55

In the second example, the design of tower was based on the ultimate tensile strength of 20.32

kN of steel-bamboo adhesive joints. As the strength of steel-bamboo joint is already determined

for D = 65 mm, the tower design requires appropriate selection of b. For the 65 mm legs, the

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base distance of the tower should be at least 2.7 m as shown in Figure 7.8 to prevent the failure

of joints in tension. To verify the result, FEA of the tower was carried out.

7.5.3.1 FE Model of the Bamboo Tower

Although bamboo possesses a graded composite structure across the wall or in the transverse

axis, compressive and tensile strengths and elastic properties do not vary noticeably along the

longitudinal axis. Silva et al. [28] applied the FE methods to determine the effective mechanical

properties and structural behaviour of bamboo culms by assuming the homogenized material

structure. The results showed that effective material properties could be determined by assuming

a homogeneous material. In this study, bamboo was assumed as homogeneous beam, i.e. it

possesses same material properties in the longitudinal direction. As a conservative approach,

bamboo was modeled as a linear elastic isotropic material because longitudinal properties of the

beam are important in lattice towers. In FE modeling, the required material properties are the

modulus of elasticity and Poisson’s ratio, which have been determined from experimental tests.

The modulus of elasticity and Poisson’s ratio used in the analysis are 16.32 GPa and 0.33

respectively. The tower was modeled in ANSYS APDL using 2-node with 288 beam elements

for bamboo columns (Figure 7.11). The properties of the beam elements are described in Chapter

5. As the analytical and FEA results for stress and deflection were obtained very similar, the

above material model was assumed to be valid.

The tower legs were assumed to be rigidly fixed to the foundation; no rotation and displacement

were assumed during the extreme loads. In addition, the tower joints were assumed to be rigid

and no rotation and transportation are allowed. This could be achieved by using lashing around

the joint, which would increase strength and stiffness of the joints. The turbine thrust and

weights considering the IEC load factors were applied at the tower top in horizontal and vertical

directions respectively. The drag forces per unit length, with IEC load factor, were computed in

legs, horizontal- and cross-bracings and then applied at each nodal point in the beam elements

(Figure 7.10). The bamboo density was taken as 800 kg/m3. The gravity load due to tower mass

was applied as “inertia in global coordinates” by using acceleration due to gravity as 9.81 m/s2.

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7.5.3. 2 Results of Finite Element Analysis

Using the tower configurations given in Table 7.2, FEA was carried out in order to compare the

stress and deflection results with the tripod analysis. The results of FEA for the maximum

compressive stress and tower deflection considering the horizontal bracings are shown in Figure

7.10-7.13. The numerical results for the tower deflections were calculated by using the

MATLAB program, TowerDef.m, given in Appendix B. The comparison of the results obtained

from the tripod analysis and FEA are shown in Table 7.3.

Figure 7. 9 Finite element models of the tower with horizontal bracings (left),

with horizontal- and cross-bracings (centre), and bottom section of the tower

showing wind loading on the tower (right)

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Figure 7.10 Tower-top deflection and compressive stress

(b=1.6 m and D=70 mm)

Figure 7.11 Tower-top deflection and compressive stress

(b=1.85 m and D = 65 mm for legs and bracings)

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Figure 7.12 Tower-top deflection and compressive stress

(b=2.15 m and D = 60 mm for legs and bracings

Figure 7.13 Tower-top deflection and compressive stress

(b=2.6 m and D =55 mm for legs and bracings)

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Table 7.3 Comparison of the results of FEA and tripod analysis

Diameter of legs and bracings (mm) 70 65 60 55

Base distance between the tower legs (m) 1.6 1.85 2.15 2.6

Allowable compressive stress (MPa)

(Analytical)

29.55 26.51 23.78 20.63

Maximum compressive stress (MPa) (FEA) 30.30 24.17 21.17 18.67

Tower-top deflection (mm) (FEA) 222 193.50 169.25 133.62

Tower-top deflection (mm)

(numerical)

232 186.27 148.46 110.17

From Table 7.3, it was found that the tripod analysis determines the maximum stresses on legs

with reasonable accuracy. Also, the tower-top deflections are comparable. It is noted that as the

base distance increases, the results of the FEA and tripod models are diverging. This indicates

that the FEA and tripod analysis give similar results for b up to 2 m. Therefore, tripod analysis

can be used to determine optimum values of D for this range of b with sufficient accuracy. For

better stiffness, same diameters of bamboo should be used for both legs and horizontal bracings.

From Table 7.3, it is evident that only the tower designs with 65, 60, and 55 mm bamboo are

feasible.

In order to determine the effect of cross-bracings, a tower design with b =1.85 m and D = 65 mm

was considered. Both the horizontal- and cross -bracings were modeled as 30 mm bamboo,

which is assumed as the minimum possible size of bamboo that can be obtained in practice. The

result of ANSYS simulation is shown in Figure 7.14.

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It is observed from Figure 7.14 that compressive stress on tower legs has increased when cross-

bracings were used. This is because of the increased drag on the tower. However, the tower

stiffness has increased considerably, with the tower-top deflection of 94 mm. The increased

compressive strength means that buckling could be a critical factor. For the 65 mm bamboo, the

allowable compressive stress is 26.51 MPa. Therefore, the tower may buckle. It is concluded that

cross-bracings increase the drag on tower considerably, which would increase the compressive

stress in tower legs.

In the second design example, FEA was carried out to calculate the maximum tensile force on

tower legs for b =2.6 m and D =65 mm. Figures 7.15 shows the distribution of effective tensile

forces in the tower legs. The influence of bracing sizes on effective tensile forces is shown in

Figure 7.16. The results show that smaller size of horizontal bracings should be used to reduce

the drag on tower.

Figure 7.14 Tower-top deflection and compressive stress in the

tower with horizontal- and cross- bracings (b= 1.85 m, D=65 mm)

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Figure 7.16 Effect of bracing sizes on maximum tensile

forces in legs at b= 2.6 m (obtained from FEA).

Figure 7.15 Tensile forces in the tower legs at b= 2.6 m, D = 65

mm and 30 mm diameter for bracings

121

In the tower model having horizontal- and cross-bracings of minimum possible diameter (Figure

7.17), the effective tensile forces increased significantly to 25 kN from 19 kN (tower without

cross-bracings). This shows that cross-bracings, which increase the drag on the tower, should not

be used in bamboo towers. Horizontal bracings are sufficient to maintain the stiffness of the

tower.

In conclusion, it was found that drag forces on cross-bracings considerably increase the

compressive stress and tensile forces in tower legs. Although, full sections of bamboo are not

recommended for cross-bracings, split bamboo sections of smaller cross-sectional areas may be

used to enhance stiffness. However, the analysis was not carried out for these sections.

Figure 7.17 Lattice tower of 2.6 m with 65 mm leg size and 30

mm for horizontal- and cross-bracings

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7.5.4 Results and Assumptions of the Analysis

From the analysis of different bamboo towers, it has been shown that tower deflections are small.

The maximum tower top deflection was found as 1.6 % of the tower height for the feasible tower

designs (Table 7.3). Although elastic behaviour of bamboo was not experimentally established in

this study, the bamboo tower is assumed to maintain linear-elastic behaviour for small tower-top

deflections during extreme wind loads.

7.5.5 The Optimal Tower Design

The above analysis has shown that bamboo towers can meet the IEC load and safety

requirements. The analysis has shown that lashings should be combined with the steel-bamboo

adhesive joints to design an optimum tower. It is concluded that bamboo tower is technically

feasible, although there are some inherent limitations of bamboo’s use, such as durability.

However, this limitation can be overcome by replacing the tower members periodically during

the life-span of the turbine. In summary, the specifications for the design of an optimum bamboo

tower are given table 7.4.

Table 7.4 Optimized design of the bamboo tower

Base distance between the tower legs, b 1.85 m

Diameter of tower legs, D (mm) 65

Diameter of horizontal bracings (mm) 65

Wall thickness of bamboo (mm) 6

Tower-top width (m) 0.15

Length of leg sections (mm) 1505

Tower mass (kg) 37

Tower-top deflection (mm) 193

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7.5.6 Tower Manufacture and Installation

Bamboo towers can be easily built with simple tools and minimum workmanship. It is

recommended that straight bamboo sections should be dried properly, such as below 20%

moisture content, to achieve good mechanical strengths. To improve durability and minimize the

effects of weathering, bamboo sections should be painted. Fabrication of adhesive joints is the

major task in the design and manufacture of bamboo tower. The procedure for fabricating the

steel-bamboo adhesive joints is a reasonably simple task as described in Chapter 3, which can be

carried out with simple tools. After the joints are fabricated, assembly and erection of tower

involves joining of the bamboo sections using lashings. The design of foundation can be done as

described in Chapter 6.

7.5.7 Comparison with the Steel Lattice Tower

Both the steel and bamboo towers were designed to satisfy the loads and safety requirements of

IEC. The basic differences in design between the bamboo and steel lattice towers, besides its

economic merits, are summarized below.

• The bamboo tower is relatively light (37 kg) when it is compared to the equivalent steel

tower (112 kg).

• In the design of bamboo tower, the available size of bamboo columns is an important

design factor for the selection of base distance between the tower legs. To minimize the

loads on legs, base distance should be increased.

• The minimum base distance of the bamboo tower is determined by the buckling strengths

of bamboo sections to satisfy the load requirements of the tower, whereas for steel tower,

minimum base distance can be chosen because any size of steel pipes can be obtained to

satisfy the load requirements.

• In bamboo towers, joining of bamboo sections is a major challenge, whereas for steel

tower, there are many options for joining the tower members.

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• In bamboo tower, the joints should be sufficiently strong to ensure that buckling is a

major design criterion.

• In steel tower, cross-bracings of smaller size may be used to increase stiffness with

minimum increase of drag on tower, whereas in bamboo tower, smaller bamboo sections

for cross-bracings could not be obtained in practice; so there is significant drag on the

tower if full bamboo sections are used.

• In steel tower, durability of material is not a major challenge, whereas in bamboo towers,

it is a major challenge and requires periodic replacement of tower members to meet the

turbine service life of 20 years.

• For the same loads, the bamboo tower requires larger base distance than the steel lattice

tower. Also, the tower-top deflection is higher.

• The construction of bamboo tower is very simple than the steel lattice tower.

7.6 Economic Feasibility

Bamboo is an extremely cheap structural material. On a market survey conducted by the author

in order to determine the current material price of bamboo in Nepal, a typical freshly harvested

bamboo pole, which is about 8-12 m long, costs about $1.5 - $3 in urban areas. The whole

bamboo pole could not be utilized due to the dimensional variability along the length.

Consequently, several bamboo poles may be required to make the tower components. On a rough

calculation, about 8-12 bamboo poles would be required for building the whole lattice tower. In

average, the material costs of the bamboo would be about $20-$30. In addition, there are also

other material costs, such as adhesives, steel connectors, and ropes etc that drive the capital costs

of the tower. The same steel connectors can be used for the whole life-span of the wind turbine.

The only materials needed during replacement of tower members are the bamboo and adhesives.

The cost for adhesives is estimated about $30-$40 and that for steel connectors is about $15-$20.

Altogether, estimated material cost of bamboo tower is about $100. Ideally, there are no

manufacturing costs besides assembly of tower at the site. For a 20 year life-span the cost of

bamboo tower would be around $400-$ 500 assuming that the bamboo is replaced 4-5 times.

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In the context of tower design, material cost is one of the several cost components, such as labor,

transportation, erection, repair and maintenance etc. It is crucial to evaluate the consequences

and every aspects of how the structure is built and maintained over the desired life-span in

practical contexts. Such systems level costs can be examined mainly in terms of design costs,

material and foundation costs, build time and labor costs, and repair and maintenance costs.

As discussed above, the purchasing cost of bamboo is very low when it is compared to steel.

Currently, steel costs about $2.7-$3/kg in Nepal [63]. So the material cost of an equivalent steel

lattice tower weighing 150 kg, described in Chapter 6, is about $405-$450. Moreover, the

production of lattice tower (e.g. welding) adds more cost in the total cost of the tower. The

designed steel lattice tower can be produced approximately at $700-$800. However, the

production and transportation costs of steel towers depend upon the contexts where it is

designed.

The manufacturing sequence for bamboo towers is very short and simple. The towers can be

built and assembled quickly with minimum use of workmanships, from design to installation.

Among others, the main drawback of bamboo tower is the low durability, which can be

addressed only by periodic replacement of tower members and use of protective coatings over

the designed life-span (generally 20 years) of the wind turbine. As bamboo is a very cheap

material, replacement of the whole tower every three to five years is not likely to reverse the

costs of steel and bamboo towers.

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Chapter 8

SUMMARY, CONCLUSIONS AND FUTURE WORK

8.1 Summary of Thesis

The core objectives of this thesis were: 1) to investigate the feasibility of bamboo tower for small

wind turbines and 2) to develop an easy design procedure for the triangular lattice towers.The

context of this thesis is the developing countries, such as Nepal, where small wind turbines are

recognized as appropriate technologies to produce electricity, particularly in off-grid remote

areas where transportation and cost of towers are the main challenges.

Chapter 2 presented a brief overview of main design types of towers for small wind turbines and

indicated the economic competitiveness of the lattice towers, examined the mechanical

properties of bamboo and various joining techniques, and introduced the type of adhesive joint

intended for the design of bamboo lattice towers.

Chapter 3 described the experimental work on mechanical properties of the bamboo and steel-

bamboo adhesive joint and summarized the main results. The buckling and compression

strengths and elastic properties of bamboo were experimentally determined. The buckling

strength of bamboo columns was characterized in terms of buckling strength and slenderness

ratio. The results of the experiment showed a considerable variation in buckling and compression

strengths. To account for the variation of properties, all the values were computed at 95%

confidence level, as required by the International Electrotechnical Commission (IEC) for the

design of wind turbine components. It was shown that a considerable variation on buckling and

compression strengths was observed when compared to the measured data and the 95%

confidence level values. The buckling strength of bamboo was found in the range of 23 MPa -60

MPa for different sizes of bamboo columns. The compressive strength was found in the range of

51 MPa-78 MPa. The elastic modulus in compression and Poisson ratio were determined as

16.32 and 0.33 respectively. In addition, the characteristic values of the pull-out strengths of a

127

specific size of steel-bamboo epoxy joint, intended for connecting the leg sections in bamboo

tower, was experimentally determined.

Chapter 4 discussed the load and safety requirements of IEC for small wind turbines,

summarized the main loads acting on the tower, their computation methods and presented a brief

overview of design methodology and standards for assessing material strengths. It was concluded

that extreme load case H of the simple load model of International Electrotechnical Commission

is an important design criteria for the tower design. Fatigue load gives relatively low bending

stress on the tower than the extreme wind load. So fatigue was not considered in the design and

analysis of the tower.

Chapter 5 introduced the design aspects of triangular tower as a low-cost alternative to the

monopole towers. To simplify the design process of the triangular tower, it was modeled as a

tripod consisting of three legs only, which allowed formulation of analytical solutions for

stresses on tower legs and tower deflection. In the tripod model of the lattice tower, the overall

dimension of the tower is governed by the base distance, tower height, imposed loads, cross-

sectional dimensions of the legs, and buckling strength of the leg sections. ASCE, Eurocode, and

AISC equations were used in the analytical solutions to determine the minimum dimensions of

the tower legs that are safe against buckling. This defines the basic geometry of the tower in

terms of base distance, tower height, imposed loads, and diameter of tower legs. Using the

results of tripod analysis, the design of lattice tower is possible. To extend this analysis to a more

accurate analysis, finite element modeling procedure for the lattice tower using the software

package ANSYS APDL has been described.

In Chapter 6, the results of tripod analysis were checked with finite element analysis. It was

shown that the tripod model gives approximately the stresses on legs and tower-top deflections.

The results of tripod analysis for stresses and tower-top deflections were found more accurate

when compared to the lattice tower with horizontal bracings. A design example of a 12 m high

steel lattice tower for a 500W wind turbine was also presented, which was intended for

comparison with the bamboo lattice. The tower consists 6 sections, to be designed with circular

128

steel hollow sections. The design procedure established in Chapter 5 was implemented to

illustrate the design process. The design of tower was based on the load assumptions of a 500 W

wind turbine at an extreme wind speed of 50 m/s. First, the tripod analysis was carried out to

obtain optimum leg diameters for various base distances using ASCE and Eurocode 3 guidelines.

Then, the finite element analysis of different tower models using ANSYS APDL was carried for

the tripod and the lattice towers. Two design examples of lattice tower models, towers with only

horizontal bracings and towers with both horizontal- and cross-bracings, were examined to

minimize the tower mass. The effect of cross-bracing was investigated by comparing the two

tower models in terms of stiffness and mass of the tower.

In Chapter 7, the design of a 12 m high triangular bamboo lattice tower for a 500 W wind turbine

was presented. The aim of the design was to examine the validity of bamboo as a potential

structural material for small wind turbine towers. The basic design of the bamboo tower consists

of 8 lattice sections, to be designed with bamboo columns. The design procedure established in

Chapter 5 was implemented to illustrate the design process. The tower design was based on the

load cases of a 500W wind turbine in accordance with the load and safety requirements of

IEC61400-2 and the experimentally determined mechanical properties of the bamboo and the

strength of steel-bamboo adhesive joint.

8.2 Conclusions

Proposing a new and alternative material for wind turbine towers is a multidisciplinary design

task, requiring a lot of work on basic design process and assessment of different material

properties; so this thesis has only considered the fundamental design and safety requirements of

the tower. To justify the use of bamboo in wind turbine towers, this thesis has proposed the

triangular type of lattice tower design.

The 12 m high triangular lattice tower, proposed in this thesis, has been modeled as a tripod to

formulate the analytical solutions for the stresses and tower deflections. Analytical equations for

determining the forces and stresses in tower legs were formulated. The analytical equation for

129

the tower deflection was derived by assuming the tripod as a cantilevered equivalent beam of

three legs. The tripod model combines the imposed loads on the tower, the tower height, the base

distance between tower legs, and the cross-sectional dimensions of tower legs. The stresses on

legs are used to assess the buckling strength of the towers using appropriate standards provided

by ASCE, Eurocode, and AISC. The ASCE and Eurocode 3 equations showed consistent results.

AISC equation gave slightly higher values of leg diameters. The AISC equations is safer than the

ASCE and Eurocode 3.As is clear from the tripod model, the analytical solutions served as a

reference for the initial tower design, which could be extended to finite element analysis.

ANSYS APDL was used as a finite element analysis tool to check the validity of the tripod

model, which is intended for basic tower design. The comparison of the results of analytical,

numerical, and finite element analysis has demonstrated that the tripod analysis can accurately

give the basic dimensions for the lattice tower with and without horizontal bracings. It was also

shown that the drag force on bracings increase the stresses on legs, however, cross-bracings

significantly increase the tower stiffness.

To assess the feasibility of tower or the structural integrity under extreme wind loads, the tower

design was based on experimentally determined mechanical properties of bamboo and the loads

and safety requirements of IEC 61400-2. For this purpose, a 12 m high bamboo tower for a 500

W wind turbine was designed using the preliminary results of tripod analysis. The results of

material testing showed that bamboo possesses good buckling resistance that meets the load

requirements of small wind turbines. During the experimental work, it was found that the desired

thickness of bamboo could not be found in practice. Therefore, the design of bamboo tower

should be based on the selection of minimum external diameter to reduce the drag on tower

while meeting the buckling resistance of the tower legs. In addition, steel-bamboo adhesive joint,

combined with conventional lashing, has been proposed for connecting the bamboo sections in

the lattice tower. To address the challenge of low durability of bamboo, periodic replacement of

tower members has been proposed.

130

The results of tripod analysis were used to design the bamboo tower. The tripod model gives the

direct relation of buckling stress and base distance which is very useful in the selection of

bamboo diameters. It was found from the tripod analysis that for reducing the compressive stress

on tower legs and pull-out load on joints, the base distance should be increased. It was shown

that bamboo tower requires larger base distance to withstand the tower loads than the steel tower.

As the tensile load at the base of tower is significant, the tower design required 2.7 m base

distance if only adhesive joints were considered. For the same tower with combined lashing in

the joints, the required base distance is 1.85 m. It was concluded that the geometry of the

bamboo tower is governed by the diameter of the bamboo, joint strength, and base distance.

Subsequent finite element analysis was carried out for the same tower to evaluate the buckling

strength of the tower legs. The results of finite element analysis for a 12 m high bamboo tower

were compared to the results of tripod analysis and it was found that buckling stresses on legs

and tower deflections could be approximately determined using the analytical equations, which

further validates that analytical equations can be used for the basic design of the bamboo tower.

Furthermore, a comparison made with the equivalent steel tower indicates that bamboo tower is

an extremely economical option. The results of this study shows that steel towers are about 4

times heavier. Bamboo towers can be constructed easily than any known towers for small wind

turbines. The implications of these results show that bamboo towers are relevant in remote

regions, where low-cost towers could be easily build. The results of this study justifies that the

design of bamboo towers is technically feasible.

8.3 Future Work

As an extension of this study, the author proposes the following:

The short-term and long-term effects of dynamic loads and weathering on the mechanical

properties of bamboo, the adhesive joint, and the structure are not fully known, which must be

investigated to further build confidence on designing bamboo tower.

131

A detailed design and analysis of the joint requires an extensive experimental work on

characterization of the steel-bamboo adhesive joint. Parametric studies on the relationship

between strength, adhesive thickness, and overlap length of the steel-bamboo adhesive joints are

recommended.

132

REFERENCES

[1] International Energy Agency, Energy for all, financing access for the poor, World Energy

Outlook, 2011

[2] “Rio+20”, http://www.un.org/en/sustainablefuture/about.shtml , accessed 20 June, 2013

[3] Sustainable Energy for All, Pathways for Concerted Action toward Sustainable Energy for

All, 2012, available

at http://www.sustainableenergyforall.org/news/item/download/15_27223d732e1e6b2e9eb5737c

368100c5

[4] International Renewable Energy Agency, Renewable energy innovation policy: Success

criteria and strategies; working paper, 2013. Available at:

http://www.irena.org/DocumentDownloads/Publications/Renewable_Energy_Innovation_Policy.

pdf

[5] Poudel, R. C., Quantitative decision parameters of rural electrification planning: A review

based on a pilot project in rural Nepal, Renewable & Sustainable energy reviews 25(2013):291-

300.

[6] IEC Standard 61400-2, Design requirements for small wind turbines, International

Electrotechnical Commission, 2006

[7] Wood, D. (2011). Small wind turbines. Dordrecht: Springer.

[8] Clifton-Smith, M. J., and Wood, D. H. (2010). Optimisation of self-supporting towers for

small wind turbines. Wind Engineering, 34(5), 561-578. doi:10.1260/0309-524X.34.5.561

[9] Clausen, P.D., Peterson, P.,Wilson, S.V.R., and Wood, D.H., Designing an Easily-Made

Lattice Tower for a Small Wind Turbine, International workshop on small scale wind energy for

developing countries, Nepal, 2010

[10] Hau, E. (2006). Wind turbines: Fundamentals, technologies, application, economics. New

York: Springer-Verlag. doi: 10.1007/3-540-29284-5

[11] The timber tower: the structure and operation; available at

http://www.timbertower.de/en/product/the-timbertower/; accessed 20 June, 2013

133

[12] Francois-Xavier, Jammes. ; Design of wind turbine towers with ultra-high performance

concrete (UHPC) (2009); M.Sc thesis, Massachusetts Institute of Technology

[13] ANSYS® Academic Research, Release 14.0, ANSYS, Inc.

[14] Malcom, D.J.; WindPACT Rotor Design Study: Hybrid Tower Design, 2004, National

Renewable Energy Laboratory (NREL); available at:

http://www.nrel.gov/docs/fy04osti/35546.pdf

[15] http://www.windenergy.com/community/blog/can-i-mount-skystream-small-wind-turbine-

my-roof.html

[16] http://www.bergenwind.com.au/our-products/towers-and-masts/free-standing-towers.php

[17] http://twnwindpower.com/2013/02/does-tower-type-really-matter/

[18] Albermani, F., Goh, G. Y., & Chan, S. L. (2007), Lightweight bamboo double layer grid

system. Engineering Structures, 29(7), 1499-1506.

doi: http://dx.doi.org.ezproxy.lib.ucalgary.ca/10.1016/j.engstruct.2006.09.003

[19] Laraque, P., Design of a low cost bamboo footbridge (2007), M.Sc thesis, Massachusetts

Institute of Technology

[20] Lou, Y.; Li, Y., Kathleen, Buckingham, G.H., Zhou, G., Bamboo and climate change

mitigation: a comparative analysis of carbon sequestration, International Network for Bamboo

and Rattan (INBAR), 2010

[21] Yu, W. K., Chung, K. F., and Chan, S. L. (2003), Column buckling of structural bamboo.

Engineering Structures, 25(6), 755-768. doi: 10.1016/S0141-0296(02)00219-5

[22] Platts, J., Wind Energy Turns to Bamboo, University of Cambridge, April, 2007, available

at: http://www.eng.cam.ac.uk/news/stories/2007/bamboo_wind_turbines/ ; accessed 25 June,

2013

[23] Ghavami, K. (2005), Bamboo as reinforcement in structural concrete elements. Cement and

Concrete Composites, 27(6), 637-649. doi:10.1016/j.cemconcomp.2004.06.002

[24] Ghavami, K., Allameh, S.M., Sancher, M.L., and Soboyejo, W.O., Multiscale study of

bamboo Phyllostachys Edulis, available at: http://www.abmtenc.civ.puc-

rio.br/pdfs/artigo/Ghavami_K.pdf

134

[25] Amada, S., The mechanical structures of bamboos in viewpoint of functionally gradient and

composite materials, J. Composite Mater., 1996, 30, 7, 800-819, Sage Publications, Sage CA:

Thousand Oaks, CA

[26] Ghavami, K., Rodrigues, C. S., and Paciornik, S., Bamboo: Functionally graded composite

material, Asian Journal of Civil Engineering (Building and Housing) Vol.4, No.1 (2003), pp 1-10

[27] Obataya, E., Kitin, P., and Yamauchi, H., Bending characteristics of bamboo (Phyllostachys

pubescens) with respect to its fiber–foam composite structure; Wood Sci Technol (2007) 41:385–

400 DOI 10.1007/s00226-007-0127-8

[28] Silva, E. C. N., Walters, M. C., and Paulino, G. H., Modeling bamboo as a functionally

graded material: Lessons for the analysis of affordable materials. Journal of Materials Science

(2006), 41(21), 6991-7004. doi: 10.1007/s10853-006-0232-3

[29] Liese, W., Preservation of bamboo culm in relation to its culm structure, 2004, available

at: http://www.fundeguadua.org/imagenes/DESARROLLOS%20TECNOLOGICOS/ARTICUL

OS%20Y%20PUBLICACIONES/WALTER%20LIESE.pdf

[30] Shihong, L., Zhang, R., Shaoyun, F, Chen, X., Zhou, B., and Zeng, Q., A Biomimetic

Model of Fiber-reinforced Composite Materials; Journal of Materials Science Technology,

(1994), Vol 10

[31] Tan, T., Rahbar, N., Allameh , S.M., Kwofie, S., Dissmore, D., Ghavami , K., Soboyejo,

W.O., Mechanical properties of functionally graded hierarchical bamboo structures, Acta

Biomaterialia, 2011, 7.10: 3796–3803

[32] Mitch, D., Harries, K., and Sharma, B., Characterization of Splitting Behavior of Bamboo

Culms, Journal of Materials, Civil Engineering, (2010) 22(11), 1195–1199. doi: 10.1061 (ASCE)

MT.1943-5533.0000120

[33] Tommy, Y. L., Cui, H.Z., Tang, P.W.C., and Leung, H.C., Strength analysis of bamboo by

microscopic investigation of bamboo fibre, Construction and Building Materials, (2008), 22, 7,

1532-1535, Elsevier Ltd

[34] Mechanical Properties of Bamboo, available at: http://bambus.rwth-aachen.de/eng/PDF-

Files/Mechanical%20properties%20of%20bamboo.pdf; accessed 12 April, 2013

135

[35] Chung, K.F. and Chan, S.L.; Design of bamboo scaffolds, technical report, International

Network for Bamboo and Rattan (INBAR), 2002; available at:

www.inbar.int/downloads/inbar_technical_report_no23.pdf

[36] Ashby, M. F. (2005), Materials selection in mechanical design; 3rd edition, Elsevier, San

Diego, pp.521

[37] Lakkad, S.C.; Patel, J.M.; Mechanical properties of bamboo: a natural composite, Fibre

science and technology, 14, (1980-81) 319-322

[38] Janssen, J.J.A., Designing and building with bamboo, International Network for Bamboo

and Rattan (INBAR), 2000; available at:

http://www.fundeguadua.org/imagenes/DESARROLLOS%20TECNOLOGICOS/ARTICULOS

%20Y%20PUBLICACIONES/INBAR_Technical_Report_No20.pdf

[39] Arce-Villalobos, O. A., Fundamentals of the design of bamboo structures (1992), PhD thesis

Eindhoven. -Met index .ref. ISBN 90-6814- 524-X, Eindhoven, Faculteit Bouwkunde,

Technische Universiteit Eindhoven

[40] Janssen, J. J.A., Bamboo in building structures (1981), PhD thesis, Eindhoven University of

Technology, Eindhoven, Netherlands

[41] Oza, N., Puja Pandals, Rethinking an urban bamboo structure (2000), MSc thesis,

Massachusetts Institute of Technology

[42] Types of Joints, available at http://bamboo.wikispaces.asu.edu/7.+Types+of+Joints;

accessed 12 April, 2013

[43] Van der Lugt, P., van den Dobbelsteen, A.A.J.F., and Janssen, J.J.A., An environmental,

economic and practical assessment of bamboo as a building material for supporting

structures; Construction and Building Materials, 2006, 20, 9, 648-656, Elsevier Ltd

[44] http://bambus.rwth-aachen.de/de/fr_bambuskuppel_4u.html

[45] http://bambus.rwth-aachen.de/eng/PDF-Files/Bamboo%20Connections.pdf

[46] Satish K., Shukla, K.S., Dev, T., and Dobriyal, P.B., Bamboo preservation techniques: A

review,

International Network for Bamboo and Rattan (INBAR) and Indian Council of Forestry Research

Education (ICFRE), 1994

136

[47] Bamboo treatment, available at http://bambooroo.net/about_bamboo.php, accessed 30 May,

2013

[48 ] Lima Jr, Humberto C., Willrich, Fabio L., Barbosa, Normando P., Rosa, Maxer A., Cunha,

Bruna S., Durability analysis of bamboo as concrete reinforcement, Mater.Struct., 2008, 41, 5,

981-989, Springer Netherlands, Dordrecht

[49] Fenner, R.T. and Reddy J.N. (2007), The mechanics of solids and structures, Second

Edition; New York: Springer

[50] Boresi, A.P., and Schmidt, R.J. (2002), Advanced mechanics of materials,

John Wiley & Sons, New York

[51] Richard, M.J., and Harries, K.A., Experimental Buckling Capacity of Multiple-Culm

Bamboo Columns, Key engineering materials, vol 517(2012) pp 51-62

[52] ISO (2004b) ISO 22157-1: Bamboo – Determination of physical and mechanical properties -

Part I: Requirements, International Standards Organization, Geneva, Switzerland.

[53] Orthwein, W. C., Machine component design (1990), West Pub, St. Paul, pp.375

[54] Robert D. Adams, J. Comyn, and William Charles Wake (1997), Structural Adhesive Joints

in Engineering, Second Edition, pp: 24

[55] Ankit, V, Adhesive bonded towers for wind turbines (2011), MSc thesis, Eindhoven

University of Technology

[56] http://www.gl-group.com/en/certification/renewables/index.php

[57] ASCE (1990) Design of steel transmission pole structures, ASCE manuals and reports on

engineering practice no 72

[58] Eurocode 3 (2007) Design of steel structures—Part 1–6: strength and stability of shell

structures, En 1993–1–6:2007

[59] ANSI/AISC 360-05, Specification for structural steel building, American Institute of Steel

Construction, 2005

[60] Dieter, G. E. (2000), Engineering design: a materials and processing approach

McGraw-Hill, Boston

[61] Gantes, C., Khoury, R., Konner, J.J., and Pauangar, C., Modeling, Loading, and Preliminary

Design Considerations for Tall Guyed Towers, Computers and structures, Vol 49,No 5 (1997),

PP:797-805

137

[62] Reddy, J.N. (2004), An introduction to nonlinear finite element analysis, Oxford University

Press, Oxford, pp: 13

[63] Data provided by Kimon Silwal, Kathmandu Alternative Power Group, Nepal.

138

APPENDICES

APPENDIX A: CALCULATION OF LEG DIAMETER TO AVOID BUCKLING

A.1. Calculation of D using ASCE (1990) guidelines

For the calculation of optimum D, following constants have been used:

Table A.1 Constants used in the Calculation

Description Value

Tower height, h (m) 12

Wall thickness of steel, t (mm) 3

Capacity factor, CF 0.5

Axial yield stress: Fy (MPa) 255

Bending yield stress: Fy (MPa) 255

Assuming that the possible sizes of steel pipes have typical diameters ranging from 20 -100 mm

with wall thickness, t =3 mm, using ASCE equations (5.10) and (5.11) for D/t, the allowable

axial stress (Fa) was determined as 255 MPa.

Using equation (6.1) and appropriate constants, optimum D is calculated from:

[550 + 8.82(𝐷𝐷𝑡𝑡 − 𝑡𝑡2)]ℎ 𝐶𝐶𝐹𝐹3𝜋𝜋(𝐷𝐷𝑡𝑡 − 𝑡𝑡2)𝐹𝐹𝑎𝑎�ℎ2 + 𝑏𝑏2/3

+2(25800 + 584𝐷𝐷)𝐶𝐶𝐹𝐹√3 𝑏𝑏𝜋𝜋(𝐷𝐷𝑡𝑡 − 𝑡𝑡2)𝐹𝐹𝑎𝑎

= 1

The resulting values for D are given in Table A.2.

139

Table A.2 Optimum values of D (t =3 mm)

base distance, b (m) Leg diameter, D (mm)

1 64.12

1.2 45.23

1.4 35.27

1.6 29.06

A.2. Calculation of D using Eurocode 3

To calculate the optimum leg diameter, it is first necessary to calculate the allowable critical

buckling strength. Eurocode 3 equations (5.14) – (5.18) were used to determine the critical

buckling strength. It was assumed that the diameters of steel pipes for tower legs fall in the range

10 mm -100 mm with wall thickness of t = 3mm.

For a 10 mm diameter pipe, the critical meridional buckling stress is given by equation (5.14):

𝜎𝜎𝑥𝑥𝑐𝑐𝑐𝑐 = 0.605𝐸𝐸𝐶𝐶𝑥𝑥𝑡𝑡 𝑟𝑟⁄

= 0.605𝐸𝐸𝐶𝐶𝑥𝑥

The unknown Cxb is calculated as follows:

Non-dimensional length parameter for a 2003 mm long pipe is calculated from equation (5.15):

𝑤𝑤 = 𝑏𝑏 �(𝐷𝐷 − 𝑡𝑡)𝑡𝑡 2⁄⁄

= 617.18

Equation (5.16) gives:

𝐶𝐶𝑥𝑥 = max (0.6,1 + 0.2 �1 − 2𝑎𝑎𝑡𝑡𝑐𝑐� 𝐶𝐶𝑥𝑥𝑎𝑎� )

For clamped-clamped end conditions in lattice towers, 𝐶𝐶𝑥𝑥𝑎𝑎 = 6

140

𝐶𝐶𝑥𝑥 = 0.6

The “meridional imperfection reduction factor”, αx , is given by equation (5.17):

𝛼𝛼𝑥𝑥 = 0.62/[1 + 1.91(𝑤𝑤𝑘𝑘 𝑡𝑡⁄ )1.44]

where, 𝑤𝑤𝑘𝑘 = √𝑟𝑟𝑡𝑡 𝑄𝑄⁄ and Q is the fabrication quality factor given in Table 5.1. Using the normal

fabrication quality class, Q is 16. Now, 𝑤𝑤𝑘𝑘 = √𝑟𝑟𝑡𝑡 𝑄𝑄⁄ = 0.205. The value of imperfection factor,

αx, was determined as 0.6.

Now,

𝜎𝜎𝑥𝑥𝑐𝑐𝑐𝑐 = 0.605𝐸𝐸𝐶𝐶𝑥𝑥𝑡𝑡 𝑟𝑟⁄ =62.22GPa

The value 62.22 GPa is multiplied with αx to get the critical buckling stress, 𝜎𝜎𝑐𝑐𝑐𝑐 = 37.33 GPa.

According to Eurocode 3, if the relative slenderness ratio, λ = �𝐹𝐹𝑦𝑦 𝛼𝛼𝑥𝑥𝜎𝜎𝑥𝑥𝑐𝑐𝑐𝑐⁄ ≤ 0.2 the

characteristic buckling strength is equal to the yield strength, Fy. Here, λ = 0.082 ≤ 0.2, so the

characteristic buckling strength of the assumed pipe is equal to the yield strength, 255 MPa.

Similarly, it was found that 2003 mm long steel pipe with D =100 mm and t =3 mm has the

characteristic buckling strength of 255 MPa. It is concluded that Eurocode 3 and ASCE give the

same optimum values of D for the range of assumed leg dimensions.

A.3 Calculation of D using AISC equations

For round hollow structural sections (HSS), AISC 360-05 equations (5.19-5.21) give the axial

buckling strength. For the assumed range of leg dimensions (e.g. 20 mm-100 mm), the sizes of

leg sections fall under the category of compact sections for which𝐷𝐷/𝑡𝑡 ≤ 0.11𝐸𝐸/𝐹𝐹𝑦𝑦.

The critical buckling strength (𝐹𝐹𝑐𝑐𝑐𝑐) of compact sections is computed from equation (5.20):

141

Where, 𝐹𝐹𝑒𝑒 = 𝜋𝜋2𝐸𝐸/(𝑘𝑘𝑏𝑏 𝑟𝑟⁄ )2 and k =1 for the tower legs.

Now, 𝐹𝐹𝑒𝑒 = 𝜋𝜋2𝐸𝐸/(4𝑏𝑏 �𝐷𝐷2 + (𝐷𝐷 − 2𝑡𝑡)2⁄ )2

For the range of leg dimensions considered, 𝐹𝐹𝑒𝑒 < 0.44𝐹𝐹𝑦𝑦.The elastic buckling occurs and the

critical buckling stress is given by equation (5.21) as:

𝐹𝐹𝑐𝑐𝑐𝑐 = 𝐹𝐹𝑎𝑎 = 0.877𝐹𝐹𝑒𝑒

Now using this equation in equation (6.1), with BF of 2, the resulting equation is:

[550 + 8.82(𝐷𝐷𝑡𝑡 − 𝑡𝑡2)]ℎ 𝐶𝐶𝐹𝐹3𝜋𝜋(𝐷𝐷𝑡𝑡 − 𝑡𝑡2)𝐹𝐹𝑐𝑐𝑐𝑐�ℎ2 + 𝑏𝑏2/3

+2(25800 + 584𝐷𝐷)𝐶𝐶𝐹𝐹√3 𝑏𝑏𝜋𝜋(𝐷𝐷𝑡𝑡 − 𝑡𝑡2)𝐹𝐹𝑎𝑎

= 1

Solving the above equation for D using MATLAB, following optimum values of D were

obtained:

Table A.3 Optimum values of D (t=3 mm)

base distance, b (m) Leg diameter, D (mm)

1 65.34

1.2 47.23

1.4 37.12

1.6 31.08

The summary of the results for the optimum values of D from the three standards are presented

in Table A.4.

142

Table A.4 Comparison of optimum values of D (t = 3 mm)

base distance, b (m) ASCE and Eurocode 3

D (mm)

AISC

D (mm)

1 64.12 65.34

1.2 45.23 47.23

1.4 35.27 37.12

1.6 31.08 31.08

143

APPENDIX B: NUMERICAL SOLUTIONS FOR DEFLECTIONS OF STEEL TOWER

B.1 MATLAB program for the tower-top deflection

The following program is the modified version of the monopole tower deflection program

documented in [7].

function TowerDef (b, D, t) % d2x/dy2=M/(EI) is rewritten as two 1st order equations to use % Matlab's Runge-Kutta routine ode45 for the deflection %Function argument %b = base distance between legs (m) %D = leg outer diameter (mm) %t = leg thickness (mm) D=D/1000; %Diameter of tower leg (m) t=t/1000; %thickness in m R1=(D-2*t)/2; R2=D/2; % inner and outer leg radius respectively h=12;%height of tower (m) R1R22=(R1^2+R2^2);%R1^2 +R2^2 for tower leg (m^2) q=0.5*1.3*1.35*1.225*D*50^2; %drag per unit length (N/m) E=200e09; % Elastic modulus (Pa) EA=E*(R2^2-R1^2)*pi; % E x cross-sectional area of leg (m^2) F=2150; % Turbine thrust (N) [Y, DEFL] = ode45(@(y,x) defderiv(y,x,F,q,R1R22,b,D,h,EA),[0 h],[0 0]); [Y 1000*DEFL] % Output deflection in mm end function dx = defderiv(y,x,F,q,R1R22,b,D,h,EA) % Function for integration dx=zeros(2,1); dx(1)=x(2); % deflection dx(2)=1/EA*(2*F+3*q*(h-y)).*(h-y)./(3/2*R1R22+((b-D)/h*(h-y)+D).^2); % equation (5.25) end

144

B.2 Results of tower-top deflections

Table B.1 Constants used in the program

Description Values

E (GPa) 200

F (N) 2150

t (mm) 3

Table B.2 Results of tower deflections

b (m) D (mm) Tower-top deflection (mm)

1 64 90

1.2 45 85

1.4 35 78

1.6 29 72

145

Figure B.2 Tower deflection (m) for b =1.2 m and D =45 mm

146

APPENDIX C: NUMERICAL SOLUTIONS FOR DEFLECTIONS OF BAMBOO TOWER

C.1 MATLAB program for the tower-top deflection presented in B1 was used with the following

constants.

Table C.1 Constants used in the program

Description Values

E (GPa) 16

F (N) 2150

t (mm) 6

C.2 Results of tower-top deflections

Table C.2 Results of numerical solutions

b (mm) D (mm) Tower-top deflection (mm)

1.6 70 232.32

1.85 65 186.28

2.15 60 148.47

2.6 55 110.17

147

Figure C.2 Tower deflection for b =1.85 m, D =65 mm

148