journal chapter 6
DESCRIPTION
Polygons and Quadrilaterals. Journal Chapter 6. Kirsten Erichsen 9-5. INDEX: 6-1: Properties and Attributes of Polygons 6-2: Properties of Parallelograms 6-3: Conditions for Parallelograms 6-4: Properties of Special Parallelograms - PowerPoint PPT PresentationTRANSCRIPT
Journal Chapter 6.
Kirsten Erichsen 9-5
Polygons and Quadrilaterals
INDEX: 6-1: Properties and Attributes of Polygons 6-2: Properties of Parallelograms 6-3: Conditions for Parallelograms 6-4: Properties of Special Parallelograms 6-5: Conditions for Special Parallelograms 6-6: Properties of Kites and Trapezoids
POLYGONS.
WHAT IS A POLYGON? Definition: a closed figure formed by 3 or more segments,
whose endpoints have to touch another 2 endpoints. Types of Polygons (sides):
Triangle = 3 Quadrilateral = 4 Pentagon = 5 Hexagon = 6 Heptagon = 7 Octagon = 8 Nonagon = 9 Decagon = 10 Dodecagon = 12
For the rest of the polygons with more sides than 12 (including 11) you just place the number and add “gon” to it = n-gon.
HOW DO YOU KNOW IT’S A POLYGON?
A polygon must not have curved sides, they all have to be straight.
The sides of the polygon must not intersect, meaning they must not intersect the other sides of the polygon.
Example 1. What type of polygon is this, based on its sides?
HEXAGON
Example 2. What type of polygon is this, based on its sides?
DODECAGON
Example 3. What type of polygon is this, based on its sides?
PENTAGON
Example 4. What type of polygon is this, based on its sides?
IT IS NOT A POLYGON BECAUSE IT HAS A CURVED SIDE.
PARTS OF A POLYGON. Side of a Polygon: each one of the segments that forms the
sides of any polygon. Vertex of a Polygon: it is the common point where any of the 2
endpoint of the polygon meet. Diagonal: a segment that connects 2 non-consecutive vertices.
Diagonal Vertex
Side
Example 1. Tell me the parts of the polygon in this shape.
VertexDiagonal
Side
Example 2. Tell me the parts of the polygon in this shape.
Vertex
Diagonal
Side
Example 3. Tell me the parts of the polygon in this shape.
Vertex
Diagonal
Side
CONVEX AND CONCAVE. Convex Polygons: If the polygon contains all of the angles
facing the outside (exterior), then it is considered convex.
Concave Polygons: If any of the angles in the polygon face the inside of the shape.
Example 1. Identify the polygon as a convex or concave and name
the polygon by its sides.
CONCAVE, 11-gon
Example 2. Identify the polygon as a convex or concave and name
the polygon by its sides.
CONCAVE, DODECAGON
Example 3. Identify the polygon as a convex or concave and name
the polygon by its sides.
CONVEX, QUADRILATERAL
REGULAR POLYGONS. Regular Polygon: a polygon that is both equilateral or
equiangular. EQUILATERAL: All of the sides are congruent in the polygon.
EQUIANGULAR: All of the angles are congruent in the polygon.
Each side is 4 inches.
Each angle is 90°.
Example 1. Classify the polygon as equilateral or equiangular.
Equiangular, because each angle measures 90°.
Example 2. Classify the polygon as equilateral or equiangular.
Equilateral, because each side measures 5 centimeters.
5 cm.
5 cm.
5 cm.
5 cm.
5 cm.
5 cm.
Example 3. Classify the polygon as equilateral or equiangular.
Both equilateral and equiangular because the sides measure 6 centimeters and the angles measure 90°.
6 cm.
6 cm.
6 cm.
6 cm.
INTERIOR ANGLES THEOREM.
This theorem states that the sum of the interior angle measures of a regular, convex polygon follows the equation of (n-2)180°.
After using the equation above, you have to divide by the number of sides of the polygon to get the angle measures.
It is also called Theorem 6-1-1 or Polygon Angle Sum Theorem.
Example 1. Find the interior angle measures of a regular decagon
using the Interior angles theorem.
(n − 2)180°(10 − 2)180°8 × 180° = 1440
1440 ÷ 10 = 144°
Each angle measures 144°.
Example 2. Find the interior angle measures of a regular
dodecagon using the Interior angles theorem.
(n − 2)180°(12 − 2)180°10 × 180° = 1800
1800 ÷ 12 = 150°
Each angle measures 150°.
Example 3. Find the interior angle measures of a regular
dodecagon using the Interior angles theorem.
(n − 2)180°(8 − 2)180°6 × 180° = 1080
1080 ÷ 8 = 135°
Each angle measures 135°.
Example 4. Find the interior angle measures of a regular
dodecagon using the Interior angles theorem.
(n − 2)180°(5 − 2)180°3 × 180° = 540
540 ÷ 5 = 108°
Each angle measures 108°.
EXTERIOR ANGLES THEOREM.
This theorem states that the sum of the exterior angles of a regular, convex polygon is always going to be 360°.
To find the angle measurements you just divide 360° by the number of sides.
This theorem is also called 6-1-2 (Polygon Exterior Angle Sum Theorem).
Example 1. Find the exterior angle measures of a regular decagon
using the exterior angles theorem.
360° ÷ number of sides360° ÷ 10 = 36°
Each angle measures 36°.
Example 2. Find the exterior angle measures of a regular hexagon
using the exterior angles theorem.
360° ÷ number of sides360° ÷ 6 = 60°
Each angle measures 60°.
Example 3. Find the exterior angle measures of a regular
dodecagon using the exterior angles theorem.
360° ÷ number of sides360° ÷ 12 = 30°
Each angle measures 30°.
PARALLELOGRAM THEOREMS.
Parallelogram: a quadrilateral with two pairs of opposite sides.
THEOREM ONE (6-2-1) If a quadrilateral is a parallelogram, then its
opposite sides are congruent. CONVERSE: If its opposite sides are congruent,
then the quadrilateral is a parallelogram. This means that the quadrilateral has to have a pair
of congruent sides to be considered a parallelogram.
It is considered a parallelogram if the sides are congruent and parallel.
Example 1. This is a parallelogram because the opposite sides are
congruent.
Example 2. This is a parallelogram because the opposite sides are
congruent.
Example 3. This is not a parallelogram because we don’t know it
the opposite sides are congruent.
THEOREM TWO (6-2-2) If a quadrilateral is a parallelogram, then its
opposite angles are congruent. CONVERSE: If the opposite angles are congruent,
then the quadrilateral is considered a parallelogram. This theorem is used only when the parallelogram is
proved to be when it has 2 pairs of congruent angles.
Example 1. This is a parallelogram because the opposite angles
are congruent.
Example 2. This is a parallelogram because the opposite angles
are congruent.
55°
55°125°
125°
Example 3. This is not a parallelogram because the opposite angles
are not congruent and they do not add up to 360°.
80°
55°125°
130°
THEOREM THREE (6-2-3) If a quadrilateral is a parallelogram, then its
consecutive angles or same side angles are supplementary.
CONVERSE: If the consecutive or same side angles are supplementary, then it is considered a parallelogram.
It is used when the same side angles add up to 180° to make up a linear pair.
Example 1. This is a parallelogram because the same side angles
add up to 180° and both pairs add up to 360°.
120°
120°
60°
60°
Example 2. This is a parallelogram because the consecutive angles
add up to 180° and both linear pairs add up to 360°.
55°
55°125°
125°
Example 3. This is not considered a parallelogram because one
pair of consecutive angles does not add up to 180°.
55°
55°125°
130°
THEOREM FOUR (6-2-4) If a quadrilateral is a parallelogram, then its
diagonals bisect each other. CONVERSE: If the diagonals bisect each other,
then it is considered to be a parallelogram. The diagonals have to bisects right through the
middle of reach other (meaning the midpoint).
Example 1. This is a parallelogram because the diagonals bisects
at the midpoints.
7 cm.
7 cm.
5 cm.
5 cm.
Example 2. This is a parallelogram because the diagonals bisect
exactly at the midpoints.
9 cm.
9 cm.8 cm.
8 cm.
Example 3. This is not considered a parallelogram because both of
the diagonals do not intersect at the midpoint.
7.5 cm.
7 cm.9.5 cm.
9 cm.
PROOVING PARALLELOGRAMS
REMEMBER ABOUT PARALLELOGRAMS.
Both pairs of opposite sides are parallel. One pair of opposite sides are parallel and
congruent. Both pairs of opposite sides are congruent. Both pairs of angles are congruent. One angle is supplementary to both of the
consecutive angles. The diagonals bisect each other.
THEOREM 6-3-1 If one pair of
opposite sides of a quadrilateral are parallel and congruent, then it is a parallelogram.
Tell me if it is a parallelogram and why.
Yes
Yes
No
THEOREM 6-3-2 If both pairs of
opposite sides of a quadrilateral are congruent, then it is considered a parallelogram.
Tell me if it is a parallelogram and why.
Yes
YesNo
THEOREM 6-3-3 If both pairs of
opposite angles of a quadrilateral are congruent, then it is considered a parallelogram.
Tell me if it is a parallelogram and why.
Yes
Yes No
THEOREM 6-3-4 If an angle is
supplementary to both of its consecutive angles, then it is a parallelogram.
Tell me if it is a parallelogram and why.
50°
50°
130°
130°
130° 40°
130°40°
YES110°
110°70°
70°
YES
NO
THEOREM 6-3-5 If the diagonals
of a quadrilateral bisect each other, then it’s a parallelogram.
Tell me if it is a parallelogram and why.
4.5
4.5
55
YES
3
3
4
4
YES4
53
2NO
EXAMPLE 1. Prove that JKLM
is a parallelogram.
1 2
34J
K L
M
1. JK ≅ LM, KL ≅MJ2. KM ≅ KM3. Triangle MJK ≅ KLM4. <1 ≅ <3, <2 ≅ <4 5. JK II LM, KL II JM6. JKLM is a Parallelogram
1. Given2. Reflexive Property 3. SSS4. Alternate Interior Angles5. Theorem 6-3-16. Definition of Parallelogram
EXAMPLE 2. Prove that ABCD
is a parallelogram.
2 1
43D
C B
A
1. AB ≅ CD, AD ≅ CB2. AC ≅ AC3. Triangle ABC ≅ CDA4. <1 ≅ <3, <2 ≅ <4 5. AB II CD, AD II CB6. JKLM is a Parallelogram
1. Given2. Reflexive Property 3. SSS4. CPCT5. Theorem 6-3-16. Definition of Parallelogram
EXAMPLE 3. Prove that WXYZ
is a parallelogram.
2 1
43X
W Z
Y
1. WZ ≅ XY, WX ≅ ZY2. WY ≅ WY3. Triangle WXY ≅ YZW4. <1 ≅ <3, <2 ≅ <4 5. WZ II XY, WX II ZY6. WXYZ is a Parallelogram
1. Given2. Reflexive Property 3. SSS4. CPCT5. Theorem 6-3-16. Definition of Parallelogram
RHOMBUSES AND THEOREMS.
WHAT IS A RHOMBUS? It is another special
quadrilateral. Definition: it is a
quadrilateral with 4 congruent sides.
A rhombus
THEOREM 6-4-3
If a quadrilateral is a rhombus, then it is a parallelogram.
A
B
C
D
HI
JK
YES YES
NONo because we don’t know if the other 2 sides are congruent to the other pair.
N
OP
Q
THEOREM 6-4-4
If a parallelogram is a rhombus, then its diagonals are perpendicular.
A
B
C
D
H I
JK
YES
NONo because we don’t know if the bisectors actually bisect.
YES
THEOREM 6-4-5
If a parallelogram is a rhombus, then each diagonal bisects a pair of opposite angles.
A
B
C
D
H I
JK
YES
NONo because we only know that one pair of angles are being bisected.
YES
SQUARES AND THEOREMS.
WHAT IS A SQUARE? It is another special
quadrilateral. Definition: it is a
quadrilateral with 4 right angles and 4 congruent sides.
A square has the properties of a parallelogram, a rectangle and a rhombus.
EXAMPLE 1. Do you consider this
a square?
No because we only know that it has 4 right angles and no 4 congruent sides.
EXAMPLE 2. Do you consider this
a square?
Yes because we have the 4 right angles and the 4 congruent sides.
EXAMPLE 3. Do you consider this
a square?
No because we only know that there are 4 congruent sides, but we don’t know anything about the angles.
RECTANGLES AND THEOREMS.
WHAT IS A RECTANGLE? It is another special
quadrilateral. Definition: it is a
quadrilateral or parallelogram with 4 right angles.
The diagonals in a rectangle are congruent.
THEOREM 6-4-2
If a parallelogram is a rectangle, then its diagonals are congruent.
Tell me if these are rectangles.
NO
3
3
4
4
YES NO
THEOREM 6-5-1
If one angle is a parallelogram is a right angle, then the parallelogram is a rectangle.
Tell me if these are rectangles.
YES
3
3
4
4
YES NO
RECTANGLES, RHOMBUS AND SQUARES
All of these shapes are quadrilaterals and parallelograms.
A rectangle has the properties of a parallelogram and a few more.
A rhombus has the properties of a rectangle, parallelogram and its individual properties.
A square has the properties of a rectangle, parallelogram, rhombus and a pair of its own properties.
TRAPEZOIDS AND THEOREMS.
WHAT IS A TRAPEZOID?
Definition: it is a quadrilateral with exactly one pair of parallel sides.
Isosceles Trapezoid
PARTS OF A TRAPEZOID. Base: each one of
the parallel sides of the trapezoid.
Legs: the pair of non-parallel sides.
Base Angles: they are 2 consecutive angles whose the common side is a base.
Base
Base
Legs
Base Angles
Base Angles
ISOSCELES TRAPEZOID.
Definition: it is when the legs of the trapezoid are congruent.
THEOREM 6-6-3
If a quadrilateral is an isosceles, then each pair of base angles are congruent.
EXAMPLES. Tell me if each one of the isosceles trapezoid are
really isosceles.
YESNO YES
THEOREM 6-6-5
A trapezoid is isosceles only if its diagonals are congruent.
EXAMPLES. Tell me if each one of the isosceles trapezoid are
really isosceles.
YES
NO
YES77
11
11
5
4
TRAPEZOID MISEGMENT THEOREM
The midsegment of a trapezoid is parallel to each base, and its length is one half the sum of the bases.
LM = 1/2 (HI + KJ)
H I
JK
L M
EXAMPLE 1. Find the missing measurement.
32 cm.
38 cm.
A B
CD
E F
The distance between EF and DC is 6 cm, so since EF is in the middle of the trapezoid you subtract 6 from 32.
AB = 26 cm.
26 cm.
EXAMPLE 2. Find the missing measurement.
16 cm.
24 cm.
G H
JK
L I
The distance between GH and JK is 8 cm, so since LI is in the middle of the trapezoid you divide 8 by 2, which is 4. Then you add 4 to 16, or subtract 4 from 24.
LI = 20 cm.
20 cm.
EXAMPLE 3. Find the missing measurement.
6 cm.
13 cm.
M N
PQ
R O
The distance between MN and RO is 7 cm, so since QP is at the bottom of the trapezoid you add 7 to 13 cm or RO.
PQ = 20 cm.
20 cm.
KITES AND THEOREMS.
WHAT IS A KITE?
Definition: it is a quadrilateral with exactly two pairs of congruent consecutive sides.
It has 2 pairs of congruent adjacent sides, diagonals are perpendicular, and it has non-congruent adjacent angles
THEOREM 6-6-1
If a quadrilateral is a kite, then its diagonals are perpendicular. A
B
C
D
EXAMPLES. Tell me if the following kites are really showing that
they are kites.
D
E
F
G
6.5 6.5
2.5
3.5
8 8
YESNO YES
THEOREM 6-6-2
If a quadrilateral is a kite, then exactly one pair of opposite angles are congruent.
NOTE: only one of the perpendicular lines is being bisected.
A
B
C
D
EXAMPLES. Tell me if the following kites are really showing that
they are kites.
D
E
F
G
110°
110°
90°
35°
95°
95°
YESNO YES