physics 231 introductory physics i lecture 1. lecturer: carl schmidt (sec. 001) schmidt@pa.msu.edu...
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PHYSICS 231
INTRODUCTORY PHYSICS I
PHYSICS 231
INTRODUCTORY PHYSICS I
Lecture 1
• Lecturer: Carl Schmidt (Sec. 001)
•schmidt@pa.msu.edu•(517) 355-9200, ext. 2128•Office Hours:
Friday 1-2:30 pm in 1248 BPS
or by appointment
PHYSICS 231INTRODUCTORY PHYSICS I
PHYSICS 231INTRODUCTORY PHYSICS I
Course Information
http://www.pa.msu.edu/courses/phy231http://www.pa.msu.edu/courses/phy231
Succeeding in Physics 231
1) Do your homework (yourself) !2) Use the help room (1248 BPS) ! 3) Make sure you understand both “why” and
“why not”4) Interrupt the lecturer!
General Physics
• First Semester (Phy 231)• Mechanics• Thermodynamics• Simple harmonic motion• Waves
Second Semester (Phy 232)• Electromagnetism• Relativity• Modern Physics • (Quantum Mechanics, …, etc.)
Mechanics
• Used by all of physics and other sciences• Foundations laid by Galileo and Newton
• Newton’s Principia - 1687
Chapter 1: the Basics
• SI Units• Unit conversions
• Dimensional Analysis • Significant Figures
UNITS (Systéme Internationale)
Dimension SI (mks) Unit Definition
Length meters (m) Distance traveled by light in 1/(299,792,458) s
Mass kilogram (kg)
Mass of a specific platinum-iridium allow cylinder kept by Intl. Bureau of Weights and Measures at Sèvres, France
Time seconds (s)
9,192,631,700 oscillations of cesium atom
Standard Kilogram at Sèvres
Unit conversion
• A car goes 50 miles/hour. What is that in m/s?
22 m/s
Example 1.1
Dimensional Analysis
Dimensions (like units) can be treated algebraically.
Variable from Eq.
x m t v=(xf-xi)/t
a=(vf-vi)/t
Dimension L M T L/T L/T2
Dimensional Analysis
Checking equations with dimensional analysis:
L (L/T)T=L
(L/T2)T2=L
• Each term must have same dimension• Two variables can not be added if dimensions are different• Multiplying variables is always fine• Numbers (e.g. 1/2 or ) are dimensionless
x f −xi =vit+12at2
Example 1.2
Could the following equations be correct?
Yes, It “could” be.
No !
€
1) Δt = v0 + 2aΔx
€
2) v f2 = v0
2 + 2aΔx
Units vs. Dimensions
• Dimensions: L, T, M, L/T …• Units: m, mm, cm, kg, g, mg, s, hr, years …
• When equation is all algebra: check dimensions
• When numbers are inserted: check units• Units and dimensions obey same rules:Never add terms with different units
• Angles are dimensionless but have units (degrees or radians)
• In physics sin(Y) or cos(Y) never occur unless Y is dimensionless
Scientific Notation
• Useful for very large…
Distance to sun = 150000000000 m = 1.5 x 1011 m
or small numbers:
radius of iron nucleus = 0.0000000000000044 m
= 4.4 x 10-15 m
Prefixes
In addition to mks units, standard prefixes can be
used, e.g., km, cm, mm, m
Significant Figures
• I measure the table length with my ruler. Which statement is more correct? A. The length is 56.0 in. (or 5.60x101 in)
B. The length is 56.00 in. (or 5.600x101 in)
Statement A.
• General Rule:• Number of digits used in decimal or scientific notation (including trailing zeros, but not leading zeros) specifies significant figures (i.e, precision) of measurement.
Significant Figures
• Other rules:
• When multiplying or dividing, keep the minimum significant figures of any factors:
(5.585)(7.4) = 41. = 41.329
• When adding or subtracting, keep the least accurate decimal place of any of the numbers: 113.2 + 2.54 = 115.74
= 115.7
Chapter 2: One-Dimensional Motion
•Motion at fixed velocity•Definition of average velocity•Motion with fixed acceleration•Graphical representations
Displacement vs. position
Position: x (relative to origin)Displacement: x = xf-xi
Example: Distance vs. Displacement
• Distance between Des Moines, Iowa, and Iowa City, is listed as 113.5 miles or 182.6 km• Straight line, to very good approximation
Question:• If we take a round trip Des Moines – Iowa City – Des Moines, what is the total distance and displacement for this trip?
Distance=365.2 km Displacement=0
basic formula
v =xt
=xf −xi
t
Average velocity
Average velocity
•Can be positive or negative•Depends only on initial/final positions•e.g., if you return to original position, average velocity is zero
Example 2.1
Carol starts at a position x(t=0) = 1.5 m.At t=2.0 s, Carol’s position is x(t=2 s)=4.5 mAt t=4.0 s, Carol’s position is x(t=4 s)=-2.5 m
a) What is Carol’s average velocity between t=0 and t=2 s?b) What is Carol’s average velocity between t=2 and t=4 s?c) What is Carol’s average velocity between t=0 and t=4 s?
a) 1.5 m/sb) -3.5 m/sc) -1.0 m/s
Graphical Representation of Average Velocity
Between A and D , v is slope of blue line
€
v =40m
3.0s=13.3m/s
basic formula
v =xt
=xf −xit
Instantaneous velocity
Let time interval approach zero
•Defined for every instance in time•Equals average velocity if v = constant•SPEED is absolute value of velocity
Graphical Representation of Average Velocity
Between A and D , v is slope of blue line
Graphical Representation of Instantaneous Velocity
x
t
€
v = limΔt→0
Δx
Δt = Slope of tangent at that point
Graphical Representation of Instantaneous Velocity
v(t=3.0) is slope of tangent (green line)
Example 2.2a
The instantaneous velocityis zero at ___
A) aB) b & dC) c & e
Example 2.2b
The instantaneous velocity is negative at _____
A) aB) bC) cD) dE) e
Example 2.2c
The average velocity is zero in the interval _____
A) a-cB) b-dC) c-dD) c-eE) d-e
Example 2.2d
The average velocity is negative in the interval(s)_________
A) a-b B) a-cC) c-eD) d-e
SPEED
• Speed is |v| and is always positive• Average speed is sum over |x| elements divided by elapsed time
Example 2.3
2
4
6
8
2 4 6 8 10 1200A
B
C
D
E
a) What is the average velocity between B and E?
b) What is the average speed between B and E?
a) 0.2 m/sb) 1.2 m/s
t (s)
x (m)
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