phys 201 instructor : dr. hla class location: walter 245 class time: 12 – 1 pm (mo, tu, we, fr)...
TRANSCRIPT
PHYS 201
Instructor : Dr. Hla
Class location: Walter 245
Class time: 12 – 1 pm (Mo, Tu, We, Fr)
Equation Sheet
You are allowed to bring an A4 size paper with your own notes (equations, some graph etc.) to the midterm and final exam. No equation will be given.
PHYS 201
Chapter 1
Power of TenUnitsUnit ConversionsBasic TrigonometryGraphical AnalysisVectorsVector Components
Prefixestera (T): 1012 1,000,000,000,000
giga (G) : 109 1,000,000,000
mega (M): 106 1,000,000
kilo (k): 103 1,000
centi (c): 10-2 1 / 100
milli (m): 10-3 1 / 1,000
micro (μ): 10-6 1 / 1,000,000
nano (n): 10-9 1 / 1,000,000,000
pico (p): 10-12 1 / 1,000,000,000,000
OU Atomic logo
30 nm
Basic UnitsSI CGS BE
Length [L] meter (m) centimeter (cm) foot (ft)
Mass [M] kilogram (kg) gram (g) slug (sl)
Time [T] second (s) second (s) second (s)
Dimensions
All the other units are derived units.Example: Speed can be expressed with mph (miles per hour, or mi / h). It is the unit of length divided by time (L / T).
Unit Conversion
Can't mix units when adding or subtracting - Need to convert
18 km + 5 mi is not 23
Can always multiply by 1
1 km =1000 m 1 = (1 km/1000m)
Can cancel units algebraically
Unit Conversion
Example 1Convert 80 mi to km.
Example 2Convert 60 mi/h to km/s, and m/s.
Example 3Convert 60 mi/h to ft/s.
1 mi = 5280 ft
1 mi = 1.609 km
1 m = 3.281 ft
Unit Conversion
Example 4
You are driving on R33 near Logan with a speed of 26.67 m/s. The speed limit there is 65 mph. Will you get a ticket because you are speeding?
Example 4
You are driving on R33 near Logan with a speed of 26.67 m/s. The speed limit there is 65 mph. Will you get a ticket because you are speeding?
Unit Conversion
Example 5
CLICKER!
Convert 1000. ft/min into meters per second.
1). 0.197 m/s2). 5.08 m/s3). 24.5 m/s4). 54.7 m/s5). 169 m/s6). 1540 m/s7). 18300 m/s
Convert 1000. ft/min into meters per second.1. 0.0847 m/s
2. 0.197 m/s
3. 5.08 m/s
4. 24.5 m/s
5. 54.7 m/s
6. 169 m/s
7. 1540 m/s
8. 18300 m/s
1 mi = 5280 ft
1 mi = 1.609 km
1 m = 3.281 ft
m/s08.5f281.3
m1
s60
min1
s
ft1000
t
ANSWER!
Unit Conversion
Example 6
CLICKER!
(1) 1.56x10-6 m3
(2) 1.56x10-4 m3 (3) 1.56x10-3 m3
(4) 1.56x10-2 m3
(5) 1.56x10-1 m3
(6) 1.56 m3
(7) 15.6 m3
(8) 1.56x103 m3
(9) 1.56x106 m3
(10) 1.56x109 m3
A bucket has a volume of 1560 cm3. What is its volume in m3?A bucket has a volume of 1560 cm3. What is its volume in m3?
A bucket has a volume of 1560 cm3. What is its volume in m3? (1) 1.56x10-6 m3 (2) 1.56x10-4 m3 (3) 1.56x10-3 m3
(4) 1.56x10-2 m3 (5) 1.56x10-1 m3 (6) 1.56 m3
(7) 15.6 m3 (8) 1.56x103 m3 (9) 1.56x106 m3
(0) 1.56x109 m3
1560cm3 = 1560 cm*cm*cm (1m/100cm)*(1m/100cm)*(1m/100cm)
= 1.56x10-3 m3
How do you interpret cm-3 ?
Negative exponent – inverse – place in denominator
3cm
1
ANSWER!
Trigonometry
• Right Triangle Sum of angles = 180
opposite angle = 90-θ
22oa hhh
Trigonometry
• Right Triangle
hypotenuse
oppositesin
hypotenuse
adjacentcos
adjacent
oppositetan
Which is true?
1. A = B + C
2. B = A – C
3. C = A + BB
CLICKER!
A
C
2 2 2
2 2 2
2 2 2
Which is true?
1. A = C sin
2. A = C cos
3. B = C cos B
CLICKER!
A
C
Example:
You walk a distance of 20m up to the top of a hill at an incline of 30°. What is the height of the hill?
Note: DRAW PICTURE!
30º
20mh
m 10
30sin m) 20(
m 20sin
h
h
h
o
What is the angle θ?
9.36
0.6
5.4tan 1
m
m
DIMENSIONS
Length: L
Mass: M
Time: T
Examples:
1). Speed: unit (mi/h). Dimension: [L/T]
2). Area : unit (ft2). Dimension: [L2]
3). Acceleration: Unit (m/s2). Dimension: [L/T2]
4). Force: Unit (kg. m/s2) . Dimension: [ML/T2]
DIMENSIONS
Length: L
Mass: M
Time: T
Dimensions of left and right side of an equation must be the same.
Example: x = ½ vt2
L = (L/T) (T2) = LT [Dimensions at left and right are not the same.WRONG equation.]
Example: x = ½ vt
L = (L/T) (T) = L [Dimensions at left and right are the same.CORRECT equation.]
You are examining two circles. Circle 2 has a radius 1.7 times bigger than circle 1. What is the ratio of the areas? Express this as the value of the fraction A2/A1.
(1) 1/1.7 (2) 1.7 (3) (1/1.7)2 (4) 1.72
(5) (6) 7.1/1 7.1
22
1
21
21
22
1
2 )7.1()7.1(
r
r
r
r
A
A
2rA
Example:
12
CLICKER!
Slope of Function on Graph
• Slope = rise/run• Up to right is positive
• Slope of curve at a point– slope of tangent line
• Slope of straight line same
at any point
x
y
run = Δx
rise = Δy
x
y
A
The slope at point B on this curve is _________ as you move to the right on the graph.
1. increasing
2. decreasing
3. staying the same
x
y
B
CLICKER!
The slope at point B on this curve is _________ as you move to the right on the graph.
1. increasing
2. decreasing
3. staying the same
x
yB
CLICKER!
The slope at point B on this curve is _________ as you move to the right on the graph.
1. increasing
2. decreasing
3. staying the same
x
y
B
Vectors
Vectors
Direction
length = magnitude
Some VECTOR quantities
-Displacement (m, ft, mi, km)-Velocity (m/s, ft/s, mi/h, km/hr)- Acceleration (m/s2, ft/s2)-Force (Newton, N)
Vector Summation
+ =A B C
+ =A B C
Vector Summation
AB
A BC = +
1) 2)
+
Two ways to sum the vectors: Parallelogram method (1), and triangle method (2).
Vector Summation
A
BC
C = A + B
2 2
= tan
A
B-1
Which is true?
CLICKER!
A
B
A BC = +
1)
2)
3)
4)
Which is true?
CLICKER!
AB
A BC = +
1)
2)
3)
4)
Vector Component
A
A
A
Y
x
x
Y
Example
40 N
30 N
60
An object is pulled by strings with 30 N and 40 N forces respectively as shown. Find (a) the magnitude of the net force. (b) the direction of the net force (find the angle).
CAPA
- Round up the numbers (e.g. 3.247321 3.25)
-Add the units: (e.g. cm, N (newton), deg (degree))
-Do not forget to put ‘-’ sign in vectors if the resultant vector is in –x or –y direction.
-For m/s2 m/s^2