advanced/notes 8.1
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![Page 1: Advanced/Notes 8.1](https://reader036.vdocuments.site/reader036/viewer/2022081412/5455292ab1af9f33608b4720/html5/thumbnails/1.jpg)
Chapter 8Rotational Motion
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Angular QuantitiesHow do I define angular
quantities?
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Rotational MotionPurely rotational :
all points on the object move in circles
The circle moves around an axis of rotation
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Angular QuantitiesAll points on a
straight line through the axis move through the same angle in the same time
The angle is , measured in radians
l is the arc length, r is radius
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Radian ReviewRadian: The angle subtended by
an arc whose angle length is equal to the radius (?!)
1 revolution = 360° = 2π radians
A bike wheel rotates 4.50 revolutions. How many radians has it rotated?
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Example
A particular bird’s eye can just distinguish objects that subtend an angle no smaller than 3 x 10-4 rad. (a) How many degrees is this? (b) How small an object can the bird just distinguish when flying at a height of 100m?
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Angular KinematicsAngular Displacement:
Average Angular Velocity:
Instantaneous angular velocity:
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Angular KinematicsAverage Angular acceleration:
Instantaneous Acceleration:
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Relating Angular and Linear VelocityEvery point on a rotating body
has an angular velocity, , and a linear velocity v
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Relating Angular and Linear VelocityObjects farther from the axis of
rotation will move faster
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Different AccelerationsA change in angular
velocity produces a tangential acceleration
Even if angular velocity is constant, each point on the object has a centripetal acceleration
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Without SlippingMust have static friction between
the rolling object and the surfaceTangential accelerations and
velocities must be the same◦# 13 on HW
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Relating Linear and Rotational Quantities
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ExampleA carousel is initially at rest. At t = 0, it is given a constant angular acceleration α = 0.060 rad/s2, which increases its angular velocity for 8.0 s. At t = 8.0 s, determine the following quantities:
a) The angular velocity of the carousel
b) The linear velocity of a child located 2.5 m from the center, P
c) The tangential (linear) acceleration of that child
d) The centripetal acceleration of the child
e) The total linear acceleration of the child
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Timing Review Frequency: number of complete
revolutions per second:
Frequencies are measured in hertz
1 Hz = 1 s-1
Period: time for one revolution:
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HomeworkRead Section 8.1Do Problems # 1, 3 – 8, 12, 13 on
page 219