angular velocity - university of coloradojcumalat/phys1110/lectures/lec24.pdf · angular velocity...
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Angular Velocity
• Midterm on Thursday at 7:30pm! Old exams available on website. Chapters 6–9 are covered. Go to same room as last time. – You are allowed one calculator and one double-
sided sheet of paper with hand written notes – 14 Multiple choice plus two long answer questions – Test time from 7:30pm – 9:00pm. If you have a
conflict, need extra time, etc., then contact Professor Daniel Dessau.
Web page: http://www.colorado.edu/physics/phys1110/phys1110_sp12/
Announcements:
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These clickers are being used in recently recorded responses, but they are not registered to any students in the class. Please check your clicker score on D2L!
Exam Rooms
Clicker question 1 Set frequency to BA
Steve (m=50. kg) is skating east with velocity v=1.0 m/s . Scott (m=70. kg) is skating north with velocity v=1.0 m/s . They happen to collide at the center of the rink, and hold tight (i.e. they “stick together”, oomph!) What is the final speed of the pair, after the collision?
A) 1.4 m/s B) 1.0 m/s C) 0.5 m/s D) 0.0 m/s E) 0.72 m/s
Clicker question 1 Set frequency to BA
Steve (m=50. kg) is skating east with velocity v=1.0 m/s . Scott (m=70. kg) is skating north with velocity v=1.0 m/s . They happen to collide at the center of the rink, and hold tight (i.e. they “stick together”, oomph!) What is the final speed of the pair, after the collision?
A) 1.4 m/s B) 1.0 m/s C) 0.5 m/s D) 0.0 m/s E) 0.72 m/s
€
(50kg)(1m /s)ˆ i + (70kg)(1m /s) ˆ j = (120kg) v f v f =
512
ˆ i + 712
ˆ j
€
v = (5 /12)2 + (7 /12)2 ≈ .72m /s
Clicker question 2 Set frequency to BA
Four identical square tiles are glued together like a “J”, as shown. Each tile has edge length “a” and mass “m”. The origin is at the bottom right, as shown. What is the x component of the center of mass of the system of tiles?
A) -(1/2) a B) -(3/4) a C) - a D) -(3/2) a E) -3 a
Clicker question 2 Set frequency to BA
Four identical square tiles are glued together like a “J”, as shown. Each tile has edge length “a” and mass “m”. The origin is at the bottom right, as shown. What is the x component of the center of mass of the system of tiles?
A) -(1/2) a B) -(3/4) a C) - a D) -(3/2) a E) -3 a
x(cm) = (m1 x1 + m2 x + m3 x3 + m4 x4 ) / (mtotal) Numbering the squares 1, 2, and 3 walking down, and #4 is the one on the left, gives x(cm) = m*(-a/2)+m*(-a/2)+m*(-a/2)+m*(-3/2a)/ (4m) = -3a/4.
A square of side 2R has a circular hole of radius R/2 removed. Relative to the center of the square the center of the hole is located at (R/2,R/2). Locate the center of mass with respect to the center of the square.
Treat the hole as negative mass: x(cm) = [4R2 (0) – π (R/2)2 (R/2)]/[4R2-π(R/2)2]
y(cm)=-.122R (same as x(cm)
Using concept of negative mass
R/2
2R
€
−πR8/[4 − π
4] = −.393R /3.21= −.122R€
CoM =mixi∑mi∑
€
CoM =msqxsq −mcirxcirmsq −mcir
Angular kinematics In chapters 2 and 3 we dealt with kinematics which involved displacement, velocity, and acceleration. Angular kinematics is the same thing but for objects which are rotating (rather than translating). For something to rotate, it must have an axis about which it rotates like the axle for a wheel.
Only sensible place for the origin is along the axis.
r θ
Use polar coordinates (r,θ) instead of Cartesian coordinates (x,y). Axis is in the z-direction.
Angular velocity Angular velocity tells us how fast (and in what direction) something is spinning.
Counterclockwise is positive
The z subscript indicates the axis is in the z-direction (and the rotation is therefore in the xy plane)
Also have angular acceleration which describes how the spinning rate changes
r θ Δθ
Using Angular Variables The angular position of a line on a disk of radius
6 cm is given by Find the average angular speed between 1 and
3 s:
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θ =10 − 5t + 4t 2rad.
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θ(1) =10 − 5 + 4 = 9rad.
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θ(3) =10 −15 + 36 = 31rad.
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ω =θ(3) −θ(1)3−1
=31− 92
=11rad /s
Using Angular Variables The angular position of a line on a disk of radius
6 cm is given by Find the linear speed of a point on the rim at 2 s:
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θ =10 − 5t + 4t 2rad.
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ω =dθdt;ω(2) = −5 + 8t =11rad /s
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v = rω = .(06m)(11rad /s)v(2) = .66m /s
Using Angular Variables The angular position of a line on a disk of radius
6 cm is given by Find the radial and tangential acceleration of a
point on the rim at 2 s:
€
θ =10 − 5t + 4t 2rad.
€
α =dωdt
=d2θdt 2
;α(2) = 8rad /s2
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atan = rα = .(06m)(8rad /s2)atan (2) = .48m /s2
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arad =v 2
r=(.66m /s)2
.06marad (2) = 7.26m /s2
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atotal = arad2 + atan
2€
dθdt
= −5 + 8t
Clicker question 3 Set frequency to BA
Big Ben and a little alarm clock (synchronized to an atomic clock) both keep perfect time. Which minute hand has the largest angular velocity?
A. Big Ben B. little alarm clock C. same D. Impossible to tell
Clicker question 3 Set frequency to BA
Big Ben and a little alarm clock (synchronized to an atomic clock) both keep perfect time. Which minute hand has the largest angular velocity?
A. Big Ben B. little alarm clock C. same D. Impossible to tell
Angular velocity is only a measure of how quickly the angle changes. Both minute hands complete 1 revolution every hour.
1 rph = 2π rad/hr = 2π/3600 rad/s x(cm) = (m1 x1 + m2 x + m3 x3 + m4 x4 ) / (mtotal) Numbering the squares 1, 2, and 3 walking down, and #4 is the one on the left, gives x(cm) = m*(-a/2)+m*(-a/2)+m*(-a/2)+m*(-3/2a)/ (4m) = -3a/4.
Angular velocity & acceleration vectors Note the subscript z on the angular velocity and acceleration which indicates the axis of rotation
Also, note that ω and α can be positive or negative
This is like 1D motion. Is there an equivalent 3D motion? Yes. The axis of rotation can change orientation; it is not always along the z-axis (and therefore neither is ω).
Angular velocity and acceleration are vectors: points perpendicular to the plane of rotation in the direction given by the right hand rule (direction of your thumb when fingers curl in direction of rotation).
Angular displacement Δθ measured in radians
Summary of angular kinematics r θ Δθ
Angular velocity:
Angular acceleration:
Angular velocity and acceleration are vectors:
points perpendicular to the plane of rotation in the direction given by the right hand rule (direction of your thumb when fingers curl in direction of rotation).
Angular kinematics The same equations which were derived for constant linear (or translational) acceleration apply for constant angular (or rotational) acceleration
Constant angular acceleration only!
Constant linear acceleration only!
Clicker question 4 Set frequency to BA
A flywheel with a mass of 120 kg, and a radius of 0.6 m, starting at rest, has an angular acceleration of 0.1 rad/s2. How many revolutions has the wheel undergone after 10 s?
What equation should the student use to obtain the answer?
A. B. C. D. E. None of them will work
Clicker question 4 Set frequency to BA
A flywheel with a mass of 120 kg, and a radius of 0.6 m, starting at rest, has an angular acceleration of 0.1 rad/s2. How many revolutions has the wheel undergone after 10 s?
What equation should the student use to obtain the answer?
A. B. C. D. E. None of them will work
θ0=0, ω0z=0, αz=0.1 rad/s2 and we want θ
Relationships to linear velocity If we want the linear displacement or velocity of a point on a rotating object, we need r and either θ or ω. What is the speed of the tire rim if the radius is 0.35 m and the tire rotates at 20 rad/s?
Radians measure distance around a unit circle
Therefore (only for θ in radians!)
r θ
s
Time derivative of both sides (r is constant): . Linear speed is radius times angular speed
Rim speed is
Relationships to linear acceleration What about acceleration? If speed is then
We know that centripetal (or radial) acceleration is . Using v = rω, this can be rewritten as .
Total linear acceleration is composed of both tangential and radial acceleration which are always perpendicular to each other.
Clicker question 5 Set frequency to BA
A. 1 rad/s2 B. 4 rad/s2 C. 16 rad/s2 D. 1 cm/s2 E. None of the above
5 cm CD slows from an angular velocity of 4 rad/s to a stop in 4 seconds with constant angular acceleration. What is the magnitude of the angular acceleration (α) of the CD?
Clicker question 5 Set frequency to BA
A. 1 rad/s2 B. 4 rad/s2 C. 16 rad/s2 D. 1 cm/s2 E. None of the above
5 cm CD slows from an angular velocity of 4 rad/s to a stop in 4 seconds with constant angular acceleration. What is the magnitude of the angular acceleration (α) of the CD?
Remember and for constant α we have
but want magnitude: 1 rad/s2.
Clicker question 6 Set frequency to BA
A. 20 cm/s2 B. 5 cm/s2 C. 21 cm/s2 D. 0.8 cm/s2 E. None of the above
5 cm CD has an angular acceleration of -1 rad/s2 and an angular velocity of 2 rad/s. What is the magnitude of the acceleration of the dust particle 5cm out?
Total acceleration is composed of radial and tangential acceleration.
Can now get net force by multiplying acceleration by mass