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Transcript
Angular Mechanics - Torque and moment of inertia
Contents:
•Review
•Linear and angular Qtys
•Tangential Relationships
•Angular Kinematics
•Torque
•Example | Whiteboard
•Moment of Inertia D D
•Example | Whiteboard
•Torque and Moment of inertia
•Example | Whiteboard
Angular Mechanics - Angular Quantities
Linear: Angular:
(m) s  - Angle (Radians)
(m/s) u o - Initial angular velocity (Rad/s)
(m/s) v  - Final angular velocity (Rad/s)
(m/s/s) a  - Angular acceleration (Rad/s/s)
(s) t t
- Uh, time (s)
(N) F  - Torque
(kg) m I - Moment of inertia
TOC
Angular Mechanics - Tangential Relationships
Linear: Tangential: (at the edge of the wheel)
(m) s = r
- Displacement
(m/s) v = r
- Velocity
(m/s/s) a = r
- Acceleration*
*Not in data packet
TOC
Angular Mechanics - Angular kinematics
Linear:
s/t = v
v/t = a
u + at = v
ut + 1/2at2 = s
u2 + 2as = v2
(u + v)t/2 = s
ma = F
Angular:
 = /t
 = /t*
 = o + t
 = ot + 1/2t2
2 = o2 + 2
 = (o + )t/2*
 = I
*Not in data packet
TOC
Angular Mechanics - Torque
Torque A twisting force that can cause an
angular acceleration.
So how do you increase torque?
Push farther out:
Push with more force: F
or
F
TOC
Angular Mechanics - Torque
Torque A twisting force that can cause an
angular acceleration.
 = rxF
F
r
If r = .5 m, and F = 80 N, then  = (.5m)(80N)
 = 40 Nm. Torque is also in foot pounds
(Torque Wrenches)
TOC
Angular Mechanics - Torque
Torque A twisting force that can cause an
angular acceleration.
 = rxF = rFsin F
Fsin

r
Only the perpendicular component gives rise
to torque. (That’s why it’s sin)
TOC
Example: What’s the torque here?
 = 56o
F = 16 N
r = 24 cm
Ok – This is as tricky as it can be:
use  = rFsin, r = .24 m, F = 16 N
But  is not 56o. You want to use the angle
between r and F which is 90 – 56 = 34o
Finally,  = (.24 m)(16 N)sin(34o) = 2.1 Nm
TOC
Whiteboards:
Torque
1|2|3
TOC
What is the torque when you have 25
N of force perpendicular 75 cm from
the center of rotation?
 = rFsin
= (.75 m)(25 N)sin(90o) = 18.75 Nm
= 19 Nm
19 Nm
W
If you want 52.0 Nm of torque, what
force must you exert at an angle of 65.0o
to the end of a .340 m long wrench?
 = rFsin
52 Nm = (.34 m)(F) sin(65o)
F =(52Nm)/((.34m) sin(65o))=168.75 N
F = 169 N
169 N
W
The axle nut of a Volkswagen requires
200. foot pounds to loosen. How far out
(in feet) do you stand on the horizontal
wrench if you weigh 145 lbs?
 = rFsin
200. ft lbs = (r)(145 lbs) sin(90o)
r = (200. ft lbs)/(145 lbs) = 1.3793 feet
r = 1.38 feet (1’ 41/2”)
1.38 feet
W
Angular Mechanics – Moment of inertia
Moment of Inertia - Inertial resistance to
angular acceleration.
Question - If the blue masses were identical,
would both systems respond identically to the
same torque applied at the center?
Demo
TOC
Angular Mechanics – Moment of inertia
F = ma - We can’t just use “m” for “I”
 = I
(The position of “m” matters!)
r
F
F = ma
rF = mar (Mult. by r)
rF = m(r)r (a = r)
 = (mr2) = I ( = rF)
So I = mr2 for a point
mass, r from the center.
TOC
Angular Mechanics – Moment of inertia
What about a cylinder rotating about its
Some parts are
central axis?
far from the axis
Some parts are
close to the axis
In this case,
I = 1/2mr2
(You need calculus
to derive it)
TOC
In
general,
you look
them up
in your
book.
Demos:
TP,
Solids
TOC
Three main ones:
½mr2 - Cylinder (solid)
mr2 - Hoop (or point
mass)
2/
2 – Sphere (solid)
mr
5
TOC
Example: Three 40. kg children are sitting
1.2 m from the center of a merry-go-round
that is a uniform cylinder with a mass of 240
kg and a radius of 1.5 m. What is its total
moment of inertia?
The total moment of inertia will just be the
total of the parts:
Children – use mr2 (assume they are points)
MGR – use 1/2mr2 (solid cylinder)
I = 3((40kg)(1.2m)2) + ½(240kg )(1.5m)2
I = 442.8 kgm2 = 440 kgm2
TOC
Whiteboards:
Moment of Inertia
1|2|3
TOC
What is the moment of inertia of a 3.5
kg point mass that is 45 cm from the
center of rotation?
I = mr2
I = (3.5kg)(.45m)2 = .70875 kgm2
I = .71 kgm2
.71 kgm2
W
A uniform cylinder has a radius of
1.125 m and a moment of inertia of
572.3 kgm2. What is its mass?
I = ½mr2
572.3 kgm2 = ½m(1.125 m)2
m = 2(572.3 kgm2)/(1.125 m)2
m = 904.375 = 904.4 kg
904.4 kg
W
A sphere has a mass of 45.2 grams, and
a moment of inertia of 5.537 x 10-6
kgm2. What is its radius? (2 Hints)
m = .0452 kg
I = 2/5mr2
5I/(2m) = r2
1/2
r = (5I/(2m))
r = (5(5.537
r = .0175 m
.0175 m
kgm2)/(2(.0452kg))
x10-6
1/2
)
W
Angular Mechanics – Torque and moment of inertia
Now let’s put it all together, we can calculate
torque and moment of inertia, so let’s relate
them:
The angular equivalent of F = ma is:
F = ma
 = I
TOC
Example: A string with a tension of 2.1 N is
wrapped around a 5.2 kg uniform cylinder
with a radius of 12 cm. What is the angular
acceleration of the cylinder?
I = ½mr2 = ½(5.2kg)(.12m)2 = 0.03744 kgm2
 = rF = (2.1N)(.12m) = .252 Nm
And finally,
 = I,
 = /I = (.252 Nm)/(0.03744 kgm2) = 6.7 s-2
TOC
Whiteboards:
Torque and Moment of Inertia
1|2|3|4|5
TOC
What torque is needed to accelerate a
23.8 kgm2 wheel at a rate of 388
rad/s/s?
 = I
 = (23.8 kgm2)(388 rad/s/s)
I = 9234.4 Nm = 9230 Nm
9230 Nm
W
An object has an angular acceleration
of 23.1 rad/s/s when you apply 6.34
Nm of torque. What is the object’s
moment of inertia?
 = I
(6.34 Nm) = I(23.1 rad/s/s)
I = (6.34 Nm)/(23.1 rad/s/s) = .274 kgm2
.274 kgm2
W
If a drill exerts 2.5 Nm of torque on a
.075 m radius, 1.75 kg grinding disk,
what is the resulting angular
acceleration? (1 hint)
 = I, I = ½mr2
I = ½mr2 = ½(1.75 kg)(.075 m)2 = .004922 kgm2
 = I, 2.5 Nm = (.004922 kgm2)
 = /I = (2.5 Nm)/(.004922 kgm2) = 510 s-2
510 s-2
W
What torque would accelerate an object
with a moment of inertia of 9.3 kgm2
from 2.3 rad/s to 7.8 rad/s in .12
seconds? (1 hint)
 = I,  = o + t
7.8 rad/s = 2.3 rad/s + (.12 s)
 = (7.8 rad/s - 2.3 rad/s)/(.12 s) = 45.833s-2
 = I = (9.3 kgm2)(45.833s-2) = 426.25 Nm
 = 430 Nm
430 Nm
W
A merry go round is a uniform solid cylinder
of radius 2.0 m. You exert 30. N of force on
it tangentially for 5.0 s and it speeds up to
1.35 rad/s. What’s its mass? (1 hint)
 = rF, I = 1/2mr2 ,  = o+t,  = I
 = 1.35 s-1/5.0 s = .27 s-2
 = rF = 30.N(2.0m) = 60 Nm
 = I, I=/ (60Nm)/(.27s-2)=222.2kgm2
I = 1/2mr2, m = 2I/r2
m = 2(222.2kgm2)/(2.0m)2 = 111.1111 kg
m = 110 kg
110 kg
W