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Rotational Motion
Angular Measure (radian) Angular Speed and velocity Centripetal Acceleration Centripetal Force Angular Acceleration
Angular measurey
x
ry
x
x=r cos()
y=r sin()
Angular measurey
x
r
x
=
2 radians = 360°
s
s
rradians
1.0 radian = 57.3°
How far to the moon?
Early Greek scientists estimated that the earth’s diameter is 3.5 times larger than the moon’s.
If a penny covers up the moon when held 200 cm from your eye, How far is the moon from Earth? (the diameter of a penny is 1.9 cm)
Small angles
rh s
h≈ s & r ≈ x
Sin ≈ ≈ tan h/r ≈ s/r ≈ h/x
x
Angular speed and velocity
Average angular speed
€
ϖ =Δt
θ = ϖt (θ i = 0)
ω =dθdt
Linear speed and angular speed
rh s
x
v =st=
rt
=rϖ
v=rω
Linear speed and angular speed
rh s
Sin ≈ ≈ tan h/r ≈ s/r ≈ h/x
x
v =rω
Angular acceleration
€
α =ΔωΔt
ω = ωi +α t
Angular acceleration
α =Δv
rt
=Δvt ⋅r
=a t
ra t = rα
€
α =ΔωΔt
ω = ωi +α t
Circular Motion(with constant α
€
ϖ =(ω + ωi )
2
Circular Motion(constant α
€
ω =ω i +α t
θ =θ i +ω f +ω i
2t
θ =θ i +ωi t +12
α t2
ω2 = ωi2 + 2α (θ −θ i )
Kinetic Energy
€
Ki =12mivi
2 =12miri
2ω2
€
K =12miri
2ω2 =∑12
miri2
[ ]ω2 =∑
12Iω2
€
K =12Iω2
€
I = miri2
[ ] or I = r2dm∫∑
€
Iz = Icm +Md2
d
Torque
€
τ =rF sinφ = Fd
€
τ =τ1 + τ 2 = +F1d1 − F2d2
€
τ∑ A= IAα
a=?
T=?
a=?
T=?
F=mamg-T=ma
τ= IαTR = 1/2MR2 (a/R)
T= 1/2M a
mg-T=ma
mg- 1/2M a=ma
mg= 1/2M a+ma
mg= (1/2M +m)a
mg (1/2M +m)
T= 1/2M a
a =
Work and Power
€
work =r τ ⋅
r θ
Power =r τ ⋅
r ω
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