Answer:
Explanation:
Given that,
Mass of wheel M = 40kg
Radius of thin hoop R= 0.81m
Angular speed ωi = 438 rev/mins
1rev = 2πrad
ωi = 438 × 2π/60 rad/sec
ωi = 45.87 rad/s
Time take to stop t = 21s
Moment of inertial of a hoop around it central axis can be calculated using
I = MR²
I = 40 × 0.81²
I = 26.24 kgm²
Then,
Change in kinetic energy is given as
∆K.E = Kf — Ki
∆K.E = ½Iωf² — ½Iωi²
Then final angular velocity is zero, since the wheel comes to rest
∆K.E = ½Iωf² — ½Iωi²
∆K.E = ½I × 0² — ½ × 26.24 × 45.87²
∆K.E = 0 — 27,609.43
∆K.E = —27,609.43 J
B. Power
Power = Workdone/Time take
The change in kinetic energy of the loop is equal to the net work done on it
∆K•E = W = —27,609.43
Power = |W| / t
P = 27,609.43/21
P = 1314.73 W
The average power to stop the loop is 1314.73 watts
