Question

What torque would have to be applied to a rod with a length of `5 m` and a mass of `2 kg` to change its horizontal spin by a frequency of `14 Hz` over `6 s`?

Answer 1

The torque (for the rod rotating about the center) is `=61.6Nm`
The torque (for the rod rotating about one end) is `=244.3Nm`

Explanation:

The torque is the rate of change of angular momentum

`tau=(dL)/dt=(d(Iomega))/dt=I(domega)/dt`

The moment of inertia of a rod, rotating about the center is

`I=1/12*mL^2`

`=1/12*2*5^2= 25/6 kgm^2`

The rate of change of angular velocity is

`(domega)/dt=(14)/6*2pi`

`=(14/3pi) rads^(-2)`

So the torque is `tau=25/6*(14/3pi) Nm=175/9piNm=61.1Nm`

The moment of inertia of a rod, rotating about one end is

`I=1/3*mL^2`

`=1/3*2*5^2=50/3kgm^2`

So,

The torque is `tau=50/3*(14/3pi)=700/9pi=244.3Nm`