110,443 views
17 votes
17 votes
A cylinder 15.0 cm in diameter rotates at 1000 rpm. (a) what is its angular velocity in rad/s? (b) what is the tangential velocity of a point on the rim of the cylinder?

User Assistant
by
2.7k points

1 Answer

8 votes
8 votes

Answer:

(a) Approximately
105\; {\rm rad \cdot s^(-1)}.

(b) Approximately
15.7\; {\rm m \cdot s^(-1)}, assuming that this cylinder is rotating along the axis that goes through the center.

Step-by-step explanation:

The unit
{\rm rpm} stands for "revolutions per minute", where each revolution is
2\, \pi radians.

With an angular velocity of
1000\; {\rm rpm}, this cylinder would turn
1000* 2\, \pi = 2000\, \pi radians every minute (
60\; {\rm s}). Thus, the angular velocity of this cylinder would be:


\begin{aligned} \omega &= \frac{2000\, \pi\; {\rm rad}}{60\; {\rm s}} \\ &\approx 104.720\; {\rm rad \cdot s^(-1)}\end{aligned}.

A point at the rim of this cylinder would be at a distance of
r = 15.0\; {\rm cm} = 0.150\; {\rm m} from the axis of revolution of this cylinder. If the angular velocity of this cylinder is
\omega, the tangential velocity of this point would be:


\begin{aligned} v&= \omega\, r \\ &= \frac{2000\, \pi}{60\; {\rm s}} * 0.150\; {\rm m} \\ &\approx 15.7 \; {\rm m\cdot s^(-1)}\end{aligned}.

User Jason De Oliveira
by
3.5k points