Answer:
[tex]86.15\pi rad/min[/tex]
Explanation: Angular velocity is the number of revolutions made per unit time.
We convert the number of revolutions to radians and the time given in seconds to minutes,
Given;
[tex]1rev=2\pi rad\\therefore\\5.6rev=5.6*2\pi rad\\= 11.2\pi rad[/tex]
Also,
60s = 1 min
hence
[tex]8s=\frac{8}{60}min\\=0.13min[/tex]
We now divide the number of revolution in radians by the time in minutes.
[tex]\omega =\frac{11.2\pi}{0.13min}\\\omega=86.15\pi rad/min[/tex]
Answer:
the angular velocity in rad per minute would be 263.89 rad/min
Explanation:
Angular Velocity is the velocity of a body along a circular path, it is measured in rev/min, rad/m.
Given that the wheel has
rev = 5.6
time = 8 sec = 8 /60 = 2/15 minute
The angular velocity in rev/min would be;
ω = no. of revolution/time
ω = 5.6 rev / (2/15 minute)
ω = 5.6 rev x 15/2 minute
ω = 42 rev/minute
the angular velocity in rev/minute is 42 rev/minute and to convert the angular velocity to rad/minute we have;
1 rev = 2π rad/min
42 rev/min = 42 rev/min x 2π rad/min
= 263.89 rad/min
Therefore the angular velocity in rad per minute would be
263.89 rads/min
