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Damian Dixon · Answer 1 · 2021-07-13T22:09:22+0000

To solve this problem we will use the concepts related to angular motion equations. Therefore we will have that the angular acceleration will be equivalent to the change in the angular velocity per unit of time.

Later we will use the relationship between linear velocity, radius and angular velocity to find said angular velocity and use it in the mathematical expression of angular acceleration.

The average angular acceleration

$\alpha = (\omega_f - \omega_0)/(t)$

Here

$\alpha$ = Angular acceleration

$\omega_(f,i) =$ Initial and final angular velocity

There is not initial angular velocity,then

$\alpha = (\omega_f)/(t)$

We know that the relation between the tangential velocity with the angular velocity is given by,

$v = r\omega$

Here,

r = Radius

$\omega$ = Angular velocity,

Rearranging to find the angular velocity

$\omega = (v)/(r)}$

$\omega = (30)/(0.20) \rightarrow$ Remember that the radius is half te diameter.

Now replacing this expression at the first equation we have,

$\alpha = (30)/(0.20*6)$

$\alpha = 25 rad /s^2$

Therefore teh average angular acceleration of each wheel is
25rad/s^2

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