Angular Acceleration without Angular Speed.

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Homework Statement


A wheel rotating about a fixed axis has an angular position given by theta= 3.0 - 2.0t^3, where theta is measured in radians and t in seconds. What is the angular acceleration of the wheel at t = 2.0s?

Homework Equations


wf = w + at

The Attempt at a Solution


I realize I most likely should use that kinematic equation to find the angular acceleration, but how would I find the angular speed? dtheta/dt? If so, is it like -6t^2/2?
Assuming w is just -6t^2, then I then got -6t^2=at. Which should be -12=a but I don't see that as an answer. Closest would be -24 rad/s^2.
 
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Just look up the definition of angular acceleration:

[tex]\alpha = \frac{d^2\theta}{dt^2}[/tex]
 
zachzach said:
Just look up the definition of angular acceleration:

[tex]\alpha = \frac{d^2\theta}{dt^2}[/tex]

Hmm so it would be -24 rad/s2 wouldn't it?
 
zachzach said:
That's what I got.

Alright thankyou. I was set on using the kinematic equation and completely overlooked the simpler method.
 
Also, the kinematic equations only work when there is constant acceleration (that is how they are derived). As you can see in this case the acceleration is NOT constant.
 
Thankyou, I'll keep that in mind. I appreciate it.