Answer:
We first to know that if the wheel rotates from rest means that at t=0 the velocity and the angle rotated is 0.
Then, we know:
[tex]\alpha = 1.33 = \frac{dw}{dt}[/tex]
Integrating 2 times, we have:
[tex]w = 1.33t\\angle =0.665t^{2}[/tex]
For the first 27.9 s, we have:
w = 37.107 rad/s
angle = 517.6426 rad
For the next seconds, according to the text, the angular velocity is constant so
w = 37.107 rad/s and hence, integrating:
[tex]angle =37.107t[/tex]
Then, the time remaining is:
53.5 - 27.9 = 25.6
So for the next 25.6 seconds we have:
[tex]angle = 37.107*25.6=949.9392 rad[/tex]
Finally, we add the 2 angles and we have as a result:
[tex]angle = 517.6426+949.9392=1467.5818[/tex]
