Respuesta :
Answer:
13333.33 rev/min²
Explanation:
Given:
Initial angular speed of the automobile (ω₁) = 1260 rev/min
Final angular speed of the automobile (ω₂) = 3460 rev/min
Time interval for the change in speed (t) = 9.90 s
Angular acceleration of the automobile (α) = ?
Consider the sense of rotation to be positive. So, making use of the equation of motion of rotation, we have:
[tex]\omega_2=\omega_1+\alpha t[/tex]
Rewriting in terms of 'α', we get:
[tex]\alpha =\dfrac{\omega_2-\omega_1}{t}[/tex]
Converting time 't' from seconds to minutes using conversion factor.
1 sec = [tex]\frac{1}{60}\ min[/tex]
So, 9.90 s = [tex]9.9\times \frac{1}{60}=0.165\ min[/tex]
Plug in all the given values and solve for 'α'. This gives,
[tex]\alpha =\frac{3460-1260}{0.165}\ rev/min^2\\\\\alpha=\frac{2200}{0.165}=13333.33\ rev/min^2[/tex]
Therefore, the angular acceleration in revolutions per minute squared is 13333.33 rev/min².
