Respuesta :
Answer:
The angular acceleration is 2.39 rad/s².
The number of degrees it rotates is 841.68 degrees.
Explanation:
Given:
Initial angular speed (ω₀) = 0 rad/s
Final angular speed in rpm (N) = 80.0 rpm
Time taken (t) = 3.50 s
First, let us determine the final angular speed in radians per second.
We know that,
[tex]\omega=\frac{2\pi N}{60}\ rad/s[/tex]
Plug in the values and find the final angular speed, 'ω'. This gives,
[tex]\omega=\frac{2\pi\times 80.0}{60}=8.38\ rad/s[/tex]
Now, using equation of motion for rotational motion, we have:
[tex]\omega=\omega_0+\alpha t\\\\\alpha\to angular\ acceleration[/tex]
Plug in the given values and solve for α. This gives,
[tex]8.38=0+\alpha \times 3.50\\\\\alpha=\frac{8.38}{3.50}=2.39\ rad/s^2[/tex]
Therefore, the angular acceleration is 2.39 rad/s².
Now, again using rotational equation of motion relating angular displacement, we have:
[tex]\omega^2=\omega_0^2+2\alpha\theta\\\\\theta=\frac{\omega^2-\omega_0^2}{2\alpha }[/tex]
Plug in the given values and solve for 'θ'. This gives,
[tex]\theta=\frac{(8.38)^2-0}{2\times 2.39}\\\\\theta=\frac{70.2244}{4.78}=14.69\ rad[/tex]
Convert radians to degrees using the conversion factor. This gives,
π radians = 180°
So, 1 radian =( 180 ÷ π ) degrees
Therefore, [tex]14.69\ rad=14.69\times (\frac{180}{\pi})=841.68^\circ[/tex]
So, the number of degrees it rotates is 841.68 degrees.
