Answer:
Maximum angle is [tex]23.91^{\circ}[/tex] rad
Explanation:
As per the question:
length of the pendulum, L = 0.30 m
Radius of the pendulum, R = 0.001 m
Angular speed at the bottom, [tex]\omega = 2.9\ rad/s[/tex]
Now,
To calculate the maximum angle, [tex]\theta_{m}[/tex]:
For the pendulum, the moment of inertia, I = [tex]\frac{ML^{2}}{3}[/tex]
Now, using the principle of the conservation of energy:
Kinetic energy = Potential energy
[tex]\frac{1}{2}\times I\omega^{2} = mgh[/tex]
where
h = [tex]\frac{L}{2}(1 - cos\theta_{m})[/tex]
Thus
[tex]\frac{1}{2}\times \frac{mL^{2}}{3}\times \omega^{2} = m\times 9.8\times \frac{L}{2}(1 - cos\theta_{m})[/tex]
[tex]1 - cos\theta_{m} = \frac{0.3\times 2.9^{2}}{3\times 9.8}[/tex]
[tex]theta_{m} = cos^{- 1}(0.914) = 23.91^{\circ}[/tex]
