Answer:
1300.80988 Nm
730.79206 kgm²
Explanation:
m = Mass of ladder = 23.8 kg
g = Acceleration due to gravity = 9.81 m/s²
L = Length of ladder = 9.08 m
F = Applied force = 260 N
[tex]\alpha[/tex] = Angular acceleration = 1.78 rad/s²
I = Moment of inertia
Weight is given by
[tex]W=mg\\\Rightarrow W=23.8\times 9.81\\\Rightarrow W=233.478\ N[/tex]
The center of gravity of the ladder lies at the center of the ladder
Torque will be
[tex]\tau=-W\times \frac{L}{2}+F\times L\\\Rightarrow \tau=-233.478\times \frac{9.08}{2}+260\times 9.08\\\Rightarrow \tau=1300.80988\ Nm[/tex]
The net torque acting on the ladder is 1300.80988 Nm
Torque is also given by
[tex]\tau=I\alpha\\\Rightarrow I=\frac{\tau}{\alpha}\\\Rightarrow I=\frac{1300.80988}{1.78}\\\Rightarrow I=730.79206\ kgm^2[/tex]
The moment of inertia of the ladder is 730.79206 kgm²
