Answer:
0.915 rad or 52.44 degrees
Explanation:
Let g = 10 m/s2. We can calculate the gravity force acting on center of mass of the new 8.75 kg pole:
[tex]F = mg = 8.75 * 10 = 87.5 kg[/tex]
The moment is the dot product of force and moment arm
[tex]M = \vec{F} \cdot \vec{r} = Frcos\theta = 87.5*0.75cos\theta = 65.625cos\theta[/tex]
where θ is the angle between the gravity force and the pole, or between the pole and the wall. As M can be at its max, which is 40 Nm, we can solve for θ:
[tex]62.625cos\theta = 40[/tex]
[tex]cos\theta = 40 / 62.625 = 0.61[/tex]
[tex]\theta = cos^{-1}0.61 = 0.915 rad = 0.915 * 180 /\pi = 52.44^o[/tex]
