Lma12684 said:
Here we go:
T(wall)=Fw* L *sin theta
=267.89*10*sin 65
=2427.90
The force from the wall is not 267.89 N. You can find the force from the wall using the horizontal force equation, which says in this problem that the force from the wall equals the force of friction.
T(ladder)=-22 (9.8) (10/2) (cos 65)
=-455.58
T (painter)= mg (h)
=(95)(-9.8)(h)
=-931h
Remember how you got the torque from the ladder: it was the force (mg), times the distance from the pivot point (10/2), times an appropriate trigonometric factor. Then the sign of the torque comes from the direction of the torque (clockwise or counterclockwise).
Sometimes the trig factor is actually equal to one (because it is sin(90 degrees) or cos(0 degrees), but it isn't here; here the torque from the painter needs a trig factor just like the torque from the weight of the ladder.
If deciding on the trig function itself is causing problems, there are three main ways of writing down the magnitude of the torque:
1. \tau=r F \sin\theta: here \theta is the angle between the directions of the moment arm and the force. To use this for the weight of the painter, the force is vertically downwards, and the r is 65 degrees above the horizontal. What is the angle between these two directions?
2. \tau =r F_{\perp}: Multiply the distance from the pivot point to where the force acts, times the component of F that is perpendicular to r. So here you would need to find the component of F that is perpendicular to the ladder.
3.\tau=r_{\perp} F: Multiply the total force times the component of r that is perpendicular to that force. I think this is the easiest for ladder problems. Since your weight force is vertical, r_{\perp} is just the horizontal component of r for the torque from that weight.
They all give the same answer, of course, but sometimes one way is more natural for a certain problem. (There are other ways of writing torque but I think these are probably the most useful for introductory physics problems.)
