Figure shows a rod length l resting on a wall and the floor. Its lower end A is pulled towards left with a constant velocity v. Find the velocity of the other end B downward when the rod makes an angle theta with the horizontal.

Figure shows a rod length l resting on a wall and the floor. Its lower

1.	Figure shows a rod length l resting on a wall and the floor. Its lower end A is pulled towards left with a constant velocity v. Find the velocity of the other end B downward when the rod makes an angle theta with the horizontal.
Answer» Solution :In such type of problems, when velocity of one part of a body is GIVEN and that of other is required, we first FIND the relation between the two displacement, then differentiate them with respect to time. Here if the distance from the corner to the point A is x and up to B is y. Then `v=(dx)/(DT)& v_(B)=-(dy)/(dt)` (-sign DENOTES that y is DECREASING) Further, `x^(2)+y^(2)=l^(2)` Differentiating with repsect to time t `2x(dx)/(dt)+2y(dy)/(dt)=0 ""xv=yv_(B)` `v_(B)+(v)(x)/(y)=vcottheta`