A conical pendulum suspended with an inextensible string of length \(L\), moves in a circular path of radius \(a\) with string making an angle \(\alpha\) with vertical. The pendulum rotates with angular velocity \(\omega\) about the vertical line passing through the point of suspension. Consider a frame rotating with angular velocity \(\nu\gneqq\omega\), the direction of the angular velocity of the frame being the same as that of the pendulum. What is the motion of the pendulum as seen by an observer in this frame? Does the sum of all forces vanish ? or not? Explain the observed behaviour of the pendulum using the equation of motion as applicable in this frame. | ![]() |
Exclude node summary :
n
Exclude node links:
0
4727:Diamond Point
0