A pendulum of length 1 m is suspended from the ceiling of a trolley moving horizontally with an acceleration of `4 m//s^(2)` . Its period of oscillation is

A seconds pendulum is suspended from the ceiling of a trolley moving horizontally with an acceleration of 4 m//s^(2) . Its period of oscillation is

A simple pendulum with a bob of mass m is suspended from the roof of a car moving with horizontal acceleration a

A simple pendulum 50cm long is suspended from the roof of a acceleration in the horizontal direction with constant acceleration sqrt(3) g m//s^(-1) . The period of small oscillations of the pendulum about its equilibrium position is (g = pi^(2) m//s^(2)) ltbRgt

A simple pendulum is suspended from the roof of a trolley which moves in a horizontal direction with an acceleration alpha , then the time period is given by T = 2pisqrt(((I)/(g))) where g is equal to

A pendulum of mass m and length l is suspended from the ceiling of a trolley which has a constant acceleration a in the maximum deflection theta of the pendulum from the vertical.

A simple pendulum of length 1m is attached to the ceiling of an elevator which is accelerating upward at the rate of 1m//s^(2) . Its frequency is approximately :-

A simple pendulum of length l and mass m is suspended in a car that is moving with constant speed v around a circle of radius r . Find the period of oscillation and equilibrium position of the pendulum.

A small metallic sphere of mass m is suspended from the ceiling of a car accelerating on a horizontal road with constant acceleration a. The tension in the string attached with metallic sphere is

A simple pendulum of length 1 feet suspended from the ceiling of an elevator takes pi/3 seconds to complete one oscilation. Find the acceleration of the elevator.

A bob of mass m is suspended from the ceiling of a train moving with an acceleration a as shown in figure. Find the angle theta in equilibrium position.