A: In reality the amplitude of a freely oscillating pendulum decreases gradually with time.
R: The frequency of the pendulum decreases with time.

Assertion : The amplitude of an oscillation pendulum decreases gradually with time Reason : The frequency of the pendulum decrease with time

The amplitude of a simple pendulum decreases with time. But there is no decrease in the amplitude of a pendulum clock. Why?

What is a simple pendulum? Find an expression for the time period and frequency of a simple pendulum.

A simple pendulum makes 100 oscillation in 25 s. What is the frequency of the pendulum correctto the significant figures?

The time period of a pendulum clock is :

A simple pendulum is oscillating in a stationery lift. When the lift falls freely, the frequency of oscillations of the pendulum is

The second's pendulum is taken from earth to moon, to keep time period constant (a) the length of the second's pendulum should be decreased (b) the length of the second's pendulum should be increased ( c) the amplitude should increase (d) the amplitude should decrease.

Amplitude of a damped oscillator decreases up to 0.6 times of its initial value in 5 seconds. In next 10 seconds, it decreases upto 'alpha' times of its intial value where 'alpha' is equal to ?

A large number of pendulums with identical bobs (mass m) but varying lengths are suspended from a thick thread. Another pendulum of a heavier bob (mass M) is also suspended from the same thred as shown. This pendulum with the heavier bob is used as a 'driver' to drive the other pendulums called as 'driven' pendulums. Assume that the amplitude of the driver is maintained constant (by some suitable mechanism). Let the frequency of the driver be f_(0) The variation of amplitude A with respect to time t is shown as