A uniform string is clamped at x=0 and x = L and is vibrating in its fundamental mode. Mass per unit length of the string is `mu`, tension in it is T and the maximum displacement of its midpoint is A. Find the total energy stored in the string. Assume to be small so that changes in tension and length of the string can be ignored

A string clamped at both ends vibrates in its fundamental mode. Is there any position (except the ends) on the string which can be touched without disturbing the motion ? What if the string vibrates in its first overtone ?

A string of length 1.5 m with its two ends clamped is vibrating in fundamental mode. Amplitude at the centre of the string is 4 mm. Minimum distance between the two points having amplitude 2 mm is:

A string tied between x = 0 and x = l vibrates in fundamental mode. The amplitude A , tension T and mass per unit length mu is given. Find the total energy of the string.

A string of mass per unit length mu is clamped at both ends such that one end of the string is at x = 0 and the other is at x =l . When string vibrates in fundamental mode, amplitude of the midpoint O of the string is a, tension in a, tension in the string is T and amplitude of vibration is A. Find the total oscillation energy stored in the string.

Derive an expression for the velocity of pulse in a in stretched in string under a tension T and mu is the mass per unit length of the sting.

A simple pendulum of mass 'm' , swings with maximum angular displacement of 60^(@) . When its angular displacement is 30^(@) ,the tension in the string is

A string of mass 'm' and length l , fixed at both ends is vibrating in its fundamental mode. The maximum amplitude is 'a' and the tension in the string is 'T' . If the energy of vibrations of the string is (pi^(2)a^(2)T)/(etaL) . Find eta

A string of mass 'm' and length l , fixed at both ends is vibrating in its fundamental mode. The maximum amplitude is 'a' and the tension in the string is 'T' . If the energy of vibrations of the string is (pi^(2)a^(2)T)/(etaL) . Find eta

Two stratched strings of same material are vibrating under some tension in fundamental mode. The ratio of their froquencies is 1 : 2 and ratio of the length of the vibrating segments is 1: 4 Then, the ratio of the radii of the strings is