Unlike a laboratory sonometer, a stringed instrument is seldom plucked in the middle. Supposing a sitar string is plucked at about `(1)/(4)th` of its length from the end. The most prominent harmonic would be

A sonometer is plucked at 1/4 of its length . The most prominent would be

We have a stringed musical instrument. The string is plucked in the middle first with a force of greater magnitude and then with a force of smaller magnitude. In which case would the instrument produce a louder sound?

A stretched string of length 1 m fixed at both ends , having a mass of 5 xx 10^(-4) kg is under a tension of 20 N . It is plucked at a point situated at 25 cm from one end . The stretched string would vibrate with a frequency of

A solid uniform sphere of mass M and radius R can rotate about a fixed vertical axis. There is no frictional torque acting at the axis of rotation. A light string is wrapped around the equator of the sphere. The string has exactly 6 turns on the sphere. The string passes over a light pulley and carries a small mass m at its end (see figure). The string between the sphere and the pulley is always horizontal. The system is released from rest and the small mass falls down vertically. The string does not slip on the sphere till 5 turns get unwound. As soon as 5^(th) turn gets unwound completely, the friction between the sphere and the string vanishes all of a sudden. (a) Find the angular speed of the sphere as the string leaves it. (b) Find the change in acceleration of the small mass m after 5 turns get unwound from the sphere.

A massless spring of force constant K and natural length l_(0) is hanging from a ceiling. An insect of mass m is sitting at the lower end of the spring and the system is in equilibrium . The insect starts slowing climbing up the spring so as to eat a bug sitting on the ceiling. Assume that insect climbs without slipping on the spring and K = (mg)/(l_(0)) . find the length of the spring when the insect is at (1)/(4)th of its original distance from the bug .

A rough horizontal plate rotates with a constant angular velocity w about its vertical axis. A particle of mass m lies on the plate at a distance (5a)/(4) from the axes. If the coefficient of friction is (1)/(3) and the particle remains at rest relative to the plane, show that w le sqrt((4g)/(15a)) . The particle is now connected to axis by a horizontal elastic string, of natural length a and modulus 3 mg. If the particle remains at rest relative to the plate and at a distance (5a)/(4) , show that the greatest possible angular velocity is sqrt((13)/(15).(g)/(a)) and find the least possible velocity.

The first overtone of a pipe closed at one end resonates with the third harmonic of a string fixed at its ends. The ratio of the speed of sound to the speed of transverse wave travelling on the string is 2 : 1. Find the ratio of the length of pipe to the length of string.

Tension of a string is 6.4 N and load is applied to it at its lower end of a string is 0.1 kg .If the length of string is 6 m , then its angular velocity will be