Assertion: If the tension in the string is doubled, then frequency of fundamental node becomes two times.
Reason: According to law of tension, frequency `prop("tension")^(1//2)`

If the tension of a string is doubled , the fundamental frequency changes will be

In law of tension , the fundamental frequency of vibrating string is

Two vibrating strings of the same material but lengths L and 2L have radii 2r and r respectively. They are stretched under the same tension. Both the strings vibrate in their fundamental modes, the one of length L with frequency n_(1) and the other with frequency n_(2) the ratio n_(1)//n_(2) is given by

Two strings X and Y of a sitar produce a beat frequency 4 Hz.When the tension of the string Y is slightly increased the beat frequency is found to be 2 Hz. If the frequency of X is 300 Hz,then the original frequency of Y was

If the tension and diameter of a sonometer wire of fundamental frequency n are doubled and density is halved then its fundamental frequency will become

The tension in a piano wire is increased by 25% .Its frequency becomes …………….. Times the original frequency .

A wire under a certain tension gives a note of fundamental frequency 320 Hz. When the tension is changed, the frequency of the fundamental note changes to 480 Hz. Compare the tensions.

A vibrating string of certain length l under a tension T resonates with a mode corresponding to the first overtone (third harmonic) of an air column of length 75cm inside a tube closed at one end. The string also generates 4 beats per second when excited along with a tuning fork of frequency n . Now when the tension of the string is slightly increased the number of beats reduces 2 per second. Assuming the velocity of sound in air to be 340 m//s , the frequency n of the tuning fork in Hz is

A simple pendulum oscillates in a verticle plane. When it passes through the bottommost point, the tension in the string is 3 times the weight of the pendulum bob. What is the maximum displacement of the pendulum of the string with respect to the vertical

A tuning fork of known frequency 256 Hz makes 5 beats per second with the vibrating string of a piano.The beat frequency decreases to 2 beats per second when the tension in the piano string is slightly increased.The frequency of the piano string before increasing the tension was