A stretched wire of stone length under a tension is vibrating with its fundamental frequency . Its length is decreased by `45 %` and tension is increased by `21 %` . Now fundamental frequency

Fundamental frequency of a stretched sonometer wire is f_(0) . When its tension is increased by 96% and length drecreased by 35% , its fundamental frequency becomes eta_(1)f_(0) . When its tension is decreased by 36% and its length is increased by 30% , its fundamental frequency becomes eta_(2)f_(0) . Then (eta_(1))/(eta_(2)) is.

A 1 cm long string vibrates with fundamental frequency of 256 Hz . If the length is reduced to 1/4 cm keeping the tension unaltered, the new fundamental frequency will be

A wire of length one metre under a certain initial tension emits a sound of fundamental frequency 256 Hz. When the tesnion is increased by 1 kg wt , the frequency of the fundamental node increases to 320 Hz. The initial tension is

(a) Distinguish between transverse wave and longitudinal wave. Give one example of each type. (b) A stretched string of length I and under a tension T, emits a note of fundamental frequency n. The tension is now reduced to T/2 and the vibrating length changed so that the frequency of the second harmonic is equal to n. Find out the new length of the string in terms of its original length.

A stone is hung from a sonometer wire. If the stone is immersed in water the fundamental frequency

The fundamental frequency of an open organ pipe is n. If one of its ends is closed then its fundamental frequency will be –

The fundamental frequency of a sonometer wire is n . If length tension and diameter of wire are triple then the new fundamental frequency is.

Fundamental frequency of sonometer wire is n. If the length, tension and diameter of wire are tripled the new fundamental frequency is

The frequency of a stetched unifrom wire under tension is in resonance with the fundamental frequency of closed tube. If the tension in the wire is increased by 8 N, it is in resonance with the first overtone of the closed tube. The initial tension in the wire is

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