A wire of length 'l' having tension T and radius 'r' vibrates with fundamental frequency 'f'.Another wire of the same metal with length 2l having tension 2 T and radius 2 r will vibrate with fundamental frequency:

A wire of length l having tension T and radius r vibrates with fundamental frequency f . Another wire of the same metal with length 2l having tension 2T and radius 2r will vibrate with fundamental frequency :

A wire of length l having tension T and radius r vibrates with fundamental frequency f . Another wire of the same metal with length 2l having tension 2T and radius 2r will vibrate with fundamental frequency :

A metallic wire with tension T and at temperature 30^(@)C vibrates with its fundamental frequency of 1 kHz . The same wire with the same tension but at 10^(@)C temperature vibrates with a fundamental frequency of 1.001 kHz . The coefficient of linear expansion of the wire is equal to 10^(-K) .^(@)C . Find 2K .

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

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

Fundamental frequency of a sonometer wire is n. If the length and diameter of the wire are doubled keeping the tension same, then the new fundamental frequency is

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

A uniform string is vibrating with a fundamental frequency 'f'. The new frequency, if radius & length both are doubled would be

Show that an organ pipe of length 2l open at both ends has the same fundamental frequency as another pipe of length I closed at one end.