An object of specific gravity rho is hung from a thin steel wire. The fundamental frequency for transverse standing waves in the wire is 300 Hz. The object is. immersed in water so that one half of its volume is submerged. The new fundamental frequency in Hz is (Take density of water = 1 g "cm"^(-3) )

An object of specific gravity rho is hung from a thin steel wire. The

1.	An object of specific gravity rho is hung from a thin steel wire. The fundamental frequency for transverse standing waves in the wire is 300 Hz. The object is. immersed in water so that one half of its volume is submerged. The new fundamental frequency in Hz is (Take density of water = 1 g "cm"^(-3) )
Answer» `300((2rho-1)/(2rho))^(1//2)` `300((2rho)/(2rho-1))^(1//2)` `300((2rho)/(2rho-1))` `300((2rho-1)/(2rho))` Solution :The steel wire is first stretched by an object of specific GRAVITY `rho`in air. Then the object is half submerged in water. The stretching force DIMINISHES due to upthrust of water on the object . Let `sigma` denote specific gravity of water. WEIGHT of the object = `Vrhog` . Upthrust of water on object= `V/2 sigmag`. `THEREFORE` Tension T.=`V rho g-(Vsigmag)/2` or `T.=Vg((2rho-sigma)/2)` `therefore upsilon=1/(2l)sqrt(T/mu)`, where T=`Vrhog` `upsilon.=1/(2l)sqrt((T.)/mu)therefore (upsilon.)/upsilon=sqrt((T.)/T)` `(upsilon.)/upsilon=sqrt((Vg(2rho-1))/2xx1/(Vgrho))` `upsilon.=upsilonsqrt((2rho-1)/(2rho))` or `upsilon.=300[(2rho-1)/(2rho)]^(1//2)`

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