A sphere contracts in volume by 0.01 % , when taken to the bottom of sea 1 km deep. The bulk modulus of the material of the sphere is (Given density of sea water may be taken as `1.0 xx 10^(3) kg m^(-3)`)

A sphere contracts in volume by 0.01% when taken to the bottom of sea 1km keep. The bulk modulus of the material of the sphere is (Given density of sea water may be taken as 1.0xx10^3kgm^-3 ).

A sphere contract in volume by 0.1% when taken to bottom of the sea 1 km deep. Find the bulk modulus of the material of the sphere. Density of sea water = 10^(3) kg //m^(3) .

A spherical ball contracts in volume by 0.02%, when subjected to a normal uniform pressure of 50 atmosphere. The Bulk modulus of its material is

A spherical ball contracts in volume by 0.01 % when subjected to a normal uniform pressure of 100 atmosphers. The bulk modulus of its material in dynes/ cm^(2) is

A spherical ball contracts in volume by 0.01% when subjected to a normal uniform pressure of 100 atmospheres. Calculate the bulk modulus of the meterial.

A spherical ball contracts in volume by 0.02% when subjected to a normal uniform pressure of 200 atmospheres. Then Bulk modulus (in N//m^(2) ) of the material of the ball is (Atomospheric pressure =10^(5)N//m^(2) )

An cube is shifted to a depth of 100 m is a lake. The change in volume is 0.1% . The bulk modulus of the material is

When a rubber ball is taken to the bottom of a sea of depth 1400 m the volume decreases by 2% . The Bulk modulus of rubber ball is (density of water is 1g//cm^3 and g =10 m//s^2

In taking a solid ball of rubber from the surface to the bottom of a lake of 180 m depth, reduction in the volume of the ball is 0.01 % . The density of water of the lake is 1xx10^(3) kg//m^(3) . Determine the value of the bulk modulus of elasticity of rubber . (g = 9.8 m//s^(2))

When a pressure of 100 atmosphere is applied on a spherical ball, then its volume reduces to 0.01% . The bulk modulus of the material of the rubber in dyne/ cm^2 is