Find the volume density of the elastic deformation energy in fresh water at a depth of h = 1 m. (Bulk modulus of water = 2 `xx 10^(9) N//m^(2)`)

Find the volume density of the elastic deformation energy in fresh water at the depth of h=1000m .

Calculate the apprroximate change in density of water in a lake at a depth of 400 m below the surface. The density of water at the surface id 1030 kg//m^(3) and bulk modulus of water is 2xx10^(9) N//m^(2) .

Find the depth of sea if longitudinal waves from a ship are sent inside sea and from the bottom of sea, the waves return back after 3s. Density of water = 10^(3) kg//m^(3) and bulk modulus of water = 1960 x 10^6 N//m^(2) .

The average depth of ocean is 2500 m. Calculate the fractional compression ((DeltaV)/(V)) of water at the bottom of ocean, given that the bulk modulus of water is 2.3 xx 10^(9) N//m^(2) .

Find the increase in pressure required to decrease the volume of a water sample of 0.01%. Bulk modulus of water =2.1xx10^9Nm^-2 .

The bulk modulus of water is 2.3xx10^(9)N//m^(2) its compressibility is

When a compressible wave is sent towards bottom of sea from a stationary ship it is observed that its echo is hear after 2s . If bulk modulus of elasticity of water is 2xx10^(9)N//m^(2) , mean temperature of water is 4^(@) and mean density of water is 1000kg//m^(3) , then depth of sea will be