Bulk modulus for rubber is `9.8xx10^(8)Nm^(-2)`. To what depth should a rubber ball be taken in a take so that its volume is decreased by `0.1%`

The bulk modulus of rubber is 9.8xx10^(8)N//m^(2). To what depth a rubber ball be taken in a lake so that its volume is decreased by 0.1%?

The bulk modulus of rubber is 9.1xx10^(8)N//m^(2) . To what depth a rubber ball be taken in a lake so that its volume is decreased by 0.1% ?

The bulk modulus of rubber is 10^(9)N/m^(2) .To what depth a rubber ball be taken in a lake so that its volume is decreased by 0.1 % : ?

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

To what depth must a rubber ball be taken in deep sea so that its volume is decreases by 0.1% (The bulk modulus of rubber is 9.8xx10^(8) N//m , and the density of sea water is 10^(3) kg//m^(3))

The bulk modulus of water is 2.1xx10^(9) Nm^(-2) . The pressure required ot increase the density of water by 0.1% is

To What depth must a rubber ball be taken in deep sea so that its volume is decreased y 0.1 %. (The bulk modulus of rubber is 9.8 xx 10^8 Nm^(-2) , and the density of seac water is 10^3 kg m^(-3).)

The bulk modulus of water is 2.0xx10^(9) N//m^(2) . The pressure required to increase the density of water by 0.1% is

The bulk modulus of a liquid is 2xx10^(10) N//m^(2) . What is the percentage decrease in the volume of the liquid, when the pressure is increased by 20 atmosphere? (one atmosphere = 10^(5) N//m^(2) )

Bulk modulus of elasticity of rubber is 10^(9)N//m^(2) . If it is taken down to a 100 m deep lake, then decrease in its volume will be " "(g=10m//s^(2))