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

The area of a cross-section of steel wire is 0.1 cm^(-2) and Young's modulus of steel is 2 x 10^(11) N m^(-2) . The force required to stretch by 0.1% of its length is

The diameter of a brass rod is 4 mm and Young's modulus of brass is 9 xx 10^(10) N//m^(2) . The force required to stretch by 0.1 % of its length is

The bulk modulus of water is 2.3xx10^(9 )N//m^2. (a) Find its compressibility in the units atm^(-1) . (b) How much pressure in atmospheres in needed to compress a sample of water by 0.1% ?

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

The bulk modulus of water is 2.3 xx 10^(9) Nm^(-2) . (i) Find its compressibility. (ii) How much pressure in atmosphere is needed to compress a sample of water by 0.1%

Bulk modulus of water is (2.3xx10^(9) N//m^(2)) .Taking average density of water rho=10^(3)kg//m^(3) ,find increases in density at a depth of 1 km . Take g=10m//s^(2)

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 quartz is 2.70xx 10^(10) Nm^(-2) . Calculate its Young's modulus if the Poisson's ratio of quartz is 0.154.

Young 's modulus of steel is 2.0 xx 10^(11)N m//(2) . Express it is "dyne"/cm^(2) .