Determine the volume contraction of a soild copper cube, `10` cm on the edge, when the subjected to a hydraulic pressure of `7.0xx10^(6)` Pa. Bulk modular of the copper = `1.40xx10^(11)` Pa.

Determine the volume contraction of a solid copper cube, 10 cm on an edge when subjected to hydraulic pressure of 7 xx 10^(6)Pa . Bulk modulus of copper = 140 Gpa.

 The volume change of a solid copper cube 10 cm on an edge, when subjected to a pressure of 7 MPa is (Bulk modulus of copper 140 GPa)

The volume change of a solid copper cube 20 cm on an edge, when subjected to a pressure of 14 MPa is (Bulk modulus of copper 140 GPa)

Compute the fractional change in volume of glass slab when subjected to a hydraulic pressure of 10 atm. (1 atm = 1.013 xx 10^(5) Pa, Bulk modulus of glass = 37 xx 10^(9) pa)

The volume of a solid is 6 xx 10^(-3) m^(3) under 2 atm pressure. Find the change in volume when subjected to a pressure of 102 atm. Bulk modulus of the material = 10^(11) Nm^(-2) .

A hydraulic press contains 0.25 m^(3)(250L) of oil. Find the decrease in volume of the oil when it is subjected to a pressure increase /_\p=1.6xx10^(7)Pa . The bulk modulus of the oil is B=5.0xx10^(9)Pa .

A hydraulic press contains 0.25 m^(3)(250L) of oil. Find the decrease in volume of the oil wen it is subjected to a pressure increase /_\p=1.6xx10^(7)Pa . The bulk modulus of the oil is B=5.0xx10^(9)Pa .

Compute the fractional change in volume of a glass slab, when subjected to a hydraulic pressure of 10 atmosphere. Bulk modulus of elasticity of glass = 37 xx 10^(9) Nm^(-2) and 1 atm = 1.013 xx 10^(5)Pa .

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) )

A steel ball initially at a pressure of 1.0 xx 10^5 Pa is heated from 20^@ C to 120^@ C keeping its volume constant. Find the pressure inside the ball. Coefficient of linear expansion of steel = 12 xx 10^(-6) C^(-1) and bulk modulus of steel = 1.6 xx 10^(11) N m^(-2)