Calculate the pressure requird to stop the increase in volume of a copper block when it is heated from `60^@C` to `80^@C.` Coefficient of linear expansion of copper is `8.0 xx 10^(-6), .^@C^(-1)` and Bulk modulus of elasticity ` = 3.6 xx 10^(11) Nm^(-2)`

Calculate the presure required to stop the increases in volume of a copper block when it is heated from 50^(@) to 70^(@)C . Coefficient of linear expansion of copper =8.0xx10^(-6).^(@)C^(-1) and bulk modulus of elasticity 3.6xx10^(11)Nm^(-2)

Find the pressure requried to prevent the expansion of a copper block if it is heated from 40^(@)C to 50^(@)C . Coefficient of linear expansion of copper is 15xx 10^(-6)//^(@)C and bulk modulus = 12 xx 10^(10) N //m^(2)

What pressure is required to prevent the expansion of a copper block, if it is heated from 30^(@)C to 40^(@)C . Coefficient fo linear expansion of copper alpha is 15 xx 10^(-6)//K and bulk modulus = 12 xx 10^(10) N m^(-2) .

A copper bar is 80 cm long at 15^(@)C . What is the increase in length, when heated to 35^(@)C ? The coefficient of linear expansion for copper is 1.7 xx 10^(-5).^(@)C^(-1)

An iron sphere has a radius of 10 cm at 0°C. The change in volume of the sphere if it is heated to 100^(@)C (coefficient of linear expansion of iron = 11 xx 10^(-6)^(@) C^(-1) ) is

A rectangular copper block measures 20cm times 12cm times 3cm . What will be the change in volume of the block when it is heated from 0^(@)C " to " 800^(@)C ? Coefficient of linear expansion of copper is 0.16 times 10^(-4@)C^(-1) .

A piece of copper wire has a length of 2m at 10^(@)C . Its length at 100^(@)C is (Coefficient of linear expansion of copper = 17xx10^(-6)//""^(@)C )

A uniform metal rod of 2 mm^2 cross-section is is heated from 0C to 20^circ C . The coefficient of linear expansion of the rod 1 2 xx 10^(-6)circC^( -1). Its Youngs modulus of elasticity is 10^(11) Nm^(-2). Energy stored per unit volume of the rod is

A steel ball initially at a pressure of 1.0 xx 10^5 Pa is heated from 20^0 C to 120^0 C keeping its volume constant. Find the pressure inside the ball. Coefficient of linear expansion of steel = 12 xx 10^(-6) ^0 C^(-1) and bulk modulus of steel = 1.6 xx 10^(11) N m^(-2)