A rod of length 2 m is at a temperature of `20^@` C. find the free expansion of the rod, if the temperature is increased to `50^@`C, then find stress produced when the rod is (i) fully prevented to expand, (ii) permitted to expand by 0.4mm. `Y=2xx10^(11)N//m^(2), alpha=15xx10^(-6//^(@))C`.

A steel rod of length 6.0 m and diameter 20 mm is fixed between two rigid supports . Determine the stress in the rod, when the temperature increases by 80^@ C if (a)the ends do not yield (b) the ends yield by 1mm Take Y=2.0xx10^(6) kg//cm^(2) and alpha=12xx10^(-6) per ^@C.

A brass rod of length 1 m is fixed to a vertical wall at one end, with the other end keeping free to expand. When the temperature of the rod is increased by 120^@C , the length increases by 3 cm . What is the strain?

Two rods of equal cross sections, one of copper and the other of steel, are joined to form a composite rod of length 2.0 m at 20^@C , the length of the copper rod is 0.5 m. When the temperature is raised to 120^@C , the length of composite rod increases to 2.002m. If the composite rod is fixed between two rigid walls and thus not allowed to expand, it is found that the lengths of the component rods also do not change with increase in temperature. Calculate Young's moulus of steel. (The coefficient of linear expansion of copper, alpha_c=1.6xx10^(-5@)C and Young's modulus of copper is 1.3xx10^(13)N//m^(2) ).

A rod of aluminium is fixed between two rigid support. If the temperature of rod is increased by 10°C , then the thermal stress on the rod is (Take Y= 7×10^10 Pa and alpha =2.4* 10^-5 K^-1 )

When composite rod is free, then composite length increases to 2.002 m for temperature 20^(@)C to 120^(@)C when composite rod is fixed between the support there is no change in component length find y and alpha of steel, if y_(c)=1.5xx10^(13)N//m^(2)alpha_(c)=1.6xx10^(-5)//.^(@)C .

A steel wire 2mm in diameter is just stretched between two rigid walls at 20°C. If the temperature falls to 10°C, find the tension in the wire. Linear coefficient of expansion of steel = 11 xx 10^(-6)//k and Y = 2 xx10^(11) N//m^(2)

A wire 2 mm in diameter is just stretched in between two fixed points at a temperature of 50^(@)C . Calculate the tension in the wire, when the temperature falls to 30^(@)C . Coefficient of linear expansion is 11 xx 10^(-4) l^(@)C and Young modulus is 2.1 xx 10^(11) N m^(2)

The temperature of a wire of length 1 metre and area of cross-section 1 cm^(2) is increased from 0^(@)C to 100^(@)C . If the rod is not allowed to increased in length, the force required will be (alpha=10^(-5)//.^(@)C and Y =10^(11) N//m^(2))

When composite rod is free, composite length increase to 2.002m from temperature 20^(@)C to 120^(@)C . When composite rod is fixed between the support, there is no change in component length. Find Y and alpha of steel if Y_(cu) = 1.5 xx 10^(13) N//m^(2) and alpha_(cu) = 1.6 xx 10^(-5//@)C

An aluminium rod of length 50cm is heated so that its temperature increases from 20^(@)C" to "80^(@)C . If the linear coefficient of expansion of aluminium is 24 xx 10^(-6)//""^(@)C find the increase in the length of the aluminium rod.