The Young’s modulus of steel is 2 × 10^(...

The Young’s modulus of steel is `2 × 10^(11) N//m^(2)` and its coefficient of linear expansion is `1.1 × 10^(–5)` per deg. The pressure to be applied to the ends of a steel cylinder to keep its length constant on raising its temperature by `100^(@)C`, will be -

Similar Questions

Explore conceptually related problems

What pressure has to be applied to the ends of a steel cylinder to keep its length constant on raising its temperature by 100.^@C ?

The young’s modulus of steel is 2 xx 10^11 N//m^2 and its coefficient of linear expansion is 1.1 xx 10^-5 per day. The pressure to be applied to the ends of a steel cylinder to keep its length constant on raising its temperature by 100^@ C will be .

Youngs modulus for steel is 2xx10^(11)N//m^(2). What is its value in C.G.S UNITS ?

The Young's modulus of steel is 1.9 xx 10^(11) Nm^(-2) . Calculate its value in dyne cm^(-2) .

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

The pressure to be applied to the ends of a steel cylinder to keep its length constant upon raising its temperature by 100^(@)C is (thermal expansion coefficient, alpha = 11 xx 10^(-6)//K , Young's modulus = 200 GPa)

Young's modulus for steel is 2xx10^(10)N//m^(2) . If the interatomic distance for steel is 3 Å, then the interatomic force constant for steel will be

The area of cross-section of steel wire is 0.1 cm^(2) and Young's modulus of steel is 2 times 10^(11)N" "m^(-1) . The force required to stretched by 0.1% of its length is

The Young’s modulus of steel is `2 × 10^(11) N//m^(2)` and its coefficient of linear expansion is `1.1 × 10^(–5)` per deg. The pressure to be applied to the ends of a steel cylinder to keep its length constant on raising its temperature by `100^(@)C`, will be -

Similar Questions

Recommended Questions