In order to produce a longitudinal strain of `2xx10^(-4)`, a stress of `2.4xx10^(7) Nm^(-2)` is produced in a wire. Calculate the Young's modulus of the material of the wire.

The length of a suspended loire increases by 10^-4 of its original length when a stress of 10^7 Nm^-2 is applied on it. Calculate the Young's modulus of the material of the wire.

A wire increases by 10^(-3) of its length when a stress of 1xx10^(8)Nm^(-2) is applied to it. What is the Young's modulus of the material of the wire?

If stress is 10^(12) times the strain produced in a wire, then its Young's modulus will be

A stress of 9.8xx10^(6)N//m^(2) is applied to a wire an which young's modulus is 10^(11)N//m^(2) find the strain

When a stress of 10^(8) Nm ^(-2) is applied to a suspended wire its length increases by 1 mm. Calculate Young's modulus of wire.

When a wire is stretched by a force the strain produced in the wire is 2 xx 10^(-4) . If the energy stored per unit volume of the wire is 4 xx 10^(4) "joule"//m^(3) then the Young's modulus of the material of the wire will be,

A wire increase by 10 ^(-6) times its original length when a stress of 10 ^(8) Nm ^(-2) is applied to it, calculate its Young's modulus.

A uniform cylindrical wire is subjected to a longitudinal tensile stress of 5 xx 10^(7) N//m^(2) . Young's modulus of the material of the wire is 2 xx 10^(11) N//m^(2) . The volume change in the wire is 0.02% . The factional change in the radius is

A uniform cylindrical wire is subjected to a longitudinal tensile stress of 5 xx 10^(7) N//m^(2) . Young's modulus of the material of the wire is 2 xx 10^(11) N//m^(2) . The volume change in the wire is 0.02% . The factional change in the radius is

On applying a stress of 20 xx 10^(8) N//m^(2) the length of a perfectly elastic wire is doubled. It Young's modulus will be