The interatomic distance for a metal is `3 xx 10^(-10)` m. If the interatomic force constant is `3.6 xx 10^(-9) N//Å`. The the Young's modulus in `N//m^(2)` will be

The mean distance between the atoms of iron is 3xx10^(-10) m and interatomic fore constant for iron is 7 N//m . The Young's modulus of elasticity for iron is

If the interatomic spacing in a steel wire is 3.0 Å and Y_(steel)=20xx10^(10)N//m^(2) then force constant is

A particle of mass 2g is initially displaced through 2cm and then released. The frictional force constant due to air on it is 12 xx 10^(-3)N//m . The restoring force constant is 50 xx 10^(-3)N//m . If it is in oscillatory motion, its time period is

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,

If young's modulus of iron be 2xx10^(11) Nm^(-2) and interatomic distance be 3xx10^(-10) m^(-2) , the intertomic force constant will be (in N//m )

What will be the change in interatomic distance ( in Å ) of steel on applying a stress of 10^(9) N//m^(2) . The Young's modulus of steel is 2 xx 10^(11) N//m^(2) and the interatomic distance in steel is 2.8Å .

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

A wire of area of cross section 1xx10^(-6)m^(2) and length 2 m is stretched through 0.1 xx 10^(-3)m . If the Young's modulus of a wire is 2xx10^(11)N//m^(2) , then the work done to stretch the wire will be