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

How much will a 30m steel tape 1 cm wide and 0.05 cm thick stretch unde a pull of a force of 300N if Young's modulus of steel is 2 xx 10^(11) Nm^(-2)

Young's modulus of steel is 19xx10^10 N/m^2 . Expres it indyne/cm^2. Here dyne is the CGS unit of force.

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

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

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

A truck is pulling a car out of a ditch by means fo a steel cable that is 9.1m long and has a radius of 5mm . When the car just beings to move, the tension in the cable is 800 N . If Young's modulus for steel is 2xx10^(11) N//m^(2) then the strecth in the cable is (neraly)

The breaking stress of steel is 7.85 xx 10^(8) N//m^(2) and density of steel is 7.7 xx 10^(3) kg//m^(3) . The maximum frequency to which a string 1 m long can be tuned is

A steal wire of cross-section area 3xx10^(-6) m^(2) can withstand a maximum strain of 10^(-3) .Young's modulus of steel is 2xx10^(11) Nm^(-2) .The maximum mass this wire can hold is

Calculate the speed of longitudinal wave in steel. Young's modulus for steel is 3xx10^(10)N//m^(2) and its density 1.2xx10^(3)kg//m^(3)