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

A steel wire of cross sectional area 3 xx 10^-6 m^2 can withstand a maximum strain of 10^-3 . Young's modulus of steel is 2 xx 10^11 N//m^2 . The maximum mass the wire can hold is (g = 10 m//s^2)

A steel wire of length 5 m and area of cross-section 4 mm^(2) is stretched by 2 mm by the application of a force. If young's modulus of steel is 2xx10^(11)N//m^(2), then the energy stored in the wire is

If the shearing stressin 4.2 xx 10^8 N//m^2 and the shearing strain is 5 xx 10^-3 . The modulus of rigidity is

The diameter of a brass rod is 4 mm and Young's modulus of brass is 9 xx 10^(10) N//m^(2) . The force required to stretch by 0.1 % of its length is

A 20 N stone is suspended from a wire and its length changes by 1% . If the Young's modulus of the material of wire is 2xx10^(11)N//m^(2) , then the area of cross-section of the wire will be

The pressure that has to be applied to the ends of a steel wire of length 10cm to keep its length constant when its temperature is raised by 100^@C is : (For steel Young's modulus is 2xx10^11 Nm^-2 and coefficient of thermal expansion is 1.1xx10^-5K^_1 )

The strain energy per unit volume is 6.25 xx lO^-4 J/m^3 .The young’s Modulus of the wire is 2 xx 10^10 N//m^2 . Calculate strain.

A brass wire of length 4.5m with cross-section area of 3xx10^(-5) m^2 and a copper wire of length 5.0 m with cross section area 4xx10^(-5) m^2 are stretched by the same load. The same elongation is produced in both the wires. Find the ratio of Young’s modulus of brass and copper.

A wire of mild steel has an initial length 1.5 m and diameter 0.60 mm gets extended by 6.3 mm when a certain force is applied to it. If Young's modulus of mild steel is 2.1 xx 10^11 N/m^2 . Calculate the force applied

A pendulumd made of a uniform wire of cross sectional area (A) has time T.When an additionl mass (M) is added to its bob, the time period changes to T_(M). If the Young's modulus of the material of the wire is (Y) then 1/Y is equal to: