A steel ring of radius r and cross-sectional area A is fitted on to a wooden disc of radius `R (R gt r )` . If Young's modulus of the steel is Y, then the force with which the steel ring is expanded is

A steel ring of radius r and cross section area A is fitted on to a wooden disc of radius R(Rgtr) . If Young's modulus be R, then the force with which the steel ring is expanded is

A metal ring of initial radius r and cross-sectional area A is fitted onto a wooden disc of radius R > r. If Youngs modules of metal is Y then tension in the ring is

A uniform ring of radius R and made up of a wire of cross - sectional radius r is rotated about its axis with a frequency f . If density of the wire is rho and young's modulus is Y . Find the fractional change in radius of the ring .

A thin ring of linear mass density λ and radius R having cross sectional area 'a' is rotating about it axis with angular speed 'ω' . If y is young modulus of ring, then choose the correct option(s). (A) dR =ωλ 2R3/Y (B) dR =3λ ω2R3/Y (C) dR =6ωλ 2R3/Y (D) dR=λ ω2R32/Y

A thin ring of linear mass density λ and radius R having cross sectional area 'a' is rotating about it axis with angular speed 'ω' . If y is young modulus of ring, then choose the correct option(s). (A) dR =ωλ 2R3/Y (B) dR =3λ ω2R3/Y (C) dR =6ωλ 2R3/Y (D) dR=λ ω2R32/Y

A steel wire is stretched by 1 kg wt . If the radius of the wire is doubled, its Young's modulus will

A steel wire of 4.0 m is stretched through 2.0 mm. The cross - sectional area of the wire is 2.0 mm^2. If young's modulus of steel is 2.0 xx10^(11) Nm^(-2) find (i) the energy density of the wire, (ii) the elastic potential energy stored in the wire.

A steel wire 4.0m in length is stretched through 2.0mm .The cross -sectional area of the wire is 2.0 mm^(2) .If young's modulus of steel is 2.0xx10^(11) N//m^(2) (a) the energy density of wire, (b) the elastic potential energy stored in the wire.

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

A steel rod has a radius 10 mm and a length of 1.0 m. A force stretches it along its length and produces a strain of 0.32% . Young's modulus of the steel is 2.0xx10^(11Nm^(-2) . What is the magnitude of the force stretching the rod?