An insulting thin rod of length l has a ...

An insulting thin rod of length `l` has a linear charge density `rho(x)=rho_(0)(x)/(l)` on it. The rod is rotated about an axis passing through the origin (x=0) and perpendicular to the rod. If the rod makes n rotations per second, then the time averaged magnetic moment of the rod is :

`n rho_0 l^3`

`pi/3 rho_0 l^3`

`pi/2 n rho_0 l^3`

`pi n rho_0 l^3`

Text Solution

Verified by Experts

The correct Answer is:

`dq = rho dx = rho_0 (2x)/(L) dx`
`di = (dq)/(T) = (rho_0 (2x)/(L) dx )/( 1/n) = (2 rho_0 n)/(L) xdx`
`dm = di.pi x^2 = (2 rho_0 n)/(L) xdx. Pi x^2`
`m_("net") = int dm (2 rho_0 n pi)/(L) int_(0)^(L) x^3dx = 2 rho_0 n pi (L^4)/(4L) = (2 rho_0 n pi L^3)/(4) = pi/2 rho_0 nL^3`

Similar Questions

Explore conceptually related problems

A thin rod of length L of mass M is bent at the middle point O at an angle of 60^@ . The moment of inertia of the rod about an axis passing through O and perpendicular to the plane of the rod will be

Moment of inertia of a thin rod of mass m and length l about an axis passing through a point l/4 from one end and perpendicular to the rod is

A thin rod of length 4l, mass 4 m is bent at the point as shown in the figure. What is the moment of inertia of the rod about the axis passing through O and perpendicular to the plane of the paper?

An insulating rod of length I carries a charge q distrubuted uniformly on it. The rod is pivoted at its mid-point and is rotated at a frequency f about a fixed axis perpendicular to the the rod and passing through the pivot . The magnetic moment of the rod system is

The moment of inertia of thin rod of linear density lambda and length l about an axis passing through one end and perpendicular to its length is

A thin uniform rod of mass M and length L. Find the radius of gyration for rotation about an axis passing through a point at a distance of (L )/(4 ) from centre and perpendicular to rod.

Two identical rods each of mass M and length L are kept according to figure. Find the moment of inertia of rods about an axis passing through O and perpendicular to the plane of rods.

An insulting thin rod of length `l` has a linear charge density `rho(x)=rho_(0)(x)/(l)` on it. The rod is rotated about an axis passing through the origin (x=0) and perpendicular to the rod. If the rod makes n rotations per second, then the time averaged magnetic moment of the rod is :

Text Solution

Similar Questions

Recommended Questions