Consider an infinite long cylinderical conductor of radius R carrying a current I with a non uniform current density `J=alphar` where a is a constant. Find the magnetic field for inside and outside prints.

An infinitely long cylinderical wire of radius R is carrying a current with current density j=alphar^(3) (where alpha is constant and r is the distance from the axis of the wire). If the magnetic fixed at r=(R)/(2) is B_(1) and at r=2R is B_(2) then the ratio (B_(2))/(B_(1)) is

A long cylindrical conductor of radius R carries I as shown. The current density is a function of radius r as j = br, where b is a constant. The magnetic field at a distance r_(1)(r_(1)ltR) is

A long cylindrical conductor of radius R carries a current i as shown in the figure. The current density J varies across the cross-section as J = kr^(2) , where, k is a constant. Find an expression for the magnetic field B at a distance r (lt R) from the axis

A long cylidrical conductor of radius R carries a current i as shown in figure. The current desity J is a function of radius according to J=br , where b is a constant. Find an expression for the magnetic field B a. at a distasnce r_1ltR and b.at a distance r_2gtR, measured from the axis.

A long straight solid metal wire of radius R carries a current I, uniformly distributed over its circular cross-section. Find the magnetic field at a distance r from axis of wire (i) inside and (ii) outside the wire.

A hollow cylindrical conductor of inner radius a and outer radius b carries a current I uniformly spread over its cross-section. Find the magnetic field induction at a point inside the body of the conductor at a distance r [where a lt r lt b ] from the axis of the cylinder.

A cylindrical conductor of radius R carrying current i along the axis such that the magnetic field inside the conductor varies as B=B_(0)r^(2)(0lt r leR) , then which of the following in incorrect?

A non-homogeneous cylinder of radius "R" carries a current I whose current density varies with the radial "distance "r" from the centre of the rod as J=sigma r where sigma is a constant.The magnetic field at a point "P" at a distance r

The figure shows the cross-section of a long cylindrical conductor of radius a carrying a uniformly distributed current i. The magnetic field due to current at P is :