In example (7), find the tension T at time I developed in the loop as a result of induced current.

A ring of mass m and radius r is rotated in uniform magnetic field B which is perpendicular to the plane of the loop with constant angular velocity omega_(0) .Find the net ampere force on the ring and the tension developed in the ring if there is a current i in the ring.Current and rotation both are clockwise.

Find the current in the loop

The electric current flowing in a wire in the direction from B to A decreasing. Find out the direction of the induced current in the metallic loop kept above the wire as shown.

Current in a long current carrying wire is I=2t A conducting loop is placed to the right of this wire. Find a. magnetic flux phi_B passing through the loop. b. induced emf|e| prodced in the loop. c. if total resistance of the loop is R , then find induced current I_("in") in the loop.

A constant current I flows through a long straight wire as shown in figure. A square loop starts moving towards righ with as constant speed v . a Find induced emf produced i the loop as a function x b. If total resistance of the loop is R , then find induced current in the loop,

A loop shown in the figure is immersed in the varying magnetic field B=B_0t , directed into the page. If the total resistance of the loop is R , then the direction and magnitude of induced current in the inner circle is

A loop having negligible self inductance but a constant resistance is placed in a uniform magnetic field but varying with time at a rate of 1 T//s . The area of loop is 1 m^(2) and it is single turn. If at some time t, the current in the loop is 1 A, the rate of change of current would be.

A loop of flexible conducting wire of length 0.5 m lies in a magnetic field of 1.0 T perpendicular to the plane of the loop. Show that when a current as shown in Fig. 1.112 is passed through the loop, it opens into a circle. Also calculate the tension developed in the wire if the current is 1.57 A.

Consider the situation shown in figure. If the current I in the long straight wire xy is increased at a steady rate the induced current in loop A and B will be

A wire is bent in the form of a square of side a in a varying magnetic field vec(B)= prop B_(0) t hat(k) . If the resistance per unit length is lamda , then find the following (i) The direction of induced current (ii) The current in the loop (iii) Potential difference between P and Q