A wire ab of length l, mass m and resistance R slided on a smooth, thick pair of metallic rails joined at the bottom as shown in . The plane of the the rails makes an angle `theta` with the horizontal. A vertical magnetic field B exists in the ragion. if the wire slides on the rails at a constant speed v, show that `B = sqrt(mg R sin theta)/(vl^2 cos^theta)`.
(##HCV_VOL2_C38_E01_076_Q01##)

A wire of length l, mass m and resitance R slides without any friction down the parallel conducting rails of negligible resistance (Fig). The rails are connected to the wire so that the wire and the rails form a closed rectangular conducting loop. The plane of the rails makes an angle theta with the horizontal and a uniform vertical magnetic field of induction B exists throughout the region. Find the steady-state velocity of the wire

A copper wire ab of length l , resistance r and mass m starts sliding at t=0 down a smooth, vertical, thick pair of connected condcuting rails as shown in figure.A uniform magnetic field B exists in the space in a direction perpendicular to the plane of the rails which options are correct.

A rod of mass m , length l and resistance R is sliding down on a smooth inclined parallel rails with a cinstant velocity v . If a uniform horizontal magnetic field B exists, then find thevalue of B .

A wire cd of length l and mass m is sliding without friction on conducting rails ax and by as shown. The verticle rails are connected to each other with a resistance R between a and b . A uniform magnetic field B is applied perpendicular to the plane abcd such that cd moves with a constant velocity of

a conducting wire os mass m slides down two smooth conducting bars, set at an angle theta to the horizontal as shown in . The separatin between the bars is l . The system is located in the magnetic field B , perpendicular to the plane of the sliding wire and bars. The constant velocity of the wire is

A wire of length l , mass m and resistance R slides without any friction down the parallel conducting rails of negligible resistance . The rails are connected to each other at the bottom by a resistanceless rail parallel to the wire so that the wire and the rails form a closed rectangualr conducting loop. The plane of the rails makes an angle theta with the horizontal and a uniform vertical magnetic field of the inducetion B exists throughout the rregion. Find the steady state velocity of the wire.

A straight wire of length l can slide on two parallel plastic rails kept in a horizontal plane with a separation d. The coefficient of friction between the wire and the rails is mu . If the wire carries a current I, what minimum magnetic field should exist in the space in order to slide the wire on the rails.

Shows a wire ab of length l and resistance R which can slide on a smooth pair of rails. I_g is a current generator which supplies a constand current in in the circuit. If the wire ab slides at a speed v towards right, find the potential difference betwwen a and b .

Consider the situation shown in . The wire PQ has mass m, resistance r and can slide on the smooth, horizontal parallel rails separted by a distance l. The resistance of the rails is negligible. A uniform magnetic field B exists in the rectangualr region and a resistance R connects the rails outsided the field region At t= 0, the wire PQ is puched towards right with a speed v_0 . find (a) the current in the loop at an instant when the speed of the wire PQ is v, (b) the acceleration of the wire at this instatn, (c ) the velocity v as a function of x and (d) the maximum distance the wire will move.

Consider the situation shown in . The wire PQ has mass m, resistance r and can slide on the smooth, horizontal parallel rails separted by a distance l. The resistance of the rails is negligible. A uniform magnetic field B exists in the rectangualr region and a resistance R connects the rails outsided the field region At t= 0, the wire PQ is puched towards right with a speed v_0 . find (a) the current in the loop at an instant when the speed of the wire PQ is v, (b) the acceleration of the wire at this instatn, (c ) the velocity v as a function of x and (d) the maximum distance the wire will move.