The magnetic flux `(phi)` linked with a coil varies with time (t) as `phi=at^(n)`, where a and n are constants. The induced emf in the coil is e. Which of the following are correct?

The magnetic flux linked with a coil varies with time t as phi=at^(2)+bt+c , where a, b and c are constants. The emf induced in the coil will be zero at a time of

The magnetic flux linked with a coil satisfies the relation phi=4t^(2)+6t+9 Wb where t is the time in second. The e.m.f. induced in the coil at t =2 second is

The magnetic flux linked with a coil is phi = (3t^2- 2t + 2) mwb. What emf is induced in the coil at t = 1 sec?—

The current I in a coil varies with time as shown in the fig. The variation of induced emf with time would be

Which of following is correct (where n in N ) ?

Current (i) passing through a coil varies with time t as i=2t^(2) . At 1 s total flux passing through the coil is 10 Wb. Then

The magnetic flux (phi) (in Wb) linked with a 100 Omega coil changes with time t (in s) according to the relation phi=8t^(2)-2t+1 . What is the value of induced current (in A) in the coil at t = 2 s?

The magnetic flux through a coil is varying according to the relation phi=(4t^(2)+2t-5)Wb , t measured in seconds. Calculate the induced current through the coil at t = 2s, if the resistance of the coil is 5Omega .

Magnetic flux through a stationary loop with a resistance R varies during the time interval tau" as "phi=alphat(tau-t) where alpha is a constant. Calculate the amount of heat generated in the loop during the time interval tau .