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(A) According to Faraday's law of electromagnetic induction,the induced e.m.f. is given by $|e| = |\frac{d\phi}{dt}|$,where $\phi = B \cdot A$. Since

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$X, A \alpha$

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(A) According to Faraday's law of electromagnetic induction,the induced e.m.f. is given by $|e| = |\frac{d\phi}{dt}|$,where $\phi = B \cdot A$. Since the magnetic field $B(t) = B_0 + \alpha t$ is uniform over the area $A$ of the solenoid,the magnetic flux linked with the ring is $\phi = B(t) \cdot A = (B_0 + \alpha t)A$. The magnitude of the induced e.m.f. is $|e| = |\frac{d}{dt}((B_0 + \alpha t)A)| = A \frac{d}{dt}(B_0 + \alpha t) = A \alpha$. According to Lenz's law,the induced current (if the circuit were closed) would oppose the increase in magnetic flux. Since the magnetic field is directed towards the right and increasing,the induced magnetic field must be directed towards the left. By the right-hand rule,the induced current would flow in an anticlockwise direction (as viewed from the right). In an anticlockwise current flow,positive charges accumulate at the end $X$ and negative charges at the end $Y$. Thus,end $X$ has an excess of positive charge.

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