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प्रश्न
Express Faraday-Lenz's law of electromagnetic induction in an equation form.
उत्तर
Assume that the magnetic flux across a coil or circuit changes by dΦm over time dt. Then, according to electromagnetic induction's second rule of Faraday, the amount of induced emf is
e α `(dΦ_m)/dt` or e = k `(dΦ_m)/dt`
where k is a proportionality constant and dΦm dt is the rate of change of magnetic flux associated with the coil. The Weber per second (dΦm/dt) and e (the volt) are chosen in SI units such that the constant of proportionality, k, equals unity. By combining Lenz's law of electromagnetic induction with Faraday's law, the induced emf
e = − `(dΦ_m)/dt`
where Lenz's rule specifies the polarity of the induced emf, and the minus sign is added to represent that polarity. In a closed loop, this polarity only establishes the direction of the induced current. The induced emf of a coil with N tightly wound loops will be N times larger than that of a single loop, meaning that
e = `− N (dΦ_m)/dt`
where dΦm/dt is the rate of change of magnetic flux through one loop.
