Sunday, November 24, 2019
Electromagnetic Induction and Faradays Law
Electromagnetic Induction and Faraday's Law Electromagnetic induction (also known as Faradays law of electromagnetic induction or just induction, but not to be confused with inductive reasoning), is a process where a conductor placed in a changing magnetic field (or a conductor moving through a stationary magnetic field) causes the production of a voltage across the conductor. This process of electromagnetic induction, in turn, causes an electrical current- it is said to induce the current. Discovery of Electromagnetic Induction Michael Faraday is given credit for the discovery of electromagnetic induction in 1831, though some others had noted similar behavior in the years prior to this. The formal name for the physics equation that defines the behavior of an induced electromagnetic field from the magnetic flux (change in a magnetic field) is Faradays law of electromagnetic induction. The process of electromagnetic induction works in reverse as well, so that a moving electrical charge generates a magnetic field. In fact, a traditional magnetà is the result of the individual motion of the electrons within the individual atoms of the magnet, aligned so that the generated magnetic field is in a uniform direction. In non-magnetic materials, the electrons move in such a way that the individual magnetic fields point in different directions, so they cancel each other out and the net magnetic field generated is negligible. Maxwell-Faraday Equation The more generalized equation is one of Maxwells equations, called the Maxwell-Faraday equation, which defines the relationship between changes in electrical fields and magnetic fields. It takes the form of: âËâ¡Ãâ"E ââ¬â âËâB / âËât where the âËâ¡Ãâ" notation is known as the curl operation, the E is the electric field (a vector quantity) and B is the magnetic field (also a vector quantity). The symbols âËâ represent the partial differentials, so the right-hand of the equation is the negative partial differential of the magnetic field with respect to time. Both E and B are changing in terms of time t, and since they are moving the position of the fields are also changing.
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