Math, asked by karwandeatharv, 4 months ago

nilopotent elements of z16

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Answered by ashwinibadgujar7382

Answer:

Let R be a ring. An element x of R is called nilpotent if there exists an integer m ≥ 0 such that xm = 0. (a) Show that every nilpotent element of R is either zero or a zero-divisor.

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nilopotent elements of z16​

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nilopotent elements of z16