Math, asked by ellfire1122, 4 months ago

Find the smallest positive integer n for the equality
$(1 + i)^{2n} = {(1 - i)}^{2n}$
is satisfied.

Answers

Answered by sangeetasathe8

Answer:

((1+i^2+2i)/(1-i^2))^2n=1. (2i/2)^2n=1. i^2n=1. 0,1 doesn't satisfy this equation but when n=2 the equation gets satisfied so smallest possible integer value ...

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Find the smallest positive integer n for the equality is satisfied.​

Answers

Find the smallest positive integer n for the equality
$(1 + i)^{2n} = {(1 - i)}^{2n}$
is satisfied.