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Z^i Complex Numbers

Z^i Complex Numbers

[Solved] Complex numbers: Let z1 = - s q r t 3 + i and z2 = -3 + i

In the simple equation $ z^i = i^z $ how are all complex values found? $ z= \pm \, i, $ and what else? It can be found by inspection, but to find general solution: We take logs, there is a d. To divide z by w, multiply z=w by w=w so that the denominator becomes real;

= = = = + i: 1 5i 1 5i 1 + 5i 1 25i2 26 2 2 the arithmetic.

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[Solved] Complex numbers: Let z1 = - s q r t 3 + i and z2 = -3 + i

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