Find all complex numbers z such that z^4 = -4 Note: All solutions should be expressed in the form a + bi, where a and b are real numbers.

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Find all complex numbers z such that z^4 = -4 Note: All solutions should be expressed in the form a + bi, where a and b are real numbers.

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Find all complex numbers z such that z^4 = -4

Note: All solutions should be expressed in the form a + bi, where a and b are real numbers.

Guest Jan 2, 2021

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Guest · Answer 1 · 2021-01-02T09:20:42

By Hamilton's Theorem, the solutions are z = 4^{1/4}*e^(pi*i/4), 4^{1/4}*e^(pi*i/4 + pi/4), 4^{1/4}*e^(pi*i/4 + 2*pi/4), and 4^{1/4}*e^(pi*i/4 + 3*pi/4). Since 4^{1/4} = sqrt(2) and e^(pi*i/4) = (1 + i)/sqrt(2), the first solution is 1 + i. Then the other roots work out as

4^{1/4}*e^(pi*i/4 + pi/4) = 1 - i,

4^{1/4}*e^(pi*i/4 + 2*pi/4) = -1 - i, and

4^{1/4}*e^(pi*i/4 + 3*pi/4) = -1 + i.

Find all complex numbers z such that z^4 = -4 Note: All solutions should be expressed in the form a + bi, where a and b are real numbers.

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Find all complex numbers z such that z^4 = -4 Note: All solutions should be expressed in the form a + bi, where a and b are real numbers.

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