Complex question (1 Viewer)

Jackson94 · Nov 24, 2011

Find all complex numbers z such that z^3 = 8i
Thanks in advance guys

slyhunter · Nov 24, 2011

z^3 = 8i

=>z^3 - 8i = 0

=>(z)^3 + (2i)^3 = (z + 2i)(z^2 - 2zi - 4) = 0

so z + 2i = 0 or

z^2 - 2zi - 4 = 0

when z + 2i = 0

z = -2i

when z^2 -2zi - 4 = 0

z = [2i +/- sqrt(-4 +16)]/2

z = [2i +/- sqrt(12)]/2

z = [2i +/- 2sqrt(3)]/2

z = i + sqrt(3) or i - sqrt(3)

So three roots are -2i, [i + sqrt(3)], [i - sqrt(3)]

Too lazy to latex.

AAEldar · Nov 24, 2011

slyhunter said:
z^3 = 8i

=>z^3 - 8i = 0

=>(z)^3 + (2i)^3 = (z + 2i)(z^2 - 2zi - 4) = 0

so z + 2i = 0 or

z^2 - 2zi - 4 = 0

when z + 2i = 0

z = -2i

when z^2 -2zi - 4 = 0

z = [2i +/- sqrt(-4 +16)]/2

z = [2i +/- sqrt(12)]/2

z = [2i +/- 2sqrt(3)]/2

z = i + sqrt(3) or i - sqrt(3)

So three roots are -2i, [i + sqrt(3)], [i - sqrt(3)]

Too lazy to latex.

You wrote down the wrong factor in the third line, should be $(z-2i)(z^2+2zi-4)=0$ and hence the first root is $z=2i$ .

slyhunter · Nov 25, 2011

$(2i)^3 = -8i$ though because $i^2 = -1$

Complex question (1 Viewer)

Jackson94

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slyhunter

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AAEldar

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slyhunter

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