How do you find the real or imaginary solutions of the equation $x^{3} + 64 = 0$ $x^3+64=0$ ?

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How do you find the real or imaginary solutions of the equation $x^{3} + 64 = 0$ $x^3+64=0$ ?

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Answer 1 · 2016-11-27T00:44:06

Use the sum of cubes identity to find the Real zero and a quadratic to solve and find the zeros are:

$4$ $4" "$ and $2 \pm 2 \sqrt{3} i$ $" "2 +-2sqrt(3)i$

Explanation:

The difference of squares identity can be written:

$a^{2} - b^{2} = (a - b) (a + b)$ $a^2-b^2 = (a-b)(a+b)$

We use this later with $a = (x - 2)$ $a=(x-2)$ and $b = \sqrt{- 12} = 2 \sqrt{3} i$ $b=sqrt(-12) = 2sqrt(3)i$ , but first...

The sum of cubes identity can be written:

$a^{3} + b^{3} = (a + b) (a^{2} - a b + b^{2})$ $a^3+b^3 = (a+b)(a^2-ab+b^2)$

Note that $x^{3}$ $x^3$ and $64 = 4^{3}$ $64 = 4^3$ are both perfect squares, so the sub of cubes identity applies directly:

$x^{3} + 64 = x^{3} + 4^{3}$ $x^3+64 = x^3+4^3$

$x^{3} + 64 = (x + 4) (x^{2} - 4 x + 16)$ $color(white)(x^3+64) = (x+4)(x^2-4x+16)$

We can factor the quadratic by completing the square:

$x^{2} - 4 x + 16 = x^{2} - 4 x + 4 + 12$ $x^2-4x+16 = x^2-4x+4+12$

$x^{2} - 4 x + 16 = {(x - 2)}^{2} - {(2 \sqrt{3} i)}^{2}$ $color(white)(x^2-4x+16) = (x-2)^2-(2sqrt(3)i)^2$

$x^{2} - 4 x + 16 = ((x - 2) - 2 \sqrt{3} i) ((x - 2) + 2 \sqrt{3} i)$ $color(white)(x^2-4x+16) = ((x-2)-2sqrt(3)i)((x-2)+2sqrt(3)i)$

$x^{2} - 4 x + 16 = (x - 2 - 2 \sqrt{3} i) (x - 2 + 2 \sqrt{3} i)$ $color(white)(x^2-4x+16) = (x-2-2sqrt(3)i)(x-2+2sqrt(3)i)$

Hence the zeros of $x^{3} + 64$ $x^3+64$ are:

$4$ $4" "$ and $2 \pm 2 \sqrt{3} i$ $" "2+-2sqrt(3)i$

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How do you find the real or imaginary solutions of the equation $x^{3} + 64 = 0$ $x^3+64=0$ ?

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How do you find the real or imaginary solutions of the equation $x^{3} + 64 = 0$ $x^3+64=0$ ?