How do you find the real zeros of $y=3/4(x-2/3)^3-16/9$ ?

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How do you find the real zeros of $y=3/4(x-2/3)^3-16/9$ ?

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Answer 1 · 2018-03-07T00:51:33

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Explanation:

You rewrite $3/4(x-2/3)^3-16/9 = 0$ in the form :

$3/4(x-2/3)^3=16/9$

so that

$(x-2/3)^3=16/9 times 4/3 = (4/3)^3$

The only real solution to $x^3=a^3$ is $x=a$ (the other two are $x=a omega$ and $x=a omega^2$ , where $omega=exp({2pi}/3i)$ and $omega^2$ are the complex cube roots of unity), so

$x-2/3 = 4/3$
and thus
$x = 2/3+4/3=2$

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How do you find the real zeros of $y=3/4(x-2/3)^3-16/9$ ?

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How do you find the real zeros of y=3/4(x-2/3)^3-16/9y=3/4(x-2/3)^3-16/9?

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How do you find the real zeros of $y=3/4(x-2/3)^3-16/9$ ?