How do you solve $x^{4} - 18 x^{2} + 81 = 0$ $x^4-18x^2+81=0$ ?

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How do you solve $x^{4} - 18 x^{2} + 81 = 0$ $x^4-18x^2+81=0$ ?

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Answer 1 · 2015-09-24T19:08:25

Refer to explanation

Explanation:

It is easy to see that

$x^{4} - 18 x^{2} + 81 = {(x^{2})}^{2} - 2 \cdot 9 \cdot x^{2} + 9^{2} = 0 \Rightarrow {(x^{2} - 9)}^{2} = 0$ $x^4-18x^2+81=(x^2)^2-2*9*x^2+9^2=0=>(x^2-9)^2=0$

Hence we have that ${(x^{2} - 9)}^{2} = 0 \Rightarrow x^{2} - 9 = 0 \Rightarrow x = 3 or x = - 3$ $(x^2-9)^2=0=>x^2-9=0=>x=3 or x=-3$

Be aware that roots $x_{1} = 3, x_{2} = - 3$ $x_1=3,x_2=-3$ have multiplicity of $2$ $2$
because we have a fourth degree polynomial.

Answer 2 · 2015-09-24T19:23:43

$x = \pm 3$ $x = +-3$

Explanation:

Normally, to solve a polynomial of degree 4 like the one here, you need to do synthetic division and use a lot of theorems and rules - it gets kinda messy. However, this one is special because we can actually make it a quadratic equation.

We do this by letting $u = x^{2}$ $u = x^2$ . Don't worry about where $u$ $u$ came from; it's just something we're using to simplify the problem. With $u = x^{2}$ $u = x^2$ , the problem becomes
$u^{2} - 18 u + 81 = 0$ $u^2-18u+81 = 0$ .

Doesn't that look better? Now we're dealing with a nice, easy quadratic equation. In fact, this is a perfect square; in other words, when you factor it, you get ${(u - 9)}^{2}$ $(u-9)^2$ . Of course, we could use the quadratic formula or completing the square to solve this equation, but you're usually not lucky enough to have a perfect square quadratic - so take advantage. At this point, we have:
${(u - 9)}^{2} = 0$ $(u-9)^2 = 0$

To solve, we take the square root of both sides:
$\sqrt{{(u - 9)}^{2}} = \sqrt{0}$ $sqrt((u-9)^2) = sqrt(0)$
And this simplifies to
$u - 9 = 0$ $u-9 = 0$

Finally, we add 9 to both sides to get
$u = 9$ $u = 9$

Awesome! Almost there. However, our original problem has $x$ $x$ s in it and our answer has a $u$ $u$ in it. We need to convert $u = 9$ $u = 9$ into $x =$ $x =$ something. But have no fear! Remember at the beginning we said let $u = x^{2}$ $u = x^2$ ? Well now that we have our $u$ $u$ , we just plug it back in to find our $x$ $x$ . So,
$u = x^{2}$ $u = x^2$
$9 = x^{2}$ $9 = x^2$
$\sqrt{9} = x$ $sqrt(9) = x$
$x = \pm 3$ $x = +-3$ (because ${(- 3)}^{2} = 9$ $(-3)^2 = 9$ and ${(3)}^{2} = 9$ $(3)^2 = 9$ )
Therefore, our solutions are $x = 3$ $x = 3$ and $x = - 3$ $x = -3$ . Note that $x = 3$ $x = 3$ and $x = - 3$ $x = -3$ are double roots, so technically, all of the roots are $x = 3$ $x = 3$ , $x = 3$ $x = 3$ , $x = - 3$ $x = -3$ , $x = - 3$ $x = -3$ .

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How do you solve $x^{4} - 18 x^{2} + 81 = 0$ $x^4-18x^2+81=0$ ?

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How do you solve $x^{4} - 18 x^{2} + 81 = 0$ $x^4-18x^2+81=0$ ?