How do you solve $(x + 5) (x^{2} - 7 x + 12) = 0$ $(x+5)(x^2-7x+12)=0$ ?

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How do you solve $(x + 5) (x^{2} - 7 x + 12) = 0$ $(x+5)(x^2-7x+12)=0$ ?

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Answer 1 · 2015-09-28T10:27:40

The solutions are $- 5$ $-5$ , $3$ $3$ and $4$ $4$ .

Explanation:

A multiplications gives zero as a result if and only if at least one of his factors equals zero. So that's what you need to impose.

The first factor is quite simple: $x + 5$ $x+5$ equals zero if and only if $x = - 5$ $x=-5$ .

The second factor is a parabola, whose zeroes you may find through the classical formula ${- b \pm \frac{\sqrt{b^{2} - 4 a c}}{2} a$ ${-b \pm \sqrt{b^2-4ac}/2a$ , but in simple cases as this, I prefer this simplier one: if the coefficient of $x^{2}$ $x^2$ is one, then you can read your equation like this:

$x^{2} - s x + p = 0$ $x^2-sx+p=0$ , where $s$ $s$ is the sum of the roots, and $p$ $p$ is their product. So, you have $- s = - 7$ $-s=-7$ , and $p = 12$ $p=12$ . This means that we are looking for two numbers $a$ $a$ and $b$ $b$ such that $a + b = 7$ $a+b=7$ , and $a \cdot b = 12$ $a*b=12$ . It's easy to see, with barely no calculations, that these numbers are $3$ $3$ and $4$ $4$ .

So, your equation is solved by three numbers, namely $- 5$ $-5$ , $3$ $3$ and $4$ $4$ .

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How do you solve $(x + 5) (x^{2} - 7 x + 12) = 0$ $(x+5)(x^2-7x+12)=0$ ?

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How do you solve (x+5)(x^2-7x+12)=0(x+5)(x2−7x+12)=0 (x+5)(x^2-7x+12)=0?

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How do you solve $(x + 5) (x^{2} - 7 x + 12) = 0$ $(x+5)(x^2-7x+12)=0$ ?