How do you solve the inequality $x^2+3x-28<0$ ?

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How do you solve the inequality $x^2+3x-28<0$ ?

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Answer 1 · 2018-04-04T15:38:43

$-7 < x < +4$

Explanation:

$x^2+3x - 28 = x^2+7x-4x-48 = x(x+7)-4(x+7) = (x-4)(x+7)$

So, the inequality is

$(x-4)(x+7)<0$

Now. the left hand side vanishes for $x = -7$ and $x=+4$ .

If $x<-7$ , then both the factors $(x+7)$ and $(x-4)$ are negative, and the product is positive. On the other hand, $if x> +4$ , both factors are positive, leading once again to a positive product.

Thus the inequality is only satisfied when

$-7 < x < +4$

where the facor $(x+7)$ is positive and $(x-4)$ is negative.

You can see this in the graph below

graph{x^2+3x-28 [-10, 10, -40, 40]}

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How do you solve the inequality $x^2+3x-28<0$ ?

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How do you solve the inequality x^2+3x-28<0x^2+3x-28<0?

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How do you solve the inequality $x^2+3x-28<0$ ?