Question

How do you solve `x^2+16x+24>6x`?

Answer 1

`x<-6`or `x>-4`

Explanation:

simplifying to `x^2+10x+24>0`

solving `x^2+10x+24=0` we get
`x_1=-4`
`x_2=-6`
so our inequality is equivalent to
`(x+4)(x+6)>0`
this gives us
`x>-4` or `x<-6`

Answer 2

`x in (-oo, -6) uu (-4, oo)`

Explanation:

Given:

`x^2+16x+24 > 6x`

Subtract `6x` from both sides to get:

`x^2+10x+24 > 0`

We can make the left hand side into a perfect square trinomial by adding `1`, so let us add `1` to both sides to get:

`(x+5)^2 = x^2+10x+25 > 1`

Note that this would give equality when `(x+5)^2 = 1`, i.e. when `x+5 = +-1`, i.e. when `x=-6` or `x=-4`.

Hence the inequality is achieved when:

`x < -6" "` or `" "x > -4`

In interval notation, when:

`x in (-oo, -6) uu (-4, oo)`