Question

How do you solve the equation by completing the square: `x^2 + 2x - 8 = 0`?

Answer 1

`x = 2` and `x = -4`

Explanation:

Let's rewrite our equation first, before completing the square:

`x^2+2x-8=0`

`x^2+2x + ? = 8 + ?`

To complete the square, we take the coefficient on the `x`-term, namely `2`, divide it by `2`, and square the result, giving us

`(2/2)^(2) = 1^2 = 1`

By replacing the `?` marks with our number `1`, we get

`x^2+2x+1 = 9`

In this case, we are looking for two numbers whose product gives us `1` and when added together, gives us `2`.

Since `1 * 1 = 1` and `1+1 = 2`, we can see that the numbers are `1` and `1`, which means that we can rewrite our equation in the following way:

`(x+1)^(2) = 9`

By taking the square root of both sides we get

`(x+1) = ± sqrt(9)`

`x+1 = ± 3`

Subtracting `1` from both sides gives us

`x = ± 3 -1`

So our solutions are `x = 2` and `x = -4`