Question

How do you solve `x^2-12x+32=0`?

Answer 1

`x=4` or `x=8`

Explanation:

`color(white)()`
Method 1 - Finding a pair of factors

Find a pair of factors of `32` with sum `12`.

The pair `4, 8` works in that `4xx8 = 32` and `4+8=12`

Hence we find:

`0 = x^2-12x+32 = (x-4)(x-8)`

So `x = 4` or `x = 8`

`color(white)()`
Method 2 - Completing the square

`0 = x^2-12x+32`

`= x^2-2(6x)+36-4`

`= (x-6)^2-2^2`

`= ((x-6)-2)((x-6)+2)`

`= (x-8)(x-4)`

Hence `x=8` or `x=4`

`color(white)()`
Method 3 - Quadratic formula

`x^2-12x+32 = 0`

is in the form `ax^2+bx+c = 0` with `a=1`, `b=-12`, `c=32`

This has roots given by the quadratic formula:

`x = (-b+-sqrt(b^2-4ac))/(2a)`

`= (12+-sqrt(12^2-4(1)(32)))/(2*1)`

`= (12+-sqrt(144-128))/2`

`= (12+-sqrt(16))/2`

`= (12+-4)/2`

`= 6+-2`

So `x=8` or `x=4`