Question

How do you solve `x^ { 2} - 10x + 16= 0`?

Answer 1

`x=8,x=2`

Explanation:

The goal here is to find two numbers who product is `16` and sum is `-10`.

This requires a little of trial and error but eventually these two numbers are `-8` and `-2` since:

`-8times-2=16`

`-8+-2=-10`

So we now have

`(x-8)(x-2)=0`

Now we solve for `x` separately by writing the above equation into two separate equations:

`x-8=0->x=8`

`x-2=0->x=2`

Answer 2

See a solution process below:

Explanation:

First, factor the left side of the equation as:

`(x - 2)(x - 8) = 0`

Now, solve each term on the left for `0` to find the solutions:

Solution 1:

`x - 2 = 0`

`x - 2 + color(red)(2) = 0 + color(red)(2)`

`x - 0 = 2`

`x = 2`

Solution 2:

`x - 8 = 0`

`x - 8 + color(red)(8) = 0 + color(red)(8)`

`x - 0 = 8`

`x = 8`

The Solutions Are: `x = 2` and `x = 8`