Question

How do you solve `g^ { 2} - 14g = 51`?

Answer 1

See the entire solution process below:

Explanation:

First, subtraction `color(red)(51)` from each side of the equation to create a standard form quadratic equation:

`g^2 - 14g - color(red)(51) = 51 - color(red)(51)`

`g^2 - 14g - 51 = 0`

Next, we factor the quadratic as:

`(g + 3)(g - 17) = 0`

Now, solve each term on the left side of the equation for `0`:

Solution 1)

`g + 3 = 0`

`g + 3 - color(red)(3) = 0 - color(red)(3)`

`g + 0 = -3`

`g = -3`

Solution 2)

`g - 17 = 0`

`g - 17 + color(red)(17) = 0 + color(red)(17)`

`g + 0 = 17`

`g = 17`

The solution is: `g = -3` and `g = 17`

Answer 2

`g = -3" "` or `" "g = 17`

Explanation:

Here's one method:

Given:

`g^2-14g = 51`

Add `49 = (14/2)^2` to both sides to get:

`g^2-14g+49 = 100`

Both sides of the equation are perfect squares:

`(g-7)^2 = 10^2`

We can deduce:

`g-7 = +-10`

Adding `7` to both sides we find:

`g = 7+-10`

That is:

`g = -3" "` or `" "g = 17`