Question

How do you solve the quadratic equation by completing the square: `y^2 + 16y = 2`?

Answer 1

`y= -8+-sqrt(66)`

Explanation:

to complete the square you use the formula:

`ax^2+bx+c`

a must equal 1

`c=(b/2)^2`

the completed square is:

`(x+b/2)^2`

Here we go, in your function the y is the general formula's x:

`y^2 + 16y = 2`

`y^2 + 16y +underbrace(c = 2+c)`
we add c to both sides so we don't alter the equation

now solve c:

`c=(b/2)^2 = (16/2)^2=64`

`y^2 + 16y +64 = 2+64`

now complete the square:

`(y+8)^2 = 66`

Now solve:

`sqrt((y+8)^2) = +-sqrt(66)`

`y+8 = +-sqrt(66)`

`y= -8+-sqrt(66)`