What is the vertex form of #y= x^2 - 10x - 9 #?

1 Answer
Rachel
Apr 19, 2018

#y=x^2 + 10x -9#

First, we need to complete the square

#y=color (green)((x^2 + 10x)) -9#

What would make #color(green)(t h i s)# #(x^2+10x)# a perfect square? Well, #5+5# equals #10# and #5 xx 5# equals #25# so let's try adding that to the equation:

#x^2+10x+25#

As a perfect square:

#(x+5)^2#

Now let's look at our original equation.

#y= (x+5)^2 -9 color(red)(-25)#

NOTE that we subtracted #25# after we added it. That's because we added #25#, but as long as we later subtract it, we haven't changed the value of the expression

#y = (x+5)^2 -34#

To check our work, let's graph our original function and what we have. If we did it right, they should be the same

graph{y=x^2+10x-9}

graph{y=(x+5)^2-34}

Looks like we were right!

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