What is the vertex form of y= x^2+x/2-4 ?

1 Answer
Alan P.
Dec 21, 2015

y=1(x-(-1/4))^2+(-4 1/16)

Explanation:

Given:
color(white)("XXX")y=x^2+x/2-4

Complete the square:
color(white)("XXX")y=x^2+1/2xcolor(green)(+(1/4)^2) -4 color(green)(-(1/4)^2)

Re-write as a squared binomial plus a simplified constant:
color(white)("XXX")y=(x+1/4)^2- 4 1/16

Complete vertex form is y=m(x-a)^2+b
so we adjust signs to get this form (an include the default value for m)
color(white)("XXX")y=1(x-(-1/4))^2+(-4 1/16)
which has its vertex at (-1/4,-4 1/16)
graph{x^2+x/2-4 [-3.813, 6.054, -4.736, 0.196]}

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