How do you graph the parabola #y= - x^2 - 6x - 8# using vertex, intercepts and additional points?

2 Answers
Feb 25, 2018

See below

Explanation:

Firstly, complete the square to put the equation in vertex form,

#y=-(x+3)^2+1#

This implies that the vertex, or local maximum (since this is a negative quadratic) is #(-3, 1)#. This can be plotted.

The quadratic can also be factorised,

#y=-(x+2)(x+4)#

which tells us that the quadratic has roots of -2 and -4, and crosses the #x axis# at these points.

Finally, we observe that if we plug #x=0# into the original equation, #y=-8#, so this is the #y# intercept.

All of this gives us enough information to sketch the curve:

graph{-x^2-6x-8 [-10, 10, -5, 5]}

Feb 25, 2018

First, turn this equation to vertex form:

#y=a(x-h)+k# with #(h,k)# as the #"vertex"#. You can find this by completing the square:

#y=-(x^2+6x+(3)^2-(3)^2)-8#

#y=-(x+3)^2+1#

So the #"vertex"# is at #(-3,1)#

To find the #"zeroes"# also known as #"x-intercept(s)"#, set #y=0# and factor (if it is factorable):

#0=-(x^2+6x+8)#

#0=-(x+4)(x+2)#

#x=-4,-2#

The #"x-intercepts"# are at #(-4,0)# and #(-2,0)#.

You can also use the quadratic formula to solve if it is not factorable (A discriminant that is a perfect square indicates that the equation is factorable):

#x=(-b+-sqrt(b^2-4ac))/(2a)#

#x=(-(-6)+-sqrt((-6)^2-4*-1*-8))/(2*-1)#

#x=(6+-sqrt(4))/-2#

#x=(6+-2)/-2#

#x=-4,-2#

The #"y-intercept"# is #c# in #ax^2+bx+c#:

The y-intercept here is #(0,-8)#.

To find additional points, plug in values for #x#:

#-(1)^2-6*1-8=>-15=>(1,-15)#

#-(2)^2-6*2-8=>-24=>(2,-24)#

etc.

A graph below is for reference:

graph{-x^2-6x-8 [-12.295, 7.705, -7.76, 2.24]}