How do you graph #y=3(x+3)^2 - 3#?

2 Answers
Konstantinos Michailidis
Sep 9, 2015

If you expand it you get #y=3x^2+18x+24 #

Explanation:

With graph

graph{3x^2+18x+24 [-10, 10, -5, 5]}

Jim H
Sep 9, 2015

See the explanation section.

Explanation:

For #y = a(x-h)^2 +k# the vertex is #(h,k)# and the graph opens from the vertex through the points #x = h +-1# and #y = k +a# That is, through the points #(h+1, k+a)# and #(h-1, k+a)#

For #y = 3(x+3)^2-3#, the vertex is #(-3,-3)# and with #a=3#, the parabola opens upward through the points #x= -3 +-1# and #y = -3+3 = 0#. That is, through the points #(-2,0)# and #(-4,0)#

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