Question #64cd4

1 Answer
Bobert
Oct 16, 2017

Vertex: #(-3, -6)#, minimum
Domain: #(-oo, oo)#
Range: #(-6, oo)#

Explanation:

This parabola is written in vertex form, where #y=a(x-h)^2+k#. This form makes it simple to find what you need to know. The parabola has vertex #(h, k)#, which in this problem is #(-3, -6)#. Because #a# is positive, in this case just #1#, we know the parabola opens upward. Therefore, the vertex is the minimum point on the parabola. The domain of any parabola (when #y# is a function of #x#) is #(-oo, oo)# or all real numbers. Since, the parabola has a minimum height at #y=-6# and expands upward forever, its range is #(-6, oo)#.

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