How do you find the vertex of #y=3x^2 - 12x - 2#?

1 Answer
Shantelle
Jul 19, 2018

The vertex is at #(2, -14)#.

Explanation:

To find the vertex of a standard quadratic equation #y = ax^2 + bx + c#, we first use the formula #-b/(2a)# to find the #x# value of the vertex, or #x_v#. We know that #a = 3# and #b = -12#:
#x = -b/(2a) = (-(-12))/(2(3)) = 12/6 = 2#

To find the #y# value of the vertex we simply plug in the #x# value back into the equation and solve for #y#:
#y = 3x^2 - 12x - 2#

#y = 3(2)^2 - 12(2) - 2#

#y = 3(4) - 24 - 2#

#y = 12 - 24 - 2#

#y = -14#

Therefore, the vertex is at #(2, -14)#.

Hope this helps!

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