Question

What is the function written in vertex form? f(x) = 4(x 6)2 10 f(x) = 4(x 6)2 – 26 f(x) = 4(x 6)2 – 134 f(x) = 4(x 6)2 154

Answer 1

The required vertex form of the given equation is a) $4(x-6)^2 +10$ is correct

the function  $y=4x^2+24x+154$ is given,

What is vertex form?

vertex form of a equation $y=ax^2+bx+c$ is given by $y=a(x-h)^2+k$.

since $y=4x^2+24x+154$
Now h = - b/2a

   h = -N

Now at x = 0
  k = 10
vector form can be given by  $4(x+6)^2 +10$

The question is incomplete. The question could be:

what is the correct vertex form of equation $y=4x^2+24x+154$?
a)$4(x+6)^2 +10$
b)$4(x-6)^2 -26$
c)$4(x-6)^2 -134$
d)$4(x-6)^2 +154$

Thus, the vector form of the given function is $4(x+6)^2 +10$

learn more about vector form here:
brainly.com/question/13921516

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