What is the vertex of y=4x-x^2 y=4xx2?

1 Answer
Aviv S.
Feb 13, 2018

The vertex is at the point (2, 4)(2,4).

Explanation:

If you write your quadratic in standard form, (ax^2+bx+cax2+bx+c) then the xx-coordinate of the vertex is calculated by (-b)/(2a)b2a.

Let's convert that equation to standard form:

y=4x-x^2y=4xx2

quad=-x^2+4x

quad=-1x^2+4x+0

In this case, our a value is -1, the b value is 4, and the c value is 0. This means the x-coordinate of the vertex is (-4)/(2(-1)) which is 2.

Now, to find the y-coordinate, simply plug 2 into the equation and see the value that it returns:

y=-1x^2+4x+0

quad=>-1(2)^2+4(2)+0

quad=-1*4+8

quad=-4+8

quad=4

Now we know that the vertex is at an x of 2 and a y of 4, or the point (2, 4).

You can check this by graphing the parabola: graph{4x-x^2 [-8, 12, -2, 8]}

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