How do you find the vertex and intercepts for y = - 2x^2 + 8x + 4y=2x2+8x+4?

1 Answer
David G.
Mar 16, 2016

The x-intercepts are simply the roots of the quadratic, x=0.58, x=3.4x=0.58,x=3.4.
The y-intercept is simply the constant term, y=4y=4.
The vertex is the point at which the slope (gradient) is zero, so differentiate and then solve to find the point (2,12)(2,12).

Explanation:

I'll use the method that requires calculus. Another answerer may be able to answer using only algebra.

First visualise the curve: the x^2x2 term is negative, so this is an 'upside-down' parabola, with its vertex at the top and the opening toward the bottom.

The x-intercepts occur when y=0y=0, so:

-2x^2+8x+4=02x2+8x+4=0

Solve using the quadratic formula or otherwise:

x=(-8+-sqrt(64-4*(-2)*4))/(2(-2))=(-8+-sqrt32)/-4x=8±644(2)42(2)=8±324
x=3.4 or 0.58x=3.4or0.58

To find the vertex, we know that it is a point where the gradient = 00. The first derivative of the expression gives the slope:

y=-2x^2+8x+4y=2x2+8x+4

(dy)/(dx)=-4x+8dydx=4x+8

Set this equal to zero:

0=-4x+80=4x+8

Solving, x=2x=2. To find the yy value of the vertex, substitute this in the original expression:

y=-2(2)^2+8(2)+4=12y=2(2)2+8(2)+4=12

Therefore the coordinates of the vertex are (2,12)(2,12).

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