Question

How do you use the important points to sketch the graph of `y=-2x^2`?

Answer 1

See below.

Explanation:

`y=-2x^2`

If we consider a quadratic in standard for; `ax^2+bx+c`

Here: `a=-2, b=0, c=0`

Since `a<0` we know that `y` will have an absolute maximum value on its axis of symmetry, where `x=(-b)/(2a)` which is `x=0` in this case.

Hence, `y_max = y(0) = 0`

This gives us our "important point" `(0,0)` as the absolute maximum of `y`.

As there are no other intercepts we are left with plotting points to produce the graph of `y` below.

E.g. `(x=+-1, y=-2), (x=+-2, y=-8)` etc.

graph{-2x^2 [-8.96, 8.82, -6.54, 2.35]}