What is the vertex form of $y=-13x^2-x-19$ ?

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Answer 1 · 2017-05-27T13:25:55

$y = -13(x+1/26)^2-987/52$ is vertex form

This gives the vertex as $(-1/26, -18 51/52)$

The equation of a parabola can be written as:

$y = ax^2 +bx+c" "$ or in vertex form: $" "y = a(x+b)^2 +c$

We have $" "y = -13x^2-x-19$

To change an equation into vertex form:

Step 1. Make $1x^2$ . Divide out $a$ , the coefficient of $x^2$

$y = -13(x^2+x/13+19/13)$

Step 2. Add and subtract $color(blue)((b/2)^2)$ (same as $+0)$

$y = -13(x^2+x/13 color(blue)(+(1/26)^2 -(1/26)^2)+19/13)$

Step 3. Write 3 terms as a perfect square and simplify the others

$y = -13((color(red)(x^2+x/13 +(1/26)^2)) -color(green)((1/676)+19/13))$

$y = -13(color(red)((x+1/26)^2) color(green)(+987/676))$

Step 4: Multiply by $a$ outside the bracket

$y = -13color(red)((x+1/26)^2) color(green)(-987/52)" "larr$ vertex form

This gives the vertex as $(-1/26, -18 51/52)$

graph{y = -13x^2-x-19 [-0.2135, 0.4115, -19.2013, -18.8888]}

What is the vertex form of y=-13x^2-x-19y=-13x^2-x-19?