What is the vertex of $y = (x - 4) (x + 2)$ $y=(x-4) (x+2)$ ?

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What is the vertex of $y = (x - 4) (x + 2)$ $y=(x-4) (x+2)$ ?

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Answer 1 · 2017-04-27T07:11:27

The vertex is $(1, - 9)$ $(1,-9)$

Explanation:

You have 3 options here:

Option 1

Multiply out to get the usual form of $y = a x^{2} + b x + c$ $y = ax^2 +bx+c$
Complete the square to get vertex form: $y = a {(x + b)}^{2} + c$ $y= a(x+b)^2 +c$

Option 2
You already have the factors.

Find the roots , the $x$ $x$ -intercepts. $(y = 0)$ $(y=0)$
The line of symmetry is halfway between, them this gives $x$ $x$
Use $x$ $x$ to find $y$ $y$ . $(x, y)$ $(x,y)$ will be the vertex.

Option 3
- Find the line of symmetry from $x = - \frac{b}{2 a}$ $x = -b/(2a)$
Then proceed as for option 2.

Let's use option 2 as the more unusual one.

Find the $x$ $x$ -intercepts of the parabola:

$y = (x - 4) (x + 2) \leftarrow$ $y= (x-4)(x+2)" "larr$ make $y = 0$ $y=0$

$0 = (x - 4) (x + 2) \to$ $0= (x-4)(x+2)" "rarr$ gives $x = 4 and x = - 2$ $x=color(blue)(4) and x= color(blue)(-2)$

Find the midpoint between them: $x = \frac{4 + (- 2)}{2} = 1$ $color(red)(x) = (color(blue)(4+(-2)))/2 = color(red)(1)$

Find the $y$ $y$ -value using $x = 1$ $color(red)(x=1)$

$y = (x - 4) (x + 2) \to (1 - 4) (1 + 2) = - 3 \times 3 = - 9$ $y= (color(red)(x)-4)(color(red)(x)+2)" "rarr (color(red)(1)-4)(color(red)(1)+2) = -3 xx 3 = -9$

The vertex is at $(x, y) = (1, - 9)$ $(x,y) = (1,-9)$

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What is the vertex of $y = (x - 4) (x + 2)$ $y=(x-4) (x+2)$ ?

1 Answer

Explanation:

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What is the vertex of $y = (x - 4) (x + 2)$ $y=(x-4) (x+2)$ ?