What is the vertex and direction of this parabola $y=-3(x+2)^2+3$ ?

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What is the vertex and direction of this parabola $y=-3(x+2)^2+3$ ?

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Answer 1 · 2015-04-15T01:15:27

$y=a(x-h)^2+k$ has
vertex $(h,k)$ and
opens up if $a$ is positive (also written "if $a>0$ ")
opens down if $a$ is negative ("if $a <0$ ")

$y=-3(x+2)^2+3$ has $h = -2$ , $k = 3$ and $a = -3$

so the vertex is $(-2, 3)$ and the parabola opens down.

Here's the graph:

graph{y = -3(x+2)^2+3 [-12.31, 10.2, -5.625, 5.625]}

Answer 2 · 2015-04-15T01:22:37

A parabola in the form: $y = a(x - h)^2+k$ will open up if a > 0, and down if a < 0. Since a = -3 in your example, the parabola will open down and have a maximum at the vertex.

In the form $y = a(x - h)^2+k$ , (h,k) is the vertex. In your example, then, (-2,3) is the vertex. The maximum value is 3. Observe the graph below:
myscreenshot

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What is the vertex and direction of this parabola $y=-3(x+2)^2+3$ ?

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