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What is the vertex of the absolute value function defined by ƒ(x) = |x - 2| - 7?
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What is the vertex of the absolute value function defined by ƒ(x) = |x - 2| - 7?

User Lisa Ta
by
7.9k points

2 Answers

4 votes
x - 2 = 7 , x - 2 = - 7
x = 9 , x = - 5
User Cocoahero
by
7.2k points
7 votes

Answer:

The vertex is at


(2,-7)

Explanation:

We can get the vertx by graphing or by analysing the function.

Let's analyse.

The parent function of the given one is


g(x)=|x|

And the given one is
f(x)=|x-2|-7

Specifically, the given function is a transformed function moved 2 units rightwards and 7 downwards.

We know that the parent function has vertex at
(0,0), but with these decribed transformation, the function has vertex at
(2,-7).

You can see this in the image attached, which shows the given function and its vertex.

Therefore, the vertex is at
(2,-7)

What is the vertex of the absolute value function defined by ƒ(x) = |x - 2| - 7?-example-1
User Guilherme Alencar
by
7.1k points
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