What is the domain and range of $f(x) = abs((9-x^2)/(x+3))$ ?

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What is the domain and range of $f(x) = abs((9-x^2)/(x+3))$ ?

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Answer 1 · 2016-03-16T23:37:15

In this case the range is pretty clear. Because of the absolute bars $f(x)$ can never be negative

Explanation:

We see from the fraction that $x!=-3$ or we divide by zero.
Otherwise:
$9-x^2$ can be factored into $(3-x)(3+x)=(3-x)(x+3)$ and we get:
$abs(((3-x)cancel(x+3))/cancel(x+3))=abs(3-x)$

This gives no restriction on the domain, except the earlier one:
So:
Domain: $x!=-3$
Range: $f(x)>=0$

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What is the domain and range of $f(x) = abs((9-x^2)/(x+3))$ ?

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