How do you find the asymptotes for $f(x)=(2x)/(sqrt (9x^2-4))$ ?

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How do you find the asymptotes for $f(x)=(2x)/(sqrt (9x^2-4))$ ?

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Answer 1 · 2016-03-27T03:56:59

Asymptotes: f(x) = y = $+-2/3$ and $x=+-2/3$ ..

Explanation:

Let y = f(x). It is defined for $9x^2-4>0$ . So, $|x|>2/3$ .

$yto+-oo$ as $xto+-2/3$ . So, $x=+-2/3$ are asymptotes..

Inversely, solve for x.
$x=(2y)/sqrt(9y^2-4)$ .
Interestingly the form is the same. So, $|y|>2/3$ .

$xto+-oo$ as $yto+-2/3$ . So, $y=+-2/3$ are asymptotes..

The graph comprises four branches symmetrical about the origin in four regions:

Both x and $y > 2/3$ in the first quadrant, $x<-2/3$ and $y > 2/3$ in the second quadrant, both x and $y < -2/3$ in the third quadrant and $x > 2/3$ and $y < -2/3$ in the fourth quadrant.

As a whole, the graph is outside of $|x| <=2/3 and |y|<=2/3$ .

In this formula, $f^(-1)-=f$ , like f(x) = 1/x. Indeed, interesting.

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How do you find the asymptotes for $f(x)=(2x)/(sqrt (9x^2-4))$ ?

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Explanation:

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How do you find the asymptotes for f(x)=(2x)/(sqrt (9x^2-4))f(x)=(2x)/(sqrt (9x^2-4))?

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How do you find the asymptotes for $f(x)=(2x)/(sqrt (9x^2-4))$ ?