How do you find the inverse of $y = - \frac{13}{x}$ $y = -13/x$ and is it a function?

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How do you find the inverse of $y = - \frac{13}{x}$ $y = -13/x$ and is it a function?

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Answer 1 · 2018-02-16T12:02:39

See below.

Explanation:

To find the inverse we need to express $x$ $bbx$ as a function of $y$ $bby$ :

$y = - \frac{13}{x}$ $y=-13/x$

$x y = - 13$ $xy=-13$

$x = - \frac{13}{y}$ $x=-13/y$

Substituting $x = y$ $x=y$

$f^{- 1} (x) = - \frac{13}{x}$ $f^-1(x)=-13/x$

This is an example of where a function is its own inverse.

We know that if we reflect the graph of a function in the line $y = x$ $bb(y=x)$ , we will obtain its inverse. If you observe the graph of $bb(y=-13/x)$ , after reflecting it in the line $bb(y=x)$ it remains unchanged.

Hence it is its own inverse.

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How do you find the inverse of $y = - \frac{13}{x}$ $y = -13/x$ and is it a function?

1 Answer

Explanation:

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Science

Math

Humanities

... and beyond

How do you find the inverse of y = -13/xy=−13x y = -13/x and is it a function?

1 Answer

Explanation:

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How do you find the inverse of $y = - \frac{13}{x}$ $y = -13/x$ and is it a function?