How do you find the inverse of $f (x) = \frac{1}{4 x + 7}$ $f(x) =1/(4x+7)$ and is it a function?

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How do you find the inverse of $f (x) = \frac{1}{4 x + 7}$ $f(x) =1/(4x+7)$ and is it a function?

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Answer 1 · 2016-04-16T16:35:15

If $y = f (x) = \frac{1}{4 x + 7}, f^{- 1} (y) = \frac{1 - 7 y}{4 y} = x$ $y = f(x) = 1/(4x + 7), f^(-1)(y)=(1-7y)/(4y)=x$ is a function.
In simple words, if y is a function of x, inversely, x is a function of y. .

Explanation:

If y = f(x), the inverse relation is $x = f^{- 1} (y)$ $x=f^(-1)(y)$ .

The mapping, either way, is $1 - 1, or m a n y - 1, or 1 - m a n y$ $1-1, or many-1, or 1-many$

In f(x) = arc sin (x), it is 1-many mapping.

In f(x) = sin x, it is many-1 mapping.

Yet, by definition,

$f^{-!} (f (x)) = x and f (f^{- 1} (y)) = y$ $f^(-!)(f(x)) = x and f( f^(-1)(y))=y$ .

Here, solving for x, the inverse relation is $x = \frac{1 - 7 y}{4 y}$ $x = (1-7y)/(4y)$ .
This is 1-1 mapping. .

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How do you find the inverse of $f (x) = \frac{1}{4 x + 7}$ $f(x) =1/(4x+7)$ and is it a function?

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Explanation:

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