How do I calculate the inverse function of this function? f(x)=(1+\ln(x))/(1-\ln(x))

ximblajy

ximblajy

Open question

2022-08-31

How do I calculate the inverse function of this function?
I have this function:
f ( x ) = 1 + ln ( x ) 1 ln ( x )
And i should calculate f 1 ( x )
I am not really sure how to proceed but I think that the first step would be to have x alone, how do I achieve that?

Answer & Explanation

Jonathan Bailey

Jonathan Bailey

Beginner2022-09-01Added 10 answers

Let f ( x ) = 1 + ln x 1 ln x = y 1
f 1 ( y ) = x
Applying Componendo & Dividendo,
ln x = y 1 y + 1
x = e ( y 1 y + 1 ) which is f 1 ( y )
daufleguos

daufleguos

Beginner2022-09-02Added 6 answers

Note, that when inversing a function you should also determine the set over which the inverse function is defined.
Set y = f ( x ) and solve for x:
y = 1 + ln x 1 ln x y ( 1 ln x ) = 1 + ln x y 1 = y ( ln x ) + ln x
which gives
( y 1 ) = ( y + 1 ) ln x ln x = y 1 y + 1
which gives by exponentiating both sides to the power e
e ln x = e y 1 y + 1
which reduces to
x = e y 1 y + 1
Therefore
f 1 ( y ) = e y 1 y + 1
Note, also that this holds for all y R { 1 }

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