How do you find the inverse of $y=e^x$ ?

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How do you find the inverse of $y=e^x$ ?

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Answer 1 · 2016-01-15T12:36:32

The inverse function is $lnx$ .

Explanation:

By definition, $y=f^(-1)(x)ifff(y)=x$

$iffe^y=x$

$iffy=lnx$ .

Answer 2 · 2016-01-15T12:43:25

$x=ln(y)$

Explanation:

Given
$color(white)("XXX")y=e^x$

Taking the natural logarithm of both sides
$color(white)("XXX")color(red)(ln(y)=ln(e^x))$

By definition of $ln$
$color(white)("XXX")ln(a)=$ the value. $b$ , needed to make $e^b=a$
(you should memorize this)
therefore
$color(white)("XXX")ln(e^x)=$ the value, $b$ , needed to make $e^b=e^x$
that is
$color(white)("XXX")ln(e^x)=x$

Therefore $color(red)(ln(y)=ln(e^x))$
implies
$color(white)("XXX")color(blue)(x=ln(y))$

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How do you find the inverse of $y=e^x$ ?

2 Answers

Explanation:

Explanation:

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