How do you simplify $e^lnx$ ?

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How do you simplify $e^lnx$ ?

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Answer 1 · 2016-03-22T20:27:19

$e^lnx=x$

Explanation:

let $y=e^lnx$
$ln y=lne^lnx$ ->Take ln of both sides
$lny = lnx * ln e$ -> use the property $log_b x^n = nlog_b x$
$lny=lnx(1)$ -> $ln_e e = 1$ -> from the property $log_b b = 1$
$lny = ln x$
Therefore $y=x$

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How do you simplify $e^lnx$ ?

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