Lne^x=5 I know that x=5 but why?

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Answer 1 · 2015-10-10T19:15:29

The function #e^x:RR->(0, oo)# and #ln:(0, oo)->RR# are inverse functions of one another.

So for any #x in RR#, #ln(e^x) = x# and for any #x in (0, oo)#, #e^ln(x) = x#

The natural logarithm #ln(x)# is defined such that #e^ln(x) = x#

So what about #ln(e^x)# ?

By the definition of #ln#, we have #e^(ln(e^x)) = e^x#

Since #e^x# is a one-one function, we can deduce that the exponents #ln(e^x)# and #x# must be equal.

That is:

#ln(e^x) = x#