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What is the value of e^ln7 x1 7e 7x 7
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3 votes
What is the value of e^ln7 x1
7e
7x
7

User Thomas Letsch
by
8.0k points

1 Answer

2 votes

Answer:

7x

Explanation:

Assuming your expression is :


e^(\ln 7x)

Then we simplify as follows


e^(\ln 7x)=e^(\ln x+\ln 7) since
\ln A+\ln B=\ln AB


\implies e^(\ln 7x)=e^(\ln x)* e^(\ln 7) since
a^(m+n)=a^m* a^n


\implies e^(\ln 7x)=x*7 since
e^(\ln a)=a


\implies e^(\ln 7x)=7x

User Abel Jojo
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