How do you write $ln (13)$ $ln(13)$ in exponential form?

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How do you write $ln (13)$ $ln(13)$ in exponential form?

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Answer 1 · 2015-06-26T14:33:49

If $x = ln (13)$ $x=ln(13)$ , then $e^{x} = 13$ $e^(x)=13$ is the exponential form.

Explanation:

In general, the equations $x = {log}_{b} (y)$ $x=log_{b}(y)$ and $b^{x} = y$ $b^{x}=y$ are equivalent (it's assumed that $b > 0$ $b>0$ , $b \neq 0$ $b!=0$ , and $y > 0$ $y>0$ here).

$b^{x} = y$ $b^{x}=y$ is the exponential form of $x = {log}_{b} (y)$ $x=log_{b}(y)$ and $x = {log}_{b} (y)$ $x=log_{b}(y)$ is the logarithmic form of $b^{x} = y$ $b^{x}=y$ .

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How do you write $ln (13)$ $ln(13)$ in exponential form?

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How do you write $ln (13)$ $ln(13)$ in exponential form?