How do you find the derivative of $y=lne^x$ ?

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How do you find the derivative of $y=lne^x$ ?

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Answer 1 · 2016-12-05T21:18:09

$dy/dx=1$

Explanation:

We should know for this approach that $d/dxln(x)=1/x$ .

Applying the chain rule to this derivative tells us that if we were to have a function $u$ instead of just the variable $x$ within the logarithm, we see that $d/dxln(u)=1/u*(du)/dx$ .

So we see that $d/dxln(e^x)=1/e^x*d/dx(e^x)$

Since $d/dx(e^x)=e^x$ :

$d/dxln(e^x)=1/e^x*e^x=1$

Answer 2 · 2016-12-05T21:22:43

$dy/dx=1$

Explanation:

The logarithm function and exponential functions are inverse functions--they undo one another! This means that $log_a(a^x)=x$ and $a^(log_a(x))=x$ .

Recall that the function $ln(x)$ is the logarithm with a base of $e$ , that is, $ln(x)=log_e(x)$ . Thus:

$y=ln(e^x)=log_e(e^x)=x$

So

$dy/dx=1$

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How do you find the derivative of $y=lne^x$ ?

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