What is the derivative of $\frac{e^{x}}{2^{x}}$ $e^x/2^x$ ?

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What is the derivative of $\frac{e^{x}}{2^{x}}$ $e^x/2^x$ ?

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Answer 1 · 2017-03-18T23:27:35

${(\frac{e}{2})}^{x} (1 - ln 2)$ $(e/2)^x(1-ln 2)$

Explanation:

Use the quotient rule $(u/v)' = (v*u' - u*v')/v^2$
Let $u = e^x$ , $u' = e^x$
Let $v = 2^x$ , $v' = 2^x ln 2$

$(u/v)' = (2^x*e^x - e^x*2^x ln 2)/(2^x)^2 = ((2^xe^x)(1-ln 2))/(2^(2x))$

Simplify using exponent rules $x^m/x^(2m) = 1/x^(2m-m) = 1/x^m$ :

$((2^xe^x)(1-ln 2))/(2^(2x)) = (e^x(1-ln 2))/ 2^x = (e/2)^x(1-ln 2)$

Answer 2 · 2017-03-19T00:04:29

$d/dx e^x/2^x = (1 - ln2)e^x/2^x$

Explanation:

Let $y = e^x/2^x$

Then take (Natural) logarithms of both sides; and use the rules of logs:

$:. ln y = ln {e^x/2^x}$
$" " = ln (e^x) - ln(2^x)$
$" " = xln (e) - xln(2)$
$" " = x - xln(2)$
$" " = x(1 - ln(2))$

Now, differentiate implicitly:

$1/ydy/dx \ = (1 - ln2)$
$:. dy/dx = (1 - ln2)y$
$" " = (1 - ln2)e^x/2^x$

Answer 3 · 2017-03-23T03:30:14

$(e/2)^x(1-ln2)$

Explanation:

$e^x/2^x = (e/2)^x$

The derivative of $a^x$ with respect to $x$ for any number $a$ is:

$d/dxa^x=a^xln(a)$

Therefore:

$d/dx(e/2)^x = (e/2)^xln(e/2)$

$color(white)"XXXXX-" = (e/2)^x(lne-ln2)$
$color(white)"XXXXX-" = (e/2)^x(1-ln2)$

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What is the derivative of $\frac{e^{x}}{2^{x}}$ $e^x/2^x$ ?

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