What is the derivative of $7^x$ ?

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What is the derivative of $7^x$ ?

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Answer 1 · 2018-03-09T12:44:40

$color(red)(d/(dx)(a^x)=a^x*lna$
$:.y=7^x=>y^'=7^x*ln7$

Explanation:

We know that
$color(blue)(f^'(x)=lim_(t to x)(f(t)-f(x))/(t-x))$ ,where $f(x)=7^x$
$=lim_(t to x)(7^t-7^x)/(t-x)$
$=7^xlim_(t to x)(7^(t-x)-1)/(t-x)$ ,
Take, $(t-x)=h$ , then, $t to x=>h to0$
$f^'(x)=7^xlim_(h to 0)(7^h-1)/h$ ,and, $color(red)(lim_(h to 0)(a^h-1)/h=lna$
$f^'(x)=7^x*ln7$

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