How do you find the first and second derivative of $y=2^-x$ ?

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How do you find the first and second derivative of $y=2^-x$ ?

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Answer 1 · 2017-02-17T17:46:02

$f'(x)=-2^(-x)ln2$

Explanation:

The derivative of any function such as $b^x$ is $b^xlnb$ . Knowing that, we can clearly see b is 2. But since it's a negative x, we must use chain rule and multiply by $-1$

$f(x)=2^(-x)$ will become $f'(x)=-2^(-x)ln2$

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How do you find the first and second derivative of $y=2^-x$ ?

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How do you find the first and second derivative of $y=2^-x$ ?