What is the derivative of $y=5^(x-2)$ ?

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What is the derivative of $y=5^(x-2)$ ?

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Answer 1 · 2016-09-18T15:37:43

$dy/dx= ln5 xx 5^(x- 2)$

Explanation:

Take the natural logarithm of both sides.

$lny = ln(5^(x- 2))$

Now, use the rule $ln(a^n) = nlna$

$lny = (x - 2)ln5$

$d/dx(lny) = d/dx((x - 2)(ln5))$

Differentiating the left-hand side using the rule $d/dx(lnx) = 1/x$ and implicit differentiation and the right-hand side using the product rule we have:

$1/y(dy/dx) = 1(ln5) + (x - 2)0$

$1/y(dy/dx) = ln5$

$dy/dx = ln5/(1/y)$

$dy/dx= yln5$

$dy/dx= ln5 xx 5^(x- 2)$ , since $y = 5^(x- 2)$

Hopefully this helps!

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What is the derivative of $y=5^(x-2)$ ?

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