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31 votes
31 votes
Find the derivative of y = ㏒5
((2x+1)(x-3))

User Benjamin West
by
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1 Answer

19 votes
19 votes

Given


y = \log_5\bigg((2x + 1) (x - 3)\bigg)

Expand the logarithm on the right side. (change-of-base and product-to-log identities)


y = (\ln(2x + 1) + \ln(x - 3))/(\ln(5))

Now differentiate both sides with respect to
x.


y' = \frac1{\ln(5)} \bigg(\ln(2x+1)\bigg)' + \frac1{\ln(5)} \bigg(\ln(x-3)\bigg)'


y' = ((2x+1)')/(\ln(5)\,(2x+1)) + ((x-3)')/(\ln(5)\,(x-3))


y' = (2)/(\ln(5)\,(2x+1)) + (1)/(\ln(5)\,(x-3))


y' = \boxed{(4x-5)/(\ln(5)\,(2x+1)(x-3))}

User Mysuperass
by
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