Question #fbdf4

1 Answer
sente
Oct 24, 2016

d/dx5ln(5x) = 5/x

Explanation:

Depends on what tools you have available.

Using the chain rule, along with the known derivative d/dxlnx = 1/x:

d/dx5ln(5x) = 5d/dxln(5x)

=5(1/(5x))(d/dx5x)

=5(1/(5x))(5)

=5/x

Using implicit differentiation:

Let y = 5ln(5x)

=> e^y = e^(5ln(5x)) = e^(ln((5x)^5))=(5x)^5=5^5x^5

=> d/dxe^y = d/dx5^5x^5

=> e^ydy/dx = 5^6x^4

=> dy/dx = (5^6x^4)/e^y

=(5^6x^4)/(5^5x^5)

=5/x

Using the definition of a derivative:

lim_(h->0)(5ln(5(x+h))-5ln(5x))/h

=5lim_(h->0)(ln(5(x+h))-ln(5x))/h

=5lim_(h->0)ln((5(x+h))/(5x))/h

=5lim_(h->0)1/hln(1+h/x)

=5lim_(h->0)ln[(1+h/x)^(1/h)]

=5lim_(h->0)ln[(1+(1/x)/(1/h))^(1/h)]

Substitute u = 1/h. Then u->oo as h->0. Recall lim_(n->oo)(1+x/n)^n = e^x.

=5lim_(u->oo)ln[(1+(1/x)/u)^u]

=5ln(e^(1/x))

=5/xln(e)

=5/x

Related questions
See all questions in Differentiating Logarithmic Functions with Base e
Impact of this question
1414 views around the world
You can reuse this answer
Creative Commons License