How do you find the critical numbers of y= x^2*(1 + 3 ln x)?

1 Answer
VNVDVI
Apr 2, 2018

x=e^(-5/6)

Explanation:

Differentiate, set equal to zero, and solve for x, in addition to being aware of specific values for which the derivative doesn't exist.

y'=x^2*d/dx(1+3lnx)+(1+3lnx)*d/dxx^2

y'=x^2(3/x)+2x(1+3lnx)

y'=3x+2x+6xlnx

y'=5x+6xlnx

The derivative is logarithmic like the original function. They both share the domain (0, oo), so there aren't any particular values for which the derivative doesn't exist while the function does.

5x+6xlnx=0

x(5+6lnx)=0

x=0 looks like it would be a solution, but since it's not in the domain of the logarithm, it is not valid.

5+6lnx=0

6lnx=-5

lnx=-5/6

e^lnx=e^(-5/6)

From the fact that e^lnx=x:

x=e^(-5/6)

Is the only critical number.

Related questions
See all questions in Identifying Stationary Points (Critical Points) for a Function
Impact of this question
1895 views around the world
You can reuse this answer
Creative Commons License