Over what intervals is # f(x)=ln(9-x^2) # increasing and decreasing?

1 Answer
Jim H
Dec 3, 2015

It is increasing on #(-3,0)# and decreasing on #(0,3)#

Explanation:

# f(x)=ln(9-x^2) #

Observe first that #f# is defined (real valued) only when #9-x^2# is positive.

So the domain of #f# is #(-3,3)#

#f'(x) = (-2x)/(9-x^2)#

Recall that the domain of #f# includes only values of #x# for which #9-x^2# is positive.
Therefore, the sign of #f'# on the domain of #f# is the same as that of #-2x#, which is

positive for #-3 < x < 0#, so #f# is increasing on #(-3,0)#, and

negative for #0 < x < 3#, so #f# is decreasing on #(0,3)#.

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