How do you determine whether the function #f(x)= x/ (x^2+2)# is concave up or concave down and its intervals?

1 Answer

Refer to explanation

Explanation:

We have that #f(x)=x/(x^2+2)# calculating its second derivative we find that

#d^2 f(x)/(d^2x)=(2x(x^2-6))/(x^2+2)^3#.

So we need to see how the signs change of #2x(x^2-6)# as x goes
from #-oo# to #+oo#

So from #(-oo,-sqrt6]# we have that #f''(x)<0#

from #[-sqrt6,0]# we have that #f''(x)>0#

from #[0,sqrt6]# we have that #f''(x)<0#

from #[sqrt6,+oo)# we have that #f''(x)>0#

In order to determine concavity we use the following theorem

Concavity Theorem:

If the function #f# is twice differentiable at #x=c#, then the graph of f is concave upward at #(c;f(c))# if #f''(c)>0# and concave downward if #f''(c)<0# .