If g is the inverse of f and if #f(x)=x^3-5x^2+2x-1#, how do you calculate g'(-9) if the domain of f(x) is the set of integers less than 0? Thanks in advance for taking time to help me out. Steve?

1 Answer
Sep 13, 2016

Use #d/dx(f^-1(b)) = 1/(f'(f^-1(b))#

Explanation:

We have, in this case #b=-9#. We need #f^-1(-9)#.

That is: we need #x# in the domain of #f# such that #f(x) = -9#.

We must solve #f(x) = -9# for solutions in the domain of #f#.

Solve
#x^3-5x^2+2x-1= -9#.

If you know the rational zeros theorem, use it. Otherwise, you'll need to solve "by inspection". (That's the fancy name for "guess and check".)

Try #x=1#, #x=2#, #x=-1# STOP!

#f(-x)=-9# and #-1# is in the domain of #f#, so if the problem is well written that should be the only solution in the domain. (If there are multiple solutions, then #f# is not invertible.)

#f'(x) = 3x^2-10x+2#,

and #f(-1) = 15#.

#d/dx(f^-1(-9)) = 1/(f'(f^-1(-9))) = 1/(f'(-1)) = 1/15 #.