Asked by Thomas
Let f(x) = (x+3)^3 + 2.
The graph of the inverse function y = f^–1(x) has a vertical tangent at:
(Hint: Think about the symmetry of the 2 graphs.)
(66, 1)
(2, –3)
(10, –1)
(–3, 2)
(–1, 10)
The graph of the inverse function y = f^–1(x) has a vertical tangent at:
(Hint: Think about the symmetry of the 2 graphs.)
(66, 1)
(2, –3)
(10, –1)
(–3, 2)
(–1, 10)
Answers
Answered by
Steve
clearly, since f'(-3) = 0, f^-1 has a vertical tangent at x = f^-1(-3) = 2.
Answered by
Thomas
Thank you. I was taking the inverse of (x+3)^3 + 2 and then I got stuck after that.
Answered by
purple
I wanted to let others who are looking for help know that the correct answer is (2,-3)
Answered by
acolorpalette
Thanks purple
Answered by
Paulie
Just plot the graph of inverse function, you would see (2,-3) is the correct answer.
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