Question: Let f($) = 1 + a: + $2 + :63. Then the derivative is 01213: 1 + 22: +3232 2 (1 +m)2+ 2232. Thus, f

Let f($) = 1 + a: + $2 + :63. Then the derivative is 01213: 1 + 22: +3232 2 (1 +m)2+ 2232. Thus, f is monotone (that is, always increasing or always decreasing) on R because 0 A. f' > 0 U B. f' 00 as a: > 00, and at) > 00 as a: > 00, the inverse function f'1 is dened for all numbers. Find the derivative of the inverse function: = 10 9

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