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Given f(x)=2x3+x−8 verify that f(x) is invertible and, if so, find the equation of the tangent line to f−1(x) at the point where x=−26. note that f(−2)=−26

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sqdancefan

The derivative, f'(x) = 6x^2+1, is never negative, so f(x) is monotonic, hence invertible.

f'(-2) = 6(-2)²+1 = 25

If point (-2, -26) is on the graph of function f(x), and the slope is 25 there, then (-26, -2) is on the graph of f⁻¹(x), and the slope is 1/25 there. The equation of the tangent line throught that point can be written in point-slope form as

... y +2 = (1/25)(x +26)

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