Suppose the function f is defined for all real x by the following formula: $f (x) = x^{5} + 3x^{3} + 6x − 3.$ Show that f has an inverse function g, and then, given that f (1) = 7, use formula (7.3.2) to find $g^{\prime}(7).$

$g^{\prime}(y_{0})={\frac{1}{f^{\prime}(x_{0})}}$ (7.3.2)

Question

Suppose the function f is defined for all real x by the following formula: $f (x) = x^{5} + 3x^{3} + 6x − 3.$ Show that f has an inverse function g, and then, given that f (1) = 7, use formula (7.3.2) to find $g^{\prime}(7).$

$g^{\prime}(y_{0})={\frac{1}{f^{\prime}(x_{0})}}$ (7.3.2)

[latex]g^{\prime}(y_{0})={\frac{1}{f^{\prime}(x_{0})}}[/latex] (7.3.2)

Accepted Answer

Differentiating f (x) yields [latex]f^{\prime}(x) = 5x^{4} + 9x^{2} + 6.[/latex] Clearly, [latex]f^{\prime}(x) > 0[/latex] for all x, so f is strictly increasing and consequently it is one-to-one. It therefore has an inverse function g. To find [latex]g^{\prime}(7),[/latex] we use formula (7.3.2) with [latex]x_{0} = 1[/latex] and [latex]y_{0} = 7.[/latex] Since [latex]f^{\prime}(1) = 20,[/latex] we obtain [latex]g^{\prime}(7) = 1/ f^{\prime} (1) = 1/20.[/latex] Note that we have found [latex]g^{\prime}(7)[/latex] exactly even though it is impossible to find any algebraic formula for the inverse function g.

Question 7.3.2: Suppose the function f is defined for all real x by the foll......

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