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Steiner's calculus problem

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Steiner's problem, asked and answered by Steiner (1850), is the problem of finding the maximum of the function

f ( x ) = x 1 / x . {\displaystyle f(x)=x^{1/x}.\,}

It is named after Jakob Steiner.

The maximum is at x = e {\displaystyle x=e} , where e denotes the base of the natural logarithm. One can determine that by solving the equivalent problem of maximizing

g ( x ) = ln f ( x ) = ln x x . {\displaystyle g(x)=\ln f(x)={\frac {\ln x}{x}}.}

Applying the first derivative test, the derivative of g {\displaystyle g} is

g ( x ) = 1 ln x x 2 , {\displaystyle g'(x)={\frac {1-\ln x}{x^{2}}},}

so g ( x ) {\displaystyle g'(x)} is positive for 0 < x < e {\displaystyle 0<x<e} and negative for x > e {\displaystyle x>e} , which implies that g ( x ) {\displaystyle g(x)} – and therefore f ( x ) {\displaystyle f(x)} – is increasing for 0 < x < e {\displaystyle 0<x<e} and decreasing for x > e . {\displaystyle x>e.} Thus, x = e {\displaystyle x=e} is the unique global maximum of f ( x ) . {\displaystyle f(x).}

References

  1. Eric W. Weisstein. "Steiner's Problem". MathWorld. Retrieved December 8, 2010.
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