About: Identric mean

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The identric mean of two positive real numbers x, y is defined as: It can be derived from the mean value theorem by considering the secant of the graph of the function . It can be generalized to more variables according by the mean value theorem for divided differences. The identric mean is a special case of the Stolarsky mean.

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  • The identric mean of two positive real numbers x, y is defined as: It can be derived from the mean value theorem by considering the secant of the graph of the function . It can be generalized to more variables according by the mean value theorem for divided differences. The identric mean is a special case of the Stolarsky mean. (en)
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  • Identric Mean (en)
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  • IdentricMean (en)
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  • The identric mean of two positive real numbers x, y is defined as: It can be derived from the mean value theorem by considering the secant of the graph of the function . It can be generalized to more variables according by the mean value theorem for divided differences. The identric mean is a special case of the Stolarsky mean. (en)
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  • Identric mean (en)
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