Math, asked by Anonymous, 1 month ago

how to prove the relation between arithmetic and geometric mean

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Answered by pradhanabhipsa27

Answer:

Property I: The Arithmetic Means of two positive numbers can never be less than their Geometric Mean. Proof: Let A and G be the Arithmetic Means and Geometric Means respectively of two positive numbers m and n. Since, m and n are positive numbers, hence it is evident that A > G when G = -√mn

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