JEE Advanced · Mathematics · 5. Sequences & Series
Paragraph:
Let \(A_1, G_1, H_1\) denote the arithmetic, geometric and harmonic means respectively, of two distinct positive numbers. For \(n \geq 2\), let \(A_{n-1}\) and \(H_{n-1}\) has arithmetic, geometric and harmonic means as \(A_n, G_n, H_n\), respectively.
Question:
Which one of the following statements is correct?
- A \(G_1>G_2>G_3>\ldots\)
- B \(G_1 < G_2 < G_3 < \ldots\)
- C \(G_1=G_2=G_3=\ldots\)
- D \(G_1 < G_3 < G_5 < \ldots\) and \(G_2>G_4>G_6>\ldots\)
Answer & Solution
Correct Answer
(C) \(G_1=G_2=G_3=\ldots\)
Step-by-step Solution
Detailed explanation
\(A_1=\frac{a+b}{2}, G_1=\sqrt{a b}\) and \(H_1=\frac{2 a b}{a+b}\)
\(A_n=\frac{A_{n-1}+H_{n-1}}{2}, G_n =\sqrt{A_{n-1} H_{n-1}}, \)
\( H_n =\frac{2 A_{n-1} H_{n-1}}{A_{n-1}+H_{n-1}}\)
Clearly, \(\quad G_1=G_2=G_3=\ldots=\sqrt{a b}\).
\(A_n=\frac{A_{n-1}+H_{n-1}}{2}, G_n =\sqrt{A_{n-1} H_{n-1}}, \)
\( H_n =\frac{2 A_{n-1} H_{n-1}}{A_{n-1}+H_{n-1}}\)
Clearly, \(\quad G_1=G_2=G_3=\ldots=\sqrt{a b}\).
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