If $a, b, c$ are in GP and $x, y$ are arithmetic mean of $a, b$ and $b, c$ respectively, then $\frac{1}{x} + \frac{1}{y}$ is equal to

$\frac{2}{b}$

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$\frac{3}{b}$

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$\frac{b}{3}$

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$\frac{b}{2}$

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Solution

The correct option is A
$\frac{2}{b}$

Explanation for the correct option:
Solve the series in GP:
Given $a, b, c$ are in GP and $x, y$ are arithmetic mean of $a, b$ and $b, c$
$b^{2} = a c . . (i)$
$x = \frac{(a + b)}{2}$
$y = \frac{(b + c)}{2}$
$\begin{array}{rcl} ∴ \frac{1}{x} + \frac{1}{y} & = & \frac{2}{(a + b)} + \frac{2}{(b + c)} \\ = & \frac{2 (b + c) + 2 (a + b)}{(a + b) (b + c)} \\ = & \frac{(2 b + 2 c + 2 a + 2 b)}{(a b + b^{2} + a c + b c)} \\ = & \frac{2 (a + c + 2 b)}{(a b + b^{2} + b^{2} + b c)} \\ = & \frac{2 (a + c + 2 b)}{(a b + 2 b^{2} + b c)} \\ = & \frac{2 (a + c + 2 b)}{b (a + 2 b + c)} \\ = & \frac{2}{b} \end{array}$ $\begin{array}{rcl} [∵ b^{2} = a c] \end{array}$
Hence, correct option is (A).

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