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Question:

If x ≥ y and y > 1, then the value of the expression

$\log_{x} (\frac{x}{y}) + \log_{y} (\frac{y}{x})$ can never be

Explanation:

$\log_{x} (\frac{x}{y}) + \log_{y} (\frac{y}{x})$ = log_x x - log_x y + log_y y - log_y x

⇒ $\log_{x} (\frac{x}{y}) + \log_{y} (\frac{y}{x})$ = 1 - log_x y + 1 - log_y x

⇒ $\log_{x} (\frac{x}{y}) + \log_{y} (\frac{y}{x})$ = 2 - log_x y - log_y x

⇒ $\log_{x} (\frac{x}{y}) + \log_{y} (\frac{y}{x})$ = 2 - (log_x y + log_y x)

As x ≥ y and y > 1,
log_y x ≥ 0
Now, (log_x y + log_y x) = $\log_{x} (y) + \frac{1}{\log_{x} (y)}$ [This is sum of a positive number and its reciprocal]

Now, sum of a positive number and its reciprocal is always greater than or equal to 2.

∴ (log_x y + log_y x) = $\log_{x} (\frac{x}{y}) + \log_{y} (\frac{y}{x})$ ≥ 2

⇒ $\log_{x} (\frac{x}{y}) + \log_{y} (\frac{y}{x})$ = 2 - (log_x y + log_y x) ≤ 0

∴ $\log_{x} (\frac{x}{y}) + \log_{y} (\frac{y}{x})$ ≠ 1

Hence, option (d).

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