JEE Advance - Mathematics (1991 - No. 20)
A man notices two objects in a straight line due west. After walking a distance $$c$$ due north he observes that the objects subtend an angle $$\alpha $$ at his eye; and, after walking a further distance $$2c$$ due north, an angle $$\beta $$. Show that the distance between the objects is $${{8c} \over {3\cot \beta - \cot \alpha }}$$; the height of the man is being ignored.
The distance between the objects is $${{8c} over {3\cot \beta - \cot \alpha }}$$
The distance between the objects is $${{8c} over {3\tan \beta - \tan \alpha }}$$
The distance between the objects is $${{5c} over {3\cot \beta - \cot \alpha }}$$
The distance between the objects is $${{8c} over {\cot \beta - 3\cot \alpha }}$$
The distance between the objects is $${{8c} over {3\cot \alpha - \cot \beta }}$$
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