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प्रश्न
The angle of elevation of the top of a vertical tower from a point A, due east of it is 45°. The angle of elevation of the top of the same tower from a point B, due south of A is 30°. If the distance between A and B is `54sqrt(2)` m, then the height of the tower (in metres), is ______.
विकल्प
108
`36sqrt(3)`
`54sqrt(3)`
54
उत्तर
The angle of elevation of the top of a vertical tower from a point A, due east of it is 45°. The angle of elevation of the top of the same tower from a point B, due south of A is 30°. If the distance between A and B is `54sqrt(2)` m, then the height of the tower (in metres), is 54.
Explanation:
Let AP = x
BP = y
In rt. ΔAPQ
tan 45° = `H/x` `\implies` H = x
In rt. ΔBPQ
tan 30° = `H/y` `\implies` y = `sqrt(3)H`
In rt. ΔABP
`x^2 + (54sqrt(2))^2` = y2
`\implies H^2 + (54sqrt(2))^2` = 3H2
`\implies (54sqrt(2))^2` = 2H2
`\implies 54sqrt(2) = sqrt(2)H`
`\implies` 54 = H
