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Question

The angle of elevation of the top of a tower from a certain point is 30°. If the observer moves 20m towards the tower, the angle of elevation of the top increases by 15°. Find the height of the tower.


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Solution

Finding the height of the tower:

Let PR=hmeter, be the height of the tower.

The observer is standing at a point Q such that, the distance between the observer and the tower is QR=(20+x)m, where

QR=QS+SR=20+xmPQR=30°PSR=θ

InPQRtan30°=PRQR13=h20+x20+x=3hx=3h-20--------(i)

InPSRtanθ=hx

The angle of elevation increases by 15° when the observer moves 20m toward the tower.

Hence

θ=30°+15°=45°

tan45°=hx1=hxh=x

Substituting x=hin(i), we get

h=3h-203-1h=20h=203-1m

On rationalizing the denominator we get

h=203-1×3+13+1h=20(3+1)2h=10(3+1)m

Hence, the required height of the tower is 10(3+1)m.


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