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1. A tourist sights the Hancock tower from the highway with an angle of elevation of 12°. If the Hancock tower is known to be 1350 feet high, how far away is the tourist, to the nearest tenth?
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1. A tourist sights the Hancock tower from the highway with an angle of elevation of 12°. If the

Hancock tower is known to be 1350 feet high, how far away is the tourist, to the nearest tenth?

User Jhurliman
by
5.3k points

1 Answer

0 votes

Answer:
6351.25\ ft

Explanation:

Given

Angle of elevation
x=12^(\circ)

Height of tower
h=1350\ ft

Suppose tourist is d feet away from the tower

from the figure, we can write


\Rightarrow \tan 12^(\circ)=(1350)/(d)\\\\\Rightarrow d=(1350)/(\tan 12^(\circ))=6351.25\ ft

Thus, the distance of tourist from the tower is
6350.25\ ft

1. A tourist sights the Hancock tower from the highway with an angle of elevation-example-1
User Tsurantino
by
6.2k points
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