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26 votes
A flagpole 95.2 ft. Tall is on top of a building. From a point on level ground, the angle of elevation of the top of the flagpole is 34.1° , while the angle of elevation of the bottom of the flagpole is 25.8° . Find the height of the building.

User Mateuszlo
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1 Answer

17 votes
17 votes

Let x be the height of the building

We will first make a sketch


\tan \theta=\frac{opposite}{\text{adjacent}}
\tan 25.8=(x)/(y)


y=(x)/(\tan 25.8)
\tan 34.1=(95.2+x)/(y)

substitute the y-value in the above


\tan 34.1=(95.2+x)/((x)/(\tan 25.8))
\tan 34.1=(95.2+x)\text{.}(tan25.8)/(x)
x\tan 34.1=(95.2+x)\tan 25.8

x (0.677) = (95.2 + x)0.4834

open the parenthesis

0.677x = 46.01968 + 0.4834x

subtract 0.4834x from both-side of the equation

0.677x - 0.4834x = 46.01968

0.1936x = 46.01968

Divide both-side by 0.1936

x≈ 237.7 ft


x\approx238\text{ f}eet

A flagpole 95.2 ft. Tall is on top of a building. From a point on level ground, the-example-1
User Sam Weaver
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3.1k points