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5 votes
5 votes
Anna is trying to find the height of a radio antenna on the roof of a local building. Shestands at a horizontal distance of 19 meters from the building. The angle of elevationfrom her eyes to the roof (point A) is 34°, and the angle of elevation from her eyes tothe top of the antenna (point B) is 41°. If her eyes are 1.5 meters from the ground,find the height of the antenna (the distance from point A to point B). Round youranswer to the nearest tenth of a meter if necessary.

User DamnWidget
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1 Answer

19 votes
19 votes

SOLUTION

Step 1: Let us draw a pictorial view of the information given:

The height of the antenna AB will be:


AB=OB-OA

Let us find OA from triangle OAS


\begin{gathered} \tan 34=(OA)/(19) \\ OA=19*\tan 34 \\ OA=12.816m \end{gathered}

Now, we will find OB from triangle OBS


\begin{gathered} \tan 41=(OB)/(19) \\ OB=19*\tan 41 \\ OB=16.516m \end{gathered}

Now, let us find length AB, which is the length of the antenna:


\begin{gathered} AB=OB-OA \\ AB=16.516m-12.816m \\ AB=3.7m \end{gathered}

The height of the antenna is 3.7 meters.

Anna is trying to find the height of a radio antenna on the roof of a local building-example-1
User Willvv
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