A skier is at the top of a mountain. His angle of depression looking down at the ski lodge is 54°25'28". If he rides the ski lift 8750 feet to the lodge, how far is the lodge from the base of the mountain?

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A skier is at the top of a mountain. His angle of depression looking down at the ski lodge is 54°25'28". If he rides the ski lift 8750 feet to the lodge, how far is the lodge from the base of the mountain?

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Answer 1 · 2017-07-25T20:30:42

The lodge is $5090.575$ feet away from the botton of the mountain.

Explanation:

Image of Conceptual Interpretation

In the figure above, O is the top of the mountain where the skier is; A is the base of mountain, B is the lodge, $theta$ which is nearest to O is the angle of depression. Using property of alternate angles we conclude that the angle at B must be same as the angle of depression.

$implies$ $OA$ is the height of the mountain, $OB$ is the distance which the skier cover or the distance between the top of mountain and the lodge and at last $AB$ is the distance between mountain and the lodge which is to be calculated.

In our situation, $theta=54^o25^'28" ~=54.4244^o$ $OB=8750$ feet, $AB=?$

From $Delta OAB$ we have,

$Costheta=(AB)/(OB)$

$implies AB=(OB) Costheta=(8750) cos(54.4244^o)=(8750)(0.58178)=5090.575$ feet.

Hence, the lodge is $5090.575$ feet away from the botton of the mountain.

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A skier is at the top of a mountain. His angle of depression looking down at the ski lodge is 54°25'28". If he rides the ski lift 8750 feet to the lodge, how far is the lodge from the base of the mountain?

1 Answer

Explanation:

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