Solve the problem using trigonometric or inverse trigonometric functions. Show illustration, define variables used and give detailed solutions. A statue 10 feet high is standing on a base 13 feet high. If an observer’s eye is 5 feet above the ground, how far should he stand from the base in order that the angle between his lines of sight to the top and bottom of the statue is a maximum? (How far should he stand to get the best view of the statue.
Ratios
A ratio is a comparison between two numbers of the same kind. It represents how many times one number contains another. It also represents how small or large one number is compared to the other.
Trigonometric Ratios
Trigonometric ratios give values of trigonometric functions. It always deals with triangles that have one angle measuring 90 degrees. These triangles are right-angled. We take the ratio of sides of these triangles.
Solve the problem using trigonometric or inverse trigonometric functions. Show illustration, define variables used and give detailed solutions.
A statue 10 feet high is standing on a base 13 feet high. If an observer’s eye is 5 feet above the ground, how far should he stand from the base in order that the angle between his lines of sight to the top and bottom of the statue is a maximum? (How far should he stand to get the best view of the statue.
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