QuestionOSHA safety regulations require that the base of a ladder be placed 1 ft from the wall for every 4 ft of ladder length. To the nearest tenth of a degree, find the angle that the ladder forms with the ground and the angle that it forms with the wall.
Studdy Solution
STEP 1
1. The ladder forms a right triangle with the wall and the ground.
2. The base of the ladder is placed 1 foot away from the wall for every 4 feet of ladder length.
STEP 2
1. Define the right triangle and its sides.
2. Use trigonometric functions to find the angle with the ground.
3. Use trigonometric functions to find the angle with the wall.
STEP 3
Define the right triangle: - Let be the length of the ladder. - The base of the triangle (distance from the wall) is . - The ladder itself is the hypotenuse.
STEP 4
Use trigonometric functions to find the angle that the ladder forms with the ground:
- Use the cosine function, which relates the adjacent side (base) to the hypotenuse:
- Solve for :
- Calculate to the nearest tenth of a degree using a calculator:
STEP 5
Use trigonometric functions to find the angle that the ladder forms with the wall:
- Use the sine function, which relates the opposite side (base) to the hypotenuse:
- Solve for :
- Calculate to the nearest tenth of a degree using a calculator:
The angle that the ladder forms with the ground is approximately and with the wall is approximately .
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