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(1) Find the exact value of each expression. state if undefined.
a)
b)
c)
d)
(2) Solve the problem. Use exact values (leave in terms of a trig function.
Aski slope is 52 ft long and the angle A ski slope is from the ground to the summit is . How high is the summit? (Draw your best ski slope and mountain) "̈
Studdy Solution
STEP 1
1. The range of the inverse trigonometric functions is assumed to be the principal value range.
2. For , the range is .
3. For , the range is .
4. The trigonometric functions are defined for real numbers unless otherwise specified.
5. The ski slope problem involves a right triangle with the slope as the hypotenuse.
STEP 2
1. Evaluate each inverse trigonometric expression.
2. Solve the ski slope problem using trigonometry.
STEP 3
Evaluate .
corresponds to the angle whose cosine is . In the principal range , this angle is:
STEP 4
Evaluate .
The sine function has a range of . Since is outside this range, is:
Undefined
STEP 5
Evaluate .
The expression gives the angle whose sine is . In the principal range , this angle is:
Thus, is:
STEP 6
Evaluate .
Sketch a right triangle where is the angle. The adjacent side is , and the hypotenuse is . Use the Pythagorean theorem to find the opposite side:
Thus, is:
STEP 7
Solve the ski slope problem.
Given:
- Hypotenuse (slope) = ft
- Angle =
We need to find the height of the summit, which is the opposite side of the angle in a right triangle. Use the sine function:
Solve for Height:
Since we need the exact value in terms of a trig function:
The solutions are:
a)
b) Undefined
c)
d)
2) Height =
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