Textbook Question
In Exercises 61โ86, use reference angles to find the exact value of each expression. Do not use a calculator. tan(9๐/2)
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3. Unit Circle
Reference Angles
5:46 minutesProblem 79
Textbook Question
Use reference angles to find the exact value of each expression. Do not use a calculator. cot 19๐/6
Verified step by step guidance1
First, recognize that the angle given is in radians: \(19\pi/6\). Since the trigonometric functions are periodic, reduce the angle to an equivalent angle between \$0$ and \(2\pi\) by subtracting multiples of \(2\pi\).
Calculate how many full rotations of \(2\pi\) fit into \(19\pi/6\). Since \(2\pi = 12\pi/6\), subtract \(12\pi/6\) from \(19\pi/6\) to get the reference angle within one full rotation: \(19\pi/6 - 12\pi/6 = 7\pi/6\).
Identify the quadrant where the angle \(7\pi/6\) lies. Since \(\pi = 6\pi/6\), \(7\pi/6\) is just past \(\pi\), so it lies in the third quadrant.
Find the reference angle for \(7\pi/6\) by subtracting \(\pi\): Reference angle \(= 7\pi/6 - \pi = 7\pi/6 - 6\pi/6 = \pi/6\).
Use the reference angle \(\pi/6\) to find \(\cot(\pi/6)\), then determine the sign of \(\cot(7\pi/6)\) based on the quadrant (third quadrant). Recall that \(\cot(\theta) = \frac{\cos(\theta)}{\sin(\theta)}\) and that both sine and cosine are negative in the third quadrant, so cotangent is positive there.
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Video duration:
5mKey Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Reference Angles
A reference angle is the acute angle formed between the terminal side of an angle and the x-axis. It helps simplify trigonometric calculations by relating any angle to an angle between 0ยฐ and 90ยฐ (or 0 and ฯ/2 radians). Using reference angles allows you to find exact trigonometric values without a calculator.
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Reference Angles on the Unit Circle
Cotangent Function
Cotangent is the reciprocal of the tangent function, defined as cot(ฮธ) = 1/tan(ฮธ) = cos(ฮธ)/sin(ฮธ). Understanding cotangent's relationship to sine and cosine is essential for evaluating its exact value, especially when using reference angles and known trigonometric values.
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Angle Reduction and Coterminal Angles
Angles larger than 2ฯ radians can be reduced by subtracting multiples of 2ฯ to find a coterminal angle within one full rotation. This simplification helps identify the reference angle and the quadrant, which determines the sign of the trigonometric function.
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