Precalculus B :: Worksheet 3
1 Questions
- Fill out the unit circle without the use of a calculator. Give exact values.
- Determine which quadrant the following angles are in:
- \(\displaystyle \frac{11\pi}{24}\)
- \(\displaystyle \frac{71\pi}{12}\)
- \(-1550^\circ\)
- Make a table of values, and sketch a graph of \(\cot \theta\). Your table should have at least five \(\theta\) values and include one full period.
- Evaluate the following without the use of a calculator, giving exact answers:
- \(\tan(5\pi/6)\)
- \(\sec(2\pi/3)\)
- \(\cot(-\pi/2)\)
- \(\tan(11\pi/6)\)
- Make the following conversions, rounding to three decimals:
- \(37.4^\circ\) to radians
- \(1\) radian to degrees
- \(11\pi/6\) radians to degrees
- A 14-inch pizza (14-in in diameter) is cut into eight slices of equal size, what is the area of one slice?
- Verify the identity \(\displaystyle (\tan^2 \theta) \left(\frac{1}{1-\cos \theta} + \frac{1}{1+\cos \theta}\right) = \frac{2}{\cos^2 \theta}\).
- Find the four smallest positive numbers \(\theta\) so that \(\tan \theta = 1\).
- Suppose that \(\pi/2 < \theta < \pi\) and \(\sin \theta = 3/4\). Evaluate:
- \(\cos \theta\)
- \(\tan \theta\)
10 For the triangle below, \(a=2\) and \(\sin u = 1/3\). Find:
- \(c\)
- \(b\)
- \(\cos u\)
- \(\tan u\)
- \(\cos v\)
- \(\sin v\)
- \(\tan v\)