Precalculus B :: Worksheet 1
- Convert \(18^\circ\) to radians.
- Convert \(\displaystyle \frac{17\pi}{12}\) to degrees.
- How many degrees are in one radian?
- Convert 3 radians into degrees.
- Which quadrant is \(1025^\circ\) in?
- Which quadrant is \(\displaystyle \frac{33\pi}{6}\) in?
- Find \(\sin \theta\) if \(\cos \theta = -12/13\) and \(\theta\) is in quadrant II.
- Find the values of \(\cos \theta\) and \(\sin \theta\) for following values of
\(\theta\):
- \(\theta = \pi/2\)
- \(\theta = 3\pi/2\)
- \(\theta = \pi/4\)
- \(\theta = 7\pi/6\)
- \(\theta = 11\pi/6\)
- \(\theta = 5\pi/4\)
- \(\theta = 3\pi/2\)
- \(\theta = 36\pi\)
- \(\theta = 37\pi/4\)
- \(\theta = -5\pi/12\)
- Given the radius \(r\) of a circle and a central angle \(\theta\) in radians, derive formulas for the length of an arc with central angle \(\theta\) and the area of a sector with central angle \(\theta\).
- For an angle \(\theta = \pi/4\) and a radius \(r = 12\):
- What is the length of an arc intercepted by a central angle of \(\theta\) on a circle of radius \(r\)?
- What is the area of the sector with central angle \(\theta\) in a circle of radius \(r\)?