3. Trigonometry

Most people are used to using degrees to measure angles. There are \(360^\circ\) in a full circle, \(90^\circ\) in a right angle and \(180^\circ\) in a straight angle.

However, mathematicians and most scientists and engineers use radian measure. There are \(2\pi\) rad in a full circle, \(\dfrac{\pi}{2}\) rad in a right angle and \(\pi\) rad in a straight angle. You need to be able to go back and forth between radians and degrees.

1. Put out your left arm. Turn toward the left until you are facing backwards. This is called turning by \(\pi\) rad.  That's    \(\pi\)
Go back to your starting position.
2. Put out your left arm. Turn toward the left until you are facing left. That is called turning by \(\dfrac{1}{2}\pi\) rad.  That's    \(\pi\)
Go back to your starting position.
3. Turn by \(\dfrac{1}{4}\pi\) rad.  That's    \(\pi\)

Go back to your starting position.
1. Put out your right arm. Turn toward the right until you are facing right. That is called turning by \(-\,\dfrac{\pi}{2}\) rad.  That's    \(\pi\)
Go back to your starting position.
2. Put out your right arm. Turn toward the right until you are facing backwards. That is called turning by \(-\pi\) rad.  That's    \(\pi\)
Go back to your starting position.
3. Turn by \(-\,\dfrac{3}{4}\pi\) rad.  That's    \(\pi\)

Go back to your starting position.
• Put out your left arm. Turn counterclockwise until you are facing left. That is the \(\dfrac{\pi}{2}\) rad direction.  That's    \(\pi\)
Go back to your starting position.
• Put out your right arm. Turn clockwise until you are facing right. That is the \(-\,\dfrac{\pi}{2}\) rad direction.  That's    \(\pi\)
Go back to your starting position.
• Turn to the \(\dfrac{2}{3}\pi\) rad direction.  That's    \(\pi\)
• Start at the \(\dfrac{2}{3}\pi\) rad direction. Then turn by \(\dfrac{2}{3}\pi\) rad.  That's    \(\pi\)