I'm a big fan of converting radians to degrees so the angles are easier to plot in a coordinate plane. Converting the radian measure to degrees is done with dimensional analysis, using the fact that there are 180 degrees in pi. [tex] \frac{28\pi}{18}=\frac{14\pi}{9} [/tex]. Let's reduce that first. Now that's out of the way...[tex] \frac{14\pi}{9}*\frac{180}{\pi} =280 [/tex]. So 280 degrees. That angle will fall into the fourth quadrant, only 10 degrees "after" the negative y axis, which is 270. We go 10 degrees into the 4th quadrant. Reference angles are ALWAYS measured from the tip of the terminal ray of the angle to the nearest x axis. Since all 4 quadrants measure 90 degrees, 90 - 10 = 80. The reference angle, then, is 80 degrees. Converting that back to radians we get that the reference angle is [tex] \frac{4\pi}{9} [/tex]. There you go!
