Arc Length and Radians

Calculating Arc Length in Degrees

  • angle / total angle of circle = arc length of angle / total circumference of circle
    • θ / 360° = arc length / 2pi*r
    • by multiplying both sides by 2pi*r, we solve for arc length
    • arc length = (2pi*r)*(θ / 360°)


Introduction to Radians

  • radians measure the arc length of the angle created
  • measuring radians uses a circle with a radius of 1
    • so the arc length of the entire circle (aka the circumference) is 2pi*r, but r = 1, so it's just 2pi
  • 2pi radians = 360°
    • from this equality you can figure out many other angle measures
    • pi radians = 180°
    • 1 radian = 180°/pi
    • 1° = pi/180 radians
  • the unit of an angle in radians often isn't shown, for example if θ = 3, that would represent 3 radians


Converting Angles from Degrees to Radians

  • because 2pi radians = 360°, divide both sides by 360 to become 1° = pi/180 radians
  • if 1° = pi/180 radians, then x degrees is x*(pi/180)
    • 160° = 160(pi/180) radians = 8pi/9 radians
    • 195° = 195(pi/180) radians = 13pi/12 radians
    • 280° = 280(pi/180) radians = 14pi/9 radians


Converting Angles from Radians to Degrees

  • because 2pi radians = 360°, divide both sides by 2pi to become 1 radian = 180°/pi
  • if 1 radian = 180°/pi, then x radians is x*(180°/pi)
    • 1/4 radians = (1/4)*(180°/pi) = 14°
    • 3pi/2 radians = (3pi/2)*(180°/pi) = 270°
    • 5pi/18 radians = (5pi/18)*(180°/pi) = 50°


Calculating Arc Length in Radians

  • with degrees, we had arc length = (2pi*r)*(θ / 360°)
  • with radians, θ will be measured in radians and replace 360° with 2pi
  • 2pi cancels out, so arc length = θ*r


Coterminal Angles

  • angles with the same terminal arm (their terminal arms overlap)
  • add or subtract a full rotation (360° or 2pi) to any angle to find another coterminal angle
    • θ = n*360° or θ = n*2pi, where n is an integer (-5, -4, -3, -2, -1, 0, 1, 2, 3, 4, 5)
  • angles that are coterminal have the EXACT same trigonometric ratios


The Unit Circle

  • the angles 0°, 30°, 45°, 60°, and 90° (or 0, pi/6, pi/4, pi/3, and pi/2), all have exact trigonometric ratios
  • angles in quadrant 2, 3, and 4 have the SAME trigo ratios as those in quadrant 1 (except they may be negative)
    • in quadrant 1, all trig ratios are positive
    • in quadrant 2, only sin is positive (cos and tan are negative)
    • in quadrant 3, only tan is positive (sin and cos are negative)
    • in quadrant 4, only cos is positive (sin and tan and negative)
    • this is summarized in ASTC (All Students Take Calculus


Degree Mode and Radian Mode

Complete and Continue