Lectures in Polar Coordinates
- Lecture 1: Definition
- Lecture 2: Additional Rules And Concepts
- Lecture 3: Converting From Rectangular To Polar Coordinates
- Lecture 4: Converting From Polar To Rectangular Coordinates
- Lecture 5: Converting From Polar To Rectangular Coordinates - Set 2
- Lecture 6: Converting From Polar To Rectangular Coordinates - Set 3
- Lecture 7: Graphing Polar Equations: R=2.5, Theta=Pi/3
- Lecture 8: Graphing Polar Equations: R=2Sin(Theta), The Circle
- Lecture 9: Graphing Polar Equations: R=2+2Sin(Theta), The Cardioid
- Lecture 10: Graphing Polar Equations: R=Cos[2(Theta)], Four Leaf Rose
- Lecture 11: Graphing Polar Equations: R=1+2Cos(Theta), Limacon
- Lecture 12: Graphing Polar Equations: R=3, R=3Sin(Theta), Circles
- Lecture 13: Graphing Polar Equations: Theta=Pi/4, Theta=Pi/4, Lines
- Lecture 14: Graphing Polar Equations: R=3Cos4(Theta), Roses
- Lecture 15: Graphing Polar Equations: R=3Cos3(Theta), Roses
- Lecture 16: Graphing Polar Equations: R=3Sin3(Theta), Roses
- Lecture 17: Graphing Polar Equations: R=3Sin2(Theta), Roses
- Lecture 18: Graphing Polar Equations: R=1+/-Cos(Theta), Limacons
- Lecture 19: Graphing Polar Equations: R=13+2Cos(Theta), Limacons***
- Lecture 20: Graphing Polar Eqns: R^2=(2^2)[Cos2(Theta)], Lemniscate
- Lecture 21: Graphing Polar Epns: R^2=(2^2)[Sin2(Theta)], Lemniscate
- Lecture 22: Graphing Polar Eqns: R=3(Theta), R=0.5(Theta), Spiral
- Lecture 23: Complex Numbers: Imaginary Axis
- Lecture 24: Complex Numbers: Modulus
- Lecture 25: Complex Numbers: Conversions I
- Lecture 26: Complex Numbers: Conversions Ii
- Lecture 27: Complex Numbers: Multiply And Divide
- Lecture 28: Complex Numbers: De Moivre'S Theorem
- Lecture 29: Complex Numbers: Finding The Roots
- Lecture 30: Complex Numbers: Proof Of The Product Rule
- Lecture 31: Complex Numbers: Proof Of De Moivre'S Theorem
- Lecture 32: Parametric Equations
- Lecture 33: Parametric Equations
- Lecture 34: Parametric Equations: Eliminating The Parameters
- Lecture 35: Parametric Equations In Polar Form