Embedded Files
Content Slideshows
Content Slideshows
The imaginart number 17.pptxImaginary Numbers
Imaginary Numbers
What are they?
Operations with complex numbers.pptxOperations with Complex Numbers
Operations with Complex Numbers
Add, Subtract, Multiply, Divide with complex numbers.
the argand diagram 1 new.pptxThe Argand Diagram Part 1
The Argand Diagram Part 1
Modulus and Argument
The argand diagram 2.pptxThe Argand Diagram Part 2
The Argand Diagram Part 2
Polar and Euler forms
Conjugates.pptComplex Conjugates
Complex Conjugates
Complex roots.pptRoots of Complex Numbers
Roots of Complex Numbers
De Moivre's Theorem
De Moivre 2.pptRoots of Complex Numbers Part 2
Roots of Complex Numbers Part 2
De Moivre continued
Worksheets and IB Style Problems
Worksheets and IB Style Problems
Videos
Videos
1.12 Cartesian Form of Complex Numbers
1.12 Graphing in the Complex Plane
1.13 Polar and Euler
1.13 Multiplication and Division
1.13 Geometric Interpretations
1.14 De Moivre's Theorem
1.14 Complex Roots
1.14 Conjugate Root Theorem
Intro to Complex Numbers
Intro Part 2
Imaginary Numbers
Multiplying Complex Numbers
Dividing Complex Numbers
Exponential form to find complex roots
Rectangular to Polar form of Complex Numbers
Complex Conjugates
14D.3 8.mp4Green Book Problem 14 D.3 #8
Complex number IB.mp4IB Style Problem
Complex Number Paper 2.mp4IB Style Problem
Properties of CIS.mp4Properties of CIS
TOK Connections
TOK Connections
Descartes showed that geometric problems could be solved algebraically and vice versa.
What does this tell us about mathematical representation and mathematical knowledge?
Why is it called the Argand plane and not the Wessel plane or Gaussian plane?
Was the complex plane already there before it was used to represent complex numbers geometrically?
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