6.6 – Complex Numbers

1. 6.6 – Complex Numbers Complex Number System: This system of numbers consists of the set of real numbers and the set of imaginary numbers. Imaginary Unit: and The imaginary unit is called i, where Square roots of a negative number can be written in terms of i.          

2. 6.6 – Complex Numbers and The imaginary unit is called i, where Operations with Imaginary Numbers             

3. 6.6 – Complex Numbers and The imaginary unit is called i, where Complex Numbers: Numbers that can written in the form a + bi, where a and b are real numbers. 3 + 5i 8 – 9i –13 + i The Sum or Difference of Complex Numbers     

4. 6.6 – Complex Numbers      

5. 6.6 – Complex Numbers Multiplying Complex Numbers          

6. 6.6 – Complex Numbers Multiplying Complex Numbers         

7. 6.6 – Complex Numbers Dividing Complex Numbers Rationalizing the Denominator:          

8. 6.6 – Complex Numbers Dividing Complex Numbers Complex Conjugates: The complex numbers (a + bi) and (a – bi) are complex conjugates of each other and, (a + bi)(a – bi) = a2 + b2    

9. 6.6 – Complex Numbers Dividing Complex Numbers Complex Conjugates: The complex numbers (a + bi) and (a – bi) are complex conjugates of each other and, (a + bi)(a – bi) = a2 + b2    

10. 6.6 – Complex Numbers Dividing Complex Numbers Complex Conjugates: The complex numbers (a + bi) and (a – bi) are complex conjugates of each other and, (a + bi)(a – bi) = a2 + b2    