4.6 Complex Numbers (p. 275).

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Presentation transcript:

4.6 Complex Numbers (p. 275)

Imaginary Unit Until now, you have always been told that you can’t take the square root of a negative number. If you use imaginary units, you can! The imaginary unit is ¡. ¡= It is used to write the square root of a negative number.

Property of the square root of negative numbers If r is a positive real number, then Examples:

*For larger exponents, divide the exponent by 4, then use the remainder as your exponent instead. Example:

Examples

Complex Numbers A complex number has a real part & an imaginary part. Standard form is: Real part Imaginary part Example: 5+4i

The Complex plane Real Axis Imaginary Axis

Graphing in the complex plane

Adding and Subtracting (add or subtract the real parts, then add or subtract the imaginary parts) Ex: Ex: Ex:

Multiplying Treat the i’s like variables, then change any that are not to the first power Ex: Ex:

Absolute Value of a Complex Number The distance the complex number is from the origin on the complex plane. If you have a complex number the absolute value can be found using:

Examples 1. 2. Which of these 2 complex numbers is closest to the origin? -2+5i

Assignment