COMPLEX NUMBERS ( , , , 1. 1 HONORS, 1

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COMPLEX NUMBERS (1. 3. 1, 1. 3. 2, 1. 3. 3, 1. 1 HONORS, 1 COMPLEX NUMBERS (1.3.1, 1.3.2, 1.3.3, 1.1 HONORS, 1.2 HONORS) (1.3.1, 1.3.2, 1.3.3) September 13th, 2017

DEFINITIONS Imaginary Unit : is the representation the non-real number . Imaginary Number: Has the form , where and Complex Numbers: The combination of the real number system and the imaginary number system. Complex numbers are of the form , where is the real part and is the imaginary part.

Ex. 1: Rewrite each radical in simplest terms within the complex number system. (You should use the imaginary unit i when necessary.) a) b) c) d) e)

How do we determine whether or not we need to use for any radical?

Ex. 2: Rewrite each complex number as a radical (do not include the imaginary unit i).

OPERATIONS ON COMPLEX NUMBERS Adding and subtracting complex numbers works exactly like it does with polynomials...think about it as collecting “like” terms. Multiplying complex numbers also works like it does with polynomials. You may use the area model to do this, as well. However, you must simplify complex number products further by noting that .

MULTIPLYING COMPLEX NUMBERS Ex.3: Multiply each set of complex numbers. Be sure to simplify your answers by combining like terms and using the identity . a) b) c)

COMPLEX CONJUGATES Def: A complex conjugate is a complex number that when multiplied by another complex number results in a product that is wholly real. The complex conjugate of is . The modulus of a complex number is the square root of the product of the complex number and its conjugate. It represents the absolute value of the complex number.

Ex. 4: Find the modulus of each complex number.

DIVIDING COMPLEX NUMBERS *When dividing complex numbers, you must rationalize the denominator by multiplying by the complex conjugate of the denominator. This will allow you to rewrite the quotient in standard form .

Ex. 5: Find the quotient of each set of complex numbers by rationalizing the denominator, then writing the result in standard form. a) b)

THE COMPLEX PLANE *Complex numbers can be plotted on the complex plane, which looks the same as the xy-coordinate plane, except the horizontal axis is called the real axis and the vertical axis is called the imaginary axis.

Ex. 6: Plot the following on the complex plane. b) c)