Daily Check: Perform the indicated operation.

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Presentation transcript:

Daily Check: Perform the indicated operation. Find the area and perimeter of the box. 3. Perimeter = ____ 4. Area = ____ 2x-3 2x+1

Homework Review

CCGPS Analytic Geometry (8-13-14) UNIT QUESTION: In what ways can algebraic methods be used in problem solving? Standard: MCC9-12.N.RN.1-3, N.CN.1-3, A.APR.1 Today’s Question: How do we take the square root of negative numbers? Standard: MCC9-12..N.CN.1-3

in a math class far, far away.. A long long time ago, in a math class far, far away.. There was no way to take the square root of a negative number

Every time we squared a negative number We got a positive.

(-1) = 1 (-2) = 4 (-3) = 9

that when multiplied by itself Was there a number, that when multiplied by itself Gave you a negative???

Can we in fact, take the square root of a negative number? WE CAN!!!!

Ladies and Gentlemen of Math II I present to you a NEW number... A number so complex...

It stretches the imagination.. I present to you:

You can't take the square root of a negative number, right? When we were young and still in Math I, no numbers that, when multiplied by themselves, gave us a negative answer. Squaring a negative number always gives you a positive. (-1)² = 1. (-2)² = 4 (-3)² = 9

So here’s what the math people did: They used the letter “i” to represent the square root of (-1). “i” stands for “imaginary” So, does really exist?

Examples of how we use

Examples of how we use

1.3 Powers of i and Complex Operations

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

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

Adding and Subtracting Add or subtract the real parts, and then, add or subtract the imaginary parts. Ex: Ex:

Your Turn!

Your Turn!

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

Your Turn!

Your Turn!

Conjugates: Two complex numbers of the form a + bi and a – bi are complex conjugates. The product is always a real number Ex:

Conjugates: Two complex numbers of the form a + bi and a – bi are complex conjugates. The product is always a real number Ex:

Dividing Complex Numbers

Conjugates: Two complex numbers of the form a + bi and a – bi are complex conjugates. The product is always a real number

Dividing Complex Numbers Multiply the numerator and denominator by the conjugate of the denominator. Simplify completely.

Writing in Standard Form

Your Turn!

Your Turn!

Assignment Complex Numbers Practice WS