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Objectives Define and use imaginary and complex numbers.

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1 Objectives Define and use imaginary and complex numbers.
Solve quadratic equations with complex roots.

2

3 Express the number in terms of i.
Check It Out! Example 1a Express the number in terms of i. Factor out –1. Product Property. Product Property. Simplify. Express in terms of i.

4 Express the number in terms of i.
Check It Out! Example 1c Express the number in terms of i. Factor out –1. Product Property. Simplify. Multiply. Express in terms of i.

5 Example 2A: Solving a Quadratic Equation with Imaginary Solutions
Solve the equation. Take square roots. Express in terms of i. Check x2 = –144 –144 (12i)2 144i 2 144(–1) x2 = –144 –144 144(–1) 144i 2 (–12i)2

6 Example 2B: Solving a Quadratic Equation with Imaginary Solutions
Solve the equation. 5x = 0 Add –90 to both sides. Divide both sides by 5. Take square roots. Express in terms of i. 5x = 0 5(18)i 2 +90 90(–1) +90 Check

7 A complex number is a number that can be written in the form a + bi, where a and b are real numbers and i = The set of real numbers is a subset of the set of complex numbers C. Every complex number has a real part a and an imaginary part b.

8 Example 4A: Finding Complex Zeros of Quadratic Functions
Find the zeros of the function. f(x) = x2 + 10x + 26 x2 + 10x + 26 = 0 Set equal to 0. x2 + 10x = –26 + Rewrite. x2 + 10x + 25 = – Add to both sides. (x + 5)2 = –1 Factor. Take square roots. Simplify.

9 Example 4B: Finding Complex Zeros of Quadratic Functions
Find the zeros of the function. g(x) = x2 + 4x + 12 x2 + 4x + 12 = 0 Set equal to 0. x2 + 4x = –12 + Rewrite. x2 + 4x + 4 = –12 + 4 Add to both sides. (x + 2)2 = –8 Factor. Take square roots. Simplify.

10 The solutions and are related
The solutions and are related. These solutions are a complex conjugate pair. Their real parts are equal and their imaginary parts are opposites. The complex conjugate of any complex number a + bi is the complex number a – bi. If a quadratic equation with real coefficients has nonreal roots, those roots are complex conjugates. When given one complex root, you can always find the other by finding its conjugate. Helpful Hint

11 Lesson Quiz 1. Express in terms of i. Solve each equation. 3. x2 + 8x +20 = 0 2. 3x = 0 4. Find the values of x and y that make the equation 3x +8i = 12 – (12y)i true. 5. Find the complex conjugate of

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