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Polynomial And Rational Functions Copyright © Cengage Learning. All rights reserved. 3.6 Complex Zeros And The Fundamental Theorem Of Algebra Copyright © Cengage Learning. All rights reserved. Objectives ► The Fundamental Theorem of Algebra and Complete Factorization ► Zeros and Their Multiplicities ► Complex Zeros Come in Conjugate Pairs ► Linear and Quadratic Factors 3 The Fundamental Theorem of Algebra and Complete Factorization 4 The Fundamental Theorem of Algebra and Complete Factorization The following theorem is the basis for much of our work in factoring polynomials and solving polynomial equations. Because any real number is also a complex number, the theorem applies to polynomials with real coefficients as well. 5 The Fundamental Theorem of Algebra and Complete Factorization The Fundamental Theorem of Algebra and the Factor Theorem together show that a polynomial can be factored completely into linear factors, 6 Example 1 – Factoring a Polynomial Completely Let P(x) = x3 – 3x2 + x – 3. (a) Find all the zeros of P. (b) Find the complete factorization of P. Solution: (a) We first factor P as follows. P(x) = x3 – 3x2 + x – 3 = x2(x – 3) + (x – 3) Given Group terms 7 Example 1 – Solution = (x – 3)(x2 + 1) cont’d Factor x – 3 We find the zeros of P by setting each factor equal to 0: P(x) = (x – 3)(x2 + 1) Setting x – 3 = 0, we see that x = 3 is a zero. Setting x2 + 1 = 0, we get x2 = –1, so x = i. So the zeros of P are 3, i, and –i. 8 Example 1 – Solution cont’d (b) Since the zeros are 3, i, and –i, by the Complete Factorization Theorem P factors as P(x) = (x – 3)(x – i) [x – (–i)] = (x – 3)(x – i) (x + i) 9 Zeros and Their Multiplicities 10 Zeros and Their Multiplicities In the Complete Factorization Theorem the numbers c1, c2, . . . , cn are the zeros of P. These zeros need not all be different. If the factor x – c appears k times in the complete factorization of P(x), then we say that c is a zero of multiplicity k. For example, the polynomial P(x) = (x – 1)3(x + 2)2(x + 3)5 has the following zeros: 1 (multiplicity 3), –2 (multiplicity 2), –3 (multiplicity 5) 11 Zeros and Their Multiplicities The polynomial P has the same number of zeros as its degree: It has degree 10 and has 10 zeros, provided that we count multiplicities. This is true for all polynomials, as we prove in the following theorem. 12 Zeros and Their Multiplicities The following table gives further examples of polynomials with their complete factorizations and zeros. 13 Example 4 – Finding Polynomials with Specified Zeros (a) Find a polynomial P(x) of degree 4, with zeros i, –i, 2, and –2, and with P(3) = 25. (b) Find a polynomial Q(x) of degree 4, with zeros –2 and 0, where –2 is a zero of multiplicity 3. Solution: (a) The required polynomial has the form P(x) = a(x – i )(x – (–i ))(x – 2)(x – (–2)) = a(x2 + 1)(x2 – 4) Difference of squares 14 Example 4 – Solution = a(x4 – 3x2 – 4) cont’d Multiply We know that P(3) = a(34 – 3 32 – 4) = 50a = 25, so a = . Thus, P(x) = x4 – x2 – 2 (b) We require Q(x) = a[x – (–2)]3(x – 0) = a(x + 2)3x 15 Example 4 – Solution = a(x3 + 6x2 + 12x + 8)x cont’d (A + B)3 = A3 + 3A2B + 3AB2 + B3 = a(x4 + 6x3 + 12x2 + 8x) Since we are given no information about Q other than its zeros and their multiplicity, we can choose any number for a. If we use a = 1, we get Q(x) = x4 + 6x3 + 12x2 + 8x 16 Complex Zeros Come in Conjugate Pairs 17 Complex Zeros Come in Conjugate Pairs As you might have noticed from the examples so far, the complex zeros of polynomials with real coefficients come in pairs. Whenever a + bi is a zero, its complex conjugate a – bi is also a zero. 18 Example 6 – A Polynomial with a Specified Complex Zero Find a polynomial P(x) of degree 3 that has integer coefficients and zeros and 3 – i. Solution: Since 3 – i is a zero, then so is 3 + i by the Conjugate Zeros Theorem. This means that P(x) must have the following form. P(x) = a(x – )[x – (3 – i)] [x – (3 + i)] = a(x – )[(x – 3) + i] [(x – 3) + i] Regroup 19 Example 6 – Solution cont’d = a(x – )[(x – 3)2 – i2] Difference of Squares Formula = a(x – )(x2 – 6x + 10) Expand = a(x3 – Expand x2 + 13x – 5 ) To make all coefficients integers, we set a = 2 and get P(x) = 2x3 – 13x2 + 26x – 10 Any other polynomial that satisfies the given requirements must be an integer multiple of this one. 20 Linear and Quadratic Factors 21 Linear and Quadratic Factors We have seen that a polynomial factors completely into linear factors if we use complex numbers. If we don’t use complex numbers, then a polynomial with real coefficients can always be factored into linear and quadratic factors. We use this property when we study partial fractions. A quadratic polynomial with no real zeros is called irreducible over the real numbers. Such a polynomial cannot be factored without using complex numbers. 22 Linear and Quadratic Factors 23 Example 7 – Factoring a Polynomial into Linear and Quadratic Factors Let P(x) = x4 + 2x2 – 8. (a) Factor P into linear and irreducible quadratic factors with real coefficients. (b) Factor P completely into linear factors with complex coefficients. Solution: (a) P(x) = x4 + 2x2 – 8 = (x2 – 2)(x2 + 4) 24 Example 7 – Solution = (x – )(x + cont’d )(x2 + 4) The factor x2 + 4 is irreducible, since it has no real zeros. (b) To get the complete factorization, we factor the remaining quadratic factor. P(x) = (x – )(x + )(x2 + 4) = (x – )(x + )(x – 2i)(x + 2i) 25