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Polynomial Division; The Remainder Theorem and Factor Theorem

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1 Polynomial Division; The Remainder Theorem and Factor Theorem
Section 4.3 Polynomial Division; The Remainder Theorem and Factor Theorem

2 Objectives Perform long division with polynomials and determine whether one polynomial is a factor of another. Use synthetic division to divide a polynomial by x  c. Use the remainder theorem to find a function value f (c). Use the factor theorem to determine whether x  c is a factor of f (x).

3 Division and Factors When we divide one polynomial by another, we obtain a quotient and a remainder. If the remainder is 0, then the divisor is a factor of the dividend. Example: Divide to determine whether x + 1 and x  3 are factors of

4 Example Divide to determine whether x +1 and x  3 are factors of
Since the remainder is 0, we know that x + 1 is a factor.

5 Example continued Divide:
Since the remainder is 24, we know that x  3 is not a factor.

6 Division of Polynomials
When we divide a polynomial P(x) by a divisor d(x), a polynomial Q(x) is the quotient and a polynomial R(x) is the remainder. The quotient must have degree less than that of the dividend, P(x). The remainder must be either 0 or have degree less than that of the divisor. As in arithmetic, to check division, we multiply the quotient by the divisor and add the remainder, to see if we get the dividend. Thus these polynomials are related as follows: P(x) = d(x) • Q(x) + R(x) Dividend Divisor Quotient Remainder

7 The Remainder Theorem If a number c is substituted for x in a polynomial f (x), then the result f (c) is the remainder that would be obtained by dividing f (x) by x  c. That is, if f (x) = (x  c) • Q(x) + R, then f (c) = R.

8 Example Use synthetic division to find the quotient and remainder: The quotient is – 2x2 + x – 3 and the remainder is 4. Note: We must write a 0 for the missing term.

9 Example Determine whether 5 is a zero of g(x), where g (x) = x4  26x2 + 11x We use synthetic division and the remainder theorem to find g (5). Since g (5) = 0, the number 5 is a zero of g (x).

10 The Factor Theorem For a polynomial f (x), if f (c) = 0, then x  c is a factor of f (x).

11 Example Let f (x) = x3  3x2 – 6x + 8. Factor f (x) and solve the equation f (x) = 0. Solution: We look for linear factors of the form x  c. Let’s try x  1:

12 Example continued Since f (−1) ≠ 0, we know that x + 1 is not a factor. We now try x – 1. Since f(1) = 0, we know that x −1 is one factor of f(x) and the quotient, x2 – 2x – 8, is another. Thus,

13 Example continued The trinomial x2 – 2x – 8 is easily factored, so we have We now solve the equation f(x) = 0. To do so, we use the principle of zero products: The solutions of the equation are −2, 1, and 4.


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