1. Splash Screen

2. Lesson Menu Five-Minute Check (over Lesson 5–7) CCSS Then/Now Key Concept: Rational Zero Theorem Example 1:Identify Possible Zeros Example 2:Real-World Example: Find Rational Zeros Example 3:Find All Zeros

3. Over Lesson 5–7 5-Minute Check 1 Solve x 2 + 4x + 7 = 0. A. B. C. D.

4. Over Lesson 5–7 5-Minute Check 2 A.3 imaginary B.2 imaginary C.3 real D.2 real What best describes the roots of the equation 2x 3 + 5x 2 – 23x + 10 = 0?

5. Over Lesson 5–7 5-Minute Check 3 A.3 B.2 C.1 D.0 How many negative real zeros does p(x) = x 4 – 7x 3 + 2x 2 – 6x – 2 have?

6. Over Lesson 5–7 5-Minute Check 4 A.4 B.3 C.2 D.1 What is the least degree of a polynomial function with zeros that include 5 and 3i?

7. Over Lesson 5–7 5-Minute Check 5 Which of the following is not a zero of 4x 3 + 9x 2 + 22x + 5? A. B. C.–1 + 2i D.–1 – 2i

8. CCSS Mathematical Practices 8 Look for and express regularity in repeated reasoning.

9. Then/Now You found zeros of quadratic functions of the form f(x) = ax 2 + bx + c. Identify possible rational zeros of a polynomial function. Find all of the rational zeros of a polynomial function.

10. Concept

11. Example 1 Identify Possible Zeros A. List all of the possible rational zeros of f(x) = 3x 4 – x 3 + 4. Answer:

12. Example 1 Identify Possible Zeros B. List all of the possible rational zeros of f(x) = x 4 + 7x 3 – 15. Since the coefficient of x 4 is 1, the possible zeros must be a factor of the constant term –15. Answer: So, the possible rational zeros are ±1, ±3, ±5, and ±15.

13. Example 1 A. List all of the possible rational zeros of f(x) = 2x 3 + x + 6. A. B. C. D.

14. Example 1 B. List all of the possible rational zeros of f(x) = x 3 + 3x + 24. A. B. C. D.

15. Example 2 Find Rational Zeros GEOMETRY The volume of a rectangular solid is 1120 cubic feet. The width is 2 feet less than the height, and the length is 4 feet more than the height. Find the dimensions of the solid. Let x = the height, x – 2 = the width, and x + 4 = the length.

16. Substitute. Example 2 Find Rational Zeros Write the equation for volume. ℓ ● w ● h = VFormula for volume The leading coefficient is 1, so the possible integer zeros are factors of 1120. Since length can only be positive, we only need to check positive zeros. Multiply. Subtract 1120 from each side.

17. Example 2 Find Rational Zeros The possible factors are 1, 2, 4, 5, 7, 8, 10, 14, 16, 20, 28, 32, 35, 40, 56, 70, 80, 112, 140, 160, 224, 280, 560, and 1120. By Descartes’ Rule of Signs, we know that there is exactly one positive real root. Make a table and test possible real zeros. So, the zero is 10. The other dimensions are 10 – 2 or 8 feet and 10 + 4 or 14 feet.

18. Example 2 Find Rational Zeros CheckVerify that the dimensions are correct. Answer: ℓ = 14 ft, w = 8 ft, and h = 10 ft 10 × 8 × 14 = 1120

19. Example 2 A.h = 6, ℓ = 11, w = 3 B.h = 5, ℓ = 10, w = 2 C.h = 7, ℓ = 12, w = 4 D.h = 8, ℓ = 13, w = 5 GEOMETRY The volume of a rectangular solid is 100 cubic feet. The width is 3 feet less than the height and the length is 5 feet more than the height. What are the dimensions of the solid?

20. Example 3 Find All Zeros Find all of the zeros of f(x) = x 4 + x 3 – 19x 2 + 11x + 30. From the corollary to the Fundamental Theorem of Algebra, we know there are exactly 4 complex roots. According to Descartes’ Rule of Signs, there are 2 or 0 positive real roots and 2 or 0 negative real roots. The possible rational zeros are  1,  2,  3,  5,  6,  10,  15, and  30. Make a table and test some possible rational zeros.

21. Example 3 Find All Zeros Since f(2) = 0, you know that x = 2 is a zero. The depressed polynomial is x 3 + 3x 2 – 13x – 15.

22. Example 3 Find All Zeros Since x = 2 is a positive real zero, and there can only be 2 or 0 positive real zeros, there must be one more positive real zero. Test the next possible rational zeros on the depressed polynomial. There is another zero at x = 3. The depressed polynomial is x 2 + 6x + 5.

23. Example 3 Find All Zeros Factor x 2 + 6x + 5. Answer: The zeros of this function are –5, –1, 2, and 3. Write the depressed polynomial. Factor. Zero Product Property or There are two more real roots at x = –5 and x = –1.

24. Example 3 A.–10, –3, 1, and 3 B.–5, 1, and 3 C.–5 and –3 D.–5, –3, 1 and 3 Find all of the zeros of f(x) = x 4 + 4x 3 – 14x 2 – 36x + 45.

25. End of the Lesson