Bruce Mayer, PE Licensed Electrical & Mechanical Engineer BMayer@ChabotCollege

1. Chabot Mathematics §5.1 Intro toPolyNomials Bruce Mayer, PE Licensed Electrical & Mechanical EngineerBMayer@ChabotCollege.edu

2. MTH 55 4.3 Review § • Any QUESTIONS About • §4.3 → Absolute Value: Equations & InEqualities • Any QUESTIONS About HomeWork • §4.3 → HW-14

3. Mathematical “TERMS” • A TERM can be a number, a variable, a product of numbers and/or variables, or a quotient of numbers and/or variables. • A term that is a product of constants and/or variables is called a monomial. • Examples of monomials: 8, w, 24x3y • A polynomial is a monomial or a sum of monomials. Examples of polynomials: • 5w + 8, −3x2 + x + 4, x, 0, 75y6

4. Example  Terms • Identify the terms of the polynomial 7p5 − 3p3 + 3 • SOLUTION • The terms are 7p5, −3p3, and 3. • We can see this by rewriting all subtractions as additions of opposites: 7p5− 3p3 + 3 = 7p5 + (−3p3) + 3 These are the terms of the polynomial.

5. [Bi, Tri, Poly]-nomials • A polynomial that is composed of two terms is called a binomial, whereas those composed of three terms are called trinomials. Polynomials with four or more terms have no special name

6. Polynomial DEGREE • The degree of a term of a polynomial is the no. of variable factors in that term • EXAMPLE: Determine the degree of each term: a) 9x5 b) 6y c) 9 • SOLUTION • a) The degree of 9x5 is 5 • b) The degree of 6y (6y1) is 1 • c) The degree of 9 (9z0) is 0

7. Mathematical COEFFICIENT • The part of a term that is a constantfactor is the coefficient of that term. The coefficient of 4y is 4. • EXAMPLE: Identify the coefficient of each term in polynomial: 5x4− 8x2y + y− 9 • SOLUTION • The coefficient of 5x4 is 5. • The coefficient of −8x2y is −8. • The coefficient of y is 1, since y = 1y. • The coefficient of −9 is simply −9

8. DEGREE of POLYNOMIAL • The leading term of a polynomial is the term of highest degree. Its coefficient is called the leading coefficient and its degree is referred to as the degree of the polynomial. • Consider this polynomial 4x2– 9x3 + 6x4 + 8x– 7. • Find the TERMS, COEFFICIENTS, and DEGREE

9. DEGREE of POLYNOMIAL • For polynomial: 4x2− 9x3 + 6x4 + 8x− 7 • List Terms, CoEfficients, Term-Degree • Terms →4x2, −9x3,6x4, 8x, and−7 • coefficients → 4, −9, 6, 8 and −7 • degree of each term → 2, 3, 4, 1, and 0 • The leading term is 6x4 and the leading coefficientis 6. • The degree of the polynomialis 4.

10. Example  −3x4 + 6x3− 2x2 + 8x + 7 • Complete Table for PolyNomial–3x4 + 6x3 – 2x2 + 8x + 7

11. Example  –3x4 + 6x3 – 2x2 + 8x + 7 • Put Terms in Descending Exponent Order

12. Example  –3x4 + 6x3 – 2x2 + 8x + 7 • Coefficients are the CONSTANTS before the Variables

13. Example  –3x4 + 6x3 – 2x2 + 8x + 7 • Term DEGREE is the Value of the EXPONENT

14. Example  –3x4 + 6x3 – 2x2 + 8x + 7 • Polymomial Degree is the SAME as the highest Term Degree

15. MultiVariable PolyNomials • Evaluate the 2-Var polynomial 5 + 4x + xy2 + 9x3y2 for x = −3 & y = 4 • Solution: Substitute −3 for x and 4 for y: 5 + 4x + xy2 + 9x3y2 = 5 + 4(−3) + (−3)(4)2 + 9(−3)3(4)2 = 5 − 12 − 48 − 3888 = −3943

16. Degree of MultiVar Polynomial • Recall that the degree of a polynomial is the number of variable factors in the term. • Example: ID the coefficient and the degree of each term and the degree of the polynomial 10x3y2– 15xy3z4 + yz + 5y + 3x2 + 9

17. Like Terms • Like, or similarterms either have exactly the same variables with exactly the same exponents or are constants. • For example, 9w5y4 and 15w5y4 are like terms • and −12 and 14 are like terms, • but −6x2y and 9xy3 are not like terms.

18. Example  Combine Like Terms • 10x2y + 4xy3− 6x2y − 2xy3 • 8st− 6st2 + 4st2 + 7s3 + 10st − 12s3 + t − 2 • SOLUTION • 10x2y + 4xy3− 6x2y− 2xy3 = (10 − 6)x2y + (4 − 2)xy3 = 4x2y + 2xy3 • 8st− 6st2 + 4st2 + 7s3 + 10st− 12s3+ t− 2 = −5s3− 2st2 + 18st + t − 2

19. Common Properties: PolyNom Fcns • The domain of a polynomial function is the set of all real numbers. • The graph of a polynomial function is a continuous curve. • This means that the graph has no holes or gaps and can be drawn on a piece of paper without lifting the pencil.

20. Continuous vs. DisContinuous Could be a PolyNomial Can NOT be a PolyNomial

21. Common Properties: PolyNom Fcns • The graph of a polynomial function is a smooth curve. • This means that the graph of a polynomial function does NOT contain any SHARP corners.

22. Smooth vs. Kinked/Cornered Can NOT be a PolyNomial Could be a PolyNomial

23. Leading Coefficient Test • Given a PolyNomial Function of the form • The leading term is anxn. The behavior of the graph of f(x) as x →  or as x → −is dominated by this term, and is similar to one of the following 4 graphs • Note that The middle portion of each graph, indicated by the dashed lines, is NOT determined by this test.

24. Lead Coeff Test: Odd & Positive • Leading Term • ODD Exponent • POSITIVE Coeff • Graph • FALLS to LEFT • RISES to RIGHT

25. Lead Coeff Test: Odd & Negative • Leading Term • ODD Exponent • NEGATIVE Coeff • Graph • RISES to LEFT • FALLS to RIGHT

26. Lead Coeff Test: Even & Positive • Leading Term • EVEN Exponent • POSITIVE Coeff • Graph • RISES to LEFT • RISES to RIGHT

27. Lead Coeff Test: Even & Negative • Leading Term • EVEN Exponent • NEGATIVE Coeff • Graph • FALLS to LEFT • FALLS to RIGHT

28. Example  Lead CoEff Test • Use the leading-CoEfficient test to determine the end behavior of the graph of • SOLUTION • Here n = 3 (odd) and an = −2 < 0. Thus, Case-2 (Odd & Neg) applies. The graph of f(x) rises to the left and falls to the right. This behavior is described by: y → as x → −;and y → −as x → 

29. Adding Polynomials • EXAMPLE  Add (−6x3 + 7x− 2) + (5x3 + 4x2 + 3) • Solution → Combine Like terms (−6x3 + 7x− 2) + (5x3 + 4x2 + 3) = (−6 + 5)x3+ 4x2 + 7x + (−2 + 3) = −x3 + 4x2 + 7x + 1

30. Example  Add Polynomials • Add: (3 – 4x + 2x2) + (–6 + 8x– 4x2 + 2x3) • Solution(3 –4x + 2x2) + (–6 + 8x–4x2 + 2x3) = (3 – 6) + (–4 + 8)x + (2–4)x2 + 2x3 = –3 + 4x– 2x2 + 2x3

31. Example  Add Polynomials • Add: 10x5– 3x3 + 7x2 + 4 and 6x4– 8x2 + 7 and 4x6– 6x5 + 2x2 + 6 • Solution 10x5 - 3x3 + 7x2 + 4 6x4 - 8x2 + 7 4x6 - 6x5 + 2x2 + 6 4x6 + 4x5 + 6x4 - 3x3 + x2 + 17 • Answer: 4x6 + 4x5 + 6x4− 3x3 + x2 + 17

32. Opposite of a PolyNomial • To find an equivalent polynomial for the opposite, or additive inverse, of a polynomial, change the sign of every term. • This is the same as multiplying the original polynomial by −1.

33. Example  Opposite of PolyNom • Simplify: –(–8x4–x3 + 9x2– 2x + 72) • Solution –(–8x4–x3 + 9x2– 2x + 72) = (–1)(–8x4–x3 + 9x2– 2x + 72) = 8x4 + x3– 9x2 + 2x– 72

34. PolyNomial Subtraction • We can now subtract one polynomial from another by adding the opposite of the polynomial being subtracted. PolyNomial Subtractor

35. Example  Subtract PolyNom • (10x5 + 2x3– 3x2 + 5) – (–3x5 + 2x4– 5x3– 4x2) • Solution (10x5 + 2x3– 3x2 + 5) – (–3x5 + 2x4– 5x3– 4x2) = 10x5 + 2x3 – 3x2 + 5 +3x5– 2x4 + 5x3 + 4x2 = 13x5 – 2x4 + 7x3 + x2 + 5

36. Example  Subtract • (8x5 + 2x3– 10x) – (4x5– 5x3 + 6) • Solution (8x5 + 2x3– 10x) – (4x5– 5x3 + 6) =8x5 + 2x3– 10x+(–4x5) + 5x3– 6 = 4x5 + 7x3– 10x– 6

37. Example  Column Form • Write in columns and subtract: (6x2– 4x + 7) – (10x2– 6x– 4) • Solution 6x2– 4x + 7 –(10x2– 6x– 4) –4x2 + 2x + 11 Remember to Change the SIGNS

38. WhiteBoard Work • Problems From §5.1 Exercise Set • By ppt → 22, 24, 26, 28, 70 • 10 Adding and Subtracting Functions If f(x) and g(x) define functions, then (f + g) (x) = f (x) + g(x) Sum function and (f – g) (x) = f (x) – g(x). Difference function In each case, the domain of the new function is theintersection of the domains of f(x) and g(x).

39. P5.1-[22, 24] • PolyNomial orNOT PolyNomial KINKED → NOT a Polynomial SMOOTH & CONTINUOUS → IS a Polynomial

40. P5.1-[26, 28] • Use Lead CoEfficient Test of End Behavior to Match Fcn to Graph Odd & Negs → Rise-Lt & Falls-Rt Odd & Pos → Falls-Lt & Rises-Rt

41. P5.1-70  AIDS Mortality Models • Given PolyNomial Models for USA AIDS mortality over the years 1990-2002 where x≡ yrs since 1990 • Bar Chart shows ACTUAL 2002 Mortality of 501 669 • Find Error Associated with Each Model

42. Evaluate Model using MATLAB Math-Processing Software See MTH25 for Info on MATLAB P5.1-70  AIDS Mortality Models >> x =2002-1990 x = 12 >> fx = -1844*x^2 + 54923*x + 111568 fx = 505108 >> gx = -11*x^3 - 2066*x^2 + 56036*x + 110590 gx = 466510 >> Yactual = 501669 >> fx_error = (fx-Yactual)/Yactual fx_error = 0.0069 = 0.69% >> gx_error = (gx-Yactual)/Yactual gx_error = -0.0701 = -7.01% • By MATLAB the Model Errors • f(x) → 0.69% Low • g(x) → 7.0% Low

43. n is Even an > 0 n is Even an < 0 n is Odd an > 0 n is Odd an < 0 All Done for Today Lead CoeffTestSummarized

44. Chabot Mathematics Appendix Bruce Mayer, PE Licensed Electrical & Mechanical EngineerBMayer@ChabotCollege.edu –

45. Graph y = |x| • Make T-table