1. An Introduction to Polynomials
Copyright Scott Storla 2015

2. Some Vocabulary for Polynomials
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3. Copyright Scott Storla 2015
Coefficient
Variable term
Constant
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4. Copyright Scott Storla 2015
Polynomials should be written in standard form with variable terms first and constants last.
Notice it’s the commutative property of addition that allows us to reorder the terms.
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5. For example writing the difference
To use the commutative property we think of subtractions as adding an opposite. This often means shifting between implicit and explicit coefficients.
For example writing the difference
as the sum
means writing an explicit coefficient of –1.
After using the commutative property to rewrite the polynomial in standard form
we usually end by again making the coefficient implicit.
Copyright Scott Storla 2015

6. Copyright Scott Storla 2015
For polynomials with one, two or three terms we often use the special names monomial, binomial or trinomial.
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7. Some Vocabulary for Polynomials
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8. Discussing Polynomials
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9. Copyright Scott Storla 2015
Write the polynomial as a sum with all coefficients explicit. Next, rewrite the polynomial in standard form and discuss the polynomial in both general and specific terms. Last, write the polynomial with all coefficients implicit.
Copyright Scott Storla 2015

10. Copyright Scott Storla 2015
Write the polynomial as a sum with all coefficients explicit. Next, rewrite the polynomial in standard form and discuss the polynomial in both general and specific terms. Last, write the polynomial with all coefficients implicit.
Copyright Scott Storla 2015

11. Copyright Scott Storla 2015
Write the polynomial as a sum with all coefficients explicit. Next, rewrite the polynomial in standard form and discuss the polynomial in both general and specific terms. Last, write the polynomial with all coefficients implicit.
Copyright Scott Storla 2015

12. Copyright Scott Storla 2015
Write the polynomial as a sum with all coefficients explicit. Next, rewrite the polynomial in standard form and discuss the polynomial in both general and specific terms. Last, write the polynomial with all coefficients implicit.
Copyright Scott Storla 2015

13. Discussing Polynomials
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14. Adding and Subtracting Polynomials Using the Distributive Property
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15. Copyright Scott Storla 2015
Like Polynomial Terms
Variable terms are like if they have the same variable. Constant terms are like terms.
Remember only like terms can be added or subtracted.
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16. Copyright Scott Storla 2015
First, write the polynomial as a sum with explicit coefficients and decide on the like terms. Next, use the commutative property to rewrite the polynomial in standard form. Finally, simplify the expression using the distributive property.
Copyright Scott Storla 2015

17. Copyright Scott Storla 2015
First, write the polynomial as a sum with explicit coefficients and decide on the like terms. Next, use the commutative property to rewrite the polynomial in standard form. Finally, simplify the expression using the distributive property.
Copyright Scott Storla 2015

18. Copyright Scott Storla 2015
First, write the polynomial as a sum with explicit coefficients and decide on the like terms. Next, use the commutative property to rewrite the polynomial in standard form. Finally, simplify the expression using the distributive property.
Copyright Scott Storla 2015

19. Copyright Scott Storla 2015
First, write the polynomial as a sum with explicit coefficients and decide on the like terms. Next, use the commutative property to rewrite the polynomial in standard form. Finally, simplify the expression using the distributive property.
Copyright Scott Storla 2015

20. Copyright Scott Storla 2015
First, write the polynomial as a sum with explicit coefficients and decide on the like terms. Next, use the commutative property to rewrite the polynomial in standard form. Finally, simplify the expression using the distributive property.
Copyright Scott Storla 2015

21. Adding and Subtracting Polynomials Using the Distributive Property
Copyright Scott Storla 2015

22. Adding and Subtracting Polynomials
Copyright Scott Storla 2015

23. Copyright Scott Storla 2015
Write the polynomial as a sum making coefficients explicit, then simplify the expression.
Copyright Scott Storla 2015

24. Copyright Scott Storla 2015
Write the polynomial as a sum making coefficients explicit, then simplify the expression.
Copyright Scott Storla 2015

25. Copyright Scott Storla 2015
Write the polynomial as a sum making coefficients explicit, then simplify the expression.
Copyright Scott Storla 2015

26. Copyright Scott Storla 2015
Write the polynomial as a sum making coefficients explicit, then simplify the expression.
Copyright Scott Storla 2015

27. Copyright Scott Storla 2015
Write the polynomial as a sum making coefficients explicit, then simplify the expression.
Copyright Scott Storla 2015

28. Copyright Scott Storla 2015
Write the polynomial as a sum making coefficients explicit, then simplify the expression.
Copyright Scott Storla 2015

29. Adding and Subtracting Polynomials
Copyright Scott Storla 2015

30. Adding and Subtracting Polynomials
Copyright Scott Storla 2015

31. Copyright Scott Storla 2015
Simplify
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32. Copyright Scott Storla 2015
Simplify
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33. Copyright Scott Storla 2015
Simplify
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34. Copyright Scott Storla 2015
Simplify
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35. Copyright Scott Storla 2015
Simplify
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36. Copyright Scott Storla 2015
Simplify
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37. Adding and Subtracting Polynomials
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38. An Introduction to Polynomial Distribution
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39. Binomial Distribution
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40. The Distributive Property of Multiplication over Addition
Simplify
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41. Copyright Scott Storla 2015
Simplify
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42. Copyright Scott Storla 2015
Simplify
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43. Copyright Scott Storla 2015
Simplify
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44. Binomial Distribution
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45. Continuing With Binomial Distribution
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46. Copyright Scott Storla 2015
Simplify
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47. Copyright Scott Storla 2015
Simplify
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48. Copyright Scott Storla 2015
Simplify
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49. Copyright Scott Storla 2015
Simplify
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50. Copyright Scott Storla 2015
Simplify
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51. Continuing With Binomial Distribution
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52. Using Distribution to Simplify Expressions
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53. Copyright Scott Storla 2015
Simplify
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54. Copyright Scott Storla 2015
Simplify
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55. Copyright Scott Storla 2015
Simplify
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56. Copyright Scott Storla 2015
Simplify
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57. Copyright Scott Storla 2015
Simplify
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58. Copyright Scott Storla 2015
Simplify
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59. Copyright Scott Storla 2015
Simplify
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60. Copyright Scott Storla 2015
Simplify
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61. Using Distribution to Simplify Expressions
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62. Copyright Scott Storla 2015
A Factor of –1
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63. Copyright Scott Storla 2015
Simplify
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64. Copyright Scott Storla 2015
Simplify
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65. Copyright Scott Storla 2015
Simplify
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66. Copyright Scott Storla 2015
Simplify
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67. Copyright Scott Storla 2015
Simplify
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68. Copyright Scott Storla 2015
Simplify
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69. Copyright Scott Storla 2015
Simplify
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70. Copyright Scott Storla 2015
Simplify
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71. Copyright Scott Storla 2015
Simplify
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72. Copyright Scott Storla 2015
Simplify
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73. Copyright Scott Storla 2015
Simplify
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74. Copyright Scott Storla 2015
A Factor of –1
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