Presentation is loading. Please wait.

Presentation is loading. Please wait.

MULTIPLICATION OF POLYNOMIALS CHAPTER 4 SECTION 5 MTH 10905 Algebra.

Published byMegan Paul Modified over 9 years ago

Similar presentations

Presentation on theme: "MULTIPLICATION OF POLYNOMIALS CHAPTER 4 SECTION 5 MTH 10905 Algebra."— Presentation transcript:

1 MULTIPLICATION OF POLYNOMIALS CHAPTER 4 SECTION 5 MTH 10905 Algebra

2 Multiply a Monomial by a Monomial A monomial is a Polynomial with one term, such as 8 because 8x 0, 4x because 4x 1, and -6x 2 Multiple their coefficients and use the product rule of exponents to determine the exponents value. Example: (3y 4 )(5y 2 )(-2a 6 )(8a 8 ) (3)(5)(y 4 )(y 2 )(-2)(8)(a 6 )(a 8 ) 15y 4+2 -16a 6+8 15y 6 -16a 14

3 Multiply a Monomial by a Monomial Example: (4xy 5 )(2x 7 y 2 ) (4)(2)(x)(x 7 )(y 5 )(y 2 ) 8x 1+7 y 5+2 8x 8 y 7 Example: 7a 2 bc 4 (-2a 5 b 7 c) (7)(-2)(a 2 )(a 5 )(b)(b 7 )(c 4 )(c) -14a 2+5 b 1+7 c 4+1 -14a 7 b 8 c 5

4 Multiply a Monomial by a Monomial Example: (-3x 3 z 8 )(-5xy 4 z 2 ) (-3)(-5)(x)(x 3 )(y 4 )(z 2 )(z 8 ) 15x 1+3 y 4 z 2+8 15x 4 y 4 z 10

5 Multiply a Polynomial by a Monomial Use the distributive property: a(b + c) = ab + ac Example: 6a(a 2 + 10) (6a)(a 2 ) + (6a)(10) 6a 1+2 + 60a 6a 3 + 60a

6 Multiply a Polynomial by a Monomial Example: -2x(2x 2 – 3x – 5) (-2x)(2x 2 ) + (-2x)(-3x) + (-2x)(-5) -4x 1+2 + 6x 1+1 + 10x -4x 3 + 6x 2 + 10x Example: 3x 2 (5x 3 – 3x + 8) (3x 2 )(5x 3 ) + (3x 2 )(-3x) + (3x 2 )(8) 15x 2+3 - 9x 2+1 + 24x 2 15x 5 - 9x 3 + 24x 2

7 Multiply a Polynomial by a Monomial Example: 3a(4a 2 b – 7ab + 2) (3a)(4a 2 b) + (3a)(-7ab) + (3a)(2) 12a 1+2 b – 21a 1+1 b + 6a 12a 3 b – 21a 2 b + 6a Example: (5x 2 – 3xy + 5)(3x) Commutative Property (3x)(5x 2 ) + (3x)(-3xy) + (3x)(5) 15x 1+2 - 9x 1+1 y + 15x 15x 3 - 9x 2 y + 15x

8 Multiply Binomials using the FOIL Method F = First, multiply the first terms together O = Outer, multiply the two outer terms together I = Inner, multiply the two inner terms together L = Last, multiply the last terms together The product of the two binomials is the sum of these four products. (a + b) (c + d) = ac + ad + bc + bd Each term must multiply every term in the other binomial

9 Multiply Binomials using the FOIL Method Example: (5a + 3)(a – 2) (5a)(a) + (5a)(-2) + (3)(a) + (3)(-2) 5a 1+1 + 3a – 10a – 6 5a 2 – 7a – 6 Example: (a + 3)(b – 9) (a)(b) + (a)(-9) + (3)(b) + (3)(-9) ab - 9a + 3b – 27

10 Multiply Binomials using the FOIL Method Example: (3x – 4)(x + 2) (3x)(x) + (3x)(2) + (-4)(x) + (-4)(2) 3x 1+1 + 6x – 4x – 8 3x 2 + 2x – 8 Example: (8 – 3b)(7 – 5b) (8)(7) + (8)(-5b) + (-3b)(7) + (-3b)(-5b) 56 – 40b – 21b + 15b 1+1 56 – 61b + 15b 2 15b 2 – 61b + 56

11 Multiply Binomials using the FOIL Method Example: (2c + 3)(2c – 3) (2c)(2c) + (2c)(-3) + (3)(2c) + (3)(-3) 4c 1+1 – 6c + 6c – 9 4c 2 – 9

12 Multiply Binomials using Formulas for Special Products The product of the Sum and Difference of the Same Two Terms: Difference of Two Squares Formula: (a + b) (a – b) = a 2 - b 2 Example: (y + 10)(y – 10) (y)(y) + (y)(-10) + (10)(y) + (10)(-10) y 2 – 10 2 y 2 – 100

13 Multiply Binomials using Formulas for Special Products Example: (7a + 2b)(7a – 2b) (7a)(7a) + (7a)(-2b) + (2b)(7a) + (2b)(-2b) (7a) 2 – (2a) 2 49a 2 – 4b 2

14 Multiply Binomials using Formulas for Special Products Example: Using the FOIL method (x + 8) 2 (x + 8)(x + 8) (x)(x) + (x)(8) + (8)(x) + (8)(8) x 1+1 + 8x + 8x + 64 x 2 + 16x + 64

15 Multiply Binomials using Formulas for Special Products Square of a Binomial Formula (a + b) 2 = (a + b)(a + b) = a 2 + 2ab + b 2 Example: (3x + 5) 2 = (3x + 5)(3x + 5) 9x 2 + 30x + 25 (3x) 2 + (2)(3x)(5) + 5 2 (3x)(3x) + (3x)(5) + (5)(3x) + (5)(5)

16 Square of a Binomial Formula (3 + 5) 2 ≠ 3 2 + 5 2 because 3 2 + 5 2 = 9 + 25 = 34 and (3 + 5) 2 = (8) 2 = 64 (a + b) 2 = (a + b)(a + b) = a 2 + 2ab + b 2 (3 + 5) 2 = 3 2 + (2)(3)(5) + 5 2 = 9 + 30 + 25 = 39 + 25 = 64

17 Multiply Binomials using Formulas for Special Products Example: (7r – w) 2 = (7r – w)(7r – w) 49r 2 - 14rw + w 2 (7r) 2 + (2)(7r)(-w) + (-w)(-w) (7r)(7r) + (7r)(-w) + (-w)(7r) + (-w)(-w)

18 Multiply any Two Polynomials using a Vertical Procedure Example: (3y + 7)(4y + 5)

19 Multiply any Two Polynomials using a Vertical Procedure Example: (3x + 2)(4x 2 + x – 3)

20 Multiply any Two Polynomials using a Vertical Procedure Example:

21 Multiply Binomials Using Formulas for Special Products Example: (2a 2 + 2a)(4a 3 +2a 2 + a + 4) Multiplication of Polynomials is very important that you understand. In Chapter 5 we will be factoring polynomials, which is the reverse process of multiplication of polynomials.

22 HOMEWORK 4.5 Page 275 #21, 25, 29, 36, 43, 45, 47, 53, 59, 75, 76, 77, 79, 80, 93, 95

Download ppt "MULTIPLICATION OF POLYNOMIALS CHAPTER 4 SECTION 5 MTH 10905 Algebra."

Similar presentations

Polynomials and Factoring

Polynomials and Factoring
Chapter 5 Section 5 Copyright © 2008 Pearson Education, Inc. Publishing as Pearson Addison-Wesley.

Chapter 5 Section 5 Copyright © 2008 Pearson Education, Inc. Publishing as Pearson Addison-Wesley.
4.5 Multiplying Polynomials

4.5 Multiplying Polynomials
Objective: To be able to find the product of two binomials. Objective: To be able to find the product of two binomials. 8.7 Multiplying Polynomials Part.

Objective: To be able to find the product of two binomials. Objective: To be able to find the product of two binomials. 8.7 Multiplying Polynomials Part.
Multiplication of Polynomials.  Use the Distributive Property when indicated.  Remember: when multiplying 2 powers that have like bases, we ADD their.

Multiplication of Polynomials.  Use the Distributive Property when indicated.  Remember: when multiplying 2 powers that have like bases, we ADD their.
10.1 Adding and Subtracting Polynomials

10.1 Adding and Subtracting Polynomials
Section 2.5 Multiplication of Polynomials and Special Products

Section 2.5 Multiplication of Polynomials and Special Products
Chapter 9 Polynomials and Factoring A monomial is an expression that contains numbers and/or variables joined by multiplication (no addition or subtraction.

Chapter 9 Polynomials and Factoring A monomial is an expression that contains numbers and/or variables joined by multiplication (no addition or subtraction.
§ 4.5 Multiplication of Polynomials. Angel, Elementary Algebra, 7ed 2 Multiplying Polynomials To multiply a monomial by a monomial, multiply their coefficients.

§ 4.5 Multiplication of Polynomials. Angel, Elementary Algebra, 7ed 2 Multiplying Polynomials To multiply a monomial by a monomial, multiply their coefficients.
Copyright © 2011 Pearson Education, Inc. Publishing as Prentice Hall. Chapter 12 Exponents and Polynomials.

Copyright © 2011 Pearson Education, Inc. Publishing as Prentice Hall. Chapter 12 Exponents and Polynomials.
For Common Assessment Chapter 10 Review

For Common Assessment Chapter 10 Review
Exponents and Polynomials

Exponents and Polynomials
Section 5.1 Polynomials Addition And Subtraction.

Section 5.1 Polynomials Addition And Subtraction.
1 linearf (x) = mx + bone f (x) = ax 2 + bx + c, a  0quadratictwo cubicthreef (x) = ax 3 + bx 2 + cx + d, a  0 Degree Function Equation Common polynomial.

1 linearf (x) = mx + bone f (x) = ax 2 + bx + c, a  0quadratictwo cubicthreef (x) = ax 3 + bx 2 + cx + d, a  0 Degree Function Equation Common polynomial.
Adding and Subtracting Polynomials Section 0.3. Polynomial A polynomial in x is an algebraic expression of the form: The degree of the polynomial is n.

Adding and Subtracting Polynomials Section 0.3. Polynomial A polynomial in x is an algebraic expression of the form: The degree of the polynomial is n.
Polynomials P4.

Polynomials P4.
1 Copyright © 2015, 2011, 2007 Pearson Education, Inc. Chapter 5-1 Polynomials and Polynomial Functions Chapter 5.

1 Copyright © 2015, 2011, 2007 Pearson Education, Inc. Chapter 5-1 Polynomials and Polynomial Functions Chapter 5.
1.2 - Products Commutative Properties Addition: Multiplication:

1.2 - Products Commutative Properties Addition: Multiplication:
Polynomials. The Degree of ax n If a does not equal 0, the degree of ax n is n. The degree of a nonzero constant is 0. The constant 0 has no defined degree.

Polynomials. The Degree of ax n If a does not equal 0, the degree of ax n is n. The degree of a nonzero constant is 0. The constant 0 has no defined degree.
Copyright © 2010 Pearson Education, Inc. All rights reserved Sec 6.4 - 1.

Copyright © 2010 Pearson Education, Inc. All rights reserved Sec

Similar presentations

Ads by Google