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POLYNOMIALS Chapter 4. 4-1 Exponents EXPONENTIAL FORM – number written such that it has a base and an exponent 4 3 = 4 4 4.

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Presentation on theme: "POLYNOMIALS Chapter 4. 4-1 Exponents EXPONENTIAL FORM – number written such that it has a base and an exponent 4 3 = 4 4 4."— Presentation transcript:

1 POLYNOMIALS Chapter 4

2 4-1 Exponents

3 EXPONENTIAL FORM – number written such that it has a base and an exponent 4 3 = 4 4 4

4 BASE – tells what factor is being multiplied EXPONENT – Tells how many equal factors there are

5 EXAMPLES 1. x x x x = x 4 2. 6 6 6 = 6 3 3. -2 p q 3 p q p = -6p 3 q 2 4. (-2) b (-4) b = 8b 2

6 ORDER OF OPERATIONS 1. 1. Simplify expression within grouping symbols 2. 2. Simplify powers 3. 3. Simplify products and quotients in order from left to right 4. 4. Simplify sums and differences in order from left to right

7 EXAMPLES 1. -3 4 = -(3)(3)(3)(3) = - 81 2. (-3) 4 = (-3)(-3)(-3)(-3) = 81 3. (1 + 5) 2 = (6) 2 = 36 4. 1 + 5 2 = 1 + 25 = 26

8 4-2 Adding and Subtracting Polynomials

9 DEFINITIONS Monomial – an expression that is either a numeral, a variable, or the product of a numeral and one or more variables. Monomial – an expression that is either a numeral, a variable, or the product of a numeral and one or more variables. -6xy, 14, z, 2/3r, ab -6xy, 14, z, 2/3r, ab

10 DEFINITIONS Polynomial – an expression that is the sum of monomials Polynomial – an expression that is the sum of monomials 14 + 2x + x 2 -4x 14 + 2x + x 2 -4x

11 DEFINITIONS Binomial – an expression that is the sum of two monomials (has two terms) Binomial – an expression that is the sum of two monomials (has two terms) 14 + 2x, x 2 - 4x 14 + 2x, x 2 - 4x

12 DEFINITIONS Trinomial – an expression that is the sum of three monomials (has three terms) Trinomial – an expression that is the sum of three monomials (has three terms) 14 + 2x + y, x 2 - 4x + 2 14 + 2x + y, x 2 - 4x + 2

13 DEFINITIONS Coefficient – the numeral preceding a variable Coefficient – the numeral preceding a variable 2x – coefficient = 2 2x – coefficient = 2

14 DEFINITIONS Similar terms – two monomials that are exactly alike except for their coefficients Similar terms – two monomials that are exactly alike except for their coefficients 2x, 4x, -6x, 12x, -x 2x, 4x, -6x, 12x, -x

15 DEFINITIONS Simplest form – when no two terms of a polynomial are similar Simplest form – when no two terms of a polynomial are similar 4x 3 – 10x 2 + 2x - 1 4x 3 – 10x 2 + 2x - 1

16 DEFINITIONS Degree of a variable– the number of times that the variable occurs as a factor in the monomial Degree of a variable– the number of times that the variable occurs as a factor in the monomial 4x 2 degree of x is 2 4x 2 degree of x is 2

17 DEFINITIONS Degree of a monomial – the sum of the degrees of its variables. Degree of a monomial – the sum of the degrees of its variables. 4x 2 y degree of monomial is 3 4x 2 y degree of monomial is 3

18 DEFINITIONS Degree of a polynomial – is the greatest of the degrees of its terms after it has been simplified. Degree of a polynomial – is the greatest of the degrees of its terms after it has been simplified. -6x 3 + 3x 2 + x 2 + 6x 3 – 5 -6x 3 + 3x 2 + x 2 + 6x 3 – 5

19 Examples (3x 2 y+4xy 2 – y 3 +3) + (x 2 y+3y 3 – 4) (-a 5 – 5ab+4b 2 – 2) – (3a 2 – 2ab – 2b 2 – 7)

20 4-3 Multiplying Monomials

21 RULE OF EXPONENTS Product Rule a m a n = a m + n x 3 x 5 = x 8 (3n 2 )(4n 4 ) = 12n 6

22 4-4 Powers of Monomials

23 RULE OF EXPONENTS Power of a Power (a m ) n = a mn (x 3 ) 5 = x 15

24 RULE OF EXPONENTS Power of a Product (ab) m = a m b m (3n 2 ) 3 = 3 3 n 6

25 4-5 Multiplying Polynomials by Monomials

26 Examples – Use Distributive Property x(x + 3) x(x + 3) x 2 + 3x 4x(2x – 3) 4x(2x – 3) 8x 2 – 12x -2x(4x 2 – 3x + 5) -2x(4x 2 – 3x + 5) -8x 3 +6x 2 – 10x

27 4-6 Multiplying Polynomials

28 Use the Distributive Property (x + 4)(x – 1) (x + 4)(x – 1) (3x – 2)(2x 2 - 5x- 4) (3x – 2)(2x 2 - 5x- 4) (y + 2x)(x 3 – 2y 3 + 3xy 2 + x 2 y) (y + 2x)(x 3 – 2y 3 + 3xy 2 + x 2 y)

29 4-7 Transforming Formulas

30 Examples C = 2  r, solve for r c/2  = r

31 Examples S = v/r, solve for r R = v/s

32 4-8 Rate-Time- Distance Problems

33 Example 1 A helicopter leaves Central Airport and flies north at 180 mi/hr. Twenty minutes later a plane leaves the airport and follows the helicopter at 330 mi/h. How long does it take the plane to overtake the helicopter.

34 Use a Chart RateTimeDistance helicopter180 t + 1/3 180(t + 1/3) plane330t330t

35 Solution 330t = 180(t + 1/3) 330t = 180t + 60 150t = 60 t = 2/5

36 Example 2 Bicyclists Brent and Jane started at noon from points 60 km apart and rode toward each other, meeting at 1:30 PM. Brent’s speed was 4 km/h greater than Jane’s speed. Find their speeds.

37 Use a Chart RateTimeDistance Brent r + 4 1.5 1.5(r + 4) Janer1.51.5r

38 Solution 1.5(r + 4) + 1.5 r = 60 1.5r + 6 + 1.5r = 60 3r + 6 = 60 3r = 54 r = 18

39 4-9 Area Problems

40 Examples A rectangle is 5 cm longer than it is wide. If its length and width are both increased by 3 cm, its area is increased by 60 cm 2. Find the dimensions of the original rectangle.

41 Draw a Picture x + 5 x x + 8 x + 3

42 Solution x(x+5) + 60 = (x+3)(x + 8) X 2 + 5x + 60 = x 2 +11x + 24 60 = 6x + 24 36 = 6x 6 = x and 6 + 5 = 11

43 Example 2 Hector made a rectangular fish pond surrounded by a brick walk 2 m wide. He had enough bricks for the area of the walk to be 76 m 2. Find the dimensions of the pond if it is twice as long as it is wide.

44 Draw a Picture 2 m 2x x 2x + 4 x + 4

45 Solution (2x + 4)(x + 4) – (2x)(x) = 76 2x 2 + 8x + 4x + 16 – 2x 2 = 76 12x + 16 = 76 -16 -16 -16 -16 12x = 60 12 12 x = 5

46 4-10 Problems Without Solutions

47 Examples A lawn is 8 m longer than it is wide. It is surrounded by a flower bed 5 m wide. Find the dimensions of the lawn if the area of the flower bed is 140 m 2

48 Draw a Picture x + 8 x 5 5

49 Solution (x+10)(x+18) –x(x+8) = 140 x 2 + 28x + 180 –x 2 -8x = 140 20x = -40 x = -2 Cannot have a negative width

50 THE END


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