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Bell Work 11/22
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Homework Due 11/25 Exponents & Exponential Functions Page 82 #1-28 all
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Objectives The student will be able to: 1. multiply a monomial and a polynomial.
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add the exponents! 1) Simplify: 5(7n - 2) Use the distributive property. 5 7n 35n - 10 Review: When multiplying variables, - 5 2
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2) Simplify: 6a 2 + 9a 3) Simplify: 6rs(r 2 s - 3) 6rs r 2 s 6r 3 s 2 - 18rs - 6rs 3
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4) Simplify: 4t 2 (3t 2 + 2t - 5) 12t 4 5) Simplify: - 4m 3 (-3m - 6n + 4p) 12m 4 + 8t 3 - 20t 2 + 24m 3 n- 16m 3 p
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6) Simplify: (27x 2 - 6x + 12) 16x 3 - 28x 2 + 4x Fooled ya, didn’t I?!? Ha! Ha! Here’s the real answer! -9x 3 + 2x 2 - 4x
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Simplify 4y(3y 2 – 1) 1.7y 2 – 1 2.12y 2 – 1 3.12y 3 – 1 4.12y 3 – 4y
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Simplify -3x 2 y 3 (y 2 – x 2 + 2xy) 1.-3x 2 y 5 + 3x 4 y 3 – 6x 3 y 4 2.-3x 2 y 6 + 3x 4 y 3 – 6x 2 y 3 3.-3x 2 y 5 + 3x 4 y 3 – 6x 2 y 3 4.3x 2 y 5 – 3x 4 y 3 + 6x 3 y 4
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Bell Work 12-2-13 1. 7a + 4 a 2 2. 5b 2 + 2n 3. 11d 4 4. 2x 3 9 + 2x + 8 4x 5. A pizza shop owner is monitoring the amount of cheese he uses each week. The polynomials below model the pounds of cheese ordered in the past, where p represents pounds. Mozzarella: 3p 3 6 p 2 + 14p + 125 Cheddar : 12.5p 2 + 18p + 75 Write a polynomial that models the total number of pounds of cheese that were ordered. Write each polynomial in standard form. Then name each polynomial based on its degree and number of terms.
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Objective The student will be able to: multiply two polynomials using the FOIL method, Box method and the distributive property.
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There are three techniques you can use for multiplying polynomials. The best part about it is that they are all the same! Huh? Whaddaya mean? It’s all about how you write it…Here they are! 1)Distributive Property 2)FOIL 3)Box Method Sit back, relax (but make sure to write this down), and I’ll show ya!
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1) Multiply. (2x + 3)(5x + 8) Using the distributive property, multiply 2x(5x + 8) + 3(5x + 8). 10x 2 + 16x + 15x + 24 Combine like terms. 10x 2 + 31x + 24 A shortcut of the distributive property is called the FOIL method.
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The FOIL method is ONLY used when you multiply 2 binomials. It is an acronym and tells you which terms to multiply. 2) Use the FOIL method to multiply the following binomials: (y + 3)(y + 7).
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(y + 3)(y + 7). F tells you to multiply the FIRST terms of each binomial. y2y2
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(y + 3)(y + 7). O tells you to multiply the OUTER terms of each binomial. y 2 + 7y
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(y + 3)(y + 7). I tells you to multiply the INNER terms of each binomial. y 2 + 7y + 3y
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(y + 3)(y + 7). L tells you to multiply the LAST terms of each binomial. y 2 + 7y + 3y + 21 Combine like terms. y 2 + 10y + 21
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Remember, FOIL reminds you to multiply the: F irst terms O uter terms I nner terms L ast terms
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The third method is the Box Method. This method works for every problem! Here’s how you do it. Multiply (3x – 5)(5x + 2) Draw a box. Write a polynomial on the top and side of a box. It does not matter which goes where. This will be modeled in the next problem along with FOIL. 3x-5 5x +2
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3) Multiply (3x - 5)(5x + 2) First terms: Outer terms: Inner terms: Last terms: Combine like terms. 15x 2 - 19x – 10 3x-5 5x +2 15x 2 +6x -25x -10 You have 3 techniques. Pick the one you like the best! 15x 2 +6x -25x -10
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4) Multiply (7p - 2)(3p - 4) First terms: Outer terms: Inner terms: Last terms: Combine like terms. 21p 2 – 34p + 8 7p-2 3p -4 21p 2 -28p -6p +8 21p 2 -28p -6p +8
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Bell Work 12/3 Simplify 1. (5a - 6m) - (2a + 5m) 2. (3y 3 +4y - 7) + (-4y 3 - y + 10) 3.(4z 3 + 5z) + (-2z 2 - 4z) 4.-6 (3x - 5)
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Warm-up: Simplify. 1. 6 (3x - 5) = _____ 2. 4 (2x + 10) = _____ 3. 9y - 3y = _____ 4. 7a + 4b + 3a - 2b = _____ 5. 4 (3x + 2) + 2 (x + 3) = ____
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Multiply (y + 4)(y – 3) 1.y 2 + y – 12 2.y 2 – y – 12 3.y 2 + 7y – 12 4.y 2 – 7y – 12 5.y 2 + y + 12 6.y 2 – y + 12 7.y 2 + 7y + 12 8.y 2 – 7y + 12
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Multiply (2a – 3b)(2a + 4b) 1.4a 2 + 14ab – 12b 2 2.4a 2 – 14ab – 12b 2 3.4a 2 + 8ab – 6ba – 12b 2 4.4a 2 + 2ab – 12b 2 5.4a 2 – 2ab – 12b 2
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5) Multiply (2x - 5)(x 2 - 5x + 4) You cannot use FOIL because they are not BOTH binomials. You must use the distributive property. 2x(x 2 - 5x + 4) - 5(x 2 - 5x + 4) 2x 3 - 10x 2 + 8x - 5x 2 + 25x - 20 Group and combine like terms. 2x 3 - 10x 2 - 5x 2 + 8x + 25x - 20 2x 3 - 15x 2 + 33x - 20
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x2x2 -5x+4 2x -5 5) Multiply (2x - 5)(x 2 - 5x + 4) You cannot use FOIL because they are not BOTH binomials. You must use the distributive property or box method. 2x 3 -5x 2 -10x 2 +25x +8x -20 Almost done! Go to the next slide!
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x2x2 -5x+4 2x -5 5) Multiply (2x - 5)(x 2 - 5x + 4) Combine like terms! 2x 3 -5x 2 -10x 2 +25x +8x -20 2x 3 – 15x 2 + 33x - 20
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Multiply (2p + 1)(p 2 – 3p + 4) 1.2p 3 + 2p 3 + p + 4 2.y 2 – y – 12 3.y 2 + 7y – 12 4.y 2 – 7y – 12
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