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Binomial Theorem Honor’s Algebra II.

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Presentation on theme: "Binomial Theorem Honor’s Algebra II."β€” Presentation transcript:

1 Binomial Theorem Honor’s Algebra II

2 In the binomial expansion theorem, the numbers, variables, & exponents follow a pattern! (𝒂+𝒃) 𝒏
*Number of terms in your answer = n + 1 *Coefficients follow Pascal's Triangle of Coefficients *Each expansion will begin with "a" and end with "b" & in between them will be "sets" of "ab's" *Exponents will decrease for "a" from left to right and decrease for "b" from right to left *Exponents on each terms add up to the n value

3 How to set up the binomial expansion theorem: (𝒂+𝒃) 𝒏
Step 1: Write out Pascal’s Triangle of Coefficients in a column. Step 2: Using the exponent, start with a to the β€œn” power and count down until a is to the 0 power. Step 3: Using the exponent, start with b to the β€œ0” power and count up until b is raised to the β€œn” power. Step 4: Simplify your terms

4 Expand the Following π‘₯+2 3

5 π‘₯βˆ’4 4 Expand the Following
π‘₯βˆ’4 4 ***When there is subtraction in the binomial, the signs should alternate!!!

6 Expand the Following 2π‘₯βˆ’3 4

7 Expand the Following π‘₯

8 ExPAND THE FOLLOWING: π’™βˆ’πŸπ’š πŸ“

9 Dividing Polynomials

10 Long division always works!
𝐷𝑖𝑣𝑖𝑑𝑒𝑛𝑑 Γ·π·π‘–π‘£π‘–π‘ π‘œπ‘Ÿ=π‘„π‘’π‘œπ‘‘π‘–π‘’π‘›π‘‘ Quotient Divisor Dividend

11 Setting up for Long Division:
1.) Write your dividend & divisor in STANDARD FORM. *If you are missing an exponent put in a PLACE HOLDER of 0 π‘₯ 𝑒π‘₯π‘π‘œπ‘›π‘’π‘›π‘‘ . 2.) On the side of your paper, take the FIRST TERM of the DIVIDEND and divide it by the FIRST TERM of the DIVISOR. Place the quotient ABOVE its LIKE TERM. 3.) Multiply the newest term in the QUOTIENT by each term in the DIVISOR. Place the product "inside" UNDER its LIKE TERM. 4.) Put ( ) around the product and then SUBTRACT. 5.) Bring down the next term in the DIVIDEND & repeat Steps until the degree of the divisor is bigger than the degree of the dividend. This piece will become your REMAINDER.

12 What will my answer look like?
π‘„π‘’π‘œπ‘‘π‘–π‘’π‘›π‘‘+ π‘…π‘’π‘šπ‘Žπ‘–π‘›π‘‘π‘’π‘Ÿ π·π‘–π‘£π‘–π‘ π‘œπ‘Ÿ Amount Left Over Everything on top of the bar

13 Example: Divide using long division
(2 π‘₯ 2 βˆ’17π‘₯βˆ’38)Γ·(2π‘₯+3)

14 Example: Divide using long division
(10 π‘₯ 4 βˆ’7 π‘₯ 2 βˆ’1)Γ·( π‘₯ 2 βˆ’π‘₯+3)

15 Example: Divide using long division
(6 π‘₯ π‘₯ 2 βˆ’17π‘₯+4)Γ·(3π‘₯βˆ’1)

16 How do I Use Synthetic Division???
To divide using Synthetic Division the divisor must be a LINEAR BINOMIAL with a LEADING COEFFICIENT OF 1. (X + #) or (X - #)

17 What does synthetic division look like?

18 What does synthetic division look like?

19 What does my answer look like?
The degree of your quotient will always be ONE LESS than the degree of your dividend.

20 Example: Divide using Synthetic Division
( π‘₯ 3 +6 π‘₯ 2 βˆ’30π‘₯+120)Γ·(π‘₯+10)

21 Example : Divide Using Synthetic Division
( π‘₯ 3 βˆ’20)Γ·(π‘₯βˆ’3)

22 Example : Divide Using Synthetic Division
( π‘₯ 2 +5π‘₯βˆ’14)Γ·(π‘₯βˆ’2)

23 Example : Divide Using Synthetic Division
( π‘₯ 3 +π‘₯+30)Γ·(π‘₯+3)

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