Using Pascal’s Triangle to Expand Binomials
Hon Alg 2: Unit 2
Powers of Binomials: Binomial Expansion
Examples: Use FOIL as needed
(x + y)0 = __________________________
(x + y)1 = __________________________
(x + y)2 = __________________________
(n + 4)2 = __________________________
(c – 3)2 = __________________________
(2a + 3b)2 = __________________________
(x + y)3 = _____________________________________
(n + 1)3 = _____________________________________
(c – 2)3 = _____________________________________
Based on the power of the binomial, do you notice any pattern or relationship between the terms of your polynomial solution and the original terms of the binomial?
Common multiples for each term depending on the power
PASCAL’S TRIANGLE
• What patterns do you notice?
Add the two previous diagonal terms from the row above
• Use your pattern to find the next two rows.
• What do you notice any relationship between the power answers and Pascal’s Triangle?
Each row represents the coefficients for the overall power
EACH Diagonal/ Term of Row = specific power of first term
Use Pascal’s Triangle to expand each of the following:
Write powers of first term counting down from n and write powers of second term count up from 0
1. (x + y)4 2. (m + n)5
= 1x4 + 4x3y + 6x2y2 + 4x1y3 + 1y4 m5 + 5m4n + 10m3n2 + 10 m2n2 + 5mn4 + 1n5
3. (x – 2)4 4. (2x – 3)6
1x4 + 4x3(-2) + 6x2(-2)2 + 4x1(-2)3 + 1(-2)4
x4 – 8x3 + 24x2 – 32x + 16
Combination Statement: [pic] or alternative notation [pic]
Total number of ways to select an unordered group of k items from a total of n items
• FACTORIAL (N!): The product of consecutive integers from N to 1.
1) 3! = 3*2*1 = 6
2) 5! = 5*4*3*2*1 = 120
3) 6! = 6*5*4*3*2*1 = 720
4) [pic]
5) [pic]
6) [pic]
7) [pic]
8) [pic]
9) [pic]
10) [pic]
Based on #7 – 10: Combination = values of Pascal’s Triangle: n= row and k = diagonal or term in row
Binomial Theorem: [pic]
The binomial expansion is based on the summation of combination statements and varying powers of your binomial terms. (be careful with negative signs)
Hint #1: Powers of each summation term will add to equal power of binomial expression (n)
Hint #2: Combinations will always be paired with the power of the second term from the binomial (b)
Hint #3: Summation from 0 to n means there will be one more term than the power of the binomial
o (… + … )1 = 2 terms
o (… + … )2 = 3 terms
o (… + … )3 = 4 terms
Examples: Expand using the binomial theorem.
1. (x + y)3
[pic]
x3 + 3x2y + 3xy2 + y3
2. (3x + y)4 [pic]
81x4 + (4)27x3y + (6)9x2y2 + (4)3xy3 + y4 = 81x4 + 108x3y + 54x2y2 + 12xy3 + y4
3. (2x + y)5
[pic](2x)5 + 5(2x)4y+ 10(2x) 3y2 + 10(2x) 2y3 + 5(2x)y4 + y5 = 32x5 + 90x4y + 80x3y2 + 40x2y3 + 10xy4 + y5
-----------------------
x3 + 3x2y + 3xy2 + y3
1
x + y
x2 + 2xy + y2
n2 + 8n + 16
c2 – 6c + 9
4a2 + 12ab + 9b2
x3 + 3n2 + 3n+ 1
c3 + 3c2(-2) + 3c(-2)2 + (-2)3
c3 – 6c2 + 12c – 8
Pascal’s Triangle:
1
1 1
1 2 1
1 3 3 1
1 4 6 4 1
1 5 10 10 5 1
n = 0
n =1
n =2
n =3
n = 4
1 6 15 20 15 6 1
1 7 21 35 35 21 7 1
(2x)6 + 6(2x)5(-3)1 + 15(2x) 4(-3)2 + 20(2x) 3(-3)3 + 15(2x) 2(-3)4 + 6(2x) 1(-3)5 + 1(-3)6
32x6 – 576x5 + 2160x4 – 4320x3 + 4860x2 – 2916x + 729
................
................
In order to avoid copyright disputes, this page is only a partial summary.
To fulfill the demand for quickly locating and searching documents.
It is intelligent file search solution for home and business.
Related download
Related searches
- how to expand your vocabulary
- words to expand your vocabulary
- binomial theorem to expand binomials
- pascal s triangle patterns
- pascal s triangle math
- pascal s triangle calculator
- pascal s triangle binomial expansion practice
- how to expand screen windows 10
- exercises to expand lung capacity
- how to expand a table excel
- how to expand a table in excel
- how to expand logarithmic equations