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Precalculus

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Precalculus 8.5 / 9.5 The Binomial Theorem Recall Binomial a polynomial with two terms We will be looking at ways to simplify the operation (x + y)n Calculate ... – PowerPoint PPT presentation

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Title: Precalculus


1
Precalculus
  • 8.5 / 9.5
  • The Binomial Theorem

2
Recall
  • Binomial a polynomial with two terms
  • We will be looking at ways to simplify the
    operation (x y)n
  • Calculate coefficients
  • Write expansions
  • Use Pascals Triangle

3
Lets start with some expansions
4
You can notice some things
Each expansion has n1 terms
  • Powers of x decrease by one as powers of y
    increase by one
  • For every term in the expansion, the exponents
    add to n
  • Coefficients increase and decrease symmetrically

5
Binomial TheoremFinds binomial coefficients
  • For each term in an expansion, it is easy to
    write x and y with their exponents
  • For example, for (x y)4
  • x4 nx3y nx2y2 nxy3 y4

x terms go down in degree
y terms go up in degree
What are the ns?
6
The Binomial Theorem
  • In the expansion (x y)n
  • the coefficient of a term in the expansion
  • xn ryr is

Look familiar?
7
  • The coefficient of xn ryr
  • Where is r coming from?
  • The exponent of x subtracted from n
  • This will also be the exponent attached to y

8
Another Note
  • The symbol is often used in place of

9
Example 1Finding Binomial Coefficients
  • For (xy)8, find the coefficient attached to the
    term whose x term is degree 6 and y terms is
    degree 2.
  • The term would be 28x6y2

10
Example 2Find the binomial coefficientThen
write the term

The term is 120x7y3
11
Binomial Expansions(x y)n
  • First, you must find the coefficients
  • Then attach x and y using the appropriate
    exponents, following the pattern mentioned earlier

12
Example 3Expanding a Binomial
  • Write the expansion of (x 1)3
  • Write out the terms
  • Find the coefficients

13
What about (x y)n?
  • The signs inside will alternate ,-,,-
  • Example (x 1)3
  • x (-1)3
  • 1x3 3x2(-11) 3x(-12) 1(-13)
  • x3 - 3x2 3x - 1

14
Practice
  • Write the expansion (2x 3)4

15
Finding a specific term from an expansion
  • What if you want to know the third term from an
    expansion
  • We use the fact that to find a term, (r 1) from
    an expansion, we can use the previously seen
    expression
  • We just need to find the value of r

16
Example 4
  • Find the third term of the expansion of
  • (x2 4)3
  • What are the values of n and r for this example?

n 3
r 1 3 so r 2
  • Evaluate

17
Practice
  • Find the sixth term of (a 2b)8

1792a3b5
18
The Shortcut
  • There is another pattern to finding binomial
    coefficients
  • Pascals Triangle

Row 0
Row 3
. . .
19
How to use the triangle
  • What are the coefficients of a binomial expansion
    (x y)8?

Row 8
20
How to form the triangle
  • The first and last entries of every row are both
    1.
  • Every other entry is formed by adding together
    the two numbers above it
  • One just off to the left
  • One just off to the right

21
3 1 2
5 4 1
22
Example 5
  • Write the expansion of (2x 3)4
  • Use the 4th row of Pascals Triangle
  • 1, 4, 6, 4, 1

23
Homework
  • P 624 31 67 every other odd, 84
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