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Pg. 601 Homework Pg. 606#1 – 6, 8, 11 – 16 #14 + 16 + 36 + … + (2n) 2 #32 + 5 + 8 + (3n + 1) #5 #7(3n 2 + 7n)/2 #84n – n 2 #21#23 #26 #29 #33The series.

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Presentation on theme: "Pg. 601 Homework Pg. 606#1 – 6, 8, 11 – 16 #14 + 16 + 36 + … + (2n) 2 #32 + 5 + 8 + (3n + 1) #5 #7(3n 2 + 7n)/2 #84n – n 2 #21#23 #26 #29 #33The series."— Presentation transcript:

1 Pg. 601 Homework Pg. 606#1 – 6, 8, 11 – 16 #14 + 16 + 36 + … + (2n) 2 #32 + 5 + 8 + (3n + 1) #5 #7(3n 2 + 7n)/2 #84n – n 2 #21#23 #26 #29 #33The series converges to ¼

2 11.2 Finite and Infinite Series Sigma Notation Write the following sequences in Sigma Notation: 2 + 5 + 8 + 11 + … + 29 – 2 + 2 – 2 + 2 – 2 + … Use Sigma Notation to write the nth partial sum of the sequence: -8, -6, -4, … -3, -6, -9, -12, …

3 11.3 Binomial Theorem Definitions A finite sum occurs in an expression like a + b, called a binomial since it has two terms, when it is raised to a power. Observations There are n + 1 terms in each Symmetry in coefficients and exponents Sum of exponents is n Begins and ends with first and last terms raised to the nth power

4 11.3 Binomial Theorem Pascal’s Triangle How is it created? What’s the next row? Comparisons How does this compare to what we just worked with? Expand:(a + b) 6 Expand:(2x + 3y 2 ) 4

5 11.3 Binomial Theorem Binomial Coefficients Pascal’s Triangle works for relatively small values, but what if you want to expand something much larger? We use a factorial to do so! n! = 1 2 3 … n 3! = 8! = If n and r are two nonnegative integers, the number called the binomial coefficient n choose r is defined by:

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