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…an overview of sections 11.2 – 11.6

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Presentation on theme: "…an overview of sections 11.2 – 11.6"— Presentation transcript:

1 …an overview of sections 11.2 – 11.6
Testing Convergence …an overview of sections 11.2 – 11.6

2 Some Fundamentals… For a series to converge the elements of the series MUST converge to zero! but This is a necessary but not sufficient condition! Example: does the following (harmonic series) converge?

3 A few major methods… Integral Test: (11.3) Comparison Test (11.4)
p-test Comparison Test (11.4) Alternating Series Test (11.5) Ratio Test (11.6) Nth Root Test (11.6)

4 Integral Test Applies to monotonic, positive, decreasing functions
Use the connection between summation and integration Express generating function for series as an integrand: Example: does converge? Compare this to Series converges if the integral does! Pg 704 #27

5 Comparison Test Sorta “common sense”:
“if series A converges and all of series B terms are less than or equal to series A terms then series B also converges” The “catch” (there is always a catch!): the terms must be non-negative. Example: Test convergence (or divergence) of: A) B) Pg 709 #27

6 Alternating Series Test
If and the Series converges Pg 713 #13

7 Ratio and Root Tests Consider the series let if: Example:
r < 1 series converges r > 1 series diverges r = 1 ??????????? Example:

8 Ratio and Root Tests Consider the series let if: Example:
r < 1 series converges r > 1 series diverges r = 1 ??????????? Example:

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