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1. The nth-Term Test:
 
1. The nth-Term Test:
  
Unless <math>an\rightarrow 0</math>, the series diverges
+
Unless <math>a_{n}\rightarrow 0</math>, the series diverges
  
 
2. Geometric series:
 
2. Geometric series:
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4. Ratio Test(for series with non-negative terms):  
 
4. Ratio Test(for series with non-negative terms):  
 
   
 
   
<math> \lim \limits_{n \to \infty }{\frac{an+1}{an}}=p</math> The series converges if p<1, diverges if p>1, and is inconclusive if p=1
+
<math> \lim \limits_{n \to \infty }{\frac{a_{n+1}}{a_{n}}}=p</math> The series converges if p<1, diverges if p>1, and is inconclusive if p=1
  
 
5. Root Test(for series with non-negative terms):  
 
5. Root Test(for series with non-negative terms):  
  
<math> \lim \limits_{n \to \infty }{\sqrt[n]{an} }=p</math> The series converges if p<1, diverges if p>1, and is inconclusive if p=1
+
<math> \lim \limits_{n \to \infty }{\sqrt[n]{a_{n}} }=p</math> The series converges if p<1, diverges if p>1, and is inconclusive if p=1
  
 
More to come...
 
More to come...

Revision as of 15:33, 9 November 2008

I saw a really great study guide that got passed around before the first Engineering 195 test, so I thought it would be a great idea to create a collaborative study guide for MA 181.

Convergent and Divergent Series Tests

1. The nth-Term Test:

Unless $ a_{n}\rightarrow 0 $, the series diverges

2. Geometric series:

$ \sum_{n=1}^\infty ar^n $ converges if $ |r| < 1 $; otherwise it diverges.

3. p-series:

$ \sum_{n=1}^\infty 1/n^p $ converges if $ p>1 $; otherwise it diverges

4. Ratio Test(for series with non-negative terms):

$ \lim \limits_{n \to \infty }{\frac{a_{n+1}}{a_{n}}}=p $ The series converges if p<1, diverges if p>1, and is inconclusive if p=1

5. Root Test(for series with non-negative terms):

$ \lim \limits_{n \to \infty }{\sqrt[n]{a_{n}} }=p $ The series converges if p<1, diverges if p>1, and is inconclusive if p=1

More to come...

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To all math majors: "Mathematics is a wonderfully rich subject."

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