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9.4 Day 2 Limit Comparison Test

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1 9.4 Day 2 Limit Comparison Test

2 Limit Comparison Test If and for all (N a positive integer)
If , then both and converge or both diverge. If , then converges if converges. If , then diverges if diverges.

3 Example 3a: When n is large, the function behaves like: harmonic series Since diverges, the series diverges.

4 Example 3b: When n is large, the function behaves like: geometric series Since converges, the series converges.

5 Use the limit comparison test to see if the series converges

6 Use the limit comparison test to see if the series converges
Compare to This series converges It is a p-series Therefore the two series have the same growth rate. They both converge

7 Tests we know so far: Try this test first
nth term test (for divergence only) Then try these Special series: Geometric, P series, Telescoping General tests: Direct comparison test, Limit comparison test, Integral test, Absolute convergence test (to be used with another test)

8 Homework p odd all Mother: Does your teacher like you ? Son: Like me, she loves me. Look at all those Xs on my test paper ! Q: What did one math book say to the other? A: Man I got a lot of problems!

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