Summary of Convergence Tests NAME STATEMENT COMMENTS Test for Divergence If lim 0, then ∑ diverges. If lim 0, then ∑ may or →∞ →∞ may not converge. P-Series Test Let ∑ be a series with positive This test can be used in conjunction with the comparison test for any a terms, then n whose denominator is raised to the (a) Series converges if p>1 nth power. (b) Series diverges if p≤1 Direct Comparison Test Let ∑ and ∑ be series with This test works best for series whose non-negative terms such that formulas look very similar to the , , ,… format needed for another test. Best if ∑ converges, then ∑ example: when is a rational funct. converges, and if ∑ diverges, WARNING: must use a second test then ∑ diverges. to determine whether the built series converges or diverges. Limit Comparison Test Let ∑ and ∑ be series with This is easier to apply than the positive terms such that Direct Comparison Test and works lim in the same type of cases. → WARNING: must use a second test if 0 < < ∞, then both series to determine whether the built series converge, or both series diverge. converges or diverges. Integral Test Let ∑ be a series with positive This test only works for series that terms, and let be the function have positive terms. that results when n is replaced by in the nth term of the associated Try this test when is easy to sequence. If is decreasing and integrate. continuous for 1, then ∑ and both converge or both diverge. Ratio Test Let ∑ be a series and suppose Try this test when involves ℓ lim factorials or combinations of → different types of functions. (a) Converges if 1ℓ1 (b) Diverges if ℓ1 or ℓ1 (c) Test fails if ℓ1 Ratio Test for Absolute Let ∑ be a series and suppose This is the default test because it is Convergence ℓ lim one of the easiest tests and it rarely → fails. (a) Series converges if ℓ < 1 NOTE: the series need not have only (b) Series diverges if ℓ > 1 positive terms nor does it have to be (c) Test fails if ℓ = 1 alternating. Root Test Let ∑ be a series and suppose This test is the most accurate, but not the easiest to use in many ℓ lim || → situations. (a) Series converges if ℓ < 1 (b) Series diverges if ℓ > 1 Use this test when has nth powers. (c) Test fails if ℓ = 1 Alternating Series Test If an > 0 for all n, then the series This test only applies to alternating a1 – a2 + a3 – a4 + … or series. -a1 + a2 – a3 + a4 – … Converges if: NOTE: || || (a) a1 > a2 > a3 > a4 > … which means that error of the (b) lim = 0 partial sum of the first __ number of → terms of the series is less than the absolute value of next term. .