where the an are positive. If 
, then if N < 1 the series converges, if N > 1 the series diverges, and if N = 1 we don't know whether it diverges or converges. Calculus Applets |
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The ratio test is helpful for determining the convergence of a series when the terms grow very large as n increases.. Suppose we have a series where the an are positive. If , then if N < 1 the series converges, if N > 1 the series diverges, and if N = 1 we don't know whether it diverges or converges.
Try the following:
. From the graph and table it definitely looks like this series converges, and quite rapidly, too (the "undefined" entries in the table are due to the n! becoming so large that the value exceeds the capacity of the variable storing the number). The ratio test says that we want to look at the ratio of successive terms as n gets large: 
. Since the limit is < 1, the series converges.
This work by Thomas S. Downey is licensed under a Creative Commons Attribution 3.0 License.
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