Mathematics MOC

Infinite Series

An infinite series is a summation across an infinite sequence (𝑎𝑛)𝑛=1, where if 𝑠𝑛 is the partial sum up to the 𝑛th term

𝑠=𝑘=1𝑎𝑘=lim𝑛𝑠𝑛=lim𝑛𝑛𝑘=1𝑎𝑘

An infinite series is said to be convergent precisely when the above limit converges, and divergent when the limit does not exist. See Tests for series divergence. Another important concept is Absolute and conditional convergence.

Examples

Well known infinite series include


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