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A '''[[geometric series]]''' is a [[series (mathematics)|series]] associated with a [[geometric sequence]],
A '''[[geometric series]]''' is a series associated with a geometric sequence,
i.e., the ratio (or quotient) ''q'' of two consecutive terms is the same for each pair.  
i.e., the ratio (or quotient) ''q'' of two consecutive terms is the same for each pair.  


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An infinite geometric series (i.e., a series with an infinite number of terms)  converges if and only if |''q''|<1, in which case its sum is <math> a \over 1-q </math>, where ''a'' is the first term of the series.
An infinite geometric series (i.e., a series with an infinite number of terms)  converges if and only if |''q''|<1, in which case its sum is <math> a \over 1-q </math>, where ''a'' is the first term of the series.


In finance, since compound [[interest rate|interest]] generates a geometric sequence,
In finance, since compound interest generates a geometric sequence,
regular payments together with compound interest lead to a geometric series.
regular payments together with compound interest lead to a geometric series.


''[[Geometric series|.... (read more)]]''
''[[Geometric series|.... (read more)]]''

Revision as of 09:47, 8 October 2011

A geometric series is a series associated with a geometric sequence, i.e., the ratio (or quotient) q of two consecutive terms is the same for each pair.

Thus, every geometric series has the form

where the quotient (ratio) of the (n+1)th and the nth term is

The sum of the first n terms of a geometric sequence is called the n-th partial sum (of the series); its formula is given below (Sn).

An infinite geometric series (i.e., a series with an infinite number of terms) converges if and only if |q|<1, in which case its sum is , where a is the first term of the series.

In finance, since compound interest generates a geometric sequence, regular payments together with compound interest lead to a geometric series.

.... (read more)