Introduction of Finite series sum:
The finite series sum is nothing but the set of ordered numbers owned by some of the patterns to calculate the next term. The finite series sum is to have the Respective continuous integer with an increment. The summing of the integers is known as series of the integers. The summing can be denoted as the symbol `sum`. The finite series sum is explained as the summing of the finite integers.
Finite Series Sum:
The series can be classified into two subdivisions. They are arithmetic series and geometric series. The arithmetic series is the successive terms altered by the identical amount. For an example {2, 4, 6, 8, 10} is the example of arithmetic progression in which each terms are made to increment by 2 to the previous terms. The geometric series is nothing but the quotients of the terms are same. For example {4, 16, 64, 256} is the example of the geometric series in which the each values are obtained by the multiples of the four. Hence the summing of the each terms are known as the finite series sum.
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