Let; u1+u2+ ..............+un+.......
be an infinite series .
If Sn denotes the sums of first n terms of the series ,
So that ;
Sn= u1+u2+ ..............+un+, then ; the sequence {Sn} is called the sequence of partial sums of the given series .
Convergent Series :- If {Sn} tends to a finite and infinite limit S, then S is defined to be the sums to infinity of the series and the series is said to be convergent to the sum S.
Thus S is defined as
lim n-->infinity Sn=S
or, Sn-->S, as n-->infinity
Divergent Series :- If {Sn} tends to +infinity or -infinity
as n tends to infinity , then the series is said to be divergent .
in other words , the series is divergent if having given any positive number delta whatsoever , we can find a finite number m such that Sn>delta ,
when n is less and equal to m .
Oscillatory Series :- If {Sn} tends to no definite limit whether finite or infinite as n tends to infinity , then the series is aid to be Oscillate. We say that the series oscillates finitely or infinitely according as Sn oscillates between finite limits or between positive and negative infinity .
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