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Review
Sequence & Series of complex numbers
First consider the useful facts

Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

The △ in-equality : If z1 & z2 are arbitrary complex no., then 

Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

Proof: 
Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

Taking positive sq. root yields the desired inequality.

Note:
Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

Note equality occur in (i)
Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

Note
Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

Defn A seq. {zn} of complex no. is said to converge to a complex no. z if the seq. {|zn- z|} of real no. converge to 0

Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

Proof forward Part :
Assume that zn → z then |zn- z|→ 0  

Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

Converse Part : Assume that Re(zn) → Re(z)  &  Im(zn) → Im(z)

consider,

|zn -  z|= |(xn + iyn )- (x+ iy)| where, zn = xn + iyn  & z = x + iy

Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

Note: {zn} can’t converge to more than one limit.
If exists is unique.
Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

→ 0 as n→∞ (∵0 ≤|z|≤ 1)

Defn A seq. {zn} of complex no. is called a Cauchy seq. if for each 𝜖 > 0, there exists (N=N(𝜖)) an integer N s.t.

Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

Cauchy Criteria for convergence in complex plane {zn} converges iff {zn} is a Cauchy seq.

Forward part: Assume that zn → z then 

Re(zn) → Re(z)   & Im(zn) → Im(z)

Proved before
Here {Re(zn)} & {Im(zn)} both are Cauchy seq. being convergent seq. of real no.

Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

Converse part: suppose {zm} is a Cauchy seq. , then using

Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics
implies both {Re(zn) & Im(zn)} are cauchy seq. of real no. hence both converges,

Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

implies {zn} converges
Defn The infinite series Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics of complex nos. is said to be converge if the seq. {Sn},

Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematicsof paritial sum S is convergent.

from the Cauchy criterion, i.e. “a seq. is conv. iff it is a Cauchy seq”, we see that Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics converges iff {Sn}is a cauchy seq.

For each Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

from this Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics it follows that convergence of Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics (i. e. a neccessary cond for the series Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics to converge is that zn →0  as n→ ∞

Remark's in the case of sequence we have,Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics converges to z iff 

Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

converges to Re(z) Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics converge to Im(z).
A sufficient condn for cgces of Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

i.e. absolutely convergent series is cgt.

also, as with real series, we say a series Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics is said to be absolutely convergent if the series Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics +ve real no. is convergent. Futher using the fact that

Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

Implies that “every absolutely convergent series is convergent.” Converse is not true e.g.
Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics absolutely and hence cgt.

Generalized Cauchy’s nth root test: let Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics  be a series of complex term such that 

Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

(a) if ℓ < 1 then series Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics cgs abs.
(b) if ℓ >1 then seriesDoc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics div.

(c) if  ℓ = 1 the series may or may not conv.

Generalised D’ lembert Ratio test:
Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics then
(a) if L < 1, then the series cgs absolutely
(b) if l > 1, the series div.
(c)if l≤1≤ L, no conclusion.

complex analysis ( Bak &  Newmann)

Topology of the complex plane
Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics
1.5 Definition
(i)Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics is called an open disc of radius r centered at z0 , also called nbhd of z0.

(ii) circle Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

= circle with center z0 , radius r.

(iii) subsetDoc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics is called Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics If for every Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics, there exists r > 0 . It means that some disc arround z lies entirely in S. for instance, the interior of a circle Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics the entire complex plane Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics half plane (Re(z) , Im(z) <0 , Re(z) ) ect. are open sets. An open disc is an open set.
(iv) A set Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics is s. t. b open iff for each Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

Note: Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics  is not open

Note: Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics is open in Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics but not in Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics 
(v) set S is called closed if its complement
Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics
Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics
= Coll of points whose neighbourhood have a non empty intersection with both S and  Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics
(ix) Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics = closure of S

(x) S is bdry iff Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics for some r > 0.
(xi) S is compact iff S is closed bdd Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

(xii) set S is said to be disconneced if there exists two disjoint open set s. t.
Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics
(xiii) S is s. t. b. disconnected iff S is a union of two non empty disjoit open subsets.
(xiv) S is called connected if it is not disconnected. in other words, S is connected if and only if, each pair of points z1, z1 of S can be connected by an arc lying in S

Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics is calle the line segment with and points z1 & z2 and denoted by [z1,z2]

∴ if Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics for each Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics then the line segment [z1, z2] , (where z1 , z2 ∈S ) is said to be containe in S.
→ by a polygonal line from z1 to zn … . a finite union of line segments of the form Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics

(z1 and zn are said to be polygonally connected)
→ A set S is said to be polygonally connected if any two points of S can be connected by a polygonal line (basically horizonal or verticaly) contained in S.

The document Doc- Review: Sequence & Series of complex numbers | Topic-wise Tests & Solved Examples for Mathematics is a part of the Mathematics Course Topic-wise Tests & Solved Examples for Mathematics.
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FAQs on Doc- Review: Sequence & Series of complex numbers - Topic-wise Tests & Solved Examples for Mathematics

1. What is a sequence of complex numbers?
Ans. A sequence of complex numbers is a list of complex numbers arranged in a specific order. Each term in the sequence is denoted by a subscript, such as a_n, where "n" represents the position of the term in the sequence.
2. How is the nth term of a sequence of complex numbers determined?
Ans. The nth term of a sequence of complex numbers can be determined using a formula or a pattern. This formula or pattern relates the position of the term (n) to its corresponding complex number. For example, in an arithmetic sequence, each term can be found by adding a constant difference to the previous term.
3. What is a series of complex numbers?
Ans. A series of complex numbers is the sum of the terms in a sequence of complex numbers. It is denoted by the sigma notation (∑) and can be finite or infinite. The terms of the sequence are added together according to a specific rule or formula.
4. How can we determine the sum of an infinite series of complex numbers?
Ans. The sum of an infinite series of complex numbers can be determined using various methods, such as the convergence tests. These tests help determine whether the series converges (has a finite sum) or diverges (sum goes to infinity). For example, the geometric series convergence test can be applied to certain types of series to determine their sum.
5. Can a sequence or series of complex numbers be divergent?
Ans. Yes, a sequence or series of complex numbers can be divergent. If the terms of the sequence or the partial sums of the series do not approach a finite value, the sequence or series is said to be divergent. This means that the sum of the series or the limit of the sequence does not exist.
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