Proving the Limit of a Sum using Sequence Convergence

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Discussion Overview

The discussion centers on proving the limit of a sum of two sequences, specifically that the limit as n approaches infinity of the sum of two sequences equals the sum of their individual limits. The scope includes mathematical reasoning and the application of limit definitions.

Discussion Character

  • Mathematical reasoning

Main Points Raised

  • One participant seeks assistance in proving that the limit of the sum of two sequences equals the sum of their limits, expressing uncertainty about their approach.
  • Another participant suggests establishing a relationship between the elements of the new sequence formed by the sum of the two sequences and the limit.
  • A further suggestion involves using the epsilon-N definition of limits to demonstrate the claim, indicating it is a straightforward application of the triangle inequality.
  • Another participant recommends utilizing the triangle inequality property |a + b| ≤ |a| + |b| as part of the proof.

Areas of Agreement / Disagreement

Participants present various approaches and suggestions, but there is no consensus on a single method or resolution to the proof. The discussion remains unresolved.

Contextual Notes

Some assumptions and definitions related to limits and sequences may not be explicitly stated, which could affect the clarity of the proof process.

marlen
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Hello,

Can someone please help me prove that

the lim as n goes to infinity of (the sequence an + the sequence bn) = (the lim of an) + (the lim of bn).

What I think is that if one adds the two limits an + bn, she will come up with a new sequence cn and take its limit, which equals L. Then if she takes the limit of an and set it equal to L1 and take the limit of bn and set it equal to L2...

After this I don't know. I don't even know if this makes sense. Someone please help me!

I hope all of this makes sense. :)
 
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1. Since cn ---> L, there must be a relationship between the elements of cn and the number L. State that relationship.

2. Now you need to show that the relationship stated in "1" indeed holds. To show this:

a. assume L = L1 + L2

b. use the given fact that the relationship stated in "1" holds between an and L1, as well as between bn and L2, to show that when L = L1 + L2, the relationship in "1" holds between cn and L.
 
you could use the epsilon-N definition to show it too. it's a pretty straightforward application of the triangle inequality.
 
You will also want to use |a+ b|\le |a|+ |b|.
 

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