,MAT2613 EXAM PACK
2023
QUESTIONS AND
ANSWERS
For enquiries contact
Email:gabrielmusyoka940@gmail.com
, 3
I OCTOBER/NOVEMBER )0/7EXAMINATION PAPER AND MEMORANDUM I
QUESTION l
1.1 Use a proof by contradiction to prove that the following statement is true.
2n ;::: 2n for all positive integers n.
[Hint: You may assume the well ordering axiom: Every non-empty set of positive integers has a least
Open Rubric
~~] 00
SOLUTION
Contradiction: There exist at least one positive integer m such that 2m < 2m.
Assumption false for m =
1 and m =
2. The statement must then be: There exist at least one positive integer
m > 2 such that 2m <2m.
Let M = (m lm > 2, m EN, 2m < 2m}. This set M bas a least element by the well·ordening axiom.
Let mo be this element. Then mo > 2 and 2mo < 2m 0 (1)
However, mo - 1 < mo and mo- 1 ¢ M, so 2<mo-l) ;::: 2 (mo- 1) (2)
and so from (1) and (2) we have since (2) is 2mo ;::: 4m0 - 4 that 4m0 - 4 ~ 2mo < 2m0 , i.e 2m0 < 4 or m0 < 2
which is a contradiction.
1.2 Give the contrapositive of the following statement:
00
If L, Or is convergent then (an) is a null sequence. (2)
rei
[10]
SOLUTION
00
If (an) is not a null sequence then L:ar is divergent.
r•l
QUESTION%
Let (an) be the sequence of real numbers defined by a 1 = I and an+l = ,JiCi;,for n EN.
Show that (an) converges and find the limit.
[Hint: Show that 1 ~an < an+l < 2 for all n EN using mathematical induction.] f81
SOLUTION
a1 = 1 and On+1 = -J24,'if n .
Following the hint we have to prove that 1 < an+2 < 2 'if n. (*)
~ an
For n = 1 we have a 1 = 1 ami a 2 = ,J2 thus (*) is true for n = I.
Suppose(*) is true for n = k, i.e 1 ~ at < ak+l < 2 (**)
Then we have from(**) that 2 ~ 2ak < 2aA:+1 < 4 so that ,J2 ~ ,J2iii < ~ < 2.
t
Open Rubric
, 4
But
A - ak+l and J2ak+l = ak+2
so 1 < .J2 ~ ak+l < ak+2 < 2 and the equation (**)is true.
We thus have an increasing sequence which is bounded above by 2.
Suppose
lim an
n-too
= L. Then also lim an+I
11--tOO
= L
We have
lim an+ 1 lim .J2ci:, = Jlim 2an
= n-too
11--too n-too
L = .fi-JI i.e -Jl = v'2 or L =2.
QUESTION3
Prove from first principles that the sequence (an) with
2n 2 +5
a1 = 0, an = ., when n ?: 2
n-- 1
converges. (7)
SOLUTION
2n 2 + 5 2 + 2..
.
We suspect that lrm an
n-too
= .
lun
11--tOO n 2 - 1
= lim ~ =2
n-too ( - ~
'-"
/
Let c > 0 be given. For n :;::: 2 we have
Since
> n when n :;::: 2 we have
lan- 21
7 7/
- -- < - for n > 2
n -l-n
2 -
Clearly
7 7
-<e~n>
n e
By the Archimedean principle there exists ;:: N with N > ~.
f:
For such an N e N we have
• 7 7
n 2: N => n > - => lan - 21 < - < c
e n
The benefits of buying summaries with Stuvia:
Guaranteed quality through customer reviews
Stuvia customers have reviewed more than 700,000 summaries. This how you know that you are buying the best documents.
Quick and easy check-out
You can quickly pay through EFT, credit card or Stuvia-credit for the summaries. There is no membership needed.
Focus on what matters
Your fellow students write the study notes themselves, which is why the documents are always reliable and up-to-date. This ensures you quickly get to the core!
Frequently asked questions
What do I get when I buy this document?
You get a PDF, available immediately after your purchase. The purchased document is accessible anytime, anywhere and indefinitely through your profile.
Satisfaction guarantee: how does it work?
Our satisfaction guarantee ensures that you always find a study document that suits you well. You fill out a form, and our customer service team takes care of the rest.
Who am I buying this summary from?
Stuvia is a marketplace, so you are not buying this document from us, but from seller gabrielmusyoka940. Stuvia facilitates payment to the seller.
Will I be stuck with a subscription?
No, you only buy this summary for R44,36. You're not tied to anything after your purchase.