I Just started Analysis 1 this week and I've encountered some tricky problems in the Assignment
Homework Statement
Let f,g : [0,1] -> R be bounded functions.
Prove that inf{ f(x) + g(1-x) : x (element of) [0,1]} >= inf{f(x) : x (element of) [0,1]} + inf{g(x) : x (element of) [0,1]}...
Homework Statement
(a) Suppose that A and B are nonempty subsets of R. Define subsets -A={-x: x\inA} and A+B={x+y: x\inA and y\inB}. Show that if A and B are bounded above, then the greatest lower bound of -A = - least upper bound of A and the least upper bound of (A+B) = the least upper bound...
Hello,
I have stumbled upon a couple of proofs, but I can not seem to get an intuitive grasp on the what's and the whys in the steps of the proofs. Strictly logical I think I get it. Enough talk however.
Number 1.
"Let f be a continuous function on the real numbers. Then the set {x in R ...
I'm likely taking an introductory real analysis course in the fall, and I was wondering what supplementary material I should look into. I'm working my way through Velleman's proofs book, what else would you recommend as a supplement to a first course in RA?
Homework Statement
Suppose A is a compact set and B is a closed subset of Rk. then A+B is closed in Rk. show that A+B for two closed sets is not necessarily closed by a counter-example.
well, since A is a compact set and there's a theorem in Rudin's mathematical analysis chapter 2 stating...
I was hoping to get some personal opinions regarding the first round (two semester sequence) of undergraduate analysis.
How difficult do YOU think that these classes are? Use comparisons as you feel fit (linear algebra, intro proofs course, abstract algebra, etc).
(I do realize how...
Hi all,
I've been self-studying Rudin's Mathematical Analysis recently and have studied the first 4 chapters so far and I'm fine with the way it has developed the theory but the book lacks solved exercises and examples to be called a perfect book for self-studying. I have learned the general...
One that is suitable for self-study and doesn't require me to constantly ask the internet for clarifications.
'Understanding Analysis' by Stephen Abbott and 'Real Mathematical Analysis' by C.C. Pugh seem suitable but unfortunately I can't find a solutions manual
Thanks
EDIT:
Also I need a...
Please note that this is a "double post". I was not sure if I should put this here or in the calculus and analysis subform.
If you must delete, I understand. But please, delete the one that should actually be deleted.
Thanks, and sorry =|...
I'm going into my 3rd year as a pure math major at UWO. I have completed both second year Real Analysis and Linear Algebra with decent marks. However, I really feel that I didn't take too much from both other than the general concepts, especially second semester of Linear Algebra (due to...
Let f:[a,b] \rightarrow R be a continuous function such that f(a)=f(b)=0 and f' exists on (a,b). Prove that for every real \lambda there is a c \in (a,b) such that f'(c) = \lambda f(c).
Hello,
I am starting a postgraduate level Economics course in two months. I will have to go through some kind of a Math Camp before the course, lasting more or less 10 days. Here is my curriculum;
1. REAL ANALYSIS
Topics:
• Sequences and Convergence
• Function on Rn
• Continuity
•...
I'm currently reading Sterling Berberian's Foundations of Real Analysis, and the first chapter had an overview of foundational mathematics from axiomatic set theory to constructive proof of the real numbers. I was looking over this chapter, and I found this exercise in the functions section...
Question: Suppose that f(x)>0 on (0,1) and that lim as x goes to 0 exists for the function. Show that lim as x goes to 0 for the function is greater than or equal to 0.
So I know that intuitively that this is true for obvious reasons, but I can not think of a clever way to set up the proof...
Question: Show that f(x)= (x^2)/((x^2)+1) is continuous on [0,infinity). Is it uniformly continuous?
My attempt: So I know that continuity is defined as
"given any Epsilon, and for all x contained in A, there exists delta >0 such that if y is contained in A and abs(y-x)<delta, then...
Applicability of "Intro To Algebra" and "Intro to Real Analysis" to Physics
Well, due to timetable complications I'm having to search for courses that aren't apart of my graduation requirements so I'm thinking about taking some math courses.
Which one of these courses do you think is more...
Please help me prove that the following properties are equivalent Nested Interval Property
Bolzano-Wierstrass theorem
Monotonic sequence property
LUB property
Heine-Borel theorem
archimedean property and cauchy sequence
line connectedness...
Homework Statement
Let E, F be two closed and non-empty subsets of R, where R is seen as a metric space with teh distance d(a,b)=|a-b| for a,b ϵ R.
Suppose E + F := { e+f |e ϵ E, f ϵ F}. Is is true that E+F has to be closed?
Homework Equations
The Attempt at a Solution
I'm...
It's just the final part (e) that I don't get, I have the rest but just for completeness I thought I'd put it in
(iii) Let f : (0,infinity) -> R be a function which is differentiable at 1 with f '(1) = 1
and satisfies:
f(xy) = f(x) + f(y) (*)
(a) Use (*) to determine f(1) and show that f(1/x)...
What is the definition of a zero set and what exactly does it mean?
I have come across different responses on the internet, but none of them explain really what it means or give good examples, I am having a rough time with this concept in real analysis.
For example, how would I determine...
Hello all,
I am having trouble showing that the operation defined by f*g(f of g)= Integral[from a to b]f(x)g(x) is an inner product.
I know it must fulfill the inner product properties, which are:
x*x>=0 for all x in V
x*x=0 iff x=0
x*y=y*x for all x,y in V
x(y+z)=x*z+y*z...
Homework Statement
Let S be the set of all functions u: N -> {0,1,2}
Describe a set of countable functions from S
Homework Equations
We're given that v1(n) = 1, if n = 1 and 2, if n =/= 1
The function above is piecewise, except i fail with latex
The Attempt at a Solution...
Hey, I'm taking a bit of a flyer here, but does anyone know of a half decent online textbook that also has a study guide? My class is working out of Trench's online book, but more or less it's just for a reference and problems, we mainly just work from notes. Would there be any book (online)...
ok so,
a) If s sub n→0, then for every ε>0 there exists N∈ℝ such that n>N implies s sub n<ε.
This a true or false problem. Now this looks like a basic definition of a limit because
s sub n -0=s sub n which is less than epsilon. n is in the natural numbers. But, I thought there should be...
Homework Statement
If the sequence xn ->a , and the sequence yn -> b , then xn - yn -> a - b
The Attempt at a Solution
Can someone check this proof? I'm aware you cannot subtract inequalities, but I tried to get around that where I indicated with the ** in the following proof...
Question A: Let (xn) and (yn) are two Cauchy sequences in a metric space (X, d), define
d((xn), (yn)) = lim d(xn, yn). It is easy to prove that "d" is a metric on the set of all Cauchy Sequences.
Now let's define \widetilde{} on the set of all sequences in a metric space (X, d) by
(xn)...
I am absolutely lost. I had to take Advanced Calculus as independent study in a one month class and this book has very few examples, if any. I'm not even sure where to start on this one.
I have to compute the limit of an integral and then justify my methods according to the Lebesgue theory...
Homework Statement
Let {y_j} be N given real numbers. Construct a sequence {a_n} so that {y_j} is the set of limit points of {a_n}, but a_n ≠ y_j for any n or j.
Homework Equations
Bolzano-Weierstrass theorem
The Attempt at a Solution
Have no idea how to go about it.
I'd really...
I'm not quite sure if this is the correct subforum. I was wondering if anybody knew where I could find some decent real analysis notes or lectures online, specifically on the formal definition of a limit. My prof is great, I just missed the class and the textbook and notes aren't quite making...
I was accepted into a top tier Ph.D. Operations Research program. I have six months to prepare independently on my own (at home). Everybody told me real analysis is the first thing I should look at (which makes sense, because I don't have proof experience).
Can you please recommend me a book...
Homework Statement
If S = { 1/n - 1/m | n, m \in N}, find inf(S) and sup(S)
I'm having a really hard time wrapping my head around the proper way to tackle sumpremum and infimum problems. I've included the little that I've done thus far, I just need a nudge in the right direction. Correct me...
i like limit, continuity,differentiation in real analysis, they are interesting, but i don't know what is their importance?
And about lebesgue integration, i don't think it is interesting, and it seems it is useless
Homework Statement
Let f and g be bounded functions on [a,b].
1. Prove that U(f+g)</=U(f)+U(g).
2. Find an example to show that a strict inequality may hold in part 1.
Homework Equations
Definition of absolute value?
The Attempt at a Solution
I know that a function f is bounded if its...
Question : Let (xn) and (yn) be sequences of real numbers such that lim(xn)= infinity and lim(xnyn)=L for some real number L.
Prove Lim(yn)=0.
I've been trying to solve this question for a long time now. I've no success yet. Can anyone guide me as to how i can approach it.
i am asked to prove the remark Rudin made in theorem 7.17 in his Mathematical Analysis.
Suppose {fn} is a sequence of functions, differentiable on [a,b] such that {fn(x0)} converges for some x0 in [a,b]. Assume f'n (derivative of fn) is continuous for every n. Show if {f'n} converges...
Homework Statement
let n\inN To prove the following inequality
na^{n-1}(b-a) < b^{n} - a^{n} < nb^{n-1}(b-a)
0<a<b
Homework Equations
The Attempt at a Solution
Knowing that b^n - a^n = (b-a)(b^(n-1) + ab^(n-2) + ... + ba^(n-2) + a^(n-1) we can divide out (b-a) because b-a #...
I am trying to prove a question :
Assume K\inR^{m} is compact and {xn} (n from 1 to infinite) is a sequence of points in K that does not converge . Prove that there are 2 subsequences that converge to different points in K .
Hint : Let yi=x_{ni} be one subsequence that converges to a point in...
Homework Statement
Prove if {bn} converges to B and B ≠ 0 and bn ≠ 0 for all n, then there is M>0 such that |bn|≥M for for all n.
Homework Equations
What I have so far:
I know that if {bn} converges to B and B ≠ 0 then their is a positive real number M and a positive integer N such...
Homework Statement
suppose {an} and {bn} are sequences such that {an} converges to A where A does not equal zero and {(an)(bn)} converges. prove that {bn} converges.
Homework Equations
What i have so far:
(Note:let E be epsilon)
i know that if {an} converges to A and {bn}converges...
Homework Statement
Let f be a function and p\in . Assume that a\leqf(x)\leqb near p. Prove that if L= lim f(x) as x-->p Then L\in [a,b]
The Attempt at a Solution
I want to say that because f(x) is bounded by [a,b] that automatically implies that the Limit L is also bounded by...
Show that the function f(x)=x is continuous at every point p.
Here's what I think but not sure if i can make one assumption.
Let \epsilon>0 and let \delta=\epsilon such that for every x\in\Re |x-p|<\delta=\epsilon. Now x=f(x) and p=f(p) so we have |f(x)-f(p)|<\epsilon...
Homework Statement
Let f be a function let p /in R. Assume limx->p=L and L>0. Prove f(x)>L/2
The Attempt at a Solution
Let f be a function let p /in R. Given that limx->pf(x)=L and L>0. Since L\neq0 Let \epsilon= |L|/2. Then given any \delta>0 and let p=0 we have |f(x)-L| = |0-L| =...
Currently, I am a bioengineering major, but I have been taking math electives the past year and a half, and now I am finding myself liking pure mathematics much more than engineering and only two classes away from a degree. The two courses I need are Real Analysis and Abstract Algebra...
Part 1. Homework Statement
The problem literally states...
"
The Integral.
limit of n-> infinity of n*[1/(n+1)^2 + 1/(n+2)^2 + 1/(n+3)^2 + 1/(2n)^2] = 1/2
"
According to the teacher, the answer is 1/2. I don't know why or how to get there.
Part 2. The attempt at a solution...
Let (a, b) be an open interval in R, and p a point of (a, b). Let f be a real-valued function defined on all of (a, b) except possibly at p. We then say that the limit of f as x approaches p is L if and only if, for every real ε > 0 there exists a real δ > 0 such that 0 < | x − p | < δ and x ∈...
Homework Statement
Ok so I'm given that we have some function from R to R, that is continuous on all of R. I am asked if it is possible to find some BOUNDED subset of R such that the image of the set is not bounded. The professor gave the hint: look at closures.
Homework Equations...
Real Analysis Exam Questions. Please Help!
I'm taking this course on real analysis and my exam will be in less than a week from now :eek:
These are exam questions from previous year which have been assigned as homework, and I just started studying and it's really hard. I would be sooo happy if...