Question

In: Advanced Math

Solve it step by step and please with clear handwritten. Be ready to follow the comment...

Solve it step by step and please with clear handwritten. Be ready to follow the comment

Integrability Topic

Question1. Let g : [0, 1] —> R be defined by if x=0, g(x)=1; if x=m/n (m and n are positive integer with no common factor), g(x)=1/n; if x doesn't belong to rational number, g(x)=0

Use the sequential criterion for continuity to prove that g is discontinuous at every rational number in[0,1]

Question.2 g is continuous at any irrational point in[0,1]. Explain why g is Riemann integrable on[0,1] based on the following fact that

Suppose h:[a,b]→R is continuous everywhere except at a countable number of points in[a,b]. Then h is Riemann integrable on[a,b]

Question.3

Letf:[0,1]→R be defined by f(x)=0 if x=0; f(x)=1 if 0<x<=1 we know that f is integrable on [0,1] Suppose c is a rational number in [0,1]. Compute(f◦g)(c). Now suppose c is an irrational number in[0,1]. Compute(f◦g)(c). Can you recognize the function f◦g:[0,1]→R?

Solutions

Expert Solution

Colby Messinger answered 2 years ago
Next > < Previous

Related Solutions

Solve it step by step and please with clear handwritten. Be ready to follow the comment...
Solve it step by step and please with clear handwritten. Be ready to follow the comment Integrability Topic Question1. Let g : [0, 1] —> R be defined by if x=0, g(x)=1; if x=m/n (m and n are positive integer with no common factor), g(x)=1/n; if x doesn't belong to rational number, g(x)=0 Use the sequential criterion for continuity to prove that g is discontinuous at every rational number in[0,1] Question.2 g is continuous at any irrational point in[0,1]. Explain...
Prove that step by step and clear handwritten. Follow the comment Conception: Limit point 1.Prove N'=empty...
Prove that step by step and clear handwritten. Follow the comment Conception: Limit point 1.Prove N'=empty 2.Prove Q'=R 3. E=(2,5), E'=[2,5] my question is that why the collection limit point of E includes 2 and 5? obviously, 2 and 5 are not in E. If they can be limit point in E does that mean R can be all set's collection of all limit point? such as R'=R, Q'=R, N'=R???
Please follow the comment and solve question 6 and question 7 if you want to get...
Please follow the comment and solve question 6 and question 7 if you want to get thumbs up. Thank you. 6- Let xn ≥0 for all n∈N. 6-1) If xn →0, show that√xn →0. 6-2) If xn →x, show that√xn →√x. Let A = lim n→∞an. Use an+1 =√2+an, the result of Exercise 6 and limit laws to prove that A = 2.
Conception about Integral, lower sum, upper sum.. Clear writing please and follow the comment What is...
Conception about Integral, lower sum, upper sum.. Clear writing please and follow the comment What is the difference between lower sum and lower integral by the textbook, lower sum is defined by the infimum but lower inegral is using supremum? how come? Please explain. By the Real analysis
Analysis Integral confused concept. Please clear writing and follow the comment 1. upper sum with respect...
Analysis Integral confused concept. Please clear writing and follow the comment 1. upper sum with respect to P is U(f,P)= sum of Mk(xk-xk-1). Does that equal to U(f)=inf{u(f,P): p is a element of Q} (Q is the collection of all possible partition}) Also, is Mk=sup{f(x):x is a element of {xk-1,xk}????? 2. If Q is a refinement of P, then U(f, Q)<=U(f, P) and L(f, P),<=L(f,Q). I don't understand the geometric meaning behind this because Q has more element than P...
Please clear writing and explain step by step this should be a simple question Consider the...
Please clear writing and explain step by step this should be a simple question Consider the function f : [0,1]→R defined by (f(x) =0 if x = 0) and (f(x)=1 if 0 < x≤1) (i)Compute L(f) andU(f). (ii) Is f Riemann integrable on [0,1]?
***PLEASE SHOW HOW TO SOLVE IN EXCEL*** NOT HANDWRITTEN 6) The time needed to complete a...
***PLEASE SHOW HOW TO SOLVE IN EXCEL*** NOT HANDWRITTEN 6) The time needed to complete a final examination in a particular college course is normally distributed with a mean of 90 minutes and a standard deviation of 15 minutes. Answer the following questions. a. What is the probability of completing the exam in one hour or less? b. What is the probability that a student will complete the exam in more than 60 minutes but less than 105 minutes? c....
***PLEASE SHOW HOW TO SOLVE IN EXCEL*** NOT HANDWRITTEN Given that z is a standard normal...
***PLEASE SHOW HOW TO SOLVE IN EXCEL*** NOT HANDWRITTEN Given that z is a standard normal random variable, find z for each situation. a. The area to the left of z is .9750. b. The area between 0 and z is .4750. c. The area to the left of z is .7291. d. The area to the right of z is .1314. e. The area to the left of z is .6700. f. The area to the right of z...
***PLEASE SHOW HOW TO SOLVE IN EXCEL*** NOT HANDWRITTEN 5) The letter grades on the midterm...
***PLEASE SHOW HOW TO SOLVE IN EXCEL*** NOT HANDWRITTEN 5) The letter grades on the midterm exam given in a large managerial statistics class are normally distributed with mean 75 and standard deviation 9. The instructor of this class wants to assign an A grade to the top 10% of the scores, a B grade to the next 10% of the scores, a C grade to the next 10% of the scores, a D grade to the next 10% of...
please explain the solution and what it is wrong with my conception. FOLLOW the COMMENT PLEASE...
please explain the solution and what it is wrong with my conception. FOLLOW the COMMENT PLEASE Question: Let A and B are nonempty set bounded subset of R, and let A+B be the set of all sums a+b where a belngs to A and b belongs to B Prove Sup(A+B)=Sup(A)+Sup(B) Solution: Let ε>0, a is in A and b is in B, supA<=a+(ε/2), supB<=b+(ε/2) sup(A + B) ≥ a + b ≥ sup A − ε /2 + sup B...
ADVERTISEMENT
Subjects
ADVERTISEMENT
Latest Questions
ADVERTISEMENT