Introduction to Real Analysis books











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I am looking for a book that covers introduction to real analysis. Currently, I am reading The Elements of Real Analysis, by Robert Bartle. However, I quickly noticed that about half of the theorems and all of the sample questions don't have solutions to them so it's hard for me to know if my answers are correct so I looks around and was able to find the following book on the internet Principles of Mathematical Analysis which does provide a solution manual.



Comparing the two books, they do have some different topics so not sure what book what be best for me.



Are there any other highly recommend book which will be good for an introduction to analysis that provides a solution manual.










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    Bartle's book has much better exercises than Rudin's, in my opinion.
    – Bungo
    Nov 28 at 2:21










  • If you want to learn the bare minimum analysis for higher mathematics. You have to learn from Foundations of Modern Analysis by Jean Diudonne. It, I am afraid, does not have solution manual; however, he does provide lengthy hints to the difficult questions.
    – Will M.
    Nov 29 at 1:17















up vote
2
down vote

favorite
1












I am looking for a book that covers introduction to real analysis. Currently, I am reading The Elements of Real Analysis, by Robert Bartle. However, I quickly noticed that about half of the theorems and all of the sample questions don't have solutions to them so it's hard for me to know if my answers are correct so I looks around and was able to find the following book on the internet Principles of Mathematical Analysis which does provide a solution manual.



Comparing the two books, they do have some different topics so not sure what book what be best for me.



Are there any other highly recommend book which will be good for an introduction to analysis that provides a solution manual.










share|cite|improve this question


















  • 1




    Bartle's book has much better exercises than Rudin's, in my opinion.
    – Bungo
    Nov 28 at 2:21










  • If you want to learn the bare minimum analysis for higher mathematics. You have to learn from Foundations of Modern Analysis by Jean Diudonne. It, I am afraid, does not have solution manual; however, he does provide lengthy hints to the difficult questions.
    – Will M.
    Nov 29 at 1:17













up vote
2
down vote

favorite
1









up vote
2
down vote

favorite
1






1





I am looking for a book that covers introduction to real analysis. Currently, I am reading The Elements of Real Analysis, by Robert Bartle. However, I quickly noticed that about half of the theorems and all of the sample questions don't have solutions to them so it's hard for me to know if my answers are correct so I looks around and was able to find the following book on the internet Principles of Mathematical Analysis which does provide a solution manual.



Comparing the two books, they do have some different topics so not sure what book what be best for me.



Are there any other highly recommend book which will be good for an introduction to analysis that provides a solution manual.










share|cite|improve this question













I am looking for a book that covers introduction to real analysis. Currently, I am reading The Elements of Real Analysis, by Robert Bartle. However, I quickly noticed that about half of the theorems and all of the sample questions don't have solutions to them so it's hard for me to know if my answers are correct so I looks around and was able to find the following book on the internet Principles of Mathematical Analysis which does provide a solution manual.



Comparing the two books, they do have some different topics so not sure what book what be best for me.



Are there any other highly recommend book which will be good for an introduction to analysis that provides a solution manual.







real-analysis






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asked Nov 28 at 0:58









Robben

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1395








  • 1




    Bartle's book has much better exercises than Rudin's, in my opinion.
    – Bungo
    Nov 28 at 2:21










  • If you want to learn the bare minimum analysis for higher mathematics. You have to learn from Foundations of Modern Analysis by Jean Diudonne. It, I am afraid, does not have solution manual; however, he does provide lengthy hints to the difficult questions.
    – Will M.
    Nov 29 at 1:17














  • 1




    Bartle's book has much better exercises than Rudin's, in my opinion.
    – Bungo
    Nov 28 at 2:21










  • If you want to learn the bare minimum analysis for higher mathematics. You have to learn from Foundations of Modern Analysis by Jean Diudonne. It, I am afraid, does not have solution manual; however, he does provide lengthy hints to the difficult questions.
    – Will M.
    Nov 29 at 1:17








1




1




Bartle's book has much better exercises than Rudin's, in my opinion.
– Bungo
Nov 28 at 2:21




Bartle's book has much better exercises than Rudin's, in my opinion.
– Bungo
Nov 28 at 2:21












If you want to learn the bare minimum analysis for higher mathematics. You have to learn from Foundations of Modern Analysis by Jean Diudonne. It, I am afraid, does not have solution manual; however, he does provide lengthy hints to the difficult questions.
– Will M.
Nov 29 at 1:17




If you want to learn the bare minimum analysis for higher mathematics. You have to learn from Foundations of Modern Analysis by Jean Diudonne. It, I am afraid, does not have solution manual; however, he does provide lengthy hints to the difficult questions.
– Will M.
Nov 29 at 1:17










5 Answers
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accepted










I would highly recommend the book by David Brennan called A first course in analysis (Cambridge University Press). What's good about it is it explains the definitions and walks you through all the "hard points" of the contents. The "other" books are also titled "intro" or "a first" course, but they are actually not so.






share|cite|improve this answer























  • I got the book and so far I really like it. It clearly illustrates how to work the examples and gives examples of the definitions instead of just giving the definition. Thanks!
    – Robben
    Dec 12 at 23:24


















up vote
2
down vote













Rudin's Principles of Mathematical Analysis is a hard book, but it's also a standard and it is extremely well-written (in my and many others' opinion) so you should read it early on. It may not be your first book in analysis, but if not I would make it your second.



When working through Rudin, even though you have a solutions manual, you should not give up on problems before you have solved them. There are problems in that book that take some of the best students hours over days to solve. The process of banging your head against the wall (or the book, or any other hard object) is part of the book and part of your preparation for mathematics. When you do get through Rudin, you will be in a very good place to step into the field of analysis $-$ possibly even the next Rudin book, Real and Complex Analysis.



As a soft introduction to analysis before Rudin, I would recommend my teacher's book: Mikusinski's An Introduction to Analysis: From Number to Integral. It is fairly short and easy to get through, and will prime your brain for the more intense fare of Rudin's book. It only covers single-variable analysis, however, which is 8 out of 11 chapters in Rudin; most courses in analysis only necessarily cover the first 7 chapters anyways.






share|cite|improve this answer




























    up vote
    1
    down vote













    Understanding Analysis by S. Abbott is a great introductory text. There is a lot of discussion, both informal to gain intuition and formal to rigorously pin down ideas. It felt like I was having a conversation the first time I read it, which was a very valuable experience as analysis was my first “hard” upper level class.



    Edit: I do believe it has a solution manual as well.






    share|cite|improve this answer




























      up vote
      1
      down vote













      See Introduction to Calculus and Classical Analysis by Omar Hijab. The synopsis of the book on the publisher's website is as follows:



      "This text is intended for an honors calculus course or for an introduction to analysis. Involving rigorous analysis, computational dexterity, and a breadth of applications, it is ideal for undergraduate majors. This third edition includes corrections as well as some additional material."



      Some features of the text:
      -The text is completely self-contained and starts with the real number axioms;




      • The integral is defined as the area under the graph, while the area is defined for every subset of the plane;


      • There is a heavy emphasis on computational problems, from the high-school quadratic formula to the formula for the derivative of the zeta function at zero;


      • There are applications from many parts of analysis, e.g., convexity, the Cantor set, continued fractions, the AGM, the theta and zeta functions, transcendental numbers, the Bessel and gamma functions, and many more;


      • Traditionally transcendentally presented material, such as infinite products, the Bernoulli series, and the zeta functional equation, is developed over the reals;


      • There are 385 problems with all the solutions at the back of the text.



      See too Elementary Classical Analysis by Jerrold E. Marsden and Michael J. Hoffman. I believe the 'worked examples' you'll find there can help you in the lack of answers to the exercises proposed in your self-study journey.



      [Reviewed by Allen Stenger, on 11/25/2012 ]



      "This is an introductory text in real analysis, aimed at upper-division undergraduates. The coverage is similar to that in Rudin’s Principles of Mathematical Analysis and Apostol’s Mathematical Analysis. This book differs from these earlier books primarily in being more talkative: explanations are written out at greater length, there are more worked examples, and there is a much larger number of exercises at all levels of difficulty."






      share|cite|improve this answer






























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        0
        down vote













        Introduction to Real Analysis, by Bartle and Sherbert, appears to be the continuation to Elements. It also has an instructors manual, so you can check your solutions.



        I used this book in college. It's a lot easier than Rudin's. If you are confident in your mathematical abilities, I would recommend Rudin's Principles of Mathematics. Don't beat yourself up if you can't get through it, though. It is terse.






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          5 Answers
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          active

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          5 Answers
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          active

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          up vote
          1
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          accepted










          I would highly recommend the book by David Brennan called A first course in analysis (Cambridge University Press). What's good about it is it explains the definitions and walks you through all the "hard points" of the contents. The "other" books are also titled "intro" or "a first" course, but they are actually not so.






          share|cite|improve this answer























          • I got the book and so far I really like it. It clearly illustrates how to work the examples and gives examples of the definitions instead of just giving the definition. Thanks!
            – Robben
            Dec 12 at 23:24















          up vote
          1
          down vote



          accepted










          I would highly recommend the book by David Brennan called A first course in analysis (Cambridge University Press). What's good about it is it explains the definitions and walks you through all the "hard points" of the contents. The "other" books are also titled "intro" or "a first" course, but they are actually not so.






          share|cite|improve this answer























          • I got the book and so far I really like it. It clearly illustrates how to work the examples and gives examples of the definitions instead of just giving the definition. Thanks!
            – Robben
            Dec 12 at 23:24













          up vote
          1
          down vote



          accepted







          up vote
          1
          down vote



          accepted






          I would highly recommend the book by David Brennan called A first course in analysis (Cambridge University Press). What's good about it is it explains the definitions and walks you through all the "hard points" of the contents. The "other" books are also titled "intro" or "a first" course, but they are actually not so.






          share|cite|improve this answer














          I would highly recommend the book by David Brennan called A first course in analysis (Cambridge University Press). What's good about it is it explains the definitions and walks you through all the "hard points" of the contents. The "other" books are also titled "intro" or "a first" course, but they are actually not so.







          share|cite|improve this answer














          share|cite|improve this answer



          share|cite|improve this answer








          edited Nov 29 at 1:04









          timtfj

          827215




          827215










          answered Nov 28 at 1:03









          DeepSea

          70.8k54487




          70.8k54487












          • I got the book and so far I really like it. It clearly illustrates how to work the examples and gives examples of the definitions instead of just giving the definition. Thanks!
            – Robben
            Dec 12 at 23:24


















          • I got the book and so far I really like it. It clearly illustrates how to work the examples and gives examples of the definitions instead of just giving the definition. Thanks!
            – Robben
            Dec 12 at 23:24
















          I got the book and so far I really like it. It clearly illustrates how to work the examples and gives examples of the definitions instead of just giving the definition. Thanks!
          – Robben
          Dec 12 at 23:24




          I got the book and so far I really like it. It clearly illustrates how to work the examples and gives examples of the definitions instead of just giving the definition. Thanks!
          – Robben
          Dec 12 at 23:24










          up vote
          2
          down vote













          Rudin's Principles of Mathematical Analysis is a hard book, but it's also a standard and it is extremely well-written (in my and many others' opinion) so you should read it early on. It may not be your first book in analysis, but if not I would make it your second.



          When working through Rudin, even though you have a solutions manual, you should not give up on problems before you have solved them. There are problems in that book that take some of the best students hours over days to solve. The process of banging your head against the wall (or the book, or any other hard object) is part of the book and part of your preparation for mathematics. When you do get through Rudin, you will be in a very good place to step into the field of analysis $-$ possibly even the next Rudin book, Real and Complex Analysis.



          As a soft introduction to analysis before Rudin, I would recommend my teacher's book: Mikusinski's An Introduction to Analysis: From Number to Integral. It is fairly short and easy to get through, and will prime your brain for the more intense fare of Rudin's book. It only covers single-variable analysis, however, which is 8 out of 11 chapters in Rudin; most courses in analysis only necessarily cover the first 7 chapters anyways.






          share|cite|improve this answer

























            up vote
            2
            down vote













            Rudin's Principles of Mathematical Analysis is a hard book, but it's also a standard and it is extremely well-written (in my and many others' opinion) so you should read it early on. It may not be your first book in analysis, but if not I would make it your second.



            When working through Rudin, even though you have a solutions manual, you should not give up on problems before you have solved them. There are problems in that book that take some of the best students hours over days to solve. The process of banging your head against the wall (or the book, or any other hard object) is part of the book and part of your preparation for mathematics. When you do get through Rudin, you will be in a very good place to step into the field of analysis $-$ possibly even the next Rudin book, Real and Complex Analysis.



            As a soft introduction to analysis before Rudin, I would recommend my teacher's book: Mikusinski's An Introduction to Analysis: From Number to Integral. It is fairly short and easy to get through, and will prime your brain for the more intense fare of Rudin's book. It only covers single-variable analysis, however, which is 8 out of 11 chapters in Rudin; most courses in analysis only necessarily cover the first 7 chapters anyways.






            share|cite|improve this answer























              up vote
              2
              down vote










              up vote
              2
              down vote









              Rudin's Principles of Mathematical Analysis is a hard book, but it's also a standard and it is extremely well-written (in my and many others' opinion) so you should read it early on. It may not be your first book in analysis, but if not I would make it your second.



              When working through Rudin, even though you have a solutions manual, you should not give up on problems before you have solved them. There are problems in that book that take some of the best students hours over days to solve. The process of banging your head against the wall (or the book, or any other hard object) is part of the book and part of your preparation for mathematics. When you do get through Rudin, you will be in a very good place to step into the field of analysis $-$ possibly even the next Rudin book, Real and Complex Analysis.



              As a soft introduction to analysis before Rudin, I would recommend my teacher's book: Mikusinski's An Introduction to Analysis: From Number to Integral. It is fairly short and easy to get through, and will prime your brain for the more intense fare of Rudin's book. It only covers single-variable analysis, however, which is 8 out of 11 chapters in Rudin; most courses in analysis only necessarily cover the first 7 chapters anyways.






              share|cite|improve this answer












              Rudin's Principles of Mathematical Analysis is a hard book, but it's also a standard and it is extremely well-written (in my and many others' opinion) so you should read it early on. It may not be your first book in analysis, but if not I would make it your second.



              When working through Rudin, even though you have a solutions manual, you should not give up on problems before you have solved them. There are problems in that book that take some of the best students hours over days to solve. The process of banging your head against the wall (or the book, or any other hard object) is part of the book and part of your preparation for mathematics. When you do get through Rudin, you will be in a very good place to step into the field of analysis $-$ possibly even the next Rudin book, Real and Complex Analysis.



              As a soft introduction to analysis before Rudin, I would recommend my teacher's book: Mikusinski's An Introduction to Analysis: From Number to Integral. It is fairly short and easy to get through, and will prime your brain for the more intense fare of Rudin's book. It only covers single-variable analysis, however, which is 8 out of 11 chapters in Rudin; most courses in analysis only necessarily cover the first 7 chapters anyways.







              share|cite|improve this answer












              share|cite|improve this answer



              share|cite|improve this answer










              answered Nov 28 at 1:48









              AlexanderJ93

              5,871723




              5,871723






















                  up vote
                  1
                  down vote













                  Understanding Analysis by S. Abbott is a great introductory text. There is a lot of discussion, both informal to gain intuition and formal to rigorously pin down ideas. It felt like I was having a conversation the first time I read it, which was a very valuable experience as analysis was my first “hard” upper level class.



                  Edit: I do believe it has a solution manual as well.






                  share|cite|improve this answer

























                    up vote
                    1
                    down vote













                    Understanding Analysis by S. Abbott is a great introductory text. There is a lot of discussion, both informal to gain intuition and formal to rigorously pin down ideas. It felt like I was having a conversation the first time I read it, which was a very valuable experience as analysis was my first “hard” upper level class.



                    Edit: I do believe it has a solution manual as well.






                    share|cite|improve this answer























                      up vote
                      1
                      down vote










                      up vote
                      1
                      down vote









                      Understanding Analysis by S. Abbott is a great introductory text. There is a lot of discussion, both informal to gain intuition and formal to rigorously pin down ideas. It felt like I was having a conversation the first time I read it, which was a very valuable experience as analysis was my first “hard” upper level class.



                      Edit: I do believe it has a solution manual as well.






                      share|cite|improve this answer












                      Understanding Analysis by S. Abbott is a great introductory text. There is a lot of discussion, both informal to gain intuition and formal to rigorously pin down ideas. It felt like I was having a conversation the first time I read it, which was a very valuable experience as analysis was my first “hard” upper level class.



                      Edit: I do believe it has a solution manual as well.







                      share|cite|improve this answer












                      share|cite|improve this answer



                      share|cite|improve this answer










                      answered Nov 28 at 11:24









                      Oiler

                      1,9391921




                      1,9391921






















                          up vote
                          1
                          down vote













                          See Introduction to Calculus and Classical Analysis by Omar Hijab. The synopsis of the book on the publisher's website is as follows:



                          "This text is intended for an honors calculus course or for an introduction to analysis. Involving rigorous analysis, computational dexterity, and a breadth of applications, it is ideal for undergraduate majors. This third edition includes corrections as well as some additional material."



                          Some features of the text:
                          -The text is completely self-contained and starts with the real number axioms;




                          • The integral is defined as the area under the graph, while the area is defined for every subset of the plane;


                          • There is a heavy emphasis on computational problems, from the high-school quadratic formula to the formula for the derivative of the zeta function at zero;


                          • There are applications from many parts of analysis, e.g., convexity, the Cantor set, continued fractions, the AGM, the theta and zeta functions, transcendental numbers, the Bessel and gamma functions, and many more;


                          • Traditionally transcendentally presented material, such as infinite products, the Bernoulli series, and the zeta functional equation, is developed over the reals;


                          • There are 385 problems with all the solutions at the back of the text.



                          See too Elementary Classical Analysis by Jerrold E. Marsden and Michael J. Hoffman. I believe the 'worked examples' you'll find there can help you in the lack of answers to the exercises proposed in your self-study journey.



                          [Reviewed by Allen Stenger, on 11/25/2012 ]



                          "This is an introductory text in real analysis, aimed at upper-division undergraduates. The coverage is similar to that in Rudin’s Principles of Mathematical Analysis and Apostol’s Mathematical Analysis. This book differs from these earlier books primarily in being more talkative: explanations are written out at greater length, there are more worked examples, and there is a much larger number of exercises at all levels of difficulty."






                          share|cite|improve this answer



























                            up vote
                            1
                            down vote













                            See Introduction to Calculus and Classical Analysis by Omar Hijab. The synopsis of the book on the publisher's website is as follows:



                            "This text is intended for an honors calculus course or for an introduction to analysis. Involving rigorous analysis, computational dexterity, and a breadth of applications, it is ideal for undergraduate majors. This third edition includes corrections as well as some additional material."



                            Some features of the text:
                            -The text is completely self-contained and starts with the real number axioms;




                            • The integral is defined as the area under the graph, while the area is defined for every subset of the plane;


                            • There is a heavy emphasis on computational problems, from the high-school quadratic formula to the formula for the derivative of the zeta function at zero;


                            • There are applications from many parts of analysis, e.g., convexity, the Cantor set, continued fractions, the AGM, the theta and zeta functions, transcendental numbers, the Bessel and gamma functions, and many more;


                            • Traditionally transcendentally presented material, such as infinite products, the Bernoulli series, and the zeta functional equation, is developed over the reals;


                            • There are 385 problems with all the solutions at the back of the text.



                            See too Elementary Classical Analysis by Jerrold E. Marsden and Michael J. Hoffman. I believe the 'worked examples' you'll find there can help you in the lack of answers to the exercises proposed in your self-study journey.



                            [Reviewed by Allen Stenger, on 11/25/2012 ]



                            "This is an introductory text in real analysis, aimed at upper-division undergraduates. The coverage is similar to that in Rudin’s Principles of Mathematical Analysis and Apostol’s Mathematical Analysis. This book differs from these earlier books primarily in being more talkative: explanations are written out at greater length, there are more worked examples, and there is a much larger number of exercises at all levels of difficulty."






                            share|cite|improve this answer

























                              up vote
                              1
                              down vote










                              up vote
                              1
                              down vote









                              See Introduction to Calculus and Classical Analysis by Omar Hijab. The synopsis of the book on the publisher's website is as follows:



                              "This text is intended for an honors calculus course or for an introduction to analysis. Involving rigorous analysis, computational dexterity, and a breadth of applications, it is ideal for undergraduate majors. This third edition includes corrections as well as some additional material."



                              Some features of the text:
                              -The text is completely self-contained and starts with the real number axioms;




                              • The integral is defined as the area under the graph, while the area is defined for every subset of the plane;


                              • There is a heavy emphasis on computational problems, from the high-school quadratic formula to the formula for the derivative of the zeta function at zero;


                              • There are applications from many parts of analysis, e.g., convexity, the Cantor set, continued fractions, the AGM, the theta and zeta functions, transcendental numbers, the Bessel and gamma functions, and many more;


                              • Traditionally transcendentally presented material, such as infinite products, the Bernoulli series, and the zeta functional equation, is developed over the reals;


                              • There are 385 problems with all the solutions at the back of the text.



                              See too Elementary Classical Analysis by Jerrold E. Marsden and Michael J. Hoffman. I believe the 'worked examples' you'll find there can help you in the lack of answers to the exercises proposed in your self-study journey.



                              [Reviewed by Allen Stenger, on 11/25/2012 ]



                              "This is an introductory text in real analysis, aimed at upper-division undergraduates. The coverage is similar to that in Rudin’s Principles of Mathematical Analysis and Apostol’s Mathematical Analysis. This book differs from these earlier books primarily in being more talkative: explanations are written out at greater length, there are more worked examples, and there is a much larger number of exercises at all levels of difficulty."






                              share|cite|improve this answer














                              See Introduction to Calculus and Classical Analysis by Omar Hijab. The synopsis of the book on the publisher's website is as follows:



                              "This text is intended for an honors calculus course or for an introduction to analysis. Involving rigorous analysis, computational dexterity, and a breadth of applications, it is ideal for undergraduate majors. This third edition includes corrections as well as some additional material."



                              Some features of the text:
                              -The text is completely self-contained and starts with the real number axioms;




                              • The integral is defined as the area under the graph, while the area is defined for every subset of the plane;


                              • There is a heavy emphasis on computational problems, from the high-school quadratic formula to the formula for the derivative of the zeta function at zero;


                              • There are applications from many parts of analysis, e.g., convexity, the Cantor set, continued fractions, the AGM, the theta and zeta functions, transcendental numbers, the Bessel and gamma functions, and many more;


                              • Traditionally transcendentally presented material, such as infinite products, the Bernoulli series, and the zeta functional equation, is developed over the reals;


                              • There are 385 problems with all the solutions at the back of the text.



                              See too Elementary Classical Analysis by Jerrold E. Marsden and Michael J. Hoffman. I believe the 'worked examples' you'll find there can help you in the lack of answers to the exercises proposed in your self-study journey.



                              [Reviewed by Allen Stenger, on 11/25/2012 ]



                              "This is an introductory text in real analysis, aimed at upper-division undergraduates. The coverage is similar to that in Rudin’s Principles of Mathematical Analysis and Apostol’s Mathematical Analysis. This book differs from these earlier books primarily in being more talkative: explanations are written out at greater length, there are more worked examples, and there is a much larger number of exercises at all levels of difficulty."







                              share|cite|improve this answer














                              share|cite|improve this answer



                              share|cite|improve this answer








                              edited Nov 29 at 1:53









                              timtfj

                              827215




                              827215










                              answered Nov 28 at 11:56









                              MathOverview

                              8,51443063




                              8,51443063






















                                  up vote
                                  0
                                  down vote













                                  Introduction to Real Analysis, by Bartle and Sherbert, appears to be the continuation to Elements. It also has an instructors manual, so you can check your solutions.



                                  I used this book in college. It's a lot easier than Rudin's. If you are confident in your mathematical abilities, I would recommend Rudin's Principles of Mathematics. Don't beat yourself up if you can't get through it, though. It is terse.






                                  share|cite|improve this answer

























                                    up vote
                                    0
                                    down vote













                                    Introduction to Real Analysis, by Bartle and Sherbert, appears to be the continuation to Elements. It also has an instructors manual, so you can check your solutions.



                                    I used this book in college. It's a lot easier than Rudin's. If you are confident in your mathematical abilities, I would recommend Rudin's Principles of Mathematics. Don't beat yourself up if you can't get through it, though. It is terse.






                                    share|cite|improve this answer























                                      up vote
                                      0
                                      down vote










                                      up vote
                                      0
                                      down vote









                                      Introduction to Real Analysis, by Bartle and Sherbert, appears to be the continuation to Elements. It also has an instructors manual, so you can check your solutions.



                                      I used this book in college. It's a lot easier than Rudin's. If you are confident in your mathematical abilities, I would recommend Rudin's Principles of Mathematics. Don't beat yourself up if you can't get through it, though. It is terse.






                                      share|cite|improve this answer












                                      Introduction to Real Analysis, by Bartle and Sherbert, appears to be the continuation to Elements. It also has an instructors manual, so you can check your solutions.



                                      I used this book in college. It's a lot easier than Rudin's. If you are confident in your mathematical abilities, I would recommend Rudin's Principles of Mathematics. Don't beat yourself up if you can't get through it, though. It is terse.







                                      share|cite|improve this answer












                                      share|cite|improve this answer



                                      share|cite|improve this answer










                                      answered Nov 29 at 2:05









                                      Larry B.

                                      2,676727




                                      2,676727






























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