[Apostol's Calculus] Exercises 1.5

in #apostol-calculus4 years ago (edited)

Notice: These proofs are my own. I am not a professional mathematician. If you notice errors or inconsistencies in these solutions, let me know! I appreciate all feedback.

The key to solving these exercises is to analyze each of the given sets and determine whether or not they violate any of the 10 axioms of real linear vectors spaces Vn:

  1. Closure under addition
  2. Closure under multiplication
  3. Commutativity of addition
  4. Associativity of Addition
  5. Existence of 0 element
  6. Existence of negatives
  7. associativity of scalar multiplication
  8. Distributive law for addition in V
  9. Distributive law for addition of numbers
  10. Existence of Identity Element

For these solutions, I will simply state "Yes" if the example given is a real linear space, but I will provide a formal proof if it is not.

Answers:

  1. Yes
  2. Yes
  3. Yes
  4. Yes
  5. No (see proof)
  6. Yes
  7. Yes
  8. Yes
  9. Yes
  10. Yes
  11. No (see proof)
  12. Yes
  13. Yes
  14. No (see proof)
  15. Yes
  16. Yes
  17. Yes
  18. Yes
  19. Yes
  20. Yes
  21. Yes
  22. Yes
  23. No (see proof)
  24. Yes
  25. No (see proof)
  26. Yes
  27. Yes
  28. Yes
  29. (a) No
    (b) No
    (c) No
    (d) No