Show that every positive even integer is of the form 2m and every positive odd integer is of the form (2m+1), where m is some integer.


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Answer:


Step by Step Explanation:
  1. Let n be any arbitrary positive integer.
    Let us divide n by 2 to get m as the quotient and r as the remainder.
  2. Then, by Euclid's division lemma, we have:
    n = 2m + r, where 0 > r > 2.
    n = 2m or (2m+1), for some integer m.
  3. Case 1: When n = 2m
    In this case, n is clearly even.
  4. Case 2: When n = 2m+1
    In this case, n is clearly odd.
  5. Thus, for some integer m, every positive even integer is of form 2m and every positive odd integer of the form (2m+1).

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