Question

1. Show that any positive odd integer is of the form 6q+1, or 6q+3, or 6q+5, where q is
some integer.

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Answer 1

Answer:

6q+16q+(3)(6)q+5

=6q+16q+18q+5

Combine Like Terms:

=6q+16q+18q+5

=(6q+16q+18q)+(5)

=40q+5

Answer:

=40q+5

Answer 2

According to Euclid's Division Lemma if we have two positive integers a and b, then there exist unique integers q and r which satisfies the condition a = bq + r where 0 ≤ r < b.