Question

Show that any positive odd integer is 6q + 1 or 6q + 3 or 6q + 5. It is of form. Where there q is an integer.​

Answer 1

HIII.......{∆}

THERE IS YOUR ANSWER.......{¶}

• ACC. TO EUCLID LEMMA ANY NO.(n) CAN BE WRITTEN IN THE FORM OF n=aq+b

SO FOR YOUR QUESTION WE CAN DO SEVERAL THINGS GIVEN BELOW......

$let \: n \: be \: any \: odd \: no. \\ so \: acc \: to \: euclid \: lemma \\ \\ n = 6q + r \\ \\ where \: \: 0\leqslant \: r \: < 6 \\ \\ so \: put \: value \: of \: r \: one \: by \: one \ \\ : from \: 0 \: to \: 5 \\ \\ n = 6q \: when \: r \: is \: 0 \\ (n \: is \: an \: even \: no \: in \: this \: case) \\ \\ n = 6q + 1 \: when \: r \: is \: 1 \\ (n \: is \: odd \: in \: this \: case) \\ \\ n = 6q + 2 \: when \: r \: is \: 2 \ \\ (n \: is \: \: even \: in \: \: this \: case) \\ \\ n = 6q + 3 \: when \: r \: is \: 3 \\ (n \: is \: odd \: in \: this \: case) \\ \\ n = 6q + 4 \: when \: r \: is \: 4 \\ (n \: is \: even \: in \: this \: case) \\ \\ n = 6q + 5 \: when \: r \: is \: 5 \\ (n \: is \: odd \: in \: this \: case) \\ \\ so \: we \: need \: only \: odd \: cases... \\ \\ {6q + 1} \: \\ {6q + 3} \\ \\ {6q + 5} \: is \: the \: answer$

HOPE IT'S HELP YOU......{∆}

Answer 2

Answer:

Let a be any positive integer and b = 6.

Then, by Euclid’s algorithm, a = 6q + r for some integer q ≥ 0, and

r = 0, 1, 2, 3, 4, 5 because 0 ≤ r < 6.

Therefore, a = 6q or 6q + 1 or 6q + 2 or 6q + 3 or 6q + 4 or 6q + 5

Also, 6q + 1 = 2 × 3q + 1 = 2k1 + 1, where k1 is a positive integer

6q + 3 = (6q + 2) + 1 = 2 (3q + 1) + 1 = 2k2 + 1, where k2 is an integer

6q + 5 = (6q + 4) + 1 = 2 (3q + 2) + 1 = 2k3 + 1, where k3 is an integer

Clearly,

6q + 1, 6q + 3, 6q + 5 are of the form 2k + 1, where k is an integer.

Therefore, 6q + 1, 6q + 3, 6q + 5 are not exactly divisible by 2.

Hence, these expressions of numbers are odd numbers.

And therefore, any odd integer can be expressed in the form 6q + 1, or 6q + 3, or 6q + 5