Prove that any positive odd integer is of the form 6x + 1, 6x + 3, or 6x + 5
Question
Prove that any positive odd integer is of the form 6x + 1, 6x + 3, or 6x + 5
Solution
Sure, here is the proof:
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Any integer can be written in the form of 6x, 6x + 1, 6x + 2, 6x + 3, 6x + 4, or 6x + 5 where x is an integer. This is because when an integer is divided by 6, the remainder is either 0, 1, 2, 3, 4, or 5.
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Now, we know that an integer is odd if it is of the form 2n + 1 where n is an integer. This means that the integer leaves a remainder of 1 when divided by 2.
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Looking at the forms we have from step 1, 6x, 6x + 2, and 6x + 4 are all divisible by 2 and hence are even. So, they cannot be our required form.
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The remaining forms are 6x + 1, 6x + 3, and 6x + 5. These are not divisible by 2 and hence are odd.
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Therefore, any positive odd integer is of the form 6x + 1, 6x + 3, or 6x + 5.
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