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17 July, 14:35

8. (8 marks) Prove that for all integers m and n, m + n and m-n are either both even or both odd

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  1. 17 July, 16:41
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    Answer with explanation:

    Let m and n are integers

    To prove that m+n and m-n are either both even or both odd.

    1. Let m and n are both even

    We know that sum of even number is even and difference of even number is even.

    Suppose m=4 and n=2

    m+n=4+2=6 = Even number

    m-n=4-2=2=Even number

    Hence, we can say m+n and m-n are both even.

    2. Let m and n are odd numbers.

    We know that sum of odd numbers is even and difference of odd numbers is even.

    Suppose m=7 and n=5

    m+n=7+5=12=Even number

    m-n=7-5=2=Even number

    Hence, m+n and m-n are both even.

    3. Let m is odd and n is even.

    We know that sum of an odd number and an even number is odd and difference of an odd and an even number is an odd number.

    Suppose m=7, n=4

    m+n=7+4=11=Odd number

    m-n=7-4=3=Odd number

    Hence, m+n and m-n are both odd numbers.

    4. Let m is even number and n is odd number.

    Suppose m=6, n=3

    m+n=6+3=9=Odd number

    m-n=6-3=3=Odd number

    Hence, m+n and m-n are both odd numbers.

    Therefore, we can say for all inetegers m and n, m+n and m-n are either both even or both odd. Hence proved.
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