Answer and explanation:
Statement - If the difference of two numbers is even then so is their sum.
Let the two even numbers be '2m' and '2n' with m and n are integers.
The difference of two number is
[tex]2m-2n=2(m-n)[/tex]
Now, The sum of the numbers is
[tex]2m+2n=2(m+n)[/tex]
Let [tex]m+n=k[/tex] where k is an integer
Then, [tex]2m+2n=2k[/tex] which is also an even number as 2 is multiplied with it.
So, If the difference of two numbers is even then so is their sum.
For example -
Let two even number 2 and 4.
The difference is [tex]4-2=2[/tex], 2 is even.
The sum is [tex]4+2=6[/tex], 6 is even.
