>>11638756Nice, although this wasn't exactly what I was looking to show (I realize now that my post should have been written clearer).
Specifically, I am interested in the following:
For any *fixed* integer value of K, and m being any integer > 2, can I write m = n + K such that any m may be represented as this sum, and since m can be any integer larger than 2, does n inherit this property? i.e. n also becomes any integer larger than 2? Essentially I'm interested in what happens to n. Since m is assumed to be any integer, does n inherit this property of also being any integer, for any fixed nonnegative integer k=K?
Essentially I'm trying to prove the following:
I have m = (some positive integer) + k, where m can be any integer larger than 2
and then I want to get rid of k on the RHS by saying that since m is any integer, and k is some fixed integer, I can write m = n + k to obtain
n = (some positive integer),
for any integer of n larger than 2.
Basically I want to show that n inherits the property of being any positive integer larger than 2 because m is any positive integer larger than 2, for any fixed nonnegative integer k.
apologize for the autism