If `m=n^(2)-n` , where n is an integer , then `m^(2)-2m ` is divisible by

If m and n are +ve integers and ( m-n) is an even number , then (m^(2) - n^(2)) will be always divisible by.

2^(2n)+1 where n is odd integer is divisible by

If m and n are two integers such that m = n^(2) - n , then (m^(2) - 2m) is always divisible by

If m and n are positive integers and (m – n) is an even number, then (m^(2) - n^(2)) will be always divisible by

m is said to be related to n if m and n are integers and m-n is divisible by 13. Does this define an equivalence relation?

The natural numbers ware not sufficient to deal with various equations that mathematicians encountered so some new sets of numbers were defined Ehole numbers (W) = {0,1,2,3,4,……….} Integers (Z or I) = (……, -3,-2,-1,1,0,2,3,4,……} Even integers :- Intigers divisible by 2, they are expressed as 2n n in Z. odd Integers :- Integers not divisible by 2, they are expressed as 2n+1or 2n-1,ninZ. If m^(2)-n^(2)=7, where m, n in Z, then number of ordered pairs (m,n) is

If m and n are integers divisible by 5,which of the following is not necessarily true? m+n backslash is divisible by 10 (b) m-n is divisible by 5m^(2)-n^(2) is divisible by 25 (d) None lof these