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

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?

If a, b, c in N , the probability that a^(2)+b^(2)+c^(2) is divisible by 7 is (m)/(n) where m, n are relatively prime natural numbers, then m + n is equal to :

If a, b, c in N , the probability that a^(2)+b^(2)+c^(2) is divisible by 7 is (m)/(n) where m, n are relatively prime natural numbers, then m + n is equal to :

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