ODD Integers are those numbers that end in 1,3,5,7,9.
So a set of ODD integers could be (101, 99, 93, 103, 10,005, 57) et seq/.
It is if we only consider integers. If we consider all real numbers, for example, it would not be.
Since negative six is not an odd integer, there cannot be any set of odd integers starting from it.
The answer depends on what set of integers is under consideration.The answer depends on what set of integers is under consideration.The answer depends on what set of integers is under consideration.The answer depends on what set of integers is under consideration.
The density property does not hold for odd numbers in the same way it does for the set of all integers or real numbers. While there are infinitely many odd numbers, they are not densely packed within the integers; there are gaps between them (specifically, every even integer separates two odd integers). Thus, between any two odd numbers, there are even integers, indicating that odd numbers do not form a dense subset of the integers.
Any set of three odd integers must be odd - for example, 3 + 5 + 7 = 15. Similarly, the sum of an even number of odd integers added together will always be an even integer.
The set of positive odd integers.
No. For example, 5 is an odd integer and 3 is an odd integer, yet 5/3 is neither an integer nor odd (as odd numbers are, by definition, integers).
There is no set of two consecutive odd integers for 323. The set has one odd and one even integer. The numbers are 161 and 162.
There is no set of four consecutive odd integers for 204. The only set is even: 48, 50, 52 and 54.
It is if we only consider integers. If we consider all real numbers, for example, it would not be.
Since negative six is not an odd integer, there cannot be any set of odd integers starting from it.
The answer depends on what set of integers is under consideration.The answer depends on what set of integers is under consideration.The answer depends on what set of integers is under consideration.The answer depends on what set of integers is under consideration.
addition
It is a set of two positive odd integers.
Because the set is not closed under addition. If x and y are odd, then x + y is not odd.
That is correct, the set is not closed.
Assuming that the question is in the context of the operation "addition", The set of odd numbers is not closed under addition. That is to say, if x and y are members of the set (x and y are odd) then x+y not odd and so not a member of the set. There is no identity element in the group such that x+i = i+x = x for all x in the group. The identity element under addition of integers is zero which is not a member of the set of odd numbers.