The set of positive integers, of course!
Set of integers is denoted by Z, because it represents the German word Zahlen which means integers
Traditionally, the set of integers that represents the natural numbers is {1,2,3,...}, which are the positive integers. Some people include the non-negative integers as the set of natural numbers, which is {0,1,2,3,...}, and includes 0.
.{..., -3, -2, -1, 0, 1, 2, 3, ...}
The set of integers is the same as the set of whole numbers.
The set of integers represents the integers.
The set of positive integers, of course!
Q represents the set of all rational numbers, Zrepresents the set of all integers so Q excluding Z, represents all rationals that are not integers.
Z.
Set of integers is denoted by Z, because it represents the German word Zahlen which means integers
Traditionally, the set of integers that represents the natural numbers is {1,2,3,...}, which are the positive integers. Some people include the non-negative integers as the set of natural numbers, which is {0,1,2,3,...}, and includes 0.
.{..., -3, -2, -1, 0, 1, 2, 3, ...}
The set of integers is an infinite set as there are an infinite number of integers.
There is no such thing as a negative set of integers. There can be a set of negative integers, but that is not the same thing. And even that does not make sense.There is no such thing as a negative set of integers. There can be a set of negative integers, but that is not the same thing. And even that does not make sense.There is no such thing as a negative set of integers. There can be a set of negative integers, but that is not the same thing. And even that does not make sense.There is no such thing as a negative set of integers. There can be a set of negative integers, but that is not the same thing. And even that does not make sense.
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.
You forgot to provide the sets from which one is to choose. However, I hope to help you, by providing an example: {2, 3.14, 7, 11, 15} is such a set, because all of the elements of the set are numbers that are greater than zero. Note that not all of the numbers have to be integers.
The set of integers is the same as the set of whole numbers.