That's false.
It is true.
That depends - unfortunately, "whole number" is ambiguous, and can mean different things to different people. If by "whole number" you mean "natural number", then both are of course the same. If you choose to include negative numbers in your definition of "whole number", i.e., whole numbers = integers, then the two sets are not the same, and the proposed statement is false.
It depends, many people do count 0 as a natural number, but MOST do not. So for most HS text book, the answer is NO, all whole numbers are not natural numbers and the reason is 0 is a whole number but not a natural number.
Yes all counting numbers are whole numbers, but the reverse is not true (zero!)
yes but only whole numbers for example 2 - 3 - 6 - 9 - 54 - 111 are all integers 2.5 - 6.9 - 8.1 are not
No, integers are not a subset of whole numbers; rather, whole numbers are a subset of integers. Whole numbers include all non-negative integers (0, 1, 2, 3, ...), while integers encompass all whole numbers as well as their negative counterparts (..., -3, -2, -1, 0, 1, 2, 3, ...). Therefore, while all whole numbers are integers, not all integers are whole numbers.
true
No, integers are positive and negative whole numbers
yes
Yes, it is true.
dont know
True--all positive whole numbers and all negative whole numbers and zero are the integers.
An integer is by definition a whole number.
Rational numbers are a subset of real numbers. They are ratios of the form x/y where x and y are integers (y ≠0). Their decimal representation are either terminating or infinitely recurring.
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.
That's a true statement. Another true statement is: All integers are rational numbers.
It is not true.