No. Natural numbers are a subset of whole numbers. Negative numbers are whole numbers but not natural.
the answer is -1
they are almost all equivalent - whole numbers also have the number 0, which natural numbers (counting numbers) do not.
whole number integers natural
there are 5 diffeerent sets Natural Numbers whole numbers integers rational numbers irrational numbers.
The set of counting numbers is the positive integers. The set of whole numbers is the positive integers plus zero. The term "natural numbers" has been used interchangeably with both of those sets.
The set of natural numbers is a subset of the set of whole numbers. The set of whole numbers is a subset of the set of integers. So the set of integers is the largest of these three sets.
the greatest number that is an integer and rational number but is not a natural or whole number is -1
N : Numbers which are greater than 0(1,2,3...) are known as natural number sets. Number sets which contains 0(eg 0,1,2,3...) are whole numbers.
C. whole numbers can be negative and don't match the other sets
You can invent an infinite number of sets that don't contain the number zero. For a start, a common set that doesn't contain the zero is the set of natural, or counting, numbers (1, 2, 3...).You can invent an infinite number of sets that don't contain the number zero. For a start, a common set that doesn't contain the zero is the set of natural, or counting, numbers (1, 2, 3...).You can invent an infinite number of sets that don't contain the number zero. For a start, a common set that doesn't contain the zero is the set of natural, or counting, numbers (1, 2, 3...).You can invent an infinite number of sets that don't contain the number zero. For a start, a common set that doesn't contain the zero is the set of natural, or counting, numbers (1, 2, 3...).
There is no such number. All of these sets go on forever.
The set of counting numbers is the positive integers. The set of whole numbers is the positive integers plus zero. The term "natural numbers" has been used interchangeably with both of those sets.