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What is the greatest number that belongs to the sets if integers and rational numbers but not to the sets of natural numbers and whole numbers?
the answer is -1
Are natural and whole numbers equivalent sets?
they are almost all equivalent - whole numbers also have the number 0, which natural numbers (counting numbers) do not.
What are the different sets of numbers?
whole number integers natural
Set and the different of sets?
there are 5 diffeerent sets Natural Numbers whole numbers integers rational numbers irrational numbers.
What natural numbers are whole 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.
Which group is the biggest amongst natural numbers whole numbers integers?
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.
What is the greatest number that belongs to the sets of integers and rational numbers but not in natural and whole numbers?
the greatest number that is an integer and rational number but is not a natural or whole number is -1
What is any natural number and 0?
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.
Which of the following is not the same set of numbers A) counting numbers (B) positive integers (C) whole numbers (D) natural numbers?
C. whole numbers can be negative and don't match the other sets
0 is not in the set of?
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...).
What is the greatest number that belongs to the set of integers and rational numbers but not to set of natural numbers and whole numbers?
There is no such number. All of these sets go on forever.
What numbers are whole 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.
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