Respuesta :
Answer:
It will be in the total of 2 subsets.
Step-by-step explanation:
The only subsets of the set containing 5564 is the empty set and the set {5564}.
5564 belongs to the set of real numbers, the set of natural numbers, the set of integers, the set of whole numbers and the set of rational numbers.
Answer:
5564 belongs to the following subsets of real numbers:
real numbers
rational numbers
integers
whole numbers
natural numbers (counting numbers)
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You can keep on going. You can even say this number belongs to the set of even integers.
Step-by-step explanation:
If you are looking for what subsets of the real numbers that 5564 belong to, then there is a lot of real number subsets to which this number can belong.
This number doesn't have an imaginary part so it's it a number.
We don't have to say it is complex (though it is), because we are looking at subsets of real numbers, not subsets of complex numbers (to which complex numbers are a subset of itself).
So the real numbers are divided into rational versus irrational.
The definition of rational numbers is any number that can be written as a fraction where the top and bottom are integers (of course the bottom integer cannot be 0). -(I will define integers in a second.)
Irrational numbers is any real number that isn't rational.
So since 5564 can be written as 5564/1, then it is rational.
A subset of rational numbers is integers (integers are in consequence also a subset of real numbers since rational numbers are a subset of real numbers).
Integers are numbers you count with, the opposite of those numbers you count with, or 0.
You can count to 5564 so 5564 can be further categorized as real rational integer.
Another subset of real numbers is whole numbers. The whole numbers is just the counting numbers and 0. Again since you count to 5564, then it is a whole number.
The natural numbers (counting numbers) is a subset of real numbers. Again, since 5564 can be counted to, it is a natural number.
