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The set {15}.

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Q: Which is the most specific subset of the real numbers that contains the number 15?
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What is the Subset?

A subset is a smaller set that is part of a larger set. For example, the set of animals contains the subset of reptiles, the subset of mammals, and various others. Or in mathematics, the set of real numbers contains the subset of positive integers, the subset of negative integers, the subset of rational numbers, etc.


Which is the most specific subset of the real numbers that contains the number -2?

Integers is a pretty general - that is, least specfic - set. I would say the solution set to the equation x + 2 = 0


Which set of numbers is not a subset of the rational numbers?

A set which contains any irrational or complex numbers.


What contains real numbers?

Real numbers form a proper subset of the set of complex numbers.


Is rational number not a subset of integer?

No, rational numbers are not a subset of integers.


What are the number sets that contain the square root of 5?

Any set that contains it, for example, the set {1, 4/7, sqrt(5), -99} sqrt(5) is an irrational number which form a subset of real numbers which form a subset of complex numbers which ...


To which set of numbers does the number -12 belong?

It belongs to any set that contains it: for example, {4.75, -12, pi, sqrt(5), 29}. It belongs to the set of integers which is a proper subset of rational numbers which is a proper subset of real numbers which is a proper subset of complex numbers. So -12 belongs to all the above sets.


What Whole number is a subset of rational numbers?

A whole number is not a set of any kind and so cannot be a subset of rational numbers.


Which subset of the real numbers does not contain the natural numbers?

The subset consisting of the one number, 7.5 : {7.5}


What is the smallest subset of real numbers that contains -1?

Integers


Which subset of the real number system contains the most rational number and explain why?

The set of all rational numbers.If the set contains all of them then no other set can contain any more rational numbers.


Does every point on the real number line correspond to a rational number?

No. There are several real numbers that are not rational (e.g. pi). However, every rational number is also a real number. In general, whole numbers/natural numbers is a subset of the integers (i.e. every whole number is an integer), the integers is a subset of the rationals, the rationals are a subset of the real numbers. I think the real numbers are a subset of the complex numbers, but I'm not 100% positive on that.