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Your question is ill-posed. I have not come across a comparison dense-denser-densest.
The term "dense" is a topological property of a set:
A set A is dense in a set B, if for all y in B, there is an open set O of B, such that O and A have nonempty intersection.
The rational numbers are indeed dense in the set of real numbers with the standard topology. An open set containing a real number contains always a rational number.
Another way of saying it is that every real number can be approximated to any precision by rational numbers.
There are denser sets, if you are willing to consider more elements.
Suppose you construct a set consisting of the rational numbers plus all algebraic numbers. The set of algebraic numbers is also countable, but adding them, makes it obviously easier to approximate real numbers.
Can you perhaps construct a set less dense than the set of rational numbers?
Suppose we take the set of rational numbers without the element 0. Is this set still dense in the real numbers? Yes, because 0 can be approximated by 1/n, n>1.
In fact, you can remove finite number of rational numbers from the set of rational numbers and the resulting set will still be dense in the set of the real numbers.
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∙ 11y ago
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Is the densest subset of real numbers is set of fractions?
No, the irrationals are more dense.
Is fraction the densest subset of real numbers?
No. Fractions do not include irrational numbers. And although there are an infinite number of both rationals and irrationals, there are far more irrational numbers than rationals.
What is the Difference between an integer and a real number?
Integer numbers are a subset of real numbers. Real numbers may contain fractions.
Is real numbers a subset of Integers?
You have it backwards. Integers are a subset of real numbers.
Which is the largest subset of a real numbers?
The real numbers, themselves. Every set is a subset of itself.
Is the densest subset of real numbers is set of fractions?
No, the irrationals are more dense.
Is fraction the densest subset of real numbers?
No. Fractions do not include irrational numbers. And although there are an infinite number of both rationals and irrationals, there are far more irrational numbers than rationals.
Is the densest of real numbers is the set of fractions?
No. Irrational numbers are denser.
What is the Difference between an integer and a real number?
Integer numbers are a subset of real numbers. Real numbers may contain fractions.
Are all integers real numbers?
Every integers are real numbers.more precisely, integers are the subset of R, the set of real numbers.They are whole numbers with no decimals or fractions
ARE All integers are real numbers?
Every integers are real numbers.more precisely, integers are the subset of R, the set of real numbers.They are whole numbers with no decimals or fractions
Are real numbers a subset of natural numbers?
No because natural numbers are a subset of real numbers
Is real numbers a subset of Integers?
You have it backwards. Integers are a subset of real numbers.
Integers are a subset of what types of numbers?
Integers are a subset of rational numbers which are a subset of real numbers which are a subset of complex numbers ...
What subset of real numbers does the fraction belong?
I'm just telling you this ahead of time...but i'm not 100% sure with this answer..: fractions belong in the Rational Numbers
Which is the largest subset of a real numbers?
The real numbers, themselves. Every set is a subset of itself.
What is the relationships among the various number sets in the real number system?
We can look at real numbers as the biggest set. Then some real numbers can be written as fractions. Those are rational numbers and that is a subset of reals. Some cannot be written as fractions and those are irrationals, another subset of the reals.Now those that are rational might have a denominator of 1 such as 3/1 of -3/1. These are a subset of the rationals and hence of the reals. They are called integers. Now if we look at 0 and the positive integers, these are the whole numbers. If we get rid of 0, these are the natural numbers.
