answersLogoWhite

0


Best Answer

No.

User Avatar

Wiki User

12y ago
This answer is:
User Avatar

Add your answer:

Earn +20 pts
Q: Is the set of rational numbers bounded?
Write your answer...
Submit
Still have questions?
magnify glass
imp
Related questions

Is the intersection of the set of rational numbers and the set of whole numbers is the set of rational numbers?

No, it is not.


Are natural numbers the same of rational numbers?

The set of rational numbers includes the set of natural numbers but they are not the same. All natural numbers are rational, not all rational numbers are natural.


Are integers in a set of rational numbers?

Yes - the set of integers is a subset of the set of rational numbers.


A set of numbers combining rational and irrational numbers?

The Real numbers


Derived Set of a set of Rational Numbers?

The derived set of a set of rational numbers is the set of all limit points of the original set. In other words, it includes all real numbers that can be approached arbitrarily closely by elements of the set. Since the rational numbers are dense in the real numbers, the derived set of a set of rational numbers is the set of all real numbers.


What is set of rational numbers union with integers?

It is the rational numbers.


Does a real number contain the set of rational numbers?

No. A real number is only one number whereas the set of rational numbers has infinitely many numbers. However, the set of real numbers does contain the set of rational numbers.


How are rational numbers and integal numbers related to set of real numbers?

Both rational numbers and integers are subsets of the set of real numbers.


How are rational number different from fractional and whole number?

The set of rational numbers is the union of the set of fractional numbers and the set of whole numbers.


Is the set of rational numbers finite?

No; there are infinitely many rational numbers.


Is the set of rational numbers is larger than the set of integers?

Yes, rational numbers are larger than integer because integers are part of rational numbers.


Why negative 3 belongs to the set of integers and rational numbers?

Because that is how the set of integers and the set of rational numbers are defined.