every irrational number is real number . explain
Answers
Answered by
3
Ya because it real numbers are the collection of natural whole rational integer etc.....
so it is true
hope it helps u
Answered by
31
Please read this properly so that you don't omitt any information by mistake.
•ANSWER:-
~~~~~~~~~~~
We all are well informed about the fact that "rational numbers" and "irrational numbers" together constitute the set called "REAL NUMBERS".
Now, coming to the topic of your question.........
According to the above stated fact, irrational numbers can undoubtedly be classified as a component of the set called real numbers.
So, this statement provides us a proof that, all the "irrational numbers" come under the category of "real numbers".
Therefore, from the above discussion, it is proved that "every irrational number is real number".
......hope this helps.......
•ANSWER:-
~~~~~~~~~~~
We all are well informed about the fact that "rational numbers" and "irrational numbers" together constitute the set called "REAL NUMBERS".
Now, coming to the topic of your question.........
According to the above stated fact, irrational numbers can undoubtedly be classified as a component of the set called real numbers.
So, this statement provides us a proof that, all the "irrational numbers" come under the category of "real numbers".
Therefore, from the above discussion, it is proved that "every irrational number is real number".
......hope this helps.......
Similar questions