Which of the following is a rational number ?
1 + √3
π
2√3
0
Answers
Concept Introduction:-
The numeral that can't be express as the proportion between two integers since the denominator can't be zero is known as a rational number.
Explanation:-
We have been provided a question
We need to choose from the given alternatives the correct option
The correct option is .
It is because is a rational number. Other option are the irrational number.
Final Answer:-
The correct answer is option .
#SPJ2
0 , is a rational number
Given
- 1 + √3
- π
- 2√3
- 0
To find
- the following is a rational number
Solution
we are provided with various numbers as mentioned above and are asked to find out the rational number among the given number.
Rational number : A number which could be expressed in the form of P by Q where Q not equal to zero are known as rational numbers.
eg, 2 ,3, etc.
Irrational number : A number which could not be expressed in the form of P by Q where Q not equal to zero are said to be irrational numbers.
eg: π, 1.010011000111... , etc. The decimal expansions of this numbers would not be recurring and terminating.
from this contents we can now say which of the above numbers is rational and irrational.
1 + √3 he is not a rational number due to the presence of root 3.
π is not a rational number either
2√3 , is not a rational number again due to the presence of root 3
0 , is a rational number as it fits the given condition of the rational number.
learn more,
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