jeswika says all integers are rational numbers do you agree with her or not justify
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Answered by
5
NO , all integers are not rational numbers .
Because rational numbers are set of natural,whole and integers and are in p/q form.
Integers are not in p/q form .
Hope it helps !
Answered by
2
Rational numbers are the numbers which are in the form of , where m and n are integers and where n ≠ 0. For example, 3 = , .
Whereas, irrational numbersbare those nbere which cannot be expressed in the form of fraction, integers or wholr number. Foe example, square root of √2, √3, √5, etc.
Therefore, if an fraction consists of an irrational number then the result can't be a rational number. As we can't express square root of non perfect squaresas a fraction of whole numbers or integers.
Therefore we can't say every fraction is a rational number.
But every fraction, that contains only whole numbers or integers or square roots of perfect squares will always be a rational number
For example, can be written as
Whereas, irrational numbersbare those nbere which cannot be expressed in the form of fraction, integers or wholr number. Foe example, square root of √2, √3, √5, etc.
Therefore, if an fraction consists of an irrational number then the result can't be a rational number. As we can't express square root of non perfect squaresas a fraction of whole numbers or integers.
Therefore we can't say every fraction is a rational number.
But every fraction, that contains only whole numbers or integers or square roots of perfect squares will always be a rational number
For example, can be written as
sukhaprmesh:
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