Answer
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Hint:For the solution of the above question, we will have to know about the rational numbers. A rational number can be defined as any number on the number line which can be represented in the form of \[\dfrac{p}{q}\] where p and q are integers and q is not equal to zero.
Complete step-by-step answer:
The set of rational numbers from above includes positive numbers, negative numbers and zero. Every whole number on the number line is a rational number because every whole number on the number line can be expressed as a fraction of the form\[\dfrac{p}{q}\].
Also, if we have two or more rational numbers we can perform arithmetic operations like addition, subtraction, multiplication and division among the rational numbers lying on the number line.
We write the three rational numbers of the form \[\dfrac{p}{q}\] and q is not equal to zero which are \[\dfrac{1}{2},\] \[\dfrac{1}{3},\] and \[\dfrac{1}{4}\].
Here, we can see that all the numbers are in the form of \[\dfrac{p}{q}\] where p and q are integers also q is not equal to zero.
Therefore, the three rational numbers are \[\dfrac{1}{2},\] \[\dfrac{1}{3},\] and\[\dfrac{1}{4}\].
Note: We should also remember some of the properties like the result of two rationalities is always a rational number if we add, subtract or multiply them. Also, a rational number remains the same if we multiply or divide both numerator and denominator with the same number.
Complete step-by-step answer:
The set of rational numbers from above includes positive numbers, negative numbers and zero. Every whole number on the number line is a rational number because every whole number on the number line can be expressed as a fraction of the form\[\dfrac{p}{q}\].
Also, if we have two or more rational numbers we can perform arithmetic operations like addition, subtraction, multiplication and division among the rational numbers lying on the number line.
We write the three rational numbers of the form \[\dfrac{p}{q}\] and q is not equal to zero which are \[\dfrac{1}{2},\] \[\dfrac{1}{3},\] and \[\dfrac{1}{4}\].
Here, we can see that all the numbers are in the form of \[\dfrac{p}{q}\] where p and q are integers also q is not equal to zero.
Therefore, the three rational numbers are \[\dfrac{1}{2},\] \[\dfrac{1}{3},\] and\[\dfrac{1}{4}\].
Note: We should also remember some of the properties like the result of two rationalities is always a rational number if we add, subtract or multiply them. Also, a rational number remains the same if we multiply or divide both numerator and denominator with the same number.
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