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प्रश्न
Every integer is a rational number.
पर्याय
True
False
MCQ
चूक किंवा बरोबर
उत्तर
This statement is True.
Explanation:
Every integer is a rational number whose denominator remain 1.
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संबंधित प्रश्न
Add the following rational numbers.
\[\frac{- 15}{4} and \frac{7}{4}\]
Simplify:
\[\frac{- 16}{9} + \frac{- 5}{12}\]
Re-arrange suitably and find the sum in each of the following:
\[\frac{3}{5} + \frac{7}{3} + \frac{9}{5} + \frac{- 13}{15} + \frac{- 7}{3}\]
Subtract the first rational number from the second in each of the following:
\[\frac{- 2}{11}, \frac{- 9}{11}\]
Simplify each of the following and express the result as a rational number in standard form:
\[\frac{- 16}{21} \times \frac{14}{5}\]
Simplify:
\[\left( - 5 \times \frac{2}{15} \right) - \left( - 6 \times \frac{2}{9} \right)\]
Fill in the blanks:
The numbers ..... and ..... are their own reciprocals.
Fill in the blanks:
If a is reciprocal of b, then the reciprocal of b is .....
Insert three rational numbers between:
0 and 1
Write the following numbers in the form `p/q` where p and q are integers:
Opposite of three-fifths
