| 41. | Showed that any elliptic curve over the rational numbers has infinitely many supersingular primes.
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| 42. | Rational numbers are constructed by the division of natural numbers.
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| 43. | Field that has the rational numbers as a subfield.
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| 44. | The rational numbers are ordered pairs of integers, right?
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| 45. | He could mathematically prove that the square root of 2 was not a rational number.
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| 46. | The nonzero rational numbers form a group under multiplication.
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| 47. | Rational numbers are the quotient field of integers.
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| 48. | Thus 22 / 7 is a rational number.
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| 49. | Namely, where is the field of rational numbers.
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| 50. | The set of all rational numbers is countable.
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