| 31. | In section 59 of that paper, Ramanujan defines generalized highly composite numbers, which include the superabundant numbers.
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| 32. | Just as there are infinitely many highly composite numbers, there are also infinitely many highly cototient numbers.
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| 33. | Now explain what rectangle numbers are ( non-square composite numbers if your syllabus doesn't use that term ).
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| 34. | Let n be a composite number.
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| 35. | Also, if is a composite number,, then an expansion for could be found from an expansion for or.
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| 36. | A "'composite number "'is a positive integer that can be formed by multiplying together two smaller positive integers.
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| 37. | When k is a composite number, the proof is as follows ( demonstrated for the measure-splitting variant ).
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| 38. | Every composite number can be written as the product of two or more ( not necessarily distinct ) primes.
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| 39. | Unknown to Alaoglu and ErdQ�s, about 30 pages of Ramanujan's 1915 paper " Highly Composite Numbers " were suppressed.
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| 40. | The prime numbers can be considered as the atomic elements which, when combined together, make up a composite number.
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