Matches in DBpedia 2016-04 for { ?s ?p "An extravagant number (also known as a wasteful number) is a natural number that has fewer digits than the number of digits in its prime factorization (including exponents). For example, in base-10 arithmetic 4 = 2², 6 = 2×3, 8 = 2³, and 9 = 3² are extravagant numbers.Extravagant numbers can be defined in any base. There are infinitely many extravagant numbers, no matter what base is used."@en }
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- Extravagant_number abstract "An extravagant number (also known as a wasteful number) is a natural number that has fewer digits than the number of digits in its prime factorization (including exponents). For example, in base-10 arithmetic 4 = 2², 6 = 2×3, 8 = 2³, and 9 = 3² are extravagant numbers.Extravagant numbers can be defined in any base. There are infinitely many extravagant numbers, no matter what base is used.".
- Q1705642 abstract "An extravagant number (also known as a wasteful number) is a natural number that has fewer digits than the number of digits in its prime factorization (including exponents). For example, in base-10 arithmetic 4 = 2², 6 = 2×3, 8 = 2³, and 9 = 3² are extravagant numbers.Extravagant numbers can be defined in any base. There are infinitely many extravagant numbers, no matter what base is used.".
- Extravagant_number comment "An extravagant number (also known as a wasteful number) is a natural number that has fewer digits than the number of digits in its prime factorization (including exponents). For example, in base-10 arithmetic 4 = 2², 6 = 2×3, 8 = 2³, and 9 = 3² are extravagant numbers.Extravagant numbers can be defined in any base. There are infinitely many extravagant numbers, no matter what base is used.".
- Q1705642 comment "An extravagant number (also known as a wasteful number) is a natural number that has fewer digits than the number of digits in its prime factorization (including exponents). For example, in base-10 arithmetic 4 = 2², 6 = 2×3, 8 = 2³, and 9 = 3² are extravagant numbers.Extravagant numbers can be defined in any base. There are infinitely many extravagant numbers, no matter what base is used.".