Matches in DBpedia 2016-04 for { <http://dbpedia.org/resource/Complete_sequence> ?p ?o }
Showing triples 1 to 40 of
40
with 100 triples per page.
- Complete_sequence abstract "In mathematics, an integer sequence is called a complete sequence if every positive integer can be expressed as a sum of values in the sequence, using each value at most once.For example, the sequence of powers of two {1, 2, 4, 8, ...}, the basis of the binary numeral system, is a complete sequence; given any natural number, we can choose the values corresponding to the 1 bits in its binary representation and sum them to obtain that number (e.g. 37 = 1001012 = 1 + 4 + 32). This sequence is minimal, since no value can be removed from it without making some natural numbers impossible to represent. Simple examples of sequences that are not complete include: The even numbers; since adding even numbers produces only even numbers, no odd number can be formed. Powers of three; no integer having a digit \"2\" in its ternary representation (2, 5, 6...) can be formed.".
- Complete_sequence wikiPageID "28055142".
- Complete_sequence wikiPageLength "7045".
- Complete_sequence wikiPageOutDegree "17".
- Complete_sequence wikiPageRevisionID "678298440".
- Complete_sequence wikiPageWikiLink Bertrands_postulate.
- Complete_sequence wikiPageWikiLink Binary_number.
- Complete_sequence wikiPageWikiLink Category:Integer_sequences.
- Complete_sequence wikiPageWikiLink Fibonacci_coding.
- Complete_sequence wikiPageWikiLink Fibonacci_number.
- Complete_sequence wikiPageWikiLink Generalizations_of_Fibonacci_numbers.
- Complete_sequence wikiPageWikiLink Greedy_algorithm.
- Complete_sequence wikiPageWikiLink Integer_sequence.
- Complete_sequence wikiPageWikiLink Lazy_caterers_sequence.
- Complete_sequence wikiPageWikiLink Mathematics.
- Complete_sequence wikiPageWikiLink Ostrowski_numeration.
- Complete_sequence wikiPageWikiLink Parity_(mathematics).
- Complete_sequence wikiPageWikiLink Power_of_two.
- Complete_sequence wikiPageWikiLink Prime_number.
- Complete_sequence wikiPageWikiLink Subbayya_Sivasankaranarayana_Pillai.
- Complete_sequence wikiPageWikiLink Zeckendorfs_theorem.
- Complete_sequence wikiPageWikiLinkText "Complete sequence".
- Complete_sequence wikiPageWikiLinkText "Complete_sequence".
- Complete_sequence wikiPageWikiLinkText "complete sequence".
- Complete_sequence title "Complete Sequence".
- Complete_sequence urlname "CompleteSequence".
- Complete_sequence wikiPageUsesTemplate Template:Anchor.
- Complete_sequence wikiPageUsesTemplate Template:MathWorld.
- Complete_sequence wikiPageUsesTemplate Template:OEIS.
- Complete_sequence wikiPageUsesTemplate Template:Series_(mathematics).
- Complete_sequence subject Category:Integer_sequences.
- Complete_sequence type Combinatoric.
- Complete_sequence type Integer.
- Complete_sequence comment "In mathematics, an integer sequence is called a complete sequence if every positive integer can be expressed as a sum of values in the sequence, using each value at most once.For example, the sequence of powers of two {1, 2, 4, 8, ...}, the basis of the binary numeral system, is a complete sequence; given any natural number, we can choose the values corresponding to the 1 bits in its binary representation and sum them to obtain that number (e.g. 37 = 1001012 = 1 + 4 + 32).".
- Complete_sequence label "Complete sequence".
- Complete_sequence sameAs Q5156512.
- Complete_sequence sameAs m.0cm8sgt.
- Complete_sequence sameAs Q5156512.
- Complete_sequence wasDerivedFrom Complete_sequence?oldid=678298440.
- Complete_sequence isPrimaryTopicOf Complete_sequence.