Matches in DBpedia 2016-04 for { <http://wikidata.dbpedia.org/resource/Q3314668> ?p ?o }
Showing triples 1 to 24 of
24
with 100 triples per page.
- Q3314668 subject Q5443526.
- Q3314668 wikiPageWikiLink Q11197.
- Q3314668 wikiPageWikiLink Q1542114.
- Q3314668 wikiPageWikiLink Q161973.
- Q3314668 wikiPageWikiLink Q168698.
- Q3314668 wikiPageWikiLink Q17285.
- Q3314668 wikiPageWikiLink Q203425.
- Q3314668 wikiPageWikiLink Q204072.
- Q3314668 wikiPageWikiLink Q207527.
- Q3314668 wikiPageWikiLink Q214561.
- Q3314668 wikiPageWikiLink Q266237.
- Q3314668 wikiPageWikiLink Q268493.
- Q3314668 wikiPageWikiLink Q28967.
- Q3314668 wikiPageWikiLink Q395.
- Q3314668 wikiPageWikiLink Q4826704.
- Q3314668 wikiPageWikiLink Q5443526.
- Q3314668 wikiPageWikiLink Q573901.
- Q3314668 wikiPageWikiLink Q724944.
- Q3314668 wikiPageWikiLink Q864333.
- Q3314668 wikiPageWikiLink Q9047.
- Q3314668 wikiPageWikiLink Q93344.
- Q3314668 wikiPageWikiLink Q938102.
- Q3314668 comment "In mathematics, a transcendental curve is a curve that is not an algebraic curve. Here for a curve, C, what matters is the point set (typically in the plane) underlying C, not a given parametrisation. For example, the unit circle is an algebraic curve (pedantically, the real points of such a curve); the usual parametrisation by trigonometric functions may involve those transcendental functions, but certainly the unit circle is defined by a polynomial equation.".
- Q3314668 label "Transcendental curve".