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Concise proof of Tienstra's formula

dc.contributor.authorPorta Pleite, Josep Maria
dc.contributor.authorThomas, Federico
dc.contributor.otherInstitut de Robòtica i Informàtica Industrial
dc.date.accessioned2010-06-01T15:43:17Z
dc.date.available2010-06-01T15:43:17Z
dc.date.issued2009
dc.identifier.citationPorta Pleite, J.M.; Thomas, F. Concise proof of Tienstra's formula. "Journal of surveying engineering (ASCE)", 2009, vol. 135, núm. 4, p. 170-172.
dc.identifier.issn0733-9453
dc.identifier.urihttp://hdl.handle.net/2117/7474
dc.description.abstractThe resection problem consists in finding the location of an observer by measuring the angles sub-tended by lines of sight from this observer to three known stations. Many researchers and practitioners recognize that Tienstra’s formula provides the most compact and elegant solution to this problem. Un- fortunately, all available proofs for this remarkable formula are intricate. This paper shows how, by using barycentric coordinates for the observer in terms of the locations of the stations, a neat and short proof is straightforwardly derived.
dc.format.extent3 p.
dc.language.isoeng
dc.subjectÀrees temàtiques de la UPC::Informàtica::Robòtica
dc.subject.lcshGlobal Positioning System
dc.subject.lcshTriangulation
dc.subject.otherTienstra's formula Triangulation Resection Global localization Barycentric coordinates
dc.titleConcise proof of Tienstra's formula
dc.typeArticle
dc.subject.lemacRobòtica
dc.subject.inspecClassificació INSPEC::Automation::Robots
dc.relation.publisherversionhttp://www-iri.upc.es/people/thomas/papers/SURVEYING2009.pdf
dc.rights.accessOpen Access
local.identifier.drac2046135
dc.description.versionPreprint
local.citation.publicationNameJournal of surveying engineering (ASCE)
local.citation.volume135
local.citation.number4
local.citation.startingPage170
local.citation.endingPage172


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