[{"data":1,"prerenderedAt":-1},["ShallowReactive",2],{"word-lokaatio":3},{"word":4,"glossSources":10,"senses":12,"sensesFi":13,"frequency":20,"etymologies":29,"etymologyFi":8,"etymologyFiLinks":8,"synonymsByPos":30,"extendedSynonymsByPos":31,"antonyms":32,"hypernyms":33,"hyponyms":34,"englishTranslations":35,"wordnetGlosses":38,"fiSynonyms":39,"fiExtendedSynonyms":40,"fiAntonyms":41,"fiExtendedAntonyms":42,"fiBaseWords":43,"fiBaseWordsGuessed":9,"fiDerivedFrom":44,"fiCompounds":45,"fiDerived":46,"fiRelated":47,"fiTranslations":50,"exampleSentences":53,"inflectionForms":8,"allInflectionForms":8,"rhymePattern":8,"rhymeSamples":64},{"id":5,"lemma":6,"pos":7,"kotusClass":8,"kotusGradation":8,"homonymIndex":8,"ipa":8,"isStub":9},413735,"lokaatio","noun",null,false,{"enWiktionary":9,"fiWiktionary":9,"wordnet":9,"aiGeneratedEn":9,"finnWordNet":11,"psychling":11,"termipankki":11},true,[],[14],{"index":15,"parentIndex":8,"glossFi":16,"glossFiLinks":8,"examplesFi":8,"tags":17,"source":19},0,"yksi lauseenjäsenten semanttisista rooleista, joka ilmaisee paikan. Esimerkiksi sana koulussa lauseessa Mauno on koulussa on lokaatio.",[18],"Kielitiede","termipankki",{"totalAbs":21,"totalRelative":22,"avgRelative":23,"corpora":24},23,0.008763104,0.09435047,{"s24":15,"klk":25,"lehdet":26,"wiki":27,"reddit":28,"opensub":15},0.019371513,0.027257834,0.0638085,0.455665,[],[],[],[],[],[],[36],{"word":37,"type":8},"location",[],[],[],[],[],[],[],[],[],[48,49],"semanttinen rooli","lähde",{"en":51},[52],{"word":37},[54,59],{"paragraph":55,"matchedForm":6,"matchOffset":56,"bookId":57,"bookTitle":58,"bookAuthor":8,"bookSlug":8},"Kuten  kaikkien  muidenkin  vakaiden  jakaumien  tapauksessa,  se  lokaatio -skaala -perhe,  johon  Cauchy -jakauma  kuuluu,  on  suljettu  sellaisten  lineaaristen  muunnosten  suhteen,  joiden  kertoimet  ovat  reaalilukuja.",67,"https://fi.wikipedia.org/wiki/Cauchy-jakauma","Cauchy-jakauma",{"paragraph":60,"matchedForm":6,"matchOffset":61,"bookId":62,"bookTitle":63,"bookAuthor":8,"bookSlug":8},"Yleistettyjen  lineaaristen  mallien  tapauksessa  jakauma  kuuluu  eksponentiaalisen  perheeseen,  jos  jakauma  voidaan  kirjoittaa  muodossa , jossa  Ф  on  skaalaparametri,  θ  on  kanooninen  lokaatio  ja  a () ,  b ()  ovat  jakaumaspesifejä  funktioita.",197,"https://fi.wikipedia.org/wiki/Poisson-regressio","Poisson-regressio",[]]