. "Quadratic Function from the Point of View of Discrete Iterative Theory"@en . . "Quadratic Function from the Point of View of Discrete Iterative Theory"@en . "Kvadratick\u00E1 funkce z hlediska diskr\u00E9tn\u00ED itera\u010Dn\u00ED teorie"@cs . . "14410" . . . "XXXI International Colloquium on the Management of Educational Process: Proceedings" . . . . "The article was created as the result of the research oriented at the innovation of the content and forms of teaching Mathematics at universities. The article includes an interesting and atypical approach to the continuity of second iterative roots of the quadratic function q. In the first part there is mentioned the description of iterative roots of this quadratic function. In the following part there is constructed a quasi-metric d, so that each second iterative root of quadratic function q is a continuous map of a space (R, d) into itself."@en . "Ber\u00E1nek, Jaroslav" . "Functional equation; iterative roots; mono-unary algebra; vertex graph; continuity; quasi-metric; isometric mapping"@en . . "Univerzita Obrany" . "Brno" . "RIV/00216224:14410/13:00068643!RIV14-MSM-14410___" . . "Brno" . "7"^^ . . . . . . "I" . "Kvadratick\u00E1 funkce z hlediska diskr\u00E9tn\u00ED itera\u010Dn\u00ED teorie" . "9788072319244" . . "RIV/00216224:14410/13:00068643" . "1"^^ . . "83939" . "[341B06E448AE]" . "1"^^ . . "P\u0159\u00EDsp\u011Bvek vznikl na z\u00E1klad\u011B v\u00FDzkumu zam\u011B\u0159en\u00E9ho na inovaci obsahu a forem v\u00FDuky matematiky na vysok\u00FDch \u0161kol\u00E1ch. P\u0159\u00EDsp\u011Bvek obsahuje zaj\u00EDmav\u00FD a netypick\u00FD p\u0159\u00EDstup ke spojitosti druh\u00FDch iterativn\u00EDch ko\u0159en\u016F nejjednodu\u0161\u0161\u00ED kvadratick\u00E9 funkce q. Nejprve je uveden popis druh\u00FDch iterativn\u00EDch ko\u0159en\u016F t\u00E9to funkce, d\u00E1le je pops\u00E1na konstrukce takov\u00E9 kvazimetriky d, \u017Ee ka\u017Ed\u00FD druh\u00FD iterativn\u00ED ko\u0159en kvadratick\u00E9 funkce q je spojit\u00FDm zobrazen\u00EDm prostoru (R, d) do sebe" . "Kvadratick\u00E1 funkce z hlediska diskr\u00E9tn\u00ED itera\u010Dn\u00ED teorie"@cs . "2013-06-20+02:00"^^ . . "Kvadratick\u00E1 funkce z hlediska diskr\u00E9tn\u00ED itera\u010Dn\u00ED teorie" . . "P\u0159\u00EDsp\u011Bvek vznikl na z\u00E1klad\u011B v\u00FDzkumu zam\u011B\u0159en\u00E9ho na inovaci obsahu a forem v\u00FDuky matematiky na vysok\u00FDch \u0161kol\u00E1ch. P\u0159\u00EDsp\u011Bvek obsahuje zaj\u00EDmav\u00FD a netypick\u00FD p\u0159\u00EDstup ke spojitosti druh\u00FDch iterativn\u00EDch ko\u0159en\u016F nejjednodu\u0161\u0161\u00ED kvadratick\u00E9 funkce q. Nejprve je uveden popis druh\u00FDch iterativn\u00EDch ko\u0159en\u016F t\u00E9to funkce, d\u00E1le je pops\u00E1na konstrukce takov\u00E9 kvazimetriky d, \u017Ee ka\u017Ed\u00FD druh\u00FD iterativn\u00ED ko\u0159en kvadratick\u00E9 funkce q je spojit\u00FDm zobrazen\u00EDm prostoru (R, d) do sebe"@cs .