{"id":44325,"date":"2022-01-04T09:55:04","date_gmt":"2022-01-04T08:55:04","guid":{"rendered":"https:\/\/zsetrakowice.pl\/elearning\/?p=44325"},"modified":"2022-01-01T17:22:38","modified_gmt":"2022-01-01T16:22:38","slug":"informatyka-3-blo-2","status":"publish","type":"post","link":"https:\/\/zsetrakowice.pl\/elearning\/2022\/01\/04\/informatyka-3-blo-2\/","title":{"rendered":"Informatyka 3 BLO"},"content":{"rendered":"<p><strong>Witajcie, pozostajemy dalej w temacie Rekurencji.<\/strong><\/p>\n<p>Wiemy ju\u017c, \u017ce rekurencja jest technik\u0105 programowania wykorzystuj\u0105c\u0105 funkcje, kt\u00f3re wywo\u0142uj\u0105 same siebie. Jest to alternatywny dla p\u0119tli spos\u00f3b powtarzania pewnych czynno\u015bci, gdzie kolejny etap jest podzadaniem poprzedniego. Przy redukcji problemu wymagany jest wyra\u017anie okre\u015blony warunek zako\u0144czenia (przypadek podstawowy).<\/p>\n<p class=\"ramka1\"><span style=\"color: #800000;\"><strong>Rekurencyjne obliczanie silni<\/strong><\/span><\/p>\n<p class=\"ramka1\">Typowym przyk\u0142adem rekurencji jest definicja silnia:<\/p>\n<p>\u00a0<img loading=\"lazy\" class=\"\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"170\" height=\"45\" \/><\/p>\n<p><strong>Warto\u015b\u0107 silni dla 0 jest przypadkiem elementarnym. <\/strong>Spos\u00f3b obliczania warto\u015bci 4! mo\u017cna przedstawi\u0107 nast\u0119puj\u0105co:<\/p>\n<p><img loading=\"lazy\" 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\" alt=\"\" width=\"99\" height=\"353\" \/><\/p>\n<p><strong>Program obliczaj\u0105cy silni\u0119 z liczby n sposobem rekurencyjnym<\/strong><\/p>\n<p><img loading=\"lazy\" class=\"\" 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\" alt=\"\" width=\"503\" height=\"364\" \/><\/p>\n<p>Zapraszam do filmu.<\/p>\n<p><iframe title=\"Kurs C++ odc. 13: Rekurencja (rekursja)\" width=\"1160\" height=\"653\" src=\"https:\/\/www.youtube.com\/embed\/jNi_X5bvmQ0?feature=oembed\" frameborder=\"0\" allow=\"accelerometer; autoplay; clipboard-write; encrypted-media; gyroscope; picture-in-picture\" allowfullscreen><\/iframe><\/p>\n<p>&nbsp;<\/p>\n","protected":false},"excerpt":{"rendered":"<p>Witajcie, pozostajemy dalej w temacie Rekurencji. Wiemy ju\u017c, \u017ce rekurencja jest technik\u0105 programowania wykorzystuj\u0105c\u0105 funkcje, kt\u00f3re wywo\u0142uj\u0105 same siebie. Jest to alternatywny dla p\u0119tli spos\u00f3b powtarzania pewnych czynno\u015bci, gdzie kolejny etap jest podzadaniem poprzedniego. Przy redukcji problemu wymagany jest wyra\u017anie okre\u015blony warunek zako\u0144czenia (przypadek podstawowy). Rekurencyjne obliczanie silni Typowym przyk\u0142adem rekurencji jest definicja silnia: \u00a0 [&hellip;]<\/p>\n","protected":false},"author":34,"featured_media":0,"comment_status":"closed","ping_status":"closed","sticky":false,"template":"","format":"standard","meta":[],"categories":[161,13],"tags":[],"_links":{"self":[{"href":"https:\/\/zsetrakowice.pl\/elearning\/wp-json\/wp\/v2\/posts\/44325"}],"collection":[{"href":"https:\/\/zsetrakowice.pl\/elearning\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/zsetrakowice.pl\/elearning\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/zsetrakowice.pl\/elearning\/wp-json\/wp\/v2\/users\/34"}],"replies":[{"embeddable":true,"href":"https:\/\/zsetrakowice.pl\/elearning\/wp-json\/wp\/v2\/comments?post=44325"}],"version-history":[{"count":2,"href":"https:\/\/zsetrakowice.pl\/elearning\/wp-json\/wp\/v2\/posts\/44325\/revisions"}],"predecessor-version":[{"id":44750,"href":"https:\/\/zsetrakowice.pl\/elearning\/wp-json\/wp\/v2\/posts\/44325\/revisions\/44750"}],"wp:attachment":[{"href":"https:\/\/zsetrakowice.pl\/elearning\/wp-json\/wp\/v2\/media?parent=44325"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/zsetrakowice.pl\/elearning\/wp-json\/wp\/v2\/categories?post=44325"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/zsetrakowice.pl\/elearning\/wp-json\/wp\/v2\/tags?post=44325"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}