{"id":476788,"date":"2023-08-09T07:36:15","date_gmt":"2023-08-09T07:36:15","guid":{"rendered":""},"modified":"2023-09-05T11:13:27","modified_gmt":"2023-09-05T11:13:27","slug":"denary","status":"publish","type":"wiki","link":"https:\/\/oneproxy.pro\/vn\/wiki\/denary\/","title":{"rendered":"T\u1eeb ch\u1ed1i"},"content":{"rendered":"<p>Denary, c\u00f2n \u0111\u01b0\u1ee3c g\u1ecdi l\u00e0 h\u1ec7 th\u1eadp ph\u00e2n ho\u1eb7c h\u1ec7 c\u01a1 s\u1ed1 10, l\u00e0 h\u1ec7 ti\u00eau chu\u1ea9n \u0111\u1ec3 bi\u1ec3u di\u1ec5n c\u00e1c s\u1ed1 m\u00e0 ch\u00fang ta s\u1eed d\u1ee5ng trong cu\u1ed9c s\u1ed1ng h\u00e0ng ng\u00e0y. B\u1eaft ngu\u1ed3n t\u1eeb c\u00e1c ph\u01b0\u01a1ng ph\u00e1p \u0111\u1ebfm ban \u0111\u1ea7u, h\u1ec7 th\u1ed1ng n\u00e0y c\u00f3 m\u01b0\u1eddi ch\u1eef s\u1ed1 duy nh\u1ea5t (0 \u0111\u1ebfn 9) v\u00e0 s\u1eed d\u1ee5ng k\u00fd hi\u1ec7u v\u1ecb tr\u00ed \u0111\u1ec3 bi\u1ec3u th\u1ecb gi\u00e1 tr\u1ecb, ngh\u0129a l\u00e0 gi\u00e1 tr\u1ecb c\u1ee7a m\u1ed9t ch\u1eef s\u1ed1 \u0111\u01b0\u1ee3c x\u00e1c \u0111\u1ecbnh b\u1edfi v\u1ecb tr\u00ed c\u1ee7a n\u00f3.<\/p>\n<h2>L\u1ecbch s\u1eed v\u00e0 ngu\u1ed3n g\u1ed1c c\u1ee7a h\u1ec7 th\u1ed1ng Denary<\/h2>\n<p>Ngu\u1ed3n g\u1ed1c c\u1ee7a h\u1ec7 th\u1ed1ng t\u1eeb ch\u1ed1i b\u1eaft ngu\u1ed3n t\u1eeb c\u00e1c n\u1ec1n v\u0103n minh c\u1ed5 \u0111\u1ea1i. Ng\u01b0\u1eddi Ai C\u1eadp, Hy L\u1ea1p, La M\u00e3 v\u00e0 \u1ea4n \u0110\u1ed9 \u0111\u1ec1u c\u00f3 h\u1ec7 th\u1ed1ng \u0111\u1ebfm \u1edf m\u1ee9c \u0111\u1ed9 n\u00e0o \u0111\u00f3 l\u00e0 c\u01a1 s\u1ed1 10. C\u00e1c nh\u00e0 s\u1eed h\u1ecdc tin r\u1eb1ng \u0111i\u1ec1u n\u00e0y c\u00f3 th\u1ec3 x\u1ea3y ra l\u00e0 do con ng\u01b0\u1eddi c\u00f3 m\u01b0\u1eddi ng\u00f3n tay, khi\u1ebfn n\u00f3 tr\u1edf th\u00e0nh c\u01a1 s\u1edf t\u1ef1 nhi\u00ean \u0111\u1ec3 \u0111\u1ebfm.<\/p>\n<p>Tuy nhi\u00ean, h\u1ec7 th\u1ed1ng c\u1ee5 th\u1ec3 m\u00e0 ch\u00fang ta s\u1eed d\u1ee5ng ng\u00e0y nay, v\u1edbi k\u00fd hi\u1ec7u v\u1ecb tr\u00ed v\u00e0 k\u00fd hi\u1ec7u s\u1ed1 0, \u0111\u00e3 \u0111\u01b0\u1ee3c ph\u00e1t tri\u1ec3n \u0111\u1ea7y \u0111\u1ee7 \u1edf \u1ea4n \u0110\u1ed9 v\u00e0o th\u1ebf k\u1ef7 th\u1ee9 9 sau C\u00f4ng nguy\u00ean, sau \u0111\u00f3 \u0111\u01b0\u1ee3c truy\u1ec1n sang th\u1ebf gi\u1edbi H\u1ed3i gi\u00e1o v\u00e0 cu\u1ed1i c\u00f9ng \u0111\u1ebfn Ch\u00e2u \u00c2u v\u00e0o th\u1eddi Trung c\u1ed5. Vi\u1ec7c s\u1eed d\u1ee5ng k\u00fd hi\u1ec7u th\u1eadp ph\u00e2n v\u1ecb tr\u00ed \u0111\u1ea7u ti\u00ean \u0111\u01b0\u1ee3c bi\u1ebft \u0111\u1ebfn l\u00e0 trong m\u1ed9t cu\u1ed1n s\u00e1ch c\u1ee7a nh\u00e0 to\u00e1n h\u1ecdc \u1ea4n \u0110\u1ed9 Brahmagupta v\u00e0o n\u0103m 628 sau C\u00f4ng nguy\u00ean.<\/p>\n<h2>Th\u00f4ng tin chi ti\u1ebft v\u1ec1 h\u1ec7 th\u1ed1ng Denary<\/h2>\n<p>H\u1ec7 th\u1ed1ng t\u1eeb ch\u1ed1i ho\u1ea1t \u0111\u1ed9ng d\u1ef1a tr\u00ean l\u0169y th\u1eeba m\u01b0\u1eddi. M\u1ed7i ch\u1eef s\u1ed1 trong m\u1ed9t s\u1ed1 t\u1eeb t\u00ednh \u0111\u1ea1i di\u1ec7n cho b\u1ed9i s\u1ed1 c\u1ee7a l\u0169y th\u1eeba m\u01b0\u1eddi. V\u00ed d\u1ee5: trong s\u1ed1 1234, &#039;1&#039; \u1edf h\u00e0ng ngh\u00ecn (10^3), &#039;2&#039; \u1edf h\u00e0ng tr\u0103m (10^2), &#039;3&#039; \u1edf h\u00e0ng ch\u1ee5c (10^2) 1) v\u00e0 s\u1ed1 &#039;4&#039; n\u1eb1m \u1edf v\u1ecb tr\u00ed h\u00e0ng \u0111\u01a1n v\u1ecb (10^0).<\/p>\n<p>Ngo\u00e0i vi\u1ec7c s\u1eed d\u1ee5ng h\u00e0ng ng\u00e0y, h\u1ec7 th\u1ed1ng t\u1eeb ch\u1ed1i c\u00f2n r\u1ea5t quan tr\u1ecdng trong nhi\u1ec1u l\u0129nh v\u1ef1c kh\u00e1c nhau nh\u01b0 th\u01b0\u01a1ng m\u1ea1i, k\u1ef9 thu\u1eadt v\u00e0 khoa h\u1ecdc.<\/p>\n<h2>C\u1ea5u tr\u00fac b\u00ean trong v\u00e0 ch\u1ee9c n\u0103ng c\u1ee7a h\u1ec7 th\u1ed1ng Denary<\/h2>\n<p>H\u1ec7 th\u1ed1ng t\u1eeb ch\u1ed1i ho\u1ea1t \u0111\u1ed9ng d\u1ef1a tr\u00ean kh\u00e1i ni\u1ec7m gi\u00e1 tr\u1ecb v\u1ecb tr\u00ed, trong \u0111\u00f3 m\u1ed7i ch\u1eef s\u1ed1 trong m\u1ed9t s\u1ed1 c\u00f3 m\u1ed9t gi\u00e1 tr\u1ecb nh\u1ea5t \u0111\u1ecbnh t\u00f9y thu\u1ed9c v\u00e0o v\u1ecb tr\u00ed c\u1ee7a n\u00f3. C\u1ea5u tr\u00fac n\u00e0y cho ph\u00e9p ch\u00fang ta bi\u1ec3u di\u1ec5n m\u1ed9t d\u00e3y s\u1ed1 r\u1ed9ng l\u1edbn ch\u1ec9 v\u1edbi m\u01b0\u1eddi k\u00fd hi\u1ec7u.<\/p>\n<p>V\u00ed d\u1ee5: s\u1ed1 &#039;345&#039; trong t\u1eeb \u0111i\u1ec3n bi\u1ec3u th\u1ecb 3 tr\u0103m (3<em>10^2), 4 ch\u1ee5c (4<\/em>10^1) v\u00e0 5 \u0111\u01a1n v\u1ecb (5*10^0). Khi nh\u1eefng th\u1ee9 n\u00e0y \u0111\u01b0\u1ee3c c\u1ed9ng l\u1ea1i v\u1edbi nhau, ch\u00fang s\u1ebd c\u00f3 t\u1ed5ng s\u1ed1 l\u00e0 345.<\/p>\n<h2>C\u00e1c t\u00ednh n\u0103ng ch\u00ednh c\u1ee7a h\u1ec7 th\u1ed1ng Denary<\/h2>\n<ol>\n<li><strong>C\u01a1 s\u1edf-10:<\/strong> Denary l\u00e0 h\u1ec7 c\u01a1 s\u1ed1 10, ngh\u0129a l\u00e0 n\u00f3 s\u1eed d\u1ee5ng m\u01b0\u1eddi k\u00fd hi\u1ec7u (0-9) \u0111\u1ec3 bi\u1ec3u th\u1ecb c\u00e1c s\u1ed1.<\/li>\n<li><strong>K\u00fd hi\u1ec7u v\u1ecb tr\u00ed:<\/strong> Gi\u00e1 tr\u1ecb c\u1ee7a m\u1ed9t ch\u1eef s\u1ed1 ph\u1ee5 thu\u1ed9c v\u00e0o v\u1ecb tr\u00ed c\u1ee7a n\u00f3 trong s\u1ed1. Ch\u1eef s\u1ed1 c\u00e0ng \u1edf b\u00ean tr\u00e1i th\u00ec gi\u00e1 tr\u1ecb c\u1ee7a n\u00f3 c\u00e0ng l\u1edbn.<\/li>\n<li><strong>D\u1ea5u th\u1eadp ph\u00e2n:<\/strong> H\u1ec7 th\u1ed1ng nh\u1ecb ph\u00e2n s\u1eed d\u1ee5ng d\u1ea5u th\u1eadp ph\u00e2n \u0111\u1ec3 ph\u00e2n t\u00e1ch s\u1ed1 nguy\u00ean kh\u1ecfi ph\u00e2n s\u1ed1.<\/li>\n<li><strong>T\u00ednh ph\u1ed5 qu\u00e1t:<\/strong> H\u1ec7 th\u1ed1ng t\u1eeb ch\u1ed1i l\u00e0 h\u1ec7 th\u1ed1ng s\u1ed1 \u0111\u01b0\u1ee3c s\u1eed d\u1ee5ng r\u1ed9ng r\u00e3i nh\u1ea5t tr\u00ean to\u00e0n th\u1ebf gi\u1edbi.<\/li>\n<\/ol>\n<h2>C\u00e1c lo\u1ea1i s\u1ed1 Denary<\/h2>\n<p>H\u1ec7 th\u1ed1ng t\u1eeb ch\u1ed1i bao g\u1ed3m c\u00e1c lo\u1ea1i s\u1ed1 kh\u00e1c nhau:<\/p>\n<ol>\n<li><strong>S\u1ed1 nguy\u00ean:<\/strong> \u0110\u00e2y l\u00e0 t\u1ea5t c\u1ea3 c\u00e1c s\u1ed1 kh\u00f4ng c\u00f3 b\u1ea5t k\u1ef3 th\u00e0nh ph\u1ea7n ph\u00e2n s\u1ed1 ho\u1eb7c th\u1eadp ph\u00e2n n\u00e0o, nh\u01b0 1, 2, 3, v.v.<\/li>\n<li><strong>S\u1ed1 th\u1eadp ph\u00e2n:<\/strong> Ch\u00fang bao g\u1ed3m d\u1ea5u th\u1eadp ph\u00e2n v\u00e0 c\u00e1c ph\u1ea7n ph\u00e2n s\u1ed1, ch\u1eb3ng h\u1ea1n nh\u01b0 0,5, 3,14, 0,3333, v.v.<\/li>\n<li><strong>S\u1ed1 \u00e2m:<\/strong> Nh\u1eefng gi\u00e1 tr\u1ecb n\u00e0y nh\u1ecf h\u01a1n 0 v\u00e0 th\u01b0\u1eddng c\u00f3 d\u1ea5u tr\u1eeb \u1edf ph\u00eda tr\u01b0\u1edbc, nh\u01b0 -1, -2, -3, v.v.<\/li>\n<\/ol>\n<h2>\u1ee8ng d\u1ee5ng, th\u00e1ch th\u1ee9c v\u00e0 gi\u1ea3i ph\u00e1p<\/h2>\n<p>H\u1ec7 th\u1ed1ng t\u1eeb ch\u1ed1i t\u00ecm th\u1ea5y \u1ee9ng d\u1ee5ng r\u1ed9ng r\u00e3i trong cu\u1ed9c s\u1ed1ng h\u00e0ng ng\u00e0y, khoa h\u1ecdc, k\u1ef9 thu\u1eadt v\u00e0 th\u01b0\u01a1ng m\u1ea1i. \u0110\u00e2y l\u00e0 h\u1ec7 th\u1ed1ng s\u1ed1 ti\u00eau chu\u1ea9n cho h\u1ea7u h\u1ebft c\u00e1c m\u1ee5c \u0111\u00edch.<\/p>\n<p>Tuy nhi\u00ean, n\u00f3 kh\u00f4ng ph\u1ea3i l\u00fac n\u00e0o c\u0169ng l\u00e0 h\u1ec7 th\u1ed1ng hi\u1ec7u qu\u1ea3 nh\u1ea5t. V\u00ed d\u1ee5, m\u00e1y t\u00ednh s\u1eed d\u1ee5ng h\u1ec7 nh\u1ecb ph\u00e2n (c\u01a1 s\u1ed1 2) v\u00ec vi\u1ec7c bi\u1ec3u di\u1ec5n s\u1ed1 nh\u1ecb ph\u00e2n b\u1eb1ng t\u00edn hi\u1ec7u \u0111i\u1ec7n d\u1ec5 d\u00e0ng h\u01a1n. T\u01b0\u01a1ng t\u1ef1, m\u1ed9t s\u1ed1 b\u00e0i to\u00e1n d\u1ec5 gi\u1ea3i h\u01a1n trong c\u00e1c c\u01a1 s\u1edf kh\u00e1c.<\/p>\n<p>Ch\u00eca kh\u00f3a \u0111\u1ec3 s\u1eed d\u1ee5ng hi\u1ec7u qu\u1ea3 c\u00e1c h\u1ec7 th\u1ed1ng s\u1ed1 kh\u00e1c nhau l\u00e0 hi\u1ec3u c\u00e1c thu\u1ed9c t\u00ednh c\u1ee7a ch\u00fang v\u00e0 c\u00f3 th\u1ec3 chuy\u1ec3n \u0111\u1ed5i gi\u1eefa ch\u00fang. Nhi\u1ec1u b\u00e0i to\u00e1n c\u00f3 th\u1ec3 \u0111\u01b0\u1ee3c \u0111\u01a1n gi\u1ea3n h\u00f3a b\u1eb1ng c\u00e1ch thay \u0111\u1ed5i h\u1ec7 th\u1ed1ng s\u1ed1, gi\u1ea3i b\u00e0i to\u00e1n, sau \u0111\u00f3 chuy\u1ec3n ng\u01b0\u1ee3c v\u1ec1 h\u1ec7 nh\u1ecb ph\u00e2n.<\/p>\n<h2>So s\u00e1nh v\u1edbi c\u00e1c h\u1ec7 th\u1ed1ng s\u1ed1 kh\u00e1c<\/h2>\n<table>\n<thead>\n<tr>\n<th>H\u1ec7 th\u1ed1ng s\u1ed1<\/th>\n<th>C\u0103n c\u1ee9<\/th>\n<th>Ch\u1eef s\u1ed1 \u0111\u01b0\u1ee3c s\u1eed d\u1ee5ng<\/th>\n<th>C\u00e1ch s\u1eed d\u1ee5ng chung<\/th>\n<\/tr>\n<\/thead>\n<tbody>\n<tr>\n<td>T\u1eeb ch\u1ed1i<\/td>\n<td>10<\/td>\n<td>0-9<\/td>\n<td>\u0110\u1ebfm h\u00e0ng ng\u00e0y, bu\u00f4n b\u00e1n<\/td>\n<\/tr>\n<tr>\n<td>nh\u1ecb ph\u00e2n<\/td>\n<td>2<\/td>\n<td>0, 1<\/td>\n<td>M\u00e1y t\u00ednh, h\u1ec7 th\u1ed1ng s\u1ed1<\/td>\n<\/tr>\n<tr>\n<td>b\u00e1t ph\u00e2n<\/td>\n<td>8<\/td>\n<td>0-7<\/td>\n<td>H\u1ec7 th\u1ed1ng m\u00e1y t\u00ednh c\u0169 h\u01a1n<\/td>\n<\/tr>\n<tr>\n<td>th\u1eadp l\u1ee5c ph\u00e2n<\/td>\n<td>16<\/td>\n<td>0-9, AF<\/td>\n<td>\u0110\u00e1nh \u0111\u1ecba ch\u1ec9 b\u1ed9 nh\u1edb m\u00e1y t\u00ednh<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<h2>Quan \u0111i\u1ec3m v\u00e0 c\u00f4ng ngh\u1ec7 t\u01b0\u01a1ng lai<\/h2>\n<p>H\u1ec7 th\u1ed1ng t\u1eeb ch\u1ed1i s\u1ebd ti\u1ebfp t\u1ee5c l\u00e0 h\u1ec7 th\u1ed1ng m\u1eb7c \u0111\u1ecbnh cho c\u00e1c ph\u00e9p t\u00ednh d\u1ef1a tr\u00ean con ng\u01b0\u1eddi do t\u00ednh ch\u1ea5t tr\u1ef1c quan c\u1ee7a n\u00f3 li\u00ean quan \u0111\u1ebfn m\u01b0\u1eddi ng\u00f3n tay c\u1ee7a ch\u00fang ta. Tuy nhi\u00ean, khi c\u00f4ng ngh\u1ec7 m\u00e1y t\u00ednh ti\u1ebfn b\u1ed9, c\u00e1c h\u1ec7 th\u1ed1ng s\u1ed1 kh\u00e1c nhau c\u00f3 th\u1ec3 tr\u1edf n\u00ean n\u1ed5i b\u1eadt h\u01a1n. V\u00ed d\u1ee5, \u0111i\u1ec7n to\u00e1n l\u01b0\u1ee3ng t\u1eed s\u1eed d\u1ee5ng qubit, c\u00f3 th\u1ec3 bi\u1ec3u th\u1ecb v\u00f4 s\u1ed1 tr\u1ea1ng th\u00e1i, kh\u00f4ng ch\u1ec9 0 v\u00e0 1.<\/p>\n<h2>M\u00e1y ch\u1ee7 proxy v\u00e0 h\u1ec7 th\u1ed1ng t\u1eeb ch\u1ed1i<\/h2>\n<p>M\u00e1y ch\u1ee7 proxy c\u00f3 th\u1ec3 \u0111\u01b0\u1ee3c s\u1eed d\u1ee5ng \u0111\u1ec3 s\u1eeda \u0111\u1ed5i ho\u1eb7c gi\u00e1m s\u00e1t l\u01b0u l\u01b0\u1ee3ng d\u1eef li\u1ec7u gi\u1eefa m\u00e1y kh\u00e1ch v\u00e0 m\u00e1y ch\u1ee7. Khi n\u00f3i \u0111\u1ebfn h\u1ec7 th\u1ed1ng t\u1eeb ch\u1ed1i, n\u00f3 c\u00f3 th\u1ec3 \u0111\u01b0\u1ee3c s\u1eed d\u1ee5ng theo nhi\u1ec1u c\u00e1ch kh\u00e1c nhau, ch\u1eb3ng h\u1ea1n nh\u01b0 chuy\u1ec3n \u0111\u1ed5i \u0111\u1ecba ch\u1ec9 IP sang \u0111\u1ecbnh d\u1ea1ng t\u1eeb ch\u1ed1i \u0111\u1ec3 con ng\u01b0\u1eddi d\u1ec5 \u0111\u1ecdc h\u01a1n. Trong giao ti\u1ebfp m\u1ea1ng, m\u1eb7c d\u00f9 d\u1eef li\u1ec7u th\u01b0\u1eddng \u0111\u01b0\u1ee3c truy\u1ec1n \u1edf d\u1ea1ng nh\u1ecb ph\u00e2n nh\u01b0ng n\u00f3 th\u01b0\u1eddng \u0111\u01b0\u1ee3c chuy\u1ec3n \u0111\u1ed5i sang d\u1ea1ng t\u1eeb ch\u1ed1i \u0111\u1ec3 hi\u1ec3n th\u1ecb cho ng\u01b0\u1eddi d\u00f9ng.<\/p>\n<h2>Li\u00ean k\u1ebft li\u00ean quan<\/h2>\n<ol>\n<li><a href=\"https:\/\/www.britannica.com\/science\/number-system\" target=\"_new\" rel=\"noopener nofollow\">L\u1ecbch s\u1eed c\u1ee7a h\u1ec7 th\u1ed1ng Denary<\/a><\/li>\n<li><a href=\"https:\/\/www.khanacademy.org\/math\/algebra-home\/alg-intro-to-algebra\/algebra-alternate-number-bases\/v\/number-systems-introduction\" target=\"_new\" rel=\"noopener nofollow\">Hi\u1ec3u h\u1ec7 th\u1ed1ng s\u1ed1 v\u1ecb tr\u00ed<\/a><\/li>\n<li><a href=\"https:\/\/www.computerhope.com\/jargon\/b\/binary.htm\" target=\"_new\" rel=\"noopener nofollow\">Vi\u1ec7c s\u1eed d\u1ee5ng c\u00e1c h\u1ec7 th\u1ed1ng s\u1ed1 kh\u00e1c nhau trong m\u00e1y t\u00ednh<\/a><\/li>\n<\/ol>","protected":false},"featured_media":468197,"menu_order":0,"template":"","meta":{"_acf_changed":false,"content-type":"","inline_featured_image":false,"footnotes":""},"class_list":["post-476788","wiki","type-wiki","status-publish","has-post-thumbnail","hentry"],"acf":{"faq_title":"Frequently Asked Questions about <mark>Denary: The Universal Number System<\/mark>","faq_items":[{"question":"What is the denary system?","answer":"<p>The denary system, also known as the decimal or base-10 system, is the standard system for representing numbers that we use in everyday life. It uses ten unique digits (0 to 9) and employs positional notation, where the value of a digit is determined by its position.<\/p>"},{"question":"Where does the denary system originate from?","answer":"<p>The denary system dates back to ancient civilizations like the Egyptians, Greeks, Romans, and Indians who all had systems of counting that were to some extent base-10. However, the specific system we use today, with positional notation and a symbol for zero, was fully developed in India by the 9th century AD.<\/p>"},{"question":"How does the denary system work?","answer":"<p>Each digit in a denary number represents a multiple of a power of ten. The value of a digit depends on its position in the number, meaning the farther left a digit is, the larger its value. This structure allows us to represent a vast range of numbers with only ten symbols.<\/p>"},{"question":"What are the key features of the denary system?","answer":"<p>The key features of the denary system include its base-10 nature, its use of positional notation, the use of a decimal point to separate whole numbers from fractions, and its universality - it's the most widely used numerical system worldwide.<\/p>"},{"question":"What types of numbers can be represented in the denary system?","answer":"<p>The denary system can represent various types of numbers, including whole numbers, decimals, and negative numbers.<\/p>"},{"question":"Where is the denary system used, and what are some of the challenges?","answer":"<p>The denary system is used in everyday life, science, engineering, and commerce. However, it may not always be the most efficient system. For example, computers use the binary (base-2) system because it's easier to represent binary numbers with electrical signals. The key to efficiently using different number systems is being able to convert between them.<\/p>"},{"question":"How does the denary system compare to other number systems?","answer":"<p>The denary system is base-10, using ten symbols (0-9) to represent numbers. This contrasts with the binary system (base-2), which uses two symbols (0,1), the octal system (base-8), which uses eight symbols (0-7), and the hexadecimal system (base-16), which uses sixteen symbols (0-9, A-F).<\/p>"},{"question":"How might the denary system be used with proxy servers?","answer":"<p>In the context of proxy servers, the denary system can be used in various ways, such as converting IP addresses to denary format for easier human readability. While data is often transmitted in binary, it's typically converted to denary for display to users.<\/p>"}]},"_links":{"self":[{"href":"https:\/\/oneproxy.pro\/vn\/wp-json\/wp\/v2\/wiki\/476788","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/oneproxy.pro\/vn\/wp-json\/wp\/v2\/wiki"}],"about":[{"href":"https:\/\/oneproxy.pro\/vn\/wp-json\/wp\/v2\/types\/wiki"}],"version-history":[{"count":0,"href":"https:\/\/oneproxy.pro\/vn\/wp-json\/wp\/v2\/wiki\/476788\/revisions"}],"wp:featuredmedia":[{"embeddable":true,"href":"https:\/\/oneproxy.pro\/vn\/wp-json\/wp\/v2\/media\/468197"}],"wp:attachment":[{"href":"https:\/\/oneproxy.pro\/vn\/wp-json\/wp\/v2\/media?parent=476788"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}