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Fandom news site for the My Little Pony franchise Equestria DailyScreenshot Equestria Daily's homepage on March 17, 2018.Type of siteFan siteCreated byShaun ScotellaroURLequestriadaily.comCommercialNoLaunchedJanuary 19, 2011; 13 years ago (2011-01-19)Current statusOnline Equestria Daily (frequently shortened to EqD or ED) is a fan site dedicated to news and fan work coverage of the animated television series My Little Pony: Friendship Is Magic, and other generations, …

Pour les articles homonymes, voir Diop. Si ce bandeau n'est plus pertinent, retirez-le. Cliquez ici pour en savoir plus. Cet article provoque une controverse de neutralité (voir la discussion) (mai 2015). Considérez-le avec précaution. (Questions courantes) Si ce bandeau n'est plus pertinent, retirez-le. Cliquez ici pour en savoir plus. Cet article doit être recyclé (janvier 2023). Une réorganisation et une clarification du contenu paraissent nécessaires. Améliorez-le, discutez des point…

ХристианствоБиблия Ветхий Завет Новый Завет Евангелие Десять заповедей Нагорная проповедь Апокрифы Бог, Троица Бог Отец Иисус Христос Святой Дух История христианства Апостолы Хронология христианства Раннее христианство Гностическое христианство Вселенские соборы Ни�…

Lists of Italian films 1910s 1910 1911 1912 1913 19141915 1916 1917 1918 1919 1920s 1920 1921 1922 1923 19241925 1926 1927 1928 1929 1930s 1930 1931 1932 1933 19341935 1936 1937 1938 1939 1940s 1940 1941 1942 1943 19441945 1946 1947 1948 1949 1950s 1950 1951 1952 1953 19541955 1956 1957 1958 1959 1960s 1960 1961 1962 1963 19641965 1966 1967 1968 1969 1970s 1970 1971 1972 1973 19741975 1976 1977 1978 1979 1980s 1980 1981 1982 1983 19841985 1986 1987 1988 1989 1990s 1990 1991 1992 1993 19941995 19…

Railway station in Guangzhou, Guangdong Guangzhou Baiyun广州白云Station exteriorGeneral informationLocationBaiyun District, Guangzhou, GuangdongChinaCoordinates23°11′39″N 113°14′24″E / 23.19417°N 113.24000°E / 23.19417; 113.24000Line(s)Beijing–Guangzhou railwayBeijing–Guangzhou high-speed railway (with connection line to Guangzhou North)Guangzhou–Qingyuan intercity railway (under construction)Guangzhou–Zhanjiang high-speed railway (planned)Construc…

الأسلوب الحر في دراجات (بي ام اكس)معلومات عامةأعلى هيئة منظمة UCIالخصائصالتصنيف سباقات الدراجاتالتجهيزات المستعملة دراجة بي ام اكسالألعاب الأوليمبيةالأولمبية نعمالبلد أو الإقليم في جميع أنحاء العالمتعديل - تعديل مصدري - تعديل ويكي بيانات الأسلوب الحر في دراجات (بي ام اكس) ه�…

Mass procession that takes place at dawn on the first day of the Bengali New Year in Bangladesh Mongol Shovajatraমঙ্গল শোভাযাত্রাFirst Ananda (Later renamed as Mongol) Shobhajatra (1989)StatusActiveGenreProcessionDate(s)14 April (First day of Bengali calendar)FrequencyAnnuallyLocation(s)Dhaka University campusCoordinates23°44′00″N 90°23′27″E / 23.733242°N 90.3909218°E / 23.733242; 90.3909218CountryBangladeshYears active1989 – pr…

British Army officer This article is about the twenty-first century colonel. For other people, see Richard Kemp (disambiguation). ColonelRichard KempCBERichard Kemp, pictured here in 2003.Born (1959-04-14) 14 April 1959 (age 65)Maldon, Essex, EnglandAllegiance United KingdomService/branch British ArmyYears of service1977−2006RankColonelService number505991[1]UnitRoyal Anglian RegimentBattles/warsOperation BannerGulf WarBosnian WarWar in AfghanistanIraq WarAwardsComm…

此条目序言章节没有充分总结全文内容要点。 (2019年3月21日)请考虑扩充序言，清晰概述条目所有重點。请在条目的讨论页讨论此问题。 哈萨克斯坦總統哈薩克總統旗現任Қасым-Жомарт Кемелұлы Тоқаев卡瑟姆若马尔特·托卡耶夫自2019年3月20日在任任期7年首任努尔苏丹·纳扎尔巴耶夫设立1990年4月24日（哈薩克蘇維埃社會主義共和國總統） 哈萨克斯坦 哈萨克斯坦政府與�…

Monumen Turul Tatabánya merupakan nama kota di Hungaria. Letaknya di bagian utara. Tepatnya di daerah Komarom-Esztergom. Pada tahun 2012, kota ini memiliki jumlah penduduk sebanyak 70.003 jiwa. Distrik Tatabánya sekarang terbagi atas 6 distrik: Alsógalla Újváros Bánhida Kertváros Dózsakert Felsőgalla Kota kembar Aalen, Jerman Będzin, Polandia Christchurch, Inggris Fairfield, Amerika Serikat Izhevsk, Rusia Odorheiu Secuiesc, Rumania Kota mitra Arad, Rumania Nové Zámky, Slowakia Saint-…

First four caliphs following the death of Muhammad Ottoman miniature paintings depicting Muhammad (center) and the Rashidun caliphs Abu Bakr, Umar, Uthman, and Ali, c. 16th century Part of a series onIslam Beliefs Oneness of God Angels Revealed Books Prophets Day of Resurrection Predestination Practices Profession of Faith Prayer Almsgiving Fasting Pilgrimage TextsFoundations Quran Sunnah (Hadith, Sirah) Tafsir (exegesis) Aqidah (creed) Qisas al-Anbiya (Stories of the Prophets) Mathnawi (P…

Book by John Holloway This article needs additional citations for verification. Please help improve this article by adding citations to reliable sources. Unsourced material may be challenged and removed.Find sources: Change the World Without Taking Power – news · newspapers · books · scholar · JSTOR (October 2012) (Learn how and when to remove this message) Change the World Without Taking Power: The Meaning of Revolution Today AuthorJohn HollowayLanguageE…

American songwriter This article relies largely or entirely on a single source. Relevant discussion may be found on the talk page. Please help improve this article by introducing citations to additional sources.Find sources: Eddie Snyder – news · newspapers · books · scholar · JSTOR (January 2022) Edward Abraham Snyder (February 22, 1919 – March 10, 2011) was an American composer and songwriter. Snyder is credited with co-writing the English language ly…

Dalam geometri, titik sudut[1] (bahasa Inggris: vertex) adalah titik pertemuan dari dua (atau lebih) kurva, garis, atau sisi yang bertemu. Berdasarkan definisi, titik sudut merupakan titik pertemuan dari dua garis yang membentuk sebuah sudut, serta titik yang berada di ujung poligon maupun polihedron. Definisi Titik sudut merupakan titik pertemuan dari dua garis atau sinar Titik sudut merupakan titik pertemuan dari dua sinar, dua ruas garis, dua garis, ataupun kombinasi dari sinar, r…

Ferdinand von Zeppelin Il conte Ferdinand Adolf Heinrich August von Zeppelin (Costanza, 8 luglio 1838 – Berlino, 8 marzo 1917) è stato un generale e progettista di dirigibili tedesco. Indice 1 Biografia 1.1 La formazione 1.2 Discussione sull'invenzione del dirigibile 1.3 I dirigibili e lo Zeppelin 1.4 La morte 2 Tributi postumi 3 Onorificenze 3.1 Onorificenze tedesche 3.2 Onorificenze straniere 4 Voci correlate 5 Altri progetti 6 Collegamenti esterni Biografia La formazione Figlio del ministr…

Swedish naturalist (1741–1783) L.f. redirects here. For other uses, see Lf. Carl Linnaeus the YoungerCarl von Linné den yngrePortrait by Jonas ForsslundBorn(1741-01-20)20 January 1741Falun, Kopparberg County, SwedenDied1 November 1783(1783-11-01) (aged 42)Uppsala, SwedenOther namesCarolus Linnaeus the YoungerLinnaeus filiusParentsCarl LinnaeusSara Elisabeth MoræaFamilyLinné family Carl Linnaeus the Younger, Carolus Linnaeus the Younger, Carl von Linné den yngre (Swedish; abbrevia…

Low-budget commercial film genre This article is about the film type. For other uses, see B movie (disambiguation). Not to be confused with Bee Movie. Part of a series onB movies Low-budget films Hollywood Golden Age 1950s transition Exploitation boom Since the 1980s Z movie vte The King of the Bs, Roger Corman, produced and directed The Raven (1963) for American International Pictures. Vincent Price headlines a cast of veteran character actors along with a young Jack Nicholson. A B movie (Ameri…

Statistics function For the phase-space function representing a quantum state, see Husimi Q representation. A plot of the Q-function. In statistics, the Q-function is the tail distribution function of the standard normal distribution.[1][2] In other words, Q ( x ) {\displaystyle Q(x)} is the probability that a normal (Gaussian) random variable will obtain a value larger than x {\displaystyle x} standard deviations. Equivalently, Q ( x ) {\displaystyle Q(x)} is the probability tha…

Procurement process E-commerce Digital content Ebook Software Streaming media Retail goods and services Advertising Auctions Banking DVD-by-mail Distribution Food ordering Grocery Marketplace Pharmacy Ride-hailing Travel Online shopping Comparison shopping Social commerce Trading communities Wallet Mobile commerce Payment Ticketing Customer service Call centre Help desk Live support software E-procurement Purchase-to-pay Super-appsvte Purchase-to-pay, often abbreviated to P2P and also called req…

赵友钦割圆术 赵友钦《革象新书》卷五《乾象周髀》篇割圆术书影 赵友钦割圆术是元代数学家赵友钦在所著的《革象新书》卷五《乾象周髀》篇研究的割圆术。与刘徽从内接正六角形开始不同，赵氏割圆术从分割内接正方形开始[1]。 如图，圆的半径为r; 内接正方形的边长为 ℓ {\displaystyle \ell } ,由圆心到正方形一边倒垂直距离为 d d = r 2 − ( ℓ 2 ) 2 {\displaystyle…