Ljubomir Nenadović
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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: List of Mexican films of 1949 – news · newspapers · books · scholar · JSTOR (June 2019) (Learn how and when to remove this template message) This film-related list is incomplete; you can help by adding missing items. (August 2008) Cinema of Mexico List of Mexican …
Liberi e Uguali LeaderPietro Grasso(2017 - 2019) Stato Italia SedeVia Giuseppe Zanardelli, 34Roma AbbreviazioneLeU Fondazione3 dicembre 2017 (Come lista elettorale)9 aprile 2018 (Come gruppo parlamentare) Dissoluzione15 novembre 2018 (Come lista elettorale)12 ottobre 2022 (Come gruppo parlamentare) Confluito in Alleanza Verdi e Sinistra (Sinistra Italiana, Possibile, Verdi del Sudtirolo/Alto Adige) Partito Democratico (Articolo Uno, èViva) IdeologiaSocialdemocrazia[1]Soci…
Le frappeur désigné (anglais designated hitter, abrégé en DH), parfois appelé frappeur de choix[1],[2],[3], est, dans la terminologie du baseball, un joueur designė avant la rencontre pour remplacer le lanceur lors de son tour de batte. Il est habituellement choisi pour la qualité de sa frappe. Ce rôle est aussi souvent assigné à un joueur ayant des lacunes en défensives, puisque le frappeur désigné n'occupe aucune position sur le terrain. Ce frappeur est désigné en début de renc…
This article is about the mercuric salt. For the mercurous salt, see mercury(I) sulfide. Mercury sulfide Names IUPAC name Mercury sulfide Other names CinnabarVermilion Identifiers CAS Number 1344-48-5 Y 3D model (JSmol) Interactive image ECHA InfoCard 100.014.270 EC Number 215-696-3 PubChem CID 62402 UNII ZI0T668SF1 Y UN number 2025 CompTox Dashboard (EPA) DTXSID0047747 InChI InChI=1S/Hg.SKey: QXKXDIKCIPXUPL-UHFFFAOYSA-N SMILES [S]=[Hg] Properties Chemical formula HgS Molar …
Govind Narain Gubernur Karnataka 8Masa jabatan2 Agustus 1977 – 15 April 1983PendahuluUma Shankar DikshitPenggantiA. N. Banerji Informasi pribadiLahir(1916-05-05)5 Mei 1916Mainpuri, British RajMeninggal3 April 2012(2012-04-03) (umur 95)New Delhi, IndiaSunting kotak info • L • B Govind Narain, ICS (5 Mei 1916 – 3 April 2012) adalah seorang pegawai sipil India. Ia merupakan anggota Imperial Civil Service dan menjabat sebagai Gubernur Karnataka ke-8.…
American rock band (1965–1995) This article is about the rock band. For the folktale, see Grateful dead (folklore). For other uses, see Grateful dead (disambiguation). Grateful DeadA promotional photo of Grateful Dead in 1970. Left to right: Bill Kreutzmann, Ron McKernan, Jerry Garcia, Bob Weir, Mickey Hart, and Phil Lesh.Background informationAlso known asThe WarlocksOriginPalo Alto, California, U.S.GenresRockDiscographyGrateful Dead discographyYears active1965–1995Labels Warner Bros. Grate…
You can help expand this article with text translated from the corresponding article in Italian. (January 2024) Click [show] for important translation instructions. View a machine-translated version of the Italian article. Machine translation, like DeepL or Google Translate, is a useful starting point for translations, but translators must revise errors as necessary and confirm that the translation is accurate, rather than simply copy-pasting machine-translated text into the English Wikiped…
Questa voce o sezione sull'argomento gruppi musicali statunitensi non cita le fonti necessarie o quelle presenti sono insufficienti. Puoi migliorare questa voce aggiungendo citazioni da fonti attendibili secondo le linee guida sull'uso delle fonti. Segui i suggerimenti del progetto di riferimento. Toxic HolocaustToxic Holocaust nel 2018 Paese d'origine Stati Uniti GenereThrash metal Periodo di attività musicale1999 – in attività EtichettaRelapse Records Album pub…
† Стеллерова корова Муляж стеллеровой коровы в Лондонском музее естествознания Научная классификация Домен:ЭукариотыЦарство:ЖивотныеПодцарство:ЭуметазоиБез ранга:Двусторонне-симметричныеБез ранга:ВторичноротыеТип:ХордовыеПодтип:ПозвоночныеИнфратип:Челюстноро…
The examples and perspective in this article are to narrow. This article needs to discuss Slavic fantasy outside Russia, in other Slavic countries. As long as it is unduly focused on Russia, it may not represent a worldwide view of the subject. You may improve this article are to narrow. This article needs to discuss Slavic fantasy outside Russia, in other Slavic countries. As long as it is unduly focused on Russia, it, discuss the issue on the talk page, or create a new article are to narrow. T…
此條目介紹的是来自威斯康星州的美国参议员(1947–57)。关于其他叫麦卡锡的人,请见「麦卡锡」。 本條目存在以下問題,請協助改善本條目或在討論頁針對議題發表看法。 此條目需要补充更多来源。 (2018年11月7日)请协助補充多方面可靠来源以改善这篇条目,无法查证的内容可能會因為异议提出而被移除。致使用者:请搜索一下条目的标题(来源搜索:约瑟夫·雷蒙…
此條目可能包含不适用或被曲解的引用资料,部分内容的准确性无法被证實。 (2023年1月5日)请协助校核其中的错误以改善这篇条目。详情请参见条目的讨论页。 各国相关 主題列表 索引 国内生产总值 石油储量 国防预算 武装部队(军事) 官方语言 人口統計 人口密度 生育率 出生率 死亡率 自杀率 谋杀率 失业率 储蓄率 识字率 出口额 进口额 煤产量 发电量 监禁率 死刑 国债 外…
District in Northwest, VietnamSốp Cộp District Huyện Sốp CộpDistrictCountry VietnamRegionNorthwestProvinceSơn LaCapitalSốp CộpArea • Total570 sq mi (1,477 km2)Population (2003) • Total32,253Time zoneUTC+7 (UTC + 7) Sốp Cộp is a rural district of Sơn La province in the Northwest region of Vietnam. It was established in December 2003. As of 2003, the district had a population of 32,253.[1] The district covers an area of 1…
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…
Anglican bishop and railway photographer (1907–1978) The Right ReverendEric TreacyMBEBishop of WakefieldAt Christ Church Halifax in 1971, after a weddingChurchChurch of EnglandDioceseDiocese of WakefieldIn office1968 to 1976PredecessorJohn RamsbothamSuccessorColin JamesOther post(s)Bishop of Pontefract (1961–1968) Archdeacon of Halifax (1949–1961)OrdersOrdination1932 (deacon) c. 1933 (priest)Consecration1961Personal detailsBorn(1907-05-02)2 May 1907London, EnglandDied13 May 1978(1978-05-13…
French artist (1610–1696) Louise MoillonBornLouise Moillon1610Paris, FranceDied1696Paris, FranceNationalityFrenchKnown forPaintingMovementBaroqueSpouseEtienne Girardot Louise Moillon (1610–1696) was a French still life painter in the Baroque era.[1] It is recorded that she became known as one of the best still life painters of her time, as her work was purchased by King Charles I of England, as well as French nobility.[2] Louise Moillon is also known for her Flemish styl…
Cleaning the mouth by brushing the teeth and cleaning in between the teeth Proper oral hygiene requires regular brushing and interdental cleaning Oral hygiene is the practice of keeping one's oral cavity clean and free of disease and other problems (e.g. bad breath) by regular brushing of the teeth (dental hygiene) and adopting good hygiene habits. It is important that oral hygiene be carried out on a regular basis to enable prevention of dental disease and bad breath. The most common types of d…
Seija MusōSampul novel ringan volume pertama聖者無双(Seija Musō)GenreIsekai, penggalan kehidupan[1] Seri novelPengarangBroccoli LionPenerbitShōsetsuka ni NarōTerbit17 Oktober 2015 – 28 Februari 2022 Novel ringanPengarangBroccoli LionIlustratorSimePenerbitMicro MagazinePenerbit bahasa InggrisNA J-Novel ClubImprintGC NovelsDemografiMaleTerbit30 Agustus 2016 – sekarangVolume11 MangaPengarangBroccoli LionIlustratorHiiro AkikazePenerbitKodanshaPenerbit bahasa InggrisNA VerticalMaj…
Space agency; public institution with extrabudgetary funding This article has multiple issues. Please help improve it or discuss these issues on the talk page. (Learn how and when to remove these template messages) This article contains content that is written like an advertisement. Please help improve it by removing promotional content and inappropriate external links, and by adding encyclopedic content written from a neutral point of view. (July 2014) (Learn how and when to remove this message…
Set of real numbers that is not Lebesgue measurable In mathematics, a Vitali set is an elementary example of a set of real numbers that is not Lebesgue measurable, found by Giuseppe Vitali in 1905.[1] The Vitali theorem is the existence theorem that there are such sets. Each Vitali set is uncountable, and there are uncountably many Vitali sets. The proof of their existence depends on the axiom of choice. Measurable sets Certain sets have a definite 'length' or 'mass'. For instance, the i…