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У этого термина существуют и другие значения, см. Терни (значения). Населённый пунктТерниTerni Флаг Герб 42°34′ с. ш. 12°39′ в. д.HGЯO Страна  Италия Административный регион Умбрия Провинция Терни Бургомистр Леонардо Латини (с 25-06-2018) История и география Площадь 211,90 к�...

Children's channel in Eastern Europe 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 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: Nickelodeon Russian TV channel – news · newspapers · books · scholar
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Gina HaspelDirektur Central Intelligence Agency ke-7Masa jabatan21 Mei 2018 – 20 Januari 2021PresidenDonald TrumpWakilVaughn BishopPendahuluMike PompeoPenggantiDavid S. Cohen (Pelaksana tugas)William Joseph BurnsWakil DirekturCentral Intelligence Agency ke-6Masa jabatan2 Februari 2017 – 21 Mei 2018PresidenDonald TrumpPendahuluDavid CohenPenggantiVaughn BishopPelaksana tugas DirekturNational Clandestine ServiceMasa jabatan28 Februari 2013 – 7 Mei 2013PresidenBa...

Victoria Muñoz García Información personalNacimiento 1921 Madrid (España) Fallecimiento 5 de agosto de 1939 Madrid (España) Causa de muerte Herida por arma de fuego Sepultura Cementerio de La Almudena Nacionalidad EspañolaInformación profesionalOcupación Activista Miembro de Juventudes Socialistas Unificadas (desde 1936) [editar datos en Wikidata] Victoria Muñoz García (Madrid, 1921 - ibídem, 5 de agosto de 1939) fue una de Las Trece Rosas, mujeres españolas fusilad...

Michael Ballhaus (2007) Michael Ballhaus (* 5. August 1935 in Berlin; † 11. April 2017[1][2][3] ebenda) war ein deutscher Kameramann. Ballhaus gilt als einer der bedeutendsten Kameraleute des deutschen und internationalen Films. Er arbeitete in den 1960er-Jahren beim deutschen Fernsehen und wurde am Ende des Jahrzehnts Stammkameramann von Rainer Werner Fassbinder, mit dem er 15 Filme drehte.[4][5] 1982 ging er in die Vereinigten Staaten, später dort ...

ループ7回目の悪役令嬢は、元敵国で自由気ままな花嫁生活を満喫する ジャンル 異世界ファンタジー、悪役令嬢 小説 著者 雨川透子 イラスト 八美☆わん 出版社 オーバーラップ 掲載サイト 小説家になろう レーベル オーバーラップノベルスf 連載期間 2020年2月7日 - 刊行期間 2020年10月25日 - 巻数 既刊5巻（2023年8月現在） 漫画 原作・原案など 雨川透子（原作）八美☆わん

Cemitério Judaico (Thür)País  AlemanhaLocalização Renânia-Palatinado AlemanhaEstatuto patrimonial monumento histórico na Alemanha (en)Coordenadas 50° 20′ 59″ N, 7° 17′ 09″ Leditar - editar código-fonte - editar Wikidata Cemitério judaico em Thür, vista geral Pedra memorial no cemitério judaico em Thür O Cemitério Judaico de Thür (em alemão: Jüdische Friedhof Thür) é um cemitério judaico em Thür, um município da Alemanha localizado no distrito de M...

هذه المقالة يتيمة إذ تصل إليها مقالات أخرى قليلة جدًا. فضلًا، ساعد بإضافة وصلة إليها في مقالات متعلقة بها. (يونيو 2019) سيسيليا ر. أراغون معلومات شخصية اسم الولادة (بالإنجليزية: Cecilia Rodriguez Aragon)‏  الميلاد سنة 1960 (العمر 62–63 سنة)  مواطنة الولايات المتحدة  الحياة العملية ال

Xuất khẩu vi mạch điện tử theo quốc gia tính đến năm 2016, theo phân loại buôn bán hàng hóa của hệ thống HS-4. Xuất khẩu vật liệu bán dẫn riêng biệt tính đến năm 2016, theo Hệ thống hài hòa mô tả và mã hóa hàng hóa HS-4 của Liên Hợp Quốc Công nghiệp bán dẫn là tập hợp toàn bộ các công ty tham gia vào lĩnh vực thiết kế và chế tạo chất bán dẫn. Ngành công nghiệp này hình thành vào kho

この記事は特に記述がない限り、日本国内の法令について解説しています。また最新の法令改正を反映していない場合があります。ご自身が現実に遭遇した事件については法律関連の専門家にご相談ください。免責事項もお読みください。 航空特殊無線技士英名 Aeronautical Service Special Radio Operator 略称 航空特実施国 日本資格種類 国家資格分野 電気・通信試験形式 マーク

Dennis Anthony TitoKebangsaan Amerika SerikatPekerjaanWirausahawanKarier luar angkasaPeserta pesawat ruang angkasaWaktu di luar angkasa7 hari 22 jam 04 menitMisiSoyuz TM-32, Stasiun Antariksa Internasional, Soyuz TM-31 Dennis Anthony Tito (lahir 8 Agustus 1940) adalah insinyur, multimilyuner, dan tokoh pertama dari Amerika Serikat yang berwisata ke Stasiun Luar Angkasa Internasional dan terbang bersama Soyuz. Perjalanan wisata tersebut berlangsung antara tanggal 28 April-6 Mei 2001. Untu...

Branch of the Ashikaga clan Hachisuka蜂須賀The emblem (mon) of the Hachisuka clanHome provinceOwariMinoParent house Ashikaga clan Shiba clanTitlesVariousFounderShiba Masaaki (Hachisuka Masaaki)Final rulerHachisuka MochiakiCurrent headMasako HachisukaFounding year14th centuryRuled until1871, Abolition of the han system The Hachisuka clan (Japanese: 蜂須賀氏, Hepburn: Hachisuka-shi) are descendants of Emperor Seiwa (850-880) of Japan and are a branch of the Ashikaga clan through the Shib...

Feast day of Saint Martin of Tours St Martin's Day Kermis by Peeter Baltens (16th century), shows peasants celebrating by drinking the first wine of the season, and a horseman representing the saint Saint Martin's Day or Martinmas, (Obsolete: Martlemas[1][2][3]), and historically called Old Halloween or Old Hallowmas Eve,[4][5] is the feast day of Saint Martin of Tours and is celebrated in the liturgical year on 11 November. In the Middle Ages and early...

Norse goddess, wife of Thor For other uses, see Sif (disambiguation). The goddess Sif holds her long, golden hair while grain grows behind her in an illustration from 1897 In Norse mythology, Sif is a golden-haired goddess associated with earth. Sif is attested in the Poetic Edda, compiled in the 13th century from earlier traditional sources, and the Prose Edda, written in the 13th century by Snorri Sturluson, and in the poetry of skalds. In both the Poetic Edda and the Prose Edda, she is kno...

يزيد بن زريع معلومات شخصية اسم الولادة يزيد بن زريع العيشي تاريخ الوفاة 182 هـ الإقامة البصرة اللقب أبو معاوية الديانة الإسلام الحياة العملية التلامذة المشهورون بهز بن أسد  المهنة راو حديث سبب الشهرة محدث البصرة تعديل مصدري - تعديل   أبو معاوية يزيد بن زريع العيشي البصر...

GendarmeryЖандармеријаŽandarmerijaPatch of the Serbian GendarmeryFlag of the Serbian GendarmeryAgency overviewFormed28 June 1860 (current form since 2001)Preceding agencySpecial Police UnitsEmployees2,800 (2017)[1]Jurisdictional structureNational agencySerbiaOperations jurisdictionSerbiaGoverning bodyMinistry of Internal AffairsGeneral natureGendarmerieOperational structureOverviewed byPolice DirectorateHeadquartersBelgradeAgency executiveCol. Dejan Luković, Commander Th...

Membrane receptor protein found in humans TNFRSF1AAvailable structuresPDBOrtholog search: PDBe RCSB List of PDB id codes1EXT, 1FT4, 1ICH, 1NCF, 1TNRIdentifiersAliasesTNFRSF1A, CD120a, FPF, MS5, TBP1, TNF-R, TNF-R-I, TNF-R55, TNFAR, TNFR1, TNFR1-d2, TNFR55, TNFR60, p55, p55-R, p60, tumor necrosis factor receptor superfamily member 1A, TNF receptor superfamily member 1AExternal IDsOMIM: 191190 MGI: 1314884 HomoloGene: 828 GeneCards: TNFRSF1A Gene location (Human)Chr.Chromosome 12 (human)[1&...

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: Risky Business soundtrack – news · newspapers · books · scholar · JSTOR (August 2016) (Learn how and when to remove this template message) 1984 soundtrack album by Various Artists / Tangerine DreamRisky BusinessSoundtrack album by Various Artists /...

Torneo Godó 2008Doppio Sport Tennis Vincitori Bob Bryan Mike Bryan Finalisti Mariusz Fyrstenberg Marcin Matkowski Punteggio 6–3, 6–2 Tornei Singolare Singolare (q)   Doppio Doppio 2007 Voce principale: Torneo Godó 2008. Il doppio del Torneo Godó 2008 è stato un torneo di tennis facente parte dell'ATP Tour. Andrei Pavel e Alexander Waske erano i detentori del titolo, ma quest'anno non hanno partecipato. Bob Bryan e Mike Bryan hanno vinto in finale 6–3, 6–2, contro Mariusz Fyrs...

The Fibonacci word fractal is a fractal curve defined on the plane from the Fibonacci word. Definition The first iterations L-system representation[1] This curve is built iteratively by applying the Odd–Even Drawing rule to the Fibonacci word 0100101001001...: For each digit at position k: Draw a segment forward If the digit is 0: Turn 90° to the left if k is even Turn 90° to the right if k is odd To a Fibonacci word of length F n {\displaystyle F_{n}} (the nth Fibonacci number) i...