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Halaman ini berisi artikel tentang the original Sanskrit version by Valmiki. Untuk kegunaan lain, lihat Ramayana (disambiguasi). RamayanaRama dan istrinya Sita bersama saudaranya Lakshmana ketika pembuangan ke hutan, manuskrip, diperkirakan tahun 1780.InformasiAgamaHinduismPenulisValmikiBahasaSanskritAyat24,000 Bagian dari seriAgama Hindu Umat Sejarah Topik Sejarah Mitologi Kosmologi Dewa-Dewi Keyakinan Brahman Atman Karmaphala Samsara Moksa Ahimsa Purushartha Maya Filsafat Samkhya Yoga Mimam...

العلاقات الإندونيسية البليزية إندونيسيا بليز   إندونيسيا   بليز تعديل مصدري - تعديل   العلاقات الإندونيسية البليزية هي العلاقات الثنائية التي تجمع بين إندونيسيا وبليز.[1][2][3][4][5] مقارنة بين البلدين هذه مقارنة عامة ومرجعية للدولتين: وجه الم...

HatraالحضرReruntuhan HatraLokasi di IrakLokasiKegubernuran Ninawa, IrakWilayahMesopotamiaKoordinat35°35′17″N 42°43′6″E / 35.58806°N 42.71833°E / 35.58806; 42.71833Koordinat: 35°35′17″N 42°43′6″E / 35.58806°N 42.71833°E / 35.58806; 42.71833SejarahPendiriKekaisaran SeleukiaDidirikanAbad ke-2 atau ke-3 SMDitinggalkan241 MPeriodeKekaisaran Seleukia sampai Kekaisaran Parthia Situs Warisan Dunia UNESCONama resmi: HatraJeni...

Fabio Quagliarella Quagliarella saat bermain untuk Torino pada tahun 2015Informasi pribadiNama lengkap Fabio Quagliarella[1]Tanggal lahir 31 Januari 1983 (umur 41)[2]Tempat lahir Castellammare di Stabia, ItaliaTinggi 1,80 m (5 ft 11 in)[2]Posisi bermain PenyerangKarier junior1988–1991 Annunziatella1991–1993 Pro Juventude1993–1997 Gragnano1997–1999 TorinoKarier senior*Tahun Tim Tampil (Gol)1999–2005 Torino 39 (7)2002–2003 → Fiorentina ...

Ahmad Shah BahadurKaisar MughalKaisar Mughal Ahmad Shah Bahadur, menerapkan keterampilan handalnya, dalam bidang berburu pada 1750.Kaisar Mughal ke-13Berkuasa29 April 1748 – 2 Juni 1754Penobatan4 Mei 1748 di Benteng Merah, DelhiPendahuluMuhammad ShahPenerusAlamgir IIWaliNawab BahadurInformasi pribadiKelahiran23 Desember 1725Delhi, Kekaisaran MughalKematian1 Januari 1775(1775-01-01) (umur 49)Delhi, Kekaisaran MughalPemakamanMausoleum Mariam Makani, DelhiWangsaTimuriyahNama lengkapAbu-Na...

Warner Bros. theatrical cartoon character Fictional character FoxyMerrie Melodies characterFoxy on the Merrie Melodies title card in 1931First appearanceLady, Play Your Mandolin! (1931)Last appearanceTwo-Tone Town (1992)Created byRudolf IsingVoiced byJohnny Murray (1931)Rob Paulsen (1992)In-universe informationSpeciesFoxGenderMale Foxy is an animated cartoon character featured in the first three animated shorts in the Merrie Melodies series, all distributed by Warner Bros. in 1931.[1]...

لا يزال النص الموجود في هذه الصفحة في مرحلة الترجمة من الفرنسية إلى العربية. إذا كنت تعرف اللغة الفرنسية، لا تتردد في الترجمة. (أبريل 2019) الحُمَر[1] أو البتومين هو مادة موجودة بشكل طبيعي في البيئة أو يمكن تصنيعها صناعيا بعد تقطير بعض الزيوت الخام. وهي تتكون من خليط من الهي...

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...

Peta infrastruktur dan tata guna lahan di Komune Houilles.  = Kawasan perkotaan  = Lahan subur  = Padang rumput  = Lahan pertanaman campuran  = Hutan  = Vegetasi perdu  = Lahan basah  = Anak sungaiHouillesNegaraPrancisArondisemenSaint-Germain-en-LayeKantonHouillesAntarkomuneCommunautéde communesde la Boucle de la SeineKode INSEE/pos78311 /  Houilles merupakan sebuah komune di pinggiran baratlaut Paris, Prancis. Terletak 14.2 km (8.8 mil) dari...

Aquatics complex in Budapest, Hungary Danube Arena (Duna Aréna)Dagály Budapest Aquatics ComplexLocationBudapest, HungaryCoordinates47°32′27″N 19°3′44″E / 47.54083°N 19.06222°E / 47.54083; 19.06222Capacity5,000 (permanent) and 8,000 (temporary)(13,000 total)ConstructionBroke groundMay 2015BuiltFebruary 2017ArchitectMarcell Ferenc The Danube Arena[1] (in Hungarian: Duna Aréna, unofficially Dagály Budapest Aquatics Complex) is an aquatics complex l...

Aquatic animal phylum having cnydocytes CnidariaTemporal range: 580–0 Ma PreꞒ Ꞓ O S D C P T J K Pg N Ediacaran–Present Four examples of cnidaria (clockwise, from top left): A jellyfish Chrysaora melanaster A gorgonian Annella mollis A sea anemone Nemanthus annamensis A stony coral Acropora cervicornis Scientific classification Domain: Eukaryota Kingdom: Animalia Subkingdom: Eumetazoa Clade: ParaHoxozoa Phylum: CnidariaHatschek, 1888 Subphyla and classes[3] Subphylum Antho...

Cable assembly containing one or more optical fibers that are used to carry light A TOSLINK optical fiber cable with a clear jacket. These cables are used mainly for digital audio connections between devices. A fiber-optic cable, also known as an optical-fiber cable, is an assembly similar to an electrical cable but containing one or more optical fibers that are used to carry light. The optical fiber elements are typically individually coated with plastic layers and contained in a protective ...

Moon of Neptune PsamatheDiscovery images of Psamathe by the Subaru Telescope in 2003Discovery[1][2]Discovered byScott S. SheppardDavid C. JewittJ. KleynaDiscovery date19 August 2003DesignationsDesignationNeptune XPronunciation/ˈsæməθiː/Named afterΨαμάθη PsamathēAlternative namesS/2003 N 1AdjectivesPsamathean /sæməˈθiːən/Orbital characteristicsEpoch 1 January 2000 (Proper orbital element)Observation arc20.97 yr (7,660 days)[3]Mean anomaly183....

United States historic placeChinese Tong Houses of Maui Island TRU.S. National Register of Historic PlacesHawaiʻi Register of Historic Places LocationMaui, HawaiiBuiltvariousArchitectvariousArchitectural stylenot listed/variousNRHP reference No.82000173, under the Chinese Tong Houses of Maui Island TR[1]HRHP No.50-50-10-01615[2]Significant datesAdded to NRHPNovember 15, 1982Designated HRHPJune 30, 1982 At their peak, there were six Chinese Society Ha...

Approximation technique in integral calculus Four of the methods for approximating the area under curves. Left and right methods make the approximation using the right and left endpoints of each subinterval, respectively. Upper and lower methods make the approximation using the largest and smallest endpoint values of each subinterval, respectively. The values of the sums converge as the subintervals halve from top-left to bottom-right. In mathematics, a Riemann sum is a certain kind of approx...

Commune in Occitania, FranceFormiguèresCommuneThe church of Sainte-Marie, in Formiguères Coat of armsLocation of Formiguères FormiguèresShow map of FranceFormiguèresShow map of OccitanieCoordinates: 42°36′56″N 2°06′09″E / 42.6156°N 2.1025°E / 42.6156; 2.1025CountryFranceRegionOccitaniaDepartmentPyrénées-OrientalesArrondissementPradesCantonLes Pyrénées catalanesGovernment • Mayor (2020–2026) Philippe Petitqueux[1]Area146.88...

National Hockey League season Sports season1999–2000 NHL seasonMillennium patch celebrating the year 2000LeagueNational Hockey LeagueSportIce hockeyDurationOctober 1, 1999 – June 10, 2000Number of games82Number of teams28TV partner(s)CBC, CTV Sportsnet, SRC (Canada)ESPN/ABC (United States)DraftTop draft pickPatrik StefanPicked byAtlanta ThrashersRegular seasonPresidents' TrophySt. Louis BluesSeason MVPChris Pronger (Blues)Top scorerJaromir Jagr (Penguins)PlayoffsPlayoffs MVPScott Stevens ...

A style of helmet known as top in India. This top came from the Deccan region. Kulah Khuds (Persian: کلاه خود; also known as top in India and devil masks[1] among English speaking arms collectors) were used in ancient western Asia for battle and as decorative head pieces.[2] Form and origin Khula Khud helmets originated in Central Asia and Turkestan,[3] they were worn by Persian Empire soldiers in the eighteenth and nineteenth centuries.[4] Made of steel...

British electrical engineering company This article's lead section may be too short to adequately summarize the key points. Please consider expanding the lead to provide an accessible overview of all important aspects of the article. (October 2023) FerrantiCompany typePublicIndustryElectronics & DefenceFounded1882 (as Ferranti, Thompson and Ince); 1885 (as S.Z. de Ferranti); 1901 (as Ferranti Ltd)DefunctBankrupt 1993 (the Belgian subsidiary lives on as Ferranti Computer Systems and as of ...

Type of organic molecule with a linear structure In chemistry, an open-chain compound (or open chain compound) or acyclic compound (Greek prefix α 'without' and κύκλος 'cycle') is a compound with a linear structure, rather than a cyclic one.[1] An open-chain compound having no side groups is called a straight-chain compound (also spelled as straight chain compound).[2][3] Many of the simple molecules of organic chemistry, such as the alkanes and alkenes, have bo...