Nomor Inter regu putra cabang olahraga Sepak takraw pada Pekan Olahraga Nasional XIX, akan dimulai pada 20 September dan berakhir pada 22 September 2016. Pertandingan akan dilaksanakan di Gedung Sporthall FPOKUPI, Kota Bandung, Jawa Barat.[1] Usia atlet dibatasi untuk yang berusia maksimal dari 27 tahun (kelahiran 1989).
Prosedur kualifikasi sepak takraw PON 2016 adalah sebagai berikut:[1]
Setiap daerah diperbolehkan membawa maksimal 5 atlet.
Seluruh waktu menggunakan Waktu Indonesia Barat (UTC+07:00)
PT Pharos Indonesia Nama dagangPharos GroupJenisPerseroan terbatasPendahuluPharos Indonesia Ltd. (1971-2003)Didirikan30 September 1971; 52 tahun lalu (1971-09-30)PendiriDrs. Eddie LembongKantorpusatJl. Limo No. 40, Permata Hijau, Kebayoran Lama, Jakarta Selatan, IndonesiaPemilikPT Kimia Farma Tbk (56,77%) Masrizal A. Syarief (10,13%) Publik (33,10%)AnakusahaPT Nutrindo Jaya Abadi PT NutriSains PT Prima Medika Laboratories PT Faratu (Pharmed) PT Perintis Pelayan Paripurna (Century Healthcare…
American animated comedy television series CatDogCreated byPeter HannanCreative directorRobert PorterVoices of Jim Cummings Tom Kenny Carlos Alazraqui Maria Bamford Billy West Nika Futterman John Kassir Dwight Schultz Laraine Newman Theme music composerPeter HannanOpening themeCatDog Theme SongEnding themeCatDog Ending Theme SongComposerDenis M. HanniganCountry of originUnited StatesOriginal languageEnglishNo. of seasons4No. of episodes68 (134 segments)66 aired2 unaired (list of episodes)Product…
Satu-satunya reruntuhan yang dibiarkan setelah Pengeboman Guernica dari udara oleh Legiun Kondor dari Luftwaffe Jerman Nazi (1937). Berkas:Frampol bombing.jpgFrampol sebelum (kiri) dan setelah (kanan) serbuan pengeboman Luftwaffe Jerman pada September 1939 pada awal Perang Dunia II (kota tersebut hampir hancur seutuhnya).[1] Reruntuhan kota Jerman Wesel setelah pengeboman area Sekutu intensif pada tahun 1945 menjelang akhir Perang Dunia II (persentase kehancuran 97% dari seluruh bangunan…
Ilustrasi arus konveksi mantel. Konveksi mantel atau arus konveksi mantel adalah proses sirkulasi arus magma di bawah bumi saat mentransfer panas inti ke litosfer sehingga lapisan-lapisan di kerak bumi mengalami pergerakkan.[1][2] Mantel dipanaskan dari bawah, didinginkan di atas atas, dan suhu keseluruhannya menurun dalam jangka waktu yang lama. Gaya konveksi mantel ini ditimbulkan karena adanya tekanan panas yang diciptakan oleh peluruhan radioaktif pada inti Bumi serta panas y…
Artikel ini memiliki beberapa masalah. Tolong bantu memperbaikinya atau diskusikan masalah-masalah ini di halaman pembicaraannya. (Pelajari bagaimana dan kapan saat yang tepat untuk menghapus templat pesan ini) Artikel ini berisi konten yang ditulis dengan gaya sebuah iklan. Bantulah memperbaiki artikel ini dengan menghapus konten yang dianggap sebagai spam dan pranala luar yang tidak sesuai, dan tambahkan konten ensiklopedis yang ditulis dari sudut pandang netral dan sesuai dengan kebijakan Wik…
Official currency of the United States of America USD redirects here. For other uses, see USD (disambiguation). United States dollarOne-dollar bill (obverse)ISO 4217CodeUSD (numeric: 840)Subunit0.01UnitSymbol$, US$, U$Nickname List Ace, bean, bill, bone, buck, deuce, dub, ducat, doubloon, fin, frog, greenback, large, simoleons, skins, smackeroo, smackers, spondulix, Tom, yard, and eagle Plural:dead presidents, green, bones, clams Based on denomination:Washingtons, Jeffersons, Lincoln…
Бахадур-шах Iперс. بهادرشاه یکم Ім'я при народженні Кутб-уд-дін Мухаммад МуаззамПсевдо Шах Алам IНародився 14 жовтня 1643(1643-10-14)БурханпурПомер 27 лютого 1712(1712-02-27) (68 років)ЛахорПоховання Tomb complex at Mehrauli Dargahd і Moti MasjiddКраїна Імперія Великих МоголівДіяльність монархТиту
Координати: 56°52′40″ пн. ш. 60°36′42″ сх. д. / 56.87778° пн. ш. 60.61167° сх. д. / 56.87778; 60.61167 У Вікіпедії є статті про інші значення цього терміна: Машинобудівників (станція метро). Машинобудівників Єкатеринбурзький метрополітен Платформа станціїЗагальн
Опис файлу Обґрунтування добропорядного використання не вказано назву статті [?] Опис обкладинка альбому Грім в ковальні Бога Джерело http://www.ex.ua/76527153 Мета використання проілюструвати статтю про альбом Замінність немає вільної заміни Обсяг використаного матеріалу зо
Distinct activity Skimming stones redirects here. For the music album, see Skipping Stone. A stone skimming across the water Stone skipping in slow motion Stone skipping and stone skimming are considered related but distinct activities: both refer to the art of throwing a flat stone across the water in such a way (usually sidearm) that it bounces off the surface. The objective of skipping is to see how many times a stone can bounce before it sinks into the water; the objective of skimming is to …
Vivian SilverLahir(1949-02-02)2 Februari 1949Winnipeg, Manitoba, KanadaMeninggal7 Oktober 2023 (usia 74)Be'eri, IsraelSebab meninggalPembantaian Be'eriTempat kerjaInstitut Strategi Perdamaian dan Pembangunan Negev (1998–2014)OrganisasiWomen Wage PeaceDikenal atasAktivisme perdamaianAnak2 Vivian Silver (Ibrani: ויויאן סילבר) (2 Februari 1949 – 7 Oktober 2023) adalah seorang pegiat perdamaian dan hak-hak perempuan Kanada-Israel.[1] Ia tewas dalam pemba…
Spartacus who appears as a character in the 1958 ballet Spartacus by Aram Khachaturian This is a list of historical figures who have been characters in ballets. List of historical figures Contents A B C D E F G H I J K L M N O P Q R S T U V W X Y Z A Hans Christian Andersen, Danish author Lera Auerbach: The Little Mermaid (as the Poet) Anna Anderson, impostor of Grand Duchess Anastasia Nikolaevna of Russia Ballet to music by Bohuslav Martinů, Pyotr Ilyich Tchaikovsky: Anastasia Andrew II of Hun…
Taiwan bubble tea chain 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. (February 2020) (Learn how and when to remove this template message) This article needs additional citations for verification. Please help improve this article by adding citations to reliable sources. Unsourced material may be challenged and rem…
For Australian politician, see David MacGibbon (Australian politician). David MacGibbon (2 April 1831 – 20 February 1902) and Thomas Ross (10 November 1839 – 4 December 1930) were Scottish architects. Their practice, MacGibbon and Ross was established in 1872 and continued until 1914. They are best known today for their comprehensive published surveys of Scotland's architectural heritage. David MacGibbon David MacGibbonBorn2 April 1831EdinburghDied20 February 1902NationalityScottishOccupatio…
هذه المقالة يتيمة إذ تصل إليها مقالات أخرى قليلة جدًا. فضلًا، ساعد بإضافة وصلة إليها في مقالات متعلقة بها. (يونيو 2017) اضغط هنا للاطلاع على كيفية قراءة التصنيف بط صفار أسود المنقار حالة الحفظ أنواع قريبة من خطر الانقراض[1] المرتبة التصنيفية نوع[2][3] التصنيف العلم…
Look up -ly in Wiktionary, the free dictionary. Part of a series onEnglish grammar MorphologyPluralsPrefixes (in English)Suffixes (frequentative) Word typesAcronymsAdjectivesAdverbs (flat)ArticlesCoordinatorsCompoundsDemonstrativesDeterminers (List here)ExpletivesIntensifierInterjectionsInterrogativesNounsPortmanteausPossessivesPrepositions (List here)Pronouns (case · person)SubordinatorsVerbs VerbsAuxiliary verbsMood (conditional · imperative · subjunctive)Aspect (continuous · habitual · p…
Governing body of association football in Chinese Taipei Chinese Taipei Football AssociationAFCFounded1924 (as former Republic of China)Headquarters2F., No. 730, Zhongyang Rd., Xinzhuang Dist., New Taipei City 242030 Taiwan (Chinese Taipei)FIFA affiliation1954AFC affiliation1954EAFF affiliation2002PresidentCheng Wen-tsanWebsitectfa.com.tw Chinese Taipei Football AssociationTraditional Chinese中華民國足球協會TranscriptionsStandard MandarinHanyu PinyinZhōnghuá Mínguó Zúqiú Xiéh…
The homotopy principle generalizes such results as Smale's proof of sphere eversion. In mathematics, the homotopy principle (or h-principle) is a very general way to solve partial differential equations (PDEs), and more generally partial differential relations (PDRs). The h-principle is good for underdetermined PDEs or PDRs, such as the immersion problem, isometric immersion problem, fluid dynamics, and other areas. The theory was started by Yakov Eliashberg, Mikhail Gromov and Anthony V. Philli…
Canadians with Icelandic ancestry or were born in Iceland Icelandic Canadians íslensk-kanadísk(ur)Total population101,795 (by ancestry),[1] 0.3% of Canada's populationRegions with significant populations Canada Manitoba31,090 British Columbia26,410 Alberta20,225 Ontario13,215LanguagesCanadian English · Canadian French · IcelandicReligionChristianity (Predominantly Protestant)Related ethnic groupsIcelandic AmericansFaroese Canadians N…
Whangape HarbourWhangape (Māori)Whangape HarbourWhangape HarbourWhangape Harbour is in the Northland Region of New ZealandLocationNorthland, New ZealandCoordinates35°21′0″S 173°14′0″E / 35.35000°S 173.23333°E / -35.35000; 173.23333Primary inflowsAwaroa River and Rotokakahi RiverPrimary outflowsTasman SeaSettlementsWhangape, Pawarenga Whangape Harbour (Māori: Whangapē) is a harbour on the west coast of Northland, New Zealand. There is a settlement calle…
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