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Queluz National Palace
The Palace of Queluz (, ) is an 18th-century palace located at Queluz, a city of the Sintra Municipality, in the Lisbon District, on the Portuguese Riviera. One of the last great Rococo buildings to be designed in Europe,Lowndes, p. 179. the palace was conceived as a summer retreat for King Joseph I's brother, Peter of Braganza, later to become husband and king ''jure uxoris'' (as King Peter III) to his own niece, Queen Maria I. It eventually served as a discreet place of incarceration for Maria I, when she became afflicted by severe mental illness in the years following Peter III's death in 1786. Following the destruction of the Palace of Ajuda by fire in 1794, Queluz Palace became the official residence of the Portuguese Prince Regent John, and his family, and remained so until the royal family fled to the Portuguese colony of Brazil following the French invasion of Portugal (1807).IPPAR Work on the palace began in 1747 under Portuguese architect Mateus Vicente de Oliveir ... [...More Info...] [...Related Items...] OR: [Wikipedia] [Google] [Baidu] |
1794 Wurde Der Palast In Queluz Zur Offiziellen Residenz Des Portugiesischen Königshauses
Events January–March * January 1 – The Stibo Group is founded by Niels Lund as a printing company in Aarhus (Denmark). * January 13 – The U.S. Congress enacts a law providing for, effective May 1, 1795, a Flag of the United States#Later flag acts, United States flag of 15 stars and 15 stripes, in recognition of the recent admission of Vermont and Kentucky as the 14th and 15th states. A subsequent act restores the number of stripes to 13, but provides for additional stars upon the admission of each additional state. * January 21 – King George III of Great Britain delivers the speech opening Parliament and recommends a continuation of Britain's war with France. * February 4 – French Revolution: The National Convention of the French First Republic abolishes slavery. * February 8 – Wreck of the Ten Sail on Grand Cayman. * February 11 – The first session of the United States Senate is open to the public. * March 4 – The Eleventh ... [...More Info...] [...Related Items...] OR: [Wikipedia] [Google] [Baidu] |
Versailles
The Palace of Versailles ( ; ) is a former royal residence commissioned by King Louis XIV located in Versailles, Yvelines, Versailles, about west of Paris, in the Yvelines, Yvelines Department of Île-de-France, Île-de-France region in France. The palace is owned by the government of France and since 1995 has been managed, under the direction of the Ministry of Culture (France), French Ministry of Culture, by the Public Establishment of the Palace, Museum and National Estate of Versailles. About 15,000,000 people visit the palace, park, or gardens of Versailles every year, making it one of the most popular tourist attractions in the world. Louis XIII built a hunting lodge at Versailles in 1623. His successor, Louis XIV, expanded the château into a palace that went through several expansions in phases from 1661 to 1715. It was a favourite residence for both kings, and in 1682, Louis XIV moved the seat of his court and government to Versailles, making the palace the ''de fact ... [...More Info...] [...Related Items...] OR: [Wikipedia] [Google] [Baidu] |
Unlinked
In the mathematical field of knot theory, an unlink is a link that is equivalent (under ambient isotopy) to finitely many disjoint circles in the plane. The two-component unlink, consisting of two non-interlinked unknots, is the simplest possible unlink. Properties * An ''n''-component link ''L'' ⊂ S3 is an unlink if and only if there exists ''n'' disjointly embedded discs ''D''''i'' ⊂ S3 such that ''L'' = ∪''i''∂''D''''i''. * A link with one component is an unlink if and only if it is the unknot. * The link group of an ''n''-component unlink is the free group on ''n'' generators, and is used in classifying Brunnian links. Examples * The Hopf link is a simple example of a link with two components that is not an unlink. * The Borromean rings form a link with three components that is not an unlink; however, any two of the rings considered on their own do form a two-component unlink. * Taizo Kanenobu has shown that for all ''n'' &g ... [...More Info...] [...Related Items...] OR: [Wikipedia] [Google] [Baidu] |
