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Erbach Palace
image:20206021 Erbach-3.tif, Main building image:SchlossErbach2-2.jpg, The palace in 1623 image:Schloss Erbach Bergfried.jpg, The keep of the palace image:Erbach odenwald schloss 4.jpg, The archives building Erbach Palace is a palace in Erbach im Odenwald and the seat of the Count of Erbach. It was originally built in the Middle Ages, but most of the buildings today date back to the early 18th century. The palace houses the extensive antique collection of Franz, Count of Erbach-Erbach. History The oldest historical record about the building was from the 12th century. The rulers of Erbach, probably Count Gerhard I, built the first castle in the 13th century.Weber, ''Bilder aus der Geschichte unserer Kreisstadt Erbach'', S. 17 Between 1500 and 1530, the castle was rebuilt in the Renaissance style. The County of Erbach became an Imperial state within the Franconian Circle in 1532. Erbach-Breuberg partitioned from Erbach in 1647. In 1717 Erbach was divided into Erbach-Erbach, Erbach- ... [...More Info...] [...Related Items...] OR: [Wikipedia] [Google] [Baidu] |
20206021 Erbach-3
6 (six) is the natural number following 5 and preceding 7. It is a composite number and the smallest perfect number. In mathematics Six is the smallest positive integer which is neither a square number nor a prime number; it is the second smallest composite number, behind 4; its proper divisors are , and . Since 6 equals the sum of its proper divisors, it is a perfect number; 6 is the smallest of the perfect numbers. It is also the smallest Granville number, or \mathcal-perfect number. As a perfect number: *6 is related to the Mersenne prime 3, since . (The next perfect number is 28 (number), 28.) *6 is the only even perfect number that is not the sum of successive odd cubes. *6 is the root of the 6-aliquot tree, and is itself the aliquot sum of only one other number; the square number, . Six is the only number that is both the sum and the product of three consecutive positive numbers. Unrelated to 6's being a perfect number, a Golomb ruler of length 6 is a "perfect ruler". Si ... [...More Info...] [...Related Items...] OR: [Wikipedia] [Google] [Baidu] |
