[✵vf✵] Mobius Strip (1999) Streaming Complet VF, Film

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• Date de sortie: 1999-01-01
• Production:
• Genres:
• Synopsis:
• Réalisateur: Joe King
• La langue: No Language – Français
• Pay: United Kingdom
• Durée: 7 Minutes.
• Wiki page: https://en.wikipedia.org/wiki/Mobius Strip

Mobius Strip – Bande annonce

In mathematics, a Möbius strip, Möbius band, or Möbius loop[a] is a surface that can be formed by attaching the ends of a strip of paper together with a half-twist. As a mathematical object, it was discovered by Johann Benedict Listing and August Ferdinand Möbius in 1858, but it had already appeared in Roman mosaics from the third century CE. This mathematical object is called a Mobius strip. It has fascinated environmentalists, artists, engineers, mathematicians and many others ever since its discovery in 1858 by August Möbius, a… En topologie, le ruban de Möbius (aussi appelé bande de Möbius ou boucle de Möbius ou encore anneau de Mœbius) est une surface compacte dont le bord est homéomorphe à un cercle. Autrement dit, il ne possède qu’une seule face (et un seul bord) contrairement à un ruban classique qui en possède deux. The Möbius strip, also called the twisted cylinder, is a one-sided surface with no boundaries. It looks like an infinite loop. Like a normal loop, an ant crawling along it would never reach an end, but in a normal loop, an ant could only crawl along either the top or the bottom. The Möbius strip, also called the twisted cylinder (Henle 1994, p. 110), is a one-sided nonorientable surface obtained by cutting a closed band into a single strip, giving one of the two ends thus produced a half twist, and then reattaching the two ends (right figure; Gray 1997, pp. 322-323). Möbius strip, a one-sided surface that can be constructed by affixing the ends of a rectangular strip after first having given one of the ends a one-half twist. This space exhibits interesting properties, such as having only one side and remaining in one piece when split down the middle. The strip itself is defined simply as a one-sided nonorientable surface that is created by adding one half-twist to a band. Möbius strips can be any band that has an odd number of half-twists, which ultimately cause the strip to only have one side, and consequently, one edge. A Möbius strip is a surface obtained by sewing together two sides of a rectangular strip with a half-twist, or any topologically equivalent surface. Maple program giving an animation of the opposite construction. The Mobius Strip is perhaps the most famous of the one-sided or “non-orientable” surfaces. A Mobius Strip can be found on any non-orientable surfaces. To see one on the Klein Bottle, select from the Settings menu “Set t,u,v Ranges” and put umin = – 0.4, umax = + 0.4 . Möbius strip. A non-orientable surface with Euler characteristic zero whose boundary is a closed curve. The Möbius strip can be obtained by identifying two opposite sides AB and CD of a rectangle ABCD so that the points A and B are matched with the points C and D, respectively (see Fig.).

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