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Tales of the Unexpected (known as Roald Dahl's Tales of the Unexpected for the first two series) is a British television series that aired between 1979 and 1988. [ 1 ] Each episode told a story, often with sinister and wryly comedic undertones, with an unexpected twist ending. [ 2 ] Every episode of series one, twelve episodes of series two ...
episodes. Tales of the Unexpected is a British anthology series, which was broadcast on ITV from 1979 to 1988. Each episode features a dramatised story that has been adapted from the works of several well-known writers, most notably, Roald Dahl. During the course of the programme, 112 episodes of Tales of the Unexpected aired over nine series ...
Euclidean tilings are usually named after Cundy & Rollett’s notation. [1] This notation represents (i) the number of vertices, (ii) the number of polygons around each vertex (arranged clockwise) and (iii) the number of sides to each of those polygons. For example: 3 6; 3 6; 3 4.6, tells us there are 3 vertices with 2 different vertex types ...
Penrose tiling. A Penrose tiling is an example of an aperiodic tiling. Here, a tiling is a covering of the plane by non-overlapping polygons or other shapes, and a tiling is aperiodic if it does not contain arbitrarily large periodic regions or patches. However, despite their lack of translational symmetry, Penrose tilings may have both ...
Pentagonal tiling. The 15th monohedral convex pentagonal type, discovered in 2015. In geometry, a pentagonal tiling is a tiling of the plane where each individual piece is in the shape of a pentagon. A regular pentagonal tiling on the Euclidean plane is impossible because the internal angle of a regular pentagon, 108°, is not a divisor of 360 ...
A set of prototiles is aperiodic if copies of the prototiles can be assembled to create tilings, such that all possible tessellation patterns are non- periodic. The aperiodicity referred to is a property of the particular set of prototiles; the various resulting tilings themselves are just non-periodic. A given set of tiles, in the Euclidean ...