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|bgcolor=#e7dcc3|Family||[[Uniform 2 k1 polytope|2_k1 polytope]] |bgcolor=#e7dcc3|8-face types||'''[[2 41 polytope|2₄₁]]'''[[File:Gosset 2 41 petrie.svg|25px]]<BR>[[8-simplex|{3⁷}]][[Image:8-simplex t0 ...

|bgcolor=#e7dcc3|Family||[[Uniform 1 k2 polytope|1_k2 polytope]] |bgcolor=#e7dcc3|8-face types||'''[[1 42 polytope|1₄₂]]'''[[File:Gosset 1 42 polytope petrie.svg|25px]]<BR>'''[[8-demicube|1₅₁]]'''[[Ima ...

...of its [[Coxeter-Dynkin diagram]]. There are no regular honeycombs in the family since its Coxeter diagram is a nonlinear graph, but there are three simples |bgcolor=#e7dcc3|Family||[[Semiregular k 21 polytope|k₂₁ polytope]] ...

|bgcolor=#e7dcc3|Family||[[Semiregular k 21 polytope|k₂₁ polytope]] |bgcolor=#e7dcc3|Face figure||[[Gosset 2 21 polytope|2₂₁]] [[Image:E6 graph.svg|25px]] ...

...er. He called it an [[Semiregular polytope|6-ic semi-regular figure]].<ref>Gosset, 1900</ref> It is also called the [[Schläfli]] polytope. These polytopes are a part of family of 39 convex [[uniform 6-polytope|uniform polytopes in 6-dimensions]], made ...

These polytopes are part of a family of 255 (2⁸&nbsp;&minus;&nbsp;1) convex [[uniform polytope]]s in |bgcolor=#e7dcc3|Family||[[Uniform 2 k1 polytope|2_k1 polytope]] ...

...1900 paper. He called it an ''8-ic semi-regular figure''.<ref name=gosset>Gosset, 1900</ref> These polytopes are part of a family of 255 = 2⁸&nbsp;&minus;&nbsp;1 convex [[uniform 8-polytope]]s, ...

...7dcc3|Vertex figure||'''[[Gosset 1 22 polytope|1₂₂]]''' [[Image:Gosset 1 22 polytope.svg|25px]] ...identical rings on all 3 branches. There are no regular honeycombs in the family since its Coxeter diagram a nonlinear graph, but the 2₂₂ and [[# ...

Selected regular and uniform 10-polytopes from each family include: # [[Simplex]] family: A₁₀ [3⁹] - {{CDD|node|3|node|3|node|3|node|3|node|3| ...

These polytopes are part of a family of 255 (2⁸&nbsp;&minus;&nbsp;1) convex [[uniform polytope]]s in |bgcolor=#e7dcc3|Family||[[Uniform 1 k2 polytope|1_k2 polytope]] ...

...>]], and [[1 42 polytope|1₄₂]] polytopes from the E₈ family. |colspan=4|[[File:Gosset 1 42 polytope petrie.svg|160px]]<BR>[[1 42 polytope|1₄₂]]<BR>{{C ...

...78-0-8493-3799-4 |pages=229–259}}</ref> It was named after [[William Sealy Gosset|Student]] (1927),<ref name=Student>{{cite journal|author=Student|title=Erro The Newman–Keuls method controls the [[Family-wise error rate|Family-Wise Error Rate]] (FWER) in the weak sense but not the strong sense:<ref na ...

These polytopes are from a family of 39 convex [[uniform 6-polytope|uniform polytopes in 6-dimensions]], made |bgcolor=#e7dcc3|Family||[[Uniform 1 k2 polytope|1_k2 polytope]] ...

...N}</math> and value 0 with the remaining probability. Assume also that the family <math>X_1, X_2, \ldots</math> are [[free independence|freely independent]]. For [[Completeness (statistics)|completeness]], a family of distributions is said to be complete if and only if <math> E(g(T)) = 0</ ...

...n models | publisher = [Chapman & Hall] | isbn = 978-0412997112 }}</ref> a family of probabilistic models that express an inherent power function relationshi ...eedie]], a British statistician and medical physicist, was investigating a family of probabilistic models that are now known as the [[Tweedie distributions]] ...