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Platonic Solid Question (1 Viewer)

dionb2014

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When I was in year 8 I somehow devised this rule that drew the relationship between sides, vertices and faces or something like that of all of the platonic solids.. Obviously I was not the first person to discover a rule like this and I was wondering what it is if any of you guys and girls no. It's just that today my math teacher said he wanted to tell his year 8 class a rule someone worked out last year.
 

dionb2014

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In geometry, a Platonic solid is a convex polyhedron that is regular, in the sense of a regular polygon. Specifically, the faces of a Platonic solid are congruent regular polygons, with the same number of faces meeting at each vertex; thus, all its edges are congruent, as are its vertices and angles.
 

sick_kent

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mate you must be a smart bloke, finding rules and shit in year 8.
it will be interesting to see your atar in 2014
 

RealiseNothing

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Are you talking about the one which is:

Vertices + faces - edges = 2
 

RivalryofTroll

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I hate anything to do with shapes, surface area or volume xD
 

dionb2014

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My teacher says it will prbably be in one of his powerpoints. I will get back to you guys if I work it out. Thanks for assistance. I don't think it was eulers realisenothing but thanks anyway.
 

Fizzy_Cyst

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Platonic solids are represented by 2 symbols {p,q} where p = number of edges/vertices on each face and q = number of faces meeting at each vertex.

There is a relationship pF = qV = 2E

Could be that one?

Or Euler's
 

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