Diagrams (3736 to 3760 of 5537)

Source	Date (min⁠–⁠max)	Aristotelian Family	B.C. (min⁠–⁠max)	Geometric Shape
Was Lewis Carroll an Amazing Oppositional Geometer?, p. 393, by Moretti, Alessio	2014	Subcontrariety 4-clique	4	Triangle
Was Lewis Carroll an Amazing Oppositional Geometer?, p. 393, by Moretti, Alessio	2014	Subcontrariety 4-clique	4	Triangle
Was Lewis Carroll an Amazing Oppositional Geometer?, p. 393, by Moretti, Alessio	2014	Subcontrariety 4-clique	4	Tetrahedron
Was Lewis Carroll an Amazing Oppositional Geometer?, p. 395, by Moretti, Alessio	2014	Classical Sigma-7	4–5	Tetrahedron
Was Lewis Carroll an Amazing Oppositional Geometer?, p. 395, by Moretti, Alessio	2014	Classical Sigma-7	4–5	Tetrahedron
Was Lewis Carroll an Amazing Oppositional Geometer?, p. 395, by Moretti, Alessio	2014	Contrariety 4-clique	4–5	Tetrahedron
Was Lewis Carroll an Amazing Oppositional Geometer?, p. 395, by Moretti, Alessio	2014	Subcontrariety 4-clique	4–5	Tetrahedron
Was Lewis Carroll an Amazing Oppositional Geometer?, p. 392, by Moretti, Alessio	2014	Classical Sigma-2	3	Trapezoid
Was Lewis Carroll an Amazing Oppositional Geometer?, p. 392, by Moretti, Alessio	2014	Classical Sigma-2	3	Trapezoid
Was Lewis Carroll an Amazing Oppositional Geometer?, p. 392, by Moretti, Alessio	2014	Classical Sigma-2	3	Square
Was Lewis Carroll an Amazing Oppositional Geometer?, p. 392, by Moretti, Alessio	2014	Degenerate Sigma-2 with Unconnectedness 4	4	Trapezoid
Was Lewis Carroll an Amazing Oppositional Geometer?, p. 392, by Moretti, Alessio	2014	Degenerate Sigma-2 with Unconnectedness 4	4	Trapezoid
Was Lewis Carroll an Amazing Oppositional Geometer?, p. 392, by Moretti, Alessio	2014	Degenerate Sigma-2 with Unconnectedness 4	4	Square
Was Lewis Carroll an Amazing Oppositional Geometer?, p. 391, by Moretti, Alessio	2014	Classical Sigma-7	4	Triangle
Was Lewis Carroll an Amazing Oppositional Geometer?, p. 391, by Moretti, Alessio	2014	Classical Sigma-7	4	Triangle
Was Lewis Carroll an Amazing Oppositional Geometer?, p. 388, by Moretti, Alessio	2014	Classical Sigma-7	4	Triangle
Was Lewis Carroll an Amazing Oppositional Geometer?, p. 388, by Moretti, Alessio	2014	Classical Sigma-7	4	Triangle
The Structure of Oppositions in Rough Set Theory and Formal Concept Analysis - Toward a New Bridge between the Two Settings, p. 156, by Ciucci, Davide; Dubois, Didier; Prade, Henri	2014	Classical Sigma-2	3	Rectangle
The Structure of Oppositions in Rough Set Theory and Formal Concept Analysis - Toward a New Bridge between the Two Settings, p. 157, by Ciucci, Davide; Dubois, Didier; Prade, Henri	2014	Classical Sigma-2	3	Rectangle
The Structure of Oppositions in Rough Set Theory and Formal Concept Analysis - Toward a New Bridge between the Two Settings, p. 158, by Ciucci, Davide; Dubois, Didier; Prade, Henri	2014	Keynes-Johnson Sigma-4	7	Cube
The Structure of Oppositions in Rough Set Theory and Formal Concept Analysis - Toward a New Bridge between the Two Settings, p. 159, by Ciucci, Davide; Dubois, Didier; Prade, Henri	2014	Keynes-Johnson Sigma-4	7	Cube
The Structure of Oppositions in Rough Set Theory and Formal Concept Analysis - Toward a New Bridge between the Two Settings, p. 160, by Ciucci, Davide; Dubois, Didier; Prade, Henri	2014	Jacoby-Sesmat-Blanché Sigma-3	3	Hexagon
The Structure of Oppositions in Rough Set Theory and Formal Concept Analysis - Toward a New Bridge between the Two Settings, p. 160, by Ciucci, Davide; Dubois, Didier; Prade, Henri	2014	Non-Sigma	7	Hexagon
The Structure of Oppositions in Rough Set Theory and Formal Concept Analysis - Toward a New Bridge between the Two Settings, p. 163, by Ciucci, Davide; Dubois, Didier; Prade, Henri	2014	Keynes-Johnson Sigma-4	7	Cube
The Structure of Oppositions in Rough Set Theory and Formal Concept Analysis - Toward a New Bridge between the Two Settings, p. 164, by Ciucci, Davide; Dubois, Didier; Prade, Henri	2014	Keynes-Johnson Sigma-4	7	Cube