About the Book
Please note that the content of this book primarily consists of articles available from Wikipedia or other free sources online. Pages: 66. Chapters: 2 theorem, Abouabdillah's theorem, Almgren regularity theorem, Anderson's theorem, Barbier's theorem, Beckman-Quarles theorem, Brahmagupta's formula, Brahmagupta theorem, Braikenridge-Maclaurin theorem, Butterfly theorem, Campbell's theorem (geometry), Casey's theorem, Castelnuovo-de Franchis theorem, Circle packing theorem, Clifford's circle theorems, Collage theorem, CPCTC, Crofton formula, Crossbar theorem, Descartes' theorem, Devissage, De Gua's theorem, Dodecahedral conjecture, Double limit theorem, Equichordal point problem, Euler's rotation theorem, Five points determine a conic, Fold-and-cut theorem, Hinge theorem, Hjelmslev's theorem, Holditch's theorem, Hyperbolization theorem, Intercept theorem, Japanese theorem for cyclic polygons, Japanese theorem for cyclic quadrilaterals, Jung's theorem, Lee Hwa Chung theorem, Lickorish-Wallace theorem, Liouville's theorem (conformal mappings), Minkowski problem, Minkowski-Hlawka theorem, Miquel's theorem, Mohr-Mascheroni theorem, Monge's theorem, Mostow rigidity theorem, Mukhopadhyaya theorem, Newton's theorem about ovals, Niven's theorem, Non-squeezing theorem, Pappus's centroid theorem, Pappus's hexagon theorem, Pasch's theorem, Petr-Douglas-Neumann theorem, Pick's theorem, Poncelet-Steiner theorem, Principal axis theorem, Ptolemy's theorem, Riemannian Penrose inequality, Riemann-Roch theorem for smooth manifolds, Saccheri-Legendre theorem, Shapley-Folkman lemma, Six circles theorem, Skoda-El Mir theorem, Soddy's hexlet, Spherical law of cosines, Tameness theorem, Thebault's theorem, Theorema Egregium, Theorem of the cube, Triangle inequality, Ultraparallel theorem, Van Aubel's theorem, Varignon's theorem, Viviani's theorem, Wendel's theorem. Excerpt: The Shapley-Folkman lemma is a result in convex geometry with applications in...
