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 Cunn, Mr. (Samuel)
 London : printed for Tho. Woodward, at the Half Moon, over against St. Dunstan's Church, in Fleetstreet, MDCCXXV. [1725]
 Description
 Book — 37, [3]p. : ill. ; 8⁰.
 Online

 find.galegroup.com Eighteenth Century Collections Online
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 Carroll, Lewis, 18321898.
 London : Macmillan, 1885 (Oxford : Printed by Horace Hart)
 Description
 Book — 306356 p. ; 19 cm.
 Online
SAL3 (offcampus storage)
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513 .D645S  Inlibrary use 
 Toepell, MichaelMarkus.
 Göttingen : Vandenh. & Ruprecht, c1986.
 Description
 Book — xiii, 293 p. : ill. ; 24 cm.
 Online
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QA681 .H582 1986  Available 
4. New trends in intuitive geometry [2018]
 Berlin, Germany : Springer, [2018]
 Description
 Book — x, 458 pages ; 25 cm.
 Summary

 Introduction. A. Barvinok: The tensorization trick in geometry. K. Bezdek and M. A. Khan: Contact numbers for sphere packings. P. M. Blagojevic, A. S. D. Blagojevic, and G. M. Ziegler: The topological Tverberg theorem plus constraints. B. Csikos: On the volume of Boolean expressions of balls  A review of the KneserPoulsen conjecture. F. de Zeeuw: A survey of ElekesRonyaitype problems. G. Domokos and G. W. Gibbons: The geometry of abrasion. F. M. de Oliveira Filho and F. Vallentin: Computing upper bounds for the packing density of congruent copies of a convex body. P. Hajnal and E. Szemeredi: Two geometrical applications of the semirandom method. A. F. Holmsen: ErdosSzekeres theorems for families of convex sets. R. Kusner, W. Kusner, J. C. Lagarias, and S. Shlosman: Configuration spaces of equal spheres touching a given sphere: the twelve spheres problem. E. Leon and G. M. Ziegler: Spaces of convex npartitions. P. McMullen: New regular compounds of 4polytopes. O. R. Musin, Five Essays on the Geometry of Laszlo Fejes Toth. M. Naszodi: Flavors of translative coverings. M. Sharir and Noam Solomon: Incidences between points and lines in three dimensions. J. Solymosi and F. de Zeeuw: Incidence bounds for complex algebraic curves on Cartesian products. K. J. Swanepoel: Combinatorial distance geometry in normed spaces.
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QA445 .N48 2018  Unknown 
5. Elements of geometry [2017]
 Barnard, S., author.
 London : New Academic Science, [2017]
 Description
 Book — xi, 431 pages ; 24 cm
 Online
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QA445 .B37 2017  Unknown 
6. Geometrical kaleidoscope [2017]
 Pritsker, Boris, author.
 Mineola, New York : Dover Publications, 2017.
 Description
 Book — 1 online resource ( xi, 124 pages) :
 Summary

 Medians, centroid, and center of gravity of a system of points
 Altitudes and the orthocenter of a triangle and some of its properties
 The orthic triangle and some of its properties
 The angle bisector of a triangle and its properties
 The area of a quadrilateral
 The theorem of ratios of the areas of similar polygons
 A pivotal approach: applying rotation in problem solving
 Auxiliary elements in problem solving
 Constructions siblings
 Session of one interesting construction problem
 Morley's theorem.
 Online

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7. Lectures on geometry [2017]
 First Edition.  Oxford, United Kingdom ; New York, NY : Oxford University Press, 2017.
 Description
 Book — vii, 188 pages : illustrations ; 24 cm.
 Summary

This volume contains a collection of papers based on lectures delivered by distinguished mathematicians at Clay Mathematics Institute events over the past few years. It is intended to be the first in an occasional series of volumes of CMI lectures. Although not explicitly linked, the topics in this inaugural volume have a common flavour and a common appeal to all who are interested in recent developments in geometry. They are intended to be accessible to all who work in this general area, regardless of their own particular research interests.
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QA446 .L43 2017  Unknown 
 Kappraff, Jay, author.
 Singapore ; Hackensack, New Jersey : World Scientific, [2015]
 Description
 Book — xvi, 256 pages : illustrations ; 26 cm
 Summary

 The Origin of Geometry in Design A Constructive Approach to the Pythagorean Theorem Lines and Pixels Compass and Straightedge Constructions Congruent Triangles and Trigonometry The Art of Proof Parallel Lines and Bracing of Frameworks Perpendicular Lines and Vornoi Domains Doing Algebra with Geometry Areas, Vectors and Geoboards From Right Triangles to Logarithmic Spirals The Golden and Silver Means Transformational Geometry and Isometries Kaleidoscope and Frieze Symmetry An Introduction to Symmetry Groups Fractals, Isometries and Matrices Thirteen Fundamental Constructions of Projective Geometry.
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QA445 .K3574 2015  Unknown 
 Sibley, Thomas Q., author.
 Washington, DC : The Mathematical Association of America, [2015]
 Description
 Book — xxiii, 559 pages : illustrations ; 26 cm.
 Summary

 Preface
 1. Euclidean geometry
 2. Axiomatic systems
 3. Analytic geometry
 4. NonEuclidean geometries
 5. Transformational geometry
 6. Symmetry
 7. Projective geometry
 8. Finite geometries
 9. Differential geometry
 10. Discrete geometry
 11. Epilogue Appendix A. Definitions, postulates, common notions, and propositions from Book I of Euclid's Elements Appendix B. SMSG axioms for Euclidean geometry Appendix C. Hilbert's axioms for Euclidean plane geometry Appendix D. Linear algebra summary Appendix E. Multivariable calculus summary Appendix F. Elements of proofs Answers to selected exercises Acknowledgements Index.
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QA445 .S543 2015  Unknown 
 CasasAlvero, Eduardo, author.
 Zuerich, Switzerland : European Mathematical Society Publishing House, 2014.
 Description
 Book — 1 online resource (636 pages). Digital: text file; PDF.
 Summary

Projective geometry is concerned with the properties of figures that are invariant by projecting and taking sections. It is considered one of the most beautiful parts of geometry and plays a central role because its specializations cover the whole of the affine, Euclidean and nonEuclidean geometries. The natural extension of projective geometry is projective algebraic geometry, a rich and active field of research. Regarding its applications, results and techniques of projective geometry are today intensively used in computer vision. This book contains a comprehensive presentation of projective geometry, over the real and complex number fields, and its applications to affine and Euclidean geometries. It covers central topics such as linear varieties, cross ratio, duality, projective transformations, quadrics and their classifications – projective, affine and metric –, as well as the more advanced and less usual spaces of quadrics, rational normal curves, line complexes and the classifications of collineations, pencils of quadrics and correlations. Two appendices are devoted to the projective foundations of perspective and to the projective models of plane nonEuclidean geometries. The presentation uses modern language, is based on linear algebra and provides complete proofs. Exercises are proposed at the end of each chapter; many of them are beautiful classical results. The material in this book is suitable for courses on projective geometry for undergraduate students, with a working knowledge of a standard first course on linear algebra. The text is a valuable guide to graduate students and researchers working in areas using or related to projective geometry, such as algebraic geometry and computer vision, and to anyone wishing to gain an advanced view on geometry as a whole.
 Leonard, I. Ed., 1938 author.
 Hoboken, New Jersey : Wiley, [2014]
 Description
 Book — xii, 479 pages : illustrations ; 25 cm
 Summary

 Preface v PART I EUCLIDEAN GEOMETRY
 1 Congruency
 3 1.1 Introduction
 3 1.2 Congruent Figures
 6 1.3 Parallel Lines
 12 1.3.1 Angles in a Triangle
 13 1.3.2 Thales' Theorem
 14 1.3.3 Quadrilaterals
 17 1.4 More About Congruency
 21 1.5 Perpendiculars and Angle Bisectors
 24 1.6 Construction Problems
 28 1.6.1 The Method of Loci
 31 1.7 Solutions to Selected Exercises
 33 1.8 Problems
 38
 2 Concurrency
 41 2.1 Perpendicular Bisectors
 41 2.2 Angle Bisectors
 43 2.3 Altitudes
 46 2.4 Medians
 48 2.5 Construction Problems
 50 2.6 Solutions to the Exercises
 54 2.7 Problems
 56
 3 Similarity
 59 3.1 Similar Triangles
 59 3.2 Parallel Lines and Similarity
 60 3.3 Other Conditions Implying Similarity
 64 3.4 Examples
 67 3.5 Construction Problems
 75 3.6 The Power of a Point
 82 3.7 Solutions to the Exercises
 87 3.8 Problems
 90
 4 Theorems of Ceva and Menelaus
 95 4.1 Directed Distances, Directed Ratios
 95 4.2 The Theorems
 97 4.3 Applications of Ceva's Theorem
 99 4.4 Applications of Menelaus' Theorem
 103 4.5 Proofs of the Theorems
 115 4.6 Extended Versions of the Theorems
 125 4.6.1 Ceva's Theorem in the Extended Plane
 127 4.6.2 Menelaus' Theorem in the Extended Plane
 129 4.7 Problems
 131
 5 Area
 133 5.1 Basic Properties
 133 5.1.1 Areas of Polygons
 134 5.1.2 Finding the Area of Polygons
 138 5.1.3 Areas of Other Shapes
 139 5.2 Applications of the Basic Properties
 140 5.3 Other Formulae for the Area of a Triangle
 147 5.4 Solutions to the Exercises
 153 5.5 Problems
 153
 6 Miscellaneous Topics
 159 6.1 The Three Problems of Antiquity
 159 6.2 Constructing Segments of Specific Lengths
 161 6.3 Construction of Regular Polygons
 166 6.3.1 Construction of the Regular Pentagon
 168 6.3.2 Construction of Other Regular Polygons
 169 6.4 Miquel's Theorem
 171 6.5 Morley's Theorem
 178 6.6 The NinePoint Circle
 185 6.6.1 Special Cases
 188 6.7 The SteinerLehmus Theorem
 193 6.8 The Circle of Apollonius
 197 6.9 Solutions to the Exercises
 200 6.10 Problems
 201 PART II TRANSFORMATIONAL GEOMETRY
 7 The Euclidean Transformations or Isometries
 207 7.1 Rotations, Reflections, and Translations
 207 7.2 Mappings and Transformations
 211 7.2.1 Isometries
 213 7.3 Using Rotations, Reflections, and Translations
 217 7.4 Problems
 227
 8 The Algebra of Isometries
 231 8.1 Basic Algebraic Properties
 231 8.2 Groups of Isometries
 236 8.2.1 Direct and Opposite Isometries
 237 8.3 The Product of Reflections
 241 8.4 Problems
 246
 9 The Product of Direct Isometries
 253 9.1 Angles
 253 9.2 Fixed Points
 255 9.3 The Product of Two Translations
 256 9.4 The Product of a Translation and a Rotation
 257 9.5 The Product of Two Rotations
 260 9.6 Problems
 263
 10 Symmetry and Groups
 269 10.1 More About Groups
 269 10.1.1 Cyclic and Dihedral Groups
 273 10.2 Leonardo's Theorem
 277 10.3 Problems
 281
 11 Homotheties
 287 11.1 The Pantograph
 287 11.2 Some Basic Properties
 288 11.2.1 Circles
 291 11.3 Construction Problems
 293 11.4 Using Homotheties in Proofs
 298 11.5 Dilatation
 302 11.6 Problems
 304
 12 Tessellations
 311 12.1 Tilings
 311 12.2 Monohedral Tilings
 312 12.3 Tiling with Regular Polygons
 317 12.4 Platonic and Archimedean Tilings
 323 12.5 Problems
 330 PART III INVERSIVE AND PROJECTIVE GEOMETRIES
 13 Introduction to Inversive Geometry
 337 13.1 Inversion in the Euclidean Plane
 337 13.2 The Effect of Inversion on Euclidean Properties
 343 13.3 Orthogonal Circles
 351 13.4 CompassOnly Constructions
 360 13.5 Problems
 369
 14 Reciprocation and the Extended Plane
 373 14.1 Harmonic Conjugates
 373 14.2 The Projective Plane and Reciprocation
 383 14.3 Conjugate Points and Lines
 393 14.4 Conics
 399 14.5 Problems
 406
 15 Cross Ratios
 409 15.1 Cross Ratios
 409 15.2 Applications of Cross Ratios
 420 15.3 Problems
 429
 16 Introduction to Projective Geometry
 433 16.1 Straightedge Constructions
 433 16.2 Perspectivities and Projectivities
 443 16.3 Line Perspectivities and Line Projectivities
 448 16.4 Projective Geometry and Fixed Points
 448 16.5 Projecting a Line to Infinity
 451 16.6 The Apollonian Definition of a Conic
 455 16.7 Problems
 461 Bibliography
 464 Index 469.
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QA445 .L46 2014  Unknown 
12. Geometry and its applications [2014]
 Cham : Springer, c2014.
 Description
 Book — x, 243 p. : ill. ; 24 cm.
 Summary

 Part I: Geometry. The Ricci flow on some generalized Wallach spaces (N.A. Abiev, A. Arvanitoyeorgos, Y.G. Nikonorov, P. Siasos). Gaussian mean curvature flow for submanifolds in space forms (A. Borisenko, V. Rovenski). Cantor laminations and exceptional minimal sets in codimension one foliations (G. Hector). Integral formulas in foliations theory (K. Andrzejewski, P. Walczak, V. Rovenski). On prescribing the mixed scalar curvature of a foliations (V. Rovenski, L. Zelenko). The partial Ricci flow for foliations (V. Rovenski). Osculation in general (P. Walczak). On stability of totally geodesic unit vector fields on threedimensional Lie groups (A. Yampolsky). Part II: Applications. Rotational liquid film interacted with ambient gaseous media (I. Gaissinski, Y. Levy, V. Rovenski, V. Sherbaum). On cycles and other geometric phenomena in phase portraits of some nonlinear dynamical systems (V. Golubyatnikov, Yu. A. Gaidov). Remeztype inequality for smooth functions (Y. Iomdin).
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QA445 .G46 2014  Unknown 
13. Large scale geometry [2012]
 Nowak, Piotr W.
 Zürich : European Mathematical Society, c2012.
 Description
 Book — xiv, 189 p. : ill. ; 24 cm.
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QA613 .N68 2012  Unknown 
14. Measurement [2012]
 Lockhart, Paul.
 Cambridge, Mass. : Harvard University Press, 2012.
 Description
 Book — 407 p. : ill. ; 22 cm.
 Summary

 Reality and imagination
 On problems
 Size and shape
 Time and space.
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15. Strasbourg Master Class on Geometry [2012]
 Zürich, Switzerland : European Mathematical Society, [2012].
 Description
 Book — 454 pages : illustrations ; 24 cm
 Summary

 Notes on nonEuclidean geometry / Norbert A'Campo and Athanase Papadopoulos
 Crossroads between hyperbolic geometry and number theory / Françoise Dal'Bo
 Introduction to origamis in Teichmüller space / Frank Herrlich
 Five lectures on 3manifold topology / Philipp Korablev and Sergey Mateev
 An introduction to globally symmetric spaces / Gabriele Link
 Geometry of the representation spaces in SU(2) / Julien Marché
 Algorithmic construction and recognition of hyperbolic 3manifolds, links, and graphs / Carlo Petronio
 An introduction to asymptotic geometry / Viktor Schroeder.
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QA445 .S77 2012  Unknown 
 Reventós i Tarrida, Agustí.
 London ; New York : Springer, c2011.
 Description
 Book — xx, 411 p.
 Online

 dx.doi.org SpringerLink
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17. Geometric methods and applications [electronic resource] : for computer science and engineering [2011]
 Gallier, Jean H.
 2nd ed.  New York : Springer, c2011.
 Description
 Book — xxvii, 680 p.
 Online

 dx.doi.org SpringerLink
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 Shult, Ernest E.
 Berlin ; Heidelberg ; New York : Springer, c2011.
 Description
 Book — xxii, 676 p.
 Online

 dx.doi.org SpringerLink
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 Holme, Audun.
 2nd ed.  Berlin ; Heidelberg : Springer, c2010.
 Description
 Book — 1 online resource (xvii, 519 p.)
 Cobos Gutiérrez, Carlos, author.
 Madrid : Editorial Tébar, 2009.
 Description
 Book — 1 online resource (115 pages)
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