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* David Brander and Steen Markvorsen: Surfaces with Natural Ridges. In: [[Bridges 2015]]. Pages 379–382 | * David Brander and Steen Markvorsen: Surfaces with Natural Ridges. In: [[Bridges 2015]]. Pages 379–382 | ||
| − | Unexpected Beauty Hidden in Radin-Conway's Pinwheel Tiling | + | * Douglas G. Burkholder: Unexpected Beauty Hidden in Radin-Conway's Pinwheel Tiling. In: [[Bridges 2015]]. Pages 383–386 |
| − | |||
| − | Pages 383–386 | ||
| − | + | * Vi Hart, Andrea Hawksley, Henry Segerman and Marc ten Bosch: Hypernom: Mapping VR Headset Orientation to S3. In: [[Bridges 2015]]. Pages 387–390 | |
| − | Vi Hart, Andrea Hawksley, Henry Segerman and Marc ten Bosch | ||
| − | Pages 387–390 | ||
| − | + | * Sean Jeng Liu, Young Kim, Raymond Shiau and Carlo H. Séquin: Large, Symmetric, “7-Around” Hyperbolic Disks. In: [[Bridges 2015]]. Pages 391–394 | |
| − | Sean Jeng Liu, Young Kim, Raymond Shiau and Carlo H. Séquin | ||
| − | Pages 391–394 | ||
| − | Katzengold: Pyrite, Plato, and a Polynomial | + | * Stephan Klaus and Bianca Violet: Katzengold: Pyrite, Plato, and a Polynomial. In: [[Bridges 2015]]. Pages 395–398 |
| − | |||
| − | Pages 395–398 | ||
| − | Infinite Rhythmic Tiling Canons | + | * Clifton Callender: Infinite Rhythmic Tiling Canons. In: [[Bridges 2015]]. Pages 399–402 |
| − | |||
| − | Pages 399–402 | ||
| − | A Concept Map for Book 1 of Euclid's Elements | + | * Alexander Boxer and Justace Clutter: A Concept Map for Book 1 of Euclid's Elements. In: [[Bridges 2015]]. Pages 403–406 |
| − | |||
| − | Pages 403–406 | ||
| − | A Musical Scale Generated from the Ratio of Consecutive Primes | + | * Reginald Bain: A Musical Scale Generated from the Ratio of Consecutive Primes. In: [[Bridges 2015]]. Pages 407–410 |
| − | |||
| − | Pages 407–410 | ||
| − | Geometric Visual Instruments Having Pinnate Forms | + | * Shunsuke Akimoto and Akihiro Matsuura: Geometric Visual Instruments Having Pinnate Forms. In: [[Bridges 2015]]. Pages 411–414 |
| − | |||
| − | Pages 411–414 | ||
| − | Design Anamorphosis in the Math Class! | + | * Kristóf Fenyvesi and Markus Hähkiöniemi: Design Anamorphosis in the Math Class! In: [[Bridges 2015]]. Pages 415–418 |
| − | |||
| − | Pages 415–418 | ||
| − | Cayley Cubic and the Visual Arts | + | * Jean Constant: Cayley Cubic and the Visual Arts. In: [[Bridges 2015]]. Pages 419–422 |
| − | |||
| − | Pages 419–422 | ||
| − | Fractal Tiling Illustrations of Geometric Series | + | * Lorelei Koss: Fractal Tiling Illustrations of Geometric Series. In: [[Bridges 2015]]. Pages 423–426 |
| − | |||
| − | Pages 423–426 | ||
| − | Nature as a Strategy for Pattern Formation in Art | + | * Irene Rousseau: Nature as a Strategy for Pattern Formation in Art. In: [[Bridges 2015]]. Pages 427–430 |
| − | |||
| − | Pages 427–430 | ||
| − | Monte Carlo Art Using Scratch | + | * Patrick Honner: Monte Carlo Art Using Scratch. In: [[Bridges 2015]]. Pages 431–434 |
| − | |||
| − | Pages 431–434 | ||
| − | The Paradigm Poem | + | * Kazmier Maslanka: The Paradigm Poem. In: [[Bridges 2015]]. Pages 435–438 |
| − | |||
| − | Pages 435–438 | ||
| − | Random Walks on Vertices of Archimedean Tilings | + | * Vincent J. Matsko: Random Walks on Vertices of Archimedean Tilings. In: [[Bridges 2015]]. Pages 439–442 |
| − | |||
| − | Pages 439–442 | ||
| − | Perspectives on Borges' Library of Babel | + | * CJ Fearnley and Jeannie Moberly: Perspectives on Borges' Library of Babel. In: [[Bridges 2015]]. Pages 443–446 |
| − | |||
| − | Pages 443–446 | ||
| − | Geometry in the Pocket | + | * Mehrdad Garousi: Geometry in the Pocket. In: [[Bridges 2015]]. Pages 447–450 |
| − | |||
| − | Pages 447–450 | ||
| − | From Mathematical Curves to Decorative Ornaments | + | * Susan McBurney: From Mathematical Curves to Decorative Ornaments. In: [[Bridges 2015]]. Pages 451–454 |
| − | |||
| − | Pages 451–454 | ||
| − | Building Polyhedra from Polygons with Colored Edges | + | * Ioana Browne and Mircea Draghicescu: Building Polyhedra from Polygons with Colored Edges Pages 455–458 |
| − | |||
| − | Pages 455–458 | ||
| − | Turing Patterns in Photoshop | + | * Andrew Werth: Turing Patterns in Photoshop Pages 459–462 |
| − | |||
| − | Pages 459–462 | ||
| − | Inspire Math-Girls-Women (perhaps with poems) | + | * Jo Anne Growney: Inspire Math-Girls-Women (perhaps with poems) Pages 463–466 |
| − | |||
| − | Pages 463–466 | ||
| − | Emergent Orange | + | * Jim Bumgardner: Emergent Orange Pages 467–470 |
| − | |||
| − | Pages 467–470 | ||
| − | + | * Adam Arstall, Briony Thomas, Reidun Twarock and Emilio Zappa: Expandohedra: Modeling Structural Transitions of a Viral Capsid Pages 471–474 | |
| − | Adam Arstall, Briony Thomas, Reidun Twarock and Emilio Zappa | ||
| − | Pages 471–474 | ||
| − | + | * Paula Burkhardt, Gabriel Currier, Stephan Ramon Garcia, Mathieu de Langis, Bob Lutz and Hong Suh: An Exhibition of Exponential Sums: Visualizing Supercharacters Pages 475–478 | |
| − | Paula Burkhardt, Gabriel Currier, Stephan Ramon Garcia, Mathieu de Langis, Bob Lutz and Hong Suh | ||
| − | Pages 475–478 | ||
| − | + | * Richard Conn Henry, James Overduin and Kielan Wilcomb: A New Way to See Inside Black Holes Pages 479–482 | |
| − | Richard Conn Henry, James Overduin and Kielan Wilcomb | ||
| − | Pages 479–482 | ||
| − | Algorithms for Morphing Escher-Like Tessellations | + | * Kevin Lee: Algorithms for Morphing Escher-Like Tessellations Pages 483–486 |
| − | |||
| − | Pages 483–486 | ||
| − | Theory of Intersection | + | * Karl Kattchee: Theory of Intersection Pages 487–490 |
| − | |||
| − | Pages 487–490 | ||
| − | Schematic Drawings of the Polychora | + | * Taneli Luotoniemi: Schematic Drawings of the Polychora Pages 491–494 |
| − | |||
| − | Pages 491–494 | ||
| − | A Successful Belgian Art & Math Exhibition with Workshops | + | * Gisèle De Meur and Samuel Verbiese: A Successful Belgian Art & Math Exhibition with Workshops Pages 495–498 |
| − | |||
| − | Pages 495–498 | ||
| − | + | * Anusch Bayens, Carlo De Pauw, Carmen Geens, Seniz Karaman, Mark Pieters, André Thomas, Alex Van Bogaert, Samuel Verbiese, Rudi Willaert and Nico Willemsens: Bridges Exhibits as Incentives to Collaborative Artworks Pages 499–502 | |
| − | Anusch Bayens, Carlo De Pauw, Carmen Geens, Seniz Karaman, Mark Pieters, André Thomas, Alex Van Bogaert, Samuel Verbiese, Rudi Willaert and Nico Willemsens | ||
| − | Pages 499–502 | ||
| − | Linguistic Oddities: An Artist Explorer at Mathematics Conferences | + | * Katie McCallum: Linguistic Oddities: An Artist Explorer at Mathematics Conferences Pages 503–506 |
| − | |||
| − | Pages 503–506 | ||
| − | 3D Lenticular Imaging for Art | + | * Yitzhak Weissman: 3D Lenticular Imaging for Art Pages 507–510 |
| − | |||
| − | Pages 507–510 | ||
| − | The Shapes of Our Souls and Other Student Concerns: Poems about the Course “Mathematics in Literature” | + | * Marion Deutsche Cohen: The Shapes of Our Souls and Other Student Concerns: Poems about the Course “Mathematics in Literature” Pages 511–514 |
| − | |||
| − | Pages 511–514 | ||
| − | Into the Shadows: Approximating Images by Orthogonal Projection | + | * Kelly Delp and Sam Lloyd: Into the Shadows: Approximating Images by Orthogonal Projection Pages 515–518 |
| − | |||
| − | Pages 515–518 | ||
| − | Exploring Ratios and Sequences with Mathematically Layered Beverages | + | * Andrea Johanna Hawksley: Exploring Ratios and Sequences with Mathematically Layered Beverages Pages 519–524 |
| − | |||
| − | Pages 519–524 | ||
| − | Math-Infused Art Lessons, Art-Infused Math Lessons | + | * Rachelle Guernsey: Math-Infused Art Lessons, Art-Infused Math Lessons Pages 525–532 |
| − | |||
| − | Pages 525–532 | ||
| − | + | * Eva Knoll, Wendy Landry, Tara Taylor, Paul Carreiro and Susan Gerofsky: The Aesthetics of Scale: Weaving Mathematical Understandings. Pages 533–540 | |
| − | Eva Knoll, Wendy Landry, Tara Taylor, Paul Carreiro and Susan Gerofsky | ||
| − | Pages 533–540 | ||
| − | The Shape Snacker: a Bite of Origami and Math | + | * Alan Russell: The Shape Snacker: a Bite of Origami and Math Pages 541–548 |
| − | |||
| − | Pages 541–548 | ||
| − | Lissajus Curves: an Experiment in Creative Coding | + | * Lali Barrière: Lissajus Curves: an Experiment in Creative Coding Pages 549–554 |
| − | |||
| − | Pages 549–554 | ||
| − | Square Seeds and Round Paths: Exploring Patterns within the Art of Classical Labyrinths | + | * David Thompson and Diana Cheng: Square Seeds and Round Paths: Exploring Patterns within the Art of Classical Labyrinths Pages 555–558 |
| − | |||
| − | Pages 555–558 | ||
| − | Thinking like a Pianist/Mathematician/Potter-Designer: Strategies for Tuning Ocarinas | + | * Elizabeth Paley: Thinking like a Pianist/Mathematician/Potter-Designer: Strategies for Tuning Ocarinas Pages 559–562 |
| − | |||
| − | Pages 559–562 | ||
| − | Use of RangoLee Art in Elementary Mathematics Education | + | * Madhuri Bapat: Use of RangoLee Art in Elementary Mathematics Education Pages 563–566 |
| − | |||
| − | Pages 563–566 | ||
| − | A Workshop Using the Log Cabin Quilt For Teaching Math Concepts and Patterns | + | * Cristina Padlan Packard: A Workshop Using the Log Cabin Quilt For Teaching Math Concepts and Patterns Pages 567–570 |
| − | |||
| − | Pages 567–570 | ||
| − | Composing Mathematical Poetry | + | * Carol Dorf: Composing Mathematical Poetry Pages 571–572 |
| − | |||
| − | Pages 571–572 | ||
| − | Mathematics Through the Lens of a Kaleidoscope: A Student Centered Approach to Building Bridges between Mathematics and Art | + | * Gail Kaplan, Rachael Gross and Kim McComas: Mathematics Through the Lens of a Kaleidoscope: A Student Centered Approach to Building Bridges between Mathematics and Art Pages 573–580 |
| − | |||
| − | Pages 573–580 | ||
| − | Hearing Math and Seeing Music: a Workshop on Pitch Perception and Temperament | + | * Evelyn Lamb: Hearing Math and Seeing Music: a Workshop on Pitch Perception and Temperament Pages 581–584 |
| − | |||
| − | Pages 581–584 | ||
| − | Unit Origami: Star-Building on Deltahedra | + | * Heidi Burgiel: Unit Origami: Star-Building on Deltahedra Pages 585–588 |
| − | |||
| − | Pages 585–588 | ||
| − | Connecting with the Sierpinski Tetrahedron | + | * Alice Petillo: Connecting with the Sierpinski Tetrahedron Pages 589–592 |
| − | |||
| − | Pages 589–592 | ||
== Links == | == Links == | ||
Version vom 19. Oktober 2015, 10:47 Uhr
zurück zu The Bridge Conferences: art and mathematics
Inhaltsverzeichnis
Reference
Kelly Delp, Craig S. Kaplan, Douglas McKenna,and Reza Sarhangi: Proceedings of Bridges 2015: Mathematics, Music, Art, Architecture, Culture. Bridges Conference at the University of Baltimore. Tessellations Publishing, Phoenix, Arizona, 2015. ISBN 978-1-938664-15-1
DOI
Abstract
Extended Abstract
Reviews
Bibtex
*
Table of contents
- The Editors: Front Matter. http://archive.bridgesmathart.org/2015/frontmatter.pdf
- Greg N. Frederickson: Folding Pseudo-Stars that are Cyclicly Hinged. In: Bridges 2015. Pages 1–8 http://archive.bridgesmathart.org/2015/bridges2015-1.html http://archive.bridgesmathart.org/2015/bridges2015-1.pdf
- Rinus Roelofs: The Concept of Elevation applied to Flat Tiling Patterns. In: Bridges 2015. Pages 9–16
- Carlo H. Séquin: 2-Manifold Sculptures. In: Bridges 2015. Pages 17–26
- Reza Sarhangi: The Geometric Studies of Some Mosaic Design Compositions and Puzzles Presented in a Historical Treatise. In: Bridges 2015. Pages 27–36
- Carolyn E. Lamb, Daniel G. Brown and Charles L.A. Clarke: Can Human Assistance Improve a Computational Poet? In: Bridges 2015. Pages 37–44
- B. Lynn Bodner: Curved Islamic Star Patterns of Medieval Egypt and Syria. In: Bridges 2015. Pages 45–52
- Tom Verhoeff and Koos Verhoeff: Three Families of Mitered Borromean Ring Sculptures. In: Bridges 2015. Pages 53–60
- Zhifu Xiao, Robert Bosch, Craig S. Kaplan and Robert J. Lang: Modular Origami Halftoning: Theme and Variations. In: Bridges 2015. Pages 61–68
- James Mai: Permutations of the Octagon: An Aesthetic-Mathematical Dialectic. In: Bridges 2015. Pages 69–76
- George Hart: Laser-Cut Plywood and Cable-Tie Sculptures. In: Bridges 2015. Pages 77–84
- Darrah Chavey, Monica Menzies Meissen, Todd O'Bryan and Glenn Terry: Double Strip Patterns: Between Strip Patterns and Wallpaper Patterns. In: Bridges 2015. Pages 85–92
- Dirk Huylebrouck: A Divine Error. In: Bridges 2015. Pages 93–98
- Gwen L. Fisher: Highly Unlikely Triangles and Other Impossible Figures in Bead Weaving. In: Bridges 2015. Pages 99–106
- Robert W. Fathauer: Real-World Tessellations. In: Bridges 2015. Pages 107–112
- Martin Levin: The Platonic Solids: a Three-Dimensional Textbook. In: Bridges 2015. Pages 113–120
- Robert Bosch and Tom Wexler: Figurative Tours and Braids. In: Bridges 2015. Pages 121–128
- Ergun Akleman, Stefano Franchi, Devkan Kaleci, Laura Mandell, Takashi Yamauchi and Derya Akleman: A Theoretical Framework to Represent Narrative Structures for Visual Storytelling. In: Bridges 2015. Pages 129–136
- Mike Naylor: Math Bugs. In: Bridges 2015. Pages 137–142
- David A. Reimann: Nonplanar expansions of polyhedral edges in Platonic and Archimedean solids. In: Bridges 2015. Pages 143–150
- David Swart: Soccer Ball Symmetry. In: Bridges 2015. Pages 151–158
- Paul Gailiunas: The Golden Spiral: The Genesis of a Misunderstanding. In: Bridges 2015. Pages 159–166
- Briony Thomas, Reidun Twarock, Motiejus Valiunas and Emilio Zappa: Nested polytopes with non-crystallographic symmetry induced by projection. In: Bridges 2015. Pages 167–174
- Kerry Mitchell: Fun with Whirls. In: Bridges 2015. Pages 175–182
- Douglas Dunham and John Shier: Fractal Wallpaper Patterns. In: Bridges 2015. Pages 183–190
- Katharine Ahrens: “In an Ocean of Ashes”: Order and Chaos in Mathematics and Literature. In: Bridges 2015. Pages 191–198
- Karl Schaffer: A Skeleton Key for the Platonic Solids. In: Bridges 2015. Pages 199–206
- Gershon Elber: 3D-Dithered Ortho-Pictures: 3D Models from Independent 2D Images. In: Bridges 2015. Pages 207–214
- James Mallos: Knotology Baskets and Topological Maps. In: Bridges 2015. Pages 215–222
- Loe M.G. Feijs and Marina Toeters: A Novel Line Fractal Pied de Poule (Houndstooth). In: Bridges 2015. Pages 223–230
- Christopher Carlson, Nina Paley and Theodore Gray: Algorithmic Quilting. In: Bridges 2015. Pages 231–238
- Norma Boakes: Integrating Origami Art with Mathematics in a College General Studies Course. In: Bridges 2015. Pages 239–246
- Gary R. Greenfield: Self-Avoiding Random Walks Yielding Labyrinths. In: Bridges 2015. Pages 247–252
- Francesco De Comité: Yvon-Villarceau Circle Equivalents on Dupin Cyclides. In: Bridges 2015. Pages 253–258
- Daniel May and Courtney Huse Wika: Galaxies Containing Infinite Worlds: Poetry from Finite Projective Planes. In: Bridges 2015. Pages 259–266
- Abdalla G. M. Ahmed: From Stippling to Scribbling. In: Bridges 2015. Pages 267–274
- Robin Linhope Willson: Magnetic Circle Packing in Creative Outreach and Refreshment. In: Bridges 2015. Pages 275–282
- Emily Grosholz: Julia Randall's Poetic Finitude: Mapping the Infinite onto a Poem. In: Bridges 2015. Pages 283–288
- Ellen Gethner, Shannon Steinmetz and Joseph Verbeke: A View of Music. In: Bridges 2015. Pages 289–294
- Stanley Spencer: The Stomachion in Wonderland. In: Bridges 2015. Pages 295–300
- Bahman Afsari, Katayun Mazdapour and Bruno Jedynak: Ordinal-Contextual Dissimilarity for Analysis of Heros in Tragedies. In: Bridges 2015. Pages 301–308
- Ergun Akleman and Hüseyin Koçak: Designing 2D Ordinary Differential Equations To Obtain Abstract Paintings, Illustrations and Animations. In: Bridges 2015. Pages 309–316
- Siobhan Roberts: The Curious Creativity of John Horton Conway. In: Bridges 2015. Pages 317–322
- Donald Spector: The Musical Canon Inside Differential Equations. In: Bridges 2015. Pages 323–330
- Dmitri Kozlov: Eight-Pointed Star and Precise Construction of 7x7 Square Grid. In: Bridges 2015. Pages 331–334
- Carlo H. Séquin and Lorenzo Larrucea: Introducing the Möbius-Twisted Turk's Head Knot. In: Bridges 2015. Pages 335–338
- Yevgen Matviychuk and Shannon M. Hughes: Exploring the Manifold of Image Patches. In: Bridges 2015. Pages 339–342
- David Chappell: Flowing, Organic Forms Using Adaptive Line-Drawing Agents. In: Bridges 2015. Pages 343–346
- Tom Verhoeff and Melle Stoel: Chains of Antiprisms. In: Bridges 2015. Pages 347–350
- Rachel Wells Hall: Programmable Mathe-Musical Boxes. In: Bridges 2015. Pages 351–354
- Robert Bosch: Two-Frame Animations in Conway's Game of Life. In: Bridges 2015. Pages 355–358
- Jonathan K. Millen: Gallery Layout in Borges' Library of Babel. In: Bridges 2015. Pages 359–362
- Hartmut F. W. Höft: Visualizing Rhyme Patterns in Sonnet Sequences. In: Bridges 2015. Pages 363–366
- Yongquan Lu and Erik D. Demaine: A Pattern Tracing System for Generating Paper Sliceform Artwork. In: Bridges 2015. Pages 367–370
- Kenneth Brecher: The “ΦTOP”: A Golden Ellipsoid. In: Bridges 2015. Pages 371–374
- Roger Bilisoly: The Geometric Structure of Scribal Variation among Manuscripts of Langland's Piers Plowman. In: Bridges 2015. Pages 375–378
- David Brander and Steen Markvorsen: Surfaces with Natural Ridges. In: Bridges 2015. Pages 379–382
- Douglas G. Burkholder: Unexpected Beauty Hidden in Radin-Conway's Pinwheel Tiling. In: Bridges 2015. Pages 383–386
- Vi Hart, Andrea Hawksley, Henry Segerman and Marc ten Bosch: Hypernom: Mapping VR Headset Orientation to S3. In: Bridges 2015. Pages 387–390
- Sean Jeng Liu, Young Kim, Raymond Shiau and Carlo H. Séquin: Large, Symmetric, “7-Around” Hyperbolic Disks. In: Bridges 2015. Pages 391–394
- Stephan Klaus and Bianca Violet: Katzengold: Pyrite, Plato, and a Polynomial. In: Bridges 2015. Pages 395–398
- Clifton Callender: Infinite Rhythmic Tiling Canons. In: Bridges 2015. Pages 399–402
- Alexander Boxer and Justace Clutter: A Concept Map for Book 1 of Euclid's Elements. In: Bridges 2015. Pages 403–406
- Reginald Bain: A Musical Scale Generated from the Ratio of Consecutive Primes. In: Bridges 2015. Pages 407–410
- Shunsuke Akimoto and Akihiro Matsuura: Geometric Visual Instruments Having Pinnate Forms. In: Bridges 2015. Pages 411–414
- Kristóf Fenyvesi and Markus Hähkiöniemi: Design Anamorphosis in the Math Class! In: Bridges 2015. Pages 415–418
- Jean Constant: Cayley Cubic and the Visual Arts. In: Bridges 2015. Pages 419–422
- Lorelei Koss: Fractal Tiling Illustrations of Geometric Series. In: Bridges 2015. Pages 423–426
- Irene Rousseau: Nature as a Strategy for Pattern Formation in Art. In: Bridges 2015. Pages 427–430
- Patrick Honner: Monte Carlo Art Using Scratch. In: Bridges 2015. Pages 431–434
- Kazmier Maslanka: The Paradigm Poem. In: Bridges 2015. Pages 435–438
- Vincent J. Matsko: Random Walks on Vertices of Archimedean Tilings. In: Bridges 2015. Pages 439–442
- CJ Fearnley and Jeannie Moberly: Perspectives on Borges' Library of Babel. In: Bridges 2015. Pages 443–446
- Mehrdad Garousi: Geometry in the Pocket. In: Bridges 2015. Pages 447–450
- Susan McBurney: From Mathematical Curves to Decorative Ornaments. In: Bridges 2015. Pages 451–454
- Ioana Browne and Mircea Draghicescu: Building Polyhedra from Polygons with Colored Edges Pages 455–458
- Andrew Werth: Turing Patterns in Photoshop Pages 459–462
- Jo Anne Growney: Inspire Math-Girls-Women (perhaps with poems) Pages 463–466
- Jim Bumgardner: Emergent Orange Pages 467–470
- Adam Arstall, Briony Thomas, Reidun Twarock and Emilio Zappa: Expandohedra: Modeling Structural Transitions of a Viral Capsid Pages 471–474
- Paula Burkhardt, Gabriel Currier, Stephan Ramon Garcia, Mathieu de Langis, Bob Lutz and Hong Suh: An Exhibition of Exponential Sums: Visualizing Supercharacters Pages 475–478
- Richard Conn Henry, James Overduin and Kielan Wilcomb: A New Way to See Inside Black Holes Pages 479–482
- Kevin Lee: Algorithms for Morphing Escher-Like Tessellations Pages 483–486
- Karl Kattchee: Theory of Intersection Pages 487–490
- Taneli Luotoniemi: Schematic Drawings of the Polychora Pages 491–494
- Gisèle De Meur and Samuel Verbiese: A Successful Belgian Art & Math Exhibition with Workshops Pages 495–498
- Anusch Bayens, Carlo De Pauw, Carmen Geens, Seniz Karaman, Mark Pieters, André Thomas, Alex Van Bogaert, Samuel Verbiese, Rudi Willaert and Nico Willemsens: Bridges Exhibits as Incentives to Collaborative Artworks Pages 499–502
- Katie McCallum: Linguistic Oddities: An Artist Explorer at Mathematics Conferences Pages 503–506
- Yitzhak Weissman: 3D Lenticular Imaging for Art Pages 507–510
- Marion Deutsche Cohen: The Shapes of Our Souls and Other Student Concerns: Poems about the Course “Mathematics in Literature” Pages 511–514
- Kelly Delp and Sam Lloyd: Into the Shadows: Approximating Images by Orthogonal Projection Pages 515–518
- Andrea Johanna Hawksley: Exploring Ratios and Sequences with Mathematically Layered Beverages Pages 519–524
- Rachelle Guernsey: Math-Infused Art Lessons, Art-Infused Math Lessons Pages 525–532
- Eva Knoll, Wendy Landry, Tara Taylor, Paul Carreiro and Susan Gerofsky: The Aesthetics of Scale: Weaving Mathematical Understandings. Pages 533–540
- Alan Russell: The Shape Snacker: a Bite of Origami and Math Pages 541–548
- Lali Barrière: Lissajus Curves: an Experiment in Creative Coding Pages 549–554
- David Thompson and Diana Cheng: Square Seeds and Round Paths: Exploring Patterns within the Art of Classical Labyrinths Pages 555–558
- Elizabeth Paley: Thinking like a Pianist/Mathematician/Potter-Designer: Strategies for Tuning Ocarinas Pages 559–562
- Madhuri Bapat: Use of RangoLee Art in Elementary Mathematics Education Pages 563–566
- Cristina Padlan Packard: A Workshop Using the Log Cabin Quilt For Teaching Math Concepts and Patterns Pages 567–570
- Carol Dorf: Composing Mathematical Poetry Pages 571–572
- Gail Kaplan, Rachael Gross and Kim McComas: Mathematics Through the Lens of a Kaleidoscope: A Student Centered Approach to Building Bridges between Mathematics and Art Pages 573–580
- Evelyn Lamb: Hearing Math and Seeing Music: a Workshop on Pitch Perception and Temperament Pages 581–584
- Heidi Burgiel: Unit Origami: Star-Building on Deltahedra Pages 585–588
- Alice Petillo: Connecting with the Sierpinski Tetrahedron Pages 589–592
Links
Full Text
http://archive.bridgesmathart.org/2015/index.html
