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Dymaxion map

The Dymaxion map, also known as the Fuller projection, is a polyhedral map projection invented by American architect and inventor R. Buckminster Fuller that represents the Earth's surface by projecting it onto the faces of an icosahedron, which is then unfolded into a two-dimensional net to minimize distortions in area, shape, and continuity of landmasses.^[1]^[2] First published in Life magazine in 1943 as the "Dymaxion World," it initially used a dodecahedral approximation but evolved to a modified icosahedral base by 1954, enabling a view of the planet as a single interconnected landmass surrounded by ocean without interrupting major continents.^[3]^[4] This design preserves relative areas more accurately than Mercator-style projections, which exaggerate high latitudes, and reduces shape distortions compared to equal-area alternatives like Mollweide, facilitating intuitive global analysis such as migration patterns or resource distribution.^[4]^[5] While no flat projection eliminates all distortions—introducing some angular and distance inaccuracies in certain orientations—the Dymaxion's emphasis on holistic sphericity underscores Fuller's first-principles approach to cartography, prioritizing empirical fidelity over conventional rectangular grids.^[2]^[6]

History

Invention and early development

The Dymaxion map projection was invented by American inventor, architect, and futurist Richard Buckminster Fuller to depict the Earth's surface on a flat plane while minimizing distortions in area and shape compared to Mercator and other cylindrical projections. Fuller's motivation stemmed from his view of Earth as a unified "spaceship" requiring accurate global visualization for resource management and international cooperation, an idea he explored as early as the 1920s through sketches of a "one-town world." The initial formulation projected the globe onto the faces of a cuboctahedron, a polyhedron with fourteen equilateral triangular faces, enabling the map to unfold without severing major landmasses.^[2]^[7] This prototype was first publicly detailed in the March 1, 1943, issue of Life magazine through a photographic essay titled "Life Presents R. Buckminster Fuller's Dymaxion World," which included a pull-out section for readers to assemble the map into a three-dimensional model. The publication highlighted the map's utility for wartime strategy by showing continents in continuity, countering the artificial divisions of traditional maps that exaggerated distances across oceans. Fuller filed a patent application for the projection method on February 25, 1944, which the U.S. Patent Office granted as No. 2,393,676 on January 29, 1946, formalizing his equal-area polyhedral approach.^[3]^[8] Early refinements involved iterative testing of polyhedral bases to reduce interruptions and edge distortions, with Fuller conducting manual projections and validations against globe data over the subsequent decade. By 1954, after extensive experimentation documented in his notes and collaborations, Fuller adapted the design to a modified icosahedron— a twenty-faced polyhedron—for the "Dymaxion Airocean World" version, partnering with Japanese-American architect-cartographer Shoji Sadao to finalize the unfolding scheme that positioned oceans as a continuous surround to landmasses. This evolution addressed limitations in the cuboctahedral model's seam alignments, achieving Fuller's goal of a "satisfactory deck plan" for global analysis.^[2]^[9]

Publication and promotion

The Dymaxion map was first publicly described in the March 1, 1943, edition of Life magazine through an article titled "Life Presents R. Buckminster Fuller's Dymaxion World," which included a photographic essay demonstrating the projection's capacity to represent the Earth's surface with comparatively low distortion and to highlight the continuity of oceanic areas.^[3]^[10] Fuller positioned the map as a practical aid for wartime geography education, arguing that conventional projections like the Mercator obscured the planet's spherical integrity and exaggerated continental separations, potentially misleading public perceptions of global interdependencies.^[10] In 1944, the map appeared in print as "World Map on Dymaxion Projection," issued by The Atlantic Neptune in what is regarded as its initial standalone cartographic publication.^[11] Fuller continued to refine the projection over the subsequent decade, culminating in the 1954 "Dymaxion Airocean World" edition, developed in collaboration with cartographer Shoji Sadao and published by North Carolina State College in a limited run of 3,000 copies known as the Raleigh edition.^[12] This version incorporated adjustments to the icosahedral base for improved unfolding and emphasized aerial and oceanic perspectives, aligning with Fuller's broader advocacy for comprehensive planetary resource mapping. Fuller promoted the Dymaxion map through lectures, exhibitions, and writings as an antidote to anthropocentric distortions in standard cartography, asserting it facilitated recognition of Earth as a singular, self-contained system—"Spaceship Earth"—with unbroken water coverage exceeding 70% of the surface.^[2] He presented it at events such as the 1956 Conference on World Affairs, where it underscored themes of global unity and efficient design, and integrated it into his geodesic dome projects and publications to challenge isolationist geographic narratives.^[13] Despite these efforts, adoption remained niche, as Fuller critiqued institutional resistance to projections that disrupted familiar north-up orientations and Mercator-derived power imbalances in visual representation.^[14]

Technical Description

Polyhedral basis and projection method

The polyhedral basis of the Dymaxion map is the regular icosahedron, a Platonic solid composed of 20 equilateral triangular faces, 12 vertices, and 30 edges, which provides an efficient approximation of the sphere with equal-area facets.^[15] Buckminster Fuller adopted this structure in 1954 for its ability to enclose the globe with minimal deviation from sphericity while maintaining uniform face areas, facilitating low-distortion mapping upon unfolding.^[16] The projection method entails first overlaying a spherical icosahedron grid on the Earth, where the grid's edges follow great circle arcs to divide the surface into 20 equal-area spherical triangles.^[15] These spherical triangles are then radially projected from the sphere's center onto the corresponding planar faces of a concentric flat icosahedron, preserving areas due to the uniform scaling across equivalent facets.^[15] ^[16] This central projection technique, akin to gnomonic projection adapted for polyhedral unfolding, ensures that each face maps a contiguous portion of the globe without seams in the initial polyhedral form, though distortions arise primarily at edges during flattening.^[15] Following projection, the icosahedron is dissected and rearranged into a two-dimensional net, typically with strategic interruptions to connect major landmasses or oceans continuously, such as centering the Pacific or emphasizing intercontinental links.^[16] This unfolding scheme, while introducing azimuthal distortions near cuts, leverages the icosahedron's symmetry to distribute shape and angular errors more evenly than cylindrical or conic projections.^[15] The resulting map maintains global area fidelity, with the icosahedral basis enabling reconfigurations to highlight different geopolitical or environmental perspectives without altering intrinsic proportions.^[15]

Unfolding and interruption scheme

The Dymaxion map's unfolding scheme derives from the net of an icosahedron, a polyhedron with 20 equilateral triangular faces, onto which the Earth's spherical surface is projected. Buckminster Fuller selected a specific arrangement of these faces to form a planar layout, ensuring that the projection's cuts—known as interruptions—align primarily with oceanic great-circle paths rather than continental boundaries. This results in a map where all major landmasses, including Eurasia, Africa, North and South America, and Australia, appear as continuous units, connected by minimal distortions at their edges.^[16]^[17] The interruption scheme interrupts the global surface along 19 edges of the icosahedron, creating gaps that separate the Pacific Ocean into multiple segments while preserving land connectivity. In the standard unfolding, the triangles are arranged in a linear or zigzag pattern, with the North Pole often positioned centrally near North America and the South Pole distributed across southern faces. This configuration minimizes shape and area distortions for land areas by avoiding splits through densely populated or geopolitically significant regions, though it fragments uninhabited ocean expanses. The process begins by inscribing the icosahedron around the globe, mapping spherical coordinates to the polyhedron's faces via radial projection, and then flattening the curved triangular sectors into straight-edged planar triangles without further conformal adjustment.^[18]^[15] Fuller's design emphasized reconfigurability, allowing the net to be refolded along different edges to recenter the map on various viewpoints, such as shifting focus from the Atlantic to the Pacific without redrawing. This flexibility stems from the icosahedron's high symmetry, enabling multiple valid nets, though the chosen interruption prioritizes visual unity of continents over exhaustive ocean continuity. Empirical tests of distortion, such as those using Tissot's indicatrix, confirm that this scheme reduces average angular deformation to under 10% across land surfaces compared to cylindrical projections, at the cost of oceanic fragmentation.^[3]^[15]

Properties and Performance

Area preservation and distortion metrics

![Dymaxion projection with Tissot's indicatrix showing distortion patterns][float-right] The Dymaxion projection, derived from projecting the spherical Earth onto the faces of an icosahedron, is neither strictly equal-area nor conformal, though it achieves comparatively low areal and angular distortions across the globe.^[1] Distortions in area arise because each icosahedral facet is mapped via a gnomonic or similar central projection, which preserves angles locally but varies scale factors, leading to area inaccuracies that increase from the facet edges toward their centers.^[1] Scale remains true along the edges of the 20 triangular facets, but overall, areas are generally distorted, with mathematical analyses revealing minute, evenly distributed discrepancies rather than extreme polar enlargements seen in cylindrical projections.^[15] Distortion metrics are often assessed using Tissot's indicatrix, which superimposes ellipses representing infinitesimal circles on the sphere; in the Dymaxion map, these ellipses exhibit moderate eccentricity, indicating balanced scale distortion in principal directions without severe shearing.^[19] Comparative studies of polyhedral projections classify the Fuller method as having moderate area distortion relative to alternatives, with compactness (a shape-area balance metric) similarly restrained, outperforming methods like simple azimuthal equidistant faceting but not eliminating all variance.^[20] While no universal maximum distortion factor is standardized, visualizations at 30-degree intervals demonstrate that areal scale factors deviate by less than a factor of two in most regions, far below Mercator's equatorial-to-polar extremes.^[21] This near-uniform distribution of distortions stems from the icosahedron's approximation to the sphere (with 20 faces covering the surface efficiently), allowing the unfolding to prioritize global continuity over perfect local fidelity; however, precise quantification requires facet-specific computations, as the projection's "compromise" nature trades exact area equivalence for reduced maximum deviation.^[19] Empirical evaluations confirm that relative continent sizes, such as Africa versus Greenland, appear more proportional than in common alternatives, though rigorous geodesic tests reveal residual errors on the order of a few percent in integrated areas.^[15]

Advantages for global visualization

![Dymaxion map showing the world with continents as one interconnected island][float-right] The Dymaxion projection facilitates global visualization by depicting the Earth's landmasses as a single, unbroken island surrounded by a continuous ocean, avoiding the fragmentation common in traditional maps like the Mercator or Robinson projections.^[2]^[22] This arrangement highlights the relative proximity and interconnectedness of continents, such as positioning Eurasia, Africa, and the Americas in near-continuity, which Fuller argued promotes a perception of global unity rather than isolation.^[4]^[23] As an equal-area projection derived from an icosahedron, it distributes distortions more evenly across the surface, preserving the accurate relative sizes of landmasses while minimizing extreme shape alterations in central regions.^[24]^[15] This evenness aids in assessing global patterns, such as resource distribution or migration routes, without the polar exaggeration or equatorial bias found in cylindrical projections.^[25] Fuller designed it to counteract cultural biases in conventional maps that emphasize north-south hierarchies, enabling viewers to grasp hemispheric relationships more intuitively. The map's icosahedral basis allows for flexible reorientation, permitting users to recenter the view around any point, which enhances analysis of worldwide phenomena like climate systems or geopolitical dynamics by reducing the perceptual dominance of any single continent.^[26] By presenting the planet as an interdependent system, it supports Fuller's advocacy for holistic problem-solving, as evidenced in applications visualizing global energy grids or human migrations.^[27]^[7]

Limitations and shape distortions

The Dymaxion projection distorts shapes due to its non-conformal nature, with angles and local forms generally deformed across the map. Distortion intensifies toward the interiors of the icosahedral facets, where points farther from facet edges experience greater shearing and scaling variations.^[1] This arises from projecting the spherical surface onto planar triangular faces, which inherently alters angular relationships even in a low-distortion polyhedral scheme.^[19] Tissot's indicatrix reveals these effects through elliptical distortions of unit circles, indicating both meridional and parallel scale changes alongside angular deformation. While global continental outlines benefit from reduced interruption in landmasses, small-scale features such as coastlines or political boundaries may appear elongated or compressed depending on their position relative to facet boundaries. Mathematical analysis confirms minute but evenly distributed shape distortions throughout.^[15] The projection's unfolding scheme exacerbates perceptual challenges for shape recognition, as cuts across oceans separate adjacent land areas, necessitating cognitive reassembly to assess true forms. Directions and bearings lack consistency, with no fixed orientation for cardinal points, further hindering accurate shape interpretation for navigational or comparative purposes.^[1] Comparative studies of polyhedral projections note that, despite low overall angular distortion, the Dymaxion's compromise approach trades some shape fidelity for balanced area representation.^[20]

Variants and Modifications

Conformal adaptation

![Tissot's indicatrix of distortion on the Dymaxion-like conformal projection][float-right] The Dymaxion-like conformal projection represents an adaptation of Buckminster Fuller's original Dymaxion map arrangement, transforming the equal-area projection into one that preserves local angles. Developed by cartographer Daniel Strebe in 2019, it applies conformal mapping techniques to the icosahedral polyhedron framework established by Fuller in 1943 and refined in 1954.^[28]^[29] This variant draws on foundational mathematical work for conformal polyhedral projections by Oscar S. Adams from the 1920s onward and L.P. Lee in 1976, enabling angle preservation across the icosahedron's faces while maintaining the interrupted unfolding scheme that centers oceans and minimizes continental fragmentation.^[29] Unlike the original Dymaxion projection, which prioritizes equal-area representation and thus distorts shapes, the conformal adaptation ensures that small-scale shapes and angles remain true, eliminating kinks in graticule lines that arise in non-conformal polyhedral mappings.^[29] This results in improved local shape fidelity for continents, making it suitable for applications requiring navigational accuracy or visual representation of angular relationships, such as in thematic mapping where distortion in bearings must be minimized. However, as a trade-off for conformality, areal distortion increases, with maximum inflation reaching a factor of 2.0 in some regions, though overall areal variation remains relatively low compared to cylindrical conformal projections like Mercator.^[29] The projection has been implemented in specialized software, including Geocart version 3.3, allowing for digital generation and customization of maps in this scheme.^[29] Visualizations, such as those using Tissot's indicatrix, demonstrate uniform angular preservation across faces, with distortion primarily manifesting as scaling variations rather than shearing. Strebe's work extends the utility of Fuller's geometric intuition by integrating modern conformal algorithms, providing cartographers with a tool that balances global continuity and local fidelity in polyhedral formats.^[28]

Other derived projections

The initial Dymaxion projection, introduced by Buckminster Fuller in 1943 and published in Life magazine, utilized a cuboctahedron with 6 square faces and 8 triangular faces to approximate the globe's surface, emphasizing the continuity of landmasses as a single island surrounded by ocean.^[4]^[14] This version, patented in 1946 (U.S. Patent 2,393,676), represented an early effort to minimize distortions in global connectivity but was limited by the cuboctahedron's coarser spherical approximation compared to higher-frequency polyhedra.^[14] Subsequent modifications to the icosahedral Dymaxion included selective subdivision of certain triangular faces—typically two or more—to accommodate irregular continental boundaries and reduce local distortions, as implemented in Fuller's 1954 collaboration with Shoji Sadao for the Airocean World map.^[30] These adjustments preserved the core topological transfer from sphere to polyhedron but allowed flexible unfolding schemes, enabling reconfigurations that prioritized ocean unity or regional focus without altering the fundamental projection method.^[19] Modern computational implementations, such as Robert Gray's C-based renderer from the early 2000s, have facilitated precise recreations of these derived forms, including cuboctahedral unfoldings, though they remain niche due to proprietary constraints on reuse.^[31] No major independent projections directly deriving from the Dymaxion's interruption scheme beyond these historical and minor tweaks have achieved prominence, as later polyhedral efforts favored alternative bases like dodecahedra for refined metrics.^[32]

Reception and Evaluation

Initial cartographic responses

The Dymaxion map, first publicized in Life magazine on March 1, 1943, drew early attention from cartographers for its polyhedral unfolding based on a cuboctahedron, which aimed to preserve relative areas while allowing reconfiguration to center any region.^[14]^[33] The feature included cutout sections for readers to assemble a physical globe, emphasizing Fuller's assertion of superior global pattern revelation compared to Mercator or azimuthal projections.^[33] In professional outlets, the map appeared in discussions within the October 1943 issue of the Geographical Review, where illustrator Richard Edes Harrison reviewed emerging projection techniques, including Fuller's approach with its six-square elements derived from vector geometry.^[34]^[33] Cartographers appreciated the projection's equal-area approximation and its facilitation of a "one-world" perspective, particularly amid World War II-era focus on strategic global connectivity, but critiqued the irregular graticule and fragmented layout for complicating distance measurements and adjacency perceptions essential to traditional mapping.^[7] By the mid-1940s, Fuller's 1946 U.S. patent (No. 2,393,676) formalized the method, yet adoption remained niche; surveys in journals like the Geographical Review highlighted its visualization strengths for thematic world maps but underscored limitations in scalability and conformity to established standards, such as those prioritized by the American Geographical Society.^[35]^[7] This tempered enthusiasm reflected a broader preference for less interrupted alternatives like John Paul Goode's 1923 homolosine projection, which balanced similar goals with greater continuity.^[7]

Criticisms and comparative analyses

![Dymaxion projection with Tissot's indicatrices of distortion][float-right] The Dymaxion projection has faced criticism from cartographers for its interrupted layout and asymmetrical unfolding of the icosahedron, which produces bent meridians and broken parallels that cross major landmasses, such as the diagonal bisection of the United States.^[36] This discontinuity disrupts continuity in global patterns and hinders intuitive navigation and recognition of relative positions.^[36] Technical critiques highlight the irregular graticule, featuring splayed and bent lines of latitude and longitude, which result in contortions of landforms including Korea and Norway, and an overall poor fidelity to the globe owing to the off-center alignment of the icosahedron with Earth's axis, equator, and poles.^[7] Cartographer Gene Keyes described it as a poor teaching tool that fails to match well with the spherical globe, with low-resolution 15-degree geocells limiting precision compared to finer grids possible in other polyhedral designs.^[7] Scalability issues further compound usability, as distortions worsen at larger map sizes, and facet edges lack metric consistency, measuring approximately 7,048.89 km rather than standardized lengths.^[7] In comparative analyses, the Dymaxion is frequently evaluated against B.J.S. Cahill's 1909 octahedral "Butterfly" projection, which employs eight symmetric triangular gores aligned to the globe's axis, yielding smoother graticules, minimal edge distortions, and superior scalability across sizes with metric 10,000 km edges.^[36] ^[7] While the Dymaxion offers low overall areal and angular distortions as a polyhedral compromise, preserving areas more accurately than navigation-focused conformal projections like Mercator—which exaggerates high-latitude landmasses such as Greenland—it sacrifices shape fidelity and directional consistency in favor of ocean-centered continuity.^[19] Against pseudocylindrical alternatives like the Robinson projection, the Dymaxion reduces extreme polar distortions but introduces fragmentation that complicates thematic mapping and standard graticule overlays.^[19]

Factors limiting widespread adoption

Despite its innovative approach to minimizing distortion through an icosahedral unfolding, the Dymaxion projection's interrupted structure, featuring multiple seams that often bisect major landmasses, complicates continuous visualization and navigation across continents.^[36] This polyhedral design results in bent meridians and broken parallels on every panel, with graticules oriented at varying angles relative to the edges, making it challenging to overlay uniform coordinate systems or perform standard geospatial analyses without panel-specific adjustments.^[36] The lack of a standardized, intuitive grid and cardinal direction alignment further hinders practical use, as users accustomed to rectangular projections like Mercator struggle with orientation and scale transitions between facets, rendering it less suitable for routine cartographic tasks such as routing or thematic mapping.^[36] Pre-digital production also posed barriers, requiring precise geometric unfolding from a globe model, which increased complexity and error risk compared to cylindrical or conic methods amenable to simpler mathematical formulas.^[1] Intellectual property claims by the Buckminster Fuller Institute have additionally restricted adoption, particularly in digital tools; the institute has asserted expired patent rights, copyrights on specific map expressions, and trademarks on the "Dymaxion" name, leading to licensing demands and lawsuits that deterred implementation in many GIS platforms beyond licensed software like ArcGIS.^[14] These enforcement actions, including settlements extracting fees despite questionable legal basis post-1963 patent expiration, created a chilling effect on broader software integration and open-source development as of 2022.^[14] Institutional inertia in cartography, favoring projections with established conventions and endorsements from bodies like the International Cartographic Association, has perpetuated alternatives despite comparative distortion analyses showing the Dymaxion's strengths in global area preservation; without widespread academic or governmental standardization, familiarity bias has limited its penetration in education and media.^[36]

Applications and Legacy

Practical uses in education and analysis

The Dymaxion map has found application in educational programs emphasizing systems thinking and global interconnectedness, most notably through Buckminster Fuller's World Game initiative launched in the 1960s. This participatory workshop series employed the projection to map comprehensive world inventories, including distributions of minerals, goods, services, population, and human capabilities against needs, fostering analysis of resource trends and future scenarios.^[37] By presenting Earth as a unified "island in one ocean," the map encouraged participants to transcend national boundaries and adopt a planetary-scale perspective, aligning with Fuller's goal of "making the world work for 100% of humanity" via data-driven cooperation.^[37]^[2] In analytical contexts, the map's polyhedral unfolding minimizes shape and area distortions across the globe, enabling clearer visualization of spatial relationships obscured in cylindrical or conic projections.^[2] Fuller intended it for precise resource surveys, where it accurately depicts percentages of global resources and populations relative to landmasses, supporting evaluations of distribution equity and scarcity patterns.^[38] It has also been utilized to trace human migration pathways, such as Homo sapiens dispersals over millennia, by maintaining proportional continental proximities—e.g., linking Eurasian land bridges without artificial separations.^[39]^[40] These features make it suitable for interdisciplinary analyses in fields like anthropology and environmental planning, where holistic pattern recognition is paramount.^[39]

Influence on alternative cartography

The Dymaxion projection's icosahedral basis and interrupted unfolding, which minimize overall distortion while preserving continental adjacency, have spurred advancements in polyhedral cartography. This approach demonstrated the feasibility of representing Earth as a continuous landmass surrounded by ocean, influencing subsequent designs that prioritize equal-area preservation and reduced shape deformation over traditional cylindrical or conic methods. Cartographers have drawn on Fuller's 1943 and 1954 formulations to experiment with geometric unfoldings that avoid polar exaggeration and meridional stretching common in Mercator-derived projections.^[2]^[14] Specific adaptations include conformal variants that retain the Dymaxion layout but adjust for angle preservation, as developed by specialist Tobias Jung around 2010. These Dymaxion-like conformal projections maintain low distortion metrics while enabling applications in navigation and conformal thematic mapping, where local shapes must remain true. Similarly, Justin Kunimune's Elastic projections, introduced in 2023, adopt a comparable interrupted icosahedral arrangement with fewer cuts, aiming for smoother continuity and adaptability in digital rendering. Such derivatives extend Fuller's compromise properties into more specialized equal-area or conformal frameworks.^[41]^[42] Beyond technical derivations, the Dymaxion map's emphasis on global interconnectedness—portraying continents as "one island in one ocean"—has shaped philosophical underpinnings of alternative cartography, encouraging projections that challenge north-up biases and promote equitable landmass depiction. This legacy appears in modern tools like ArcGIS implementations of the Fuller projection, facilitating dynamic visualizations for geospatial analysis, and in broader critiques of distortion in world mapping. While not spawning a dominant school, it has contributed to a niche revival of polyhedral methods, influencing educational and analytical maps focused on holistic planetary views.^[1]^[13]^[43]

Modern digital implementations

The Fuller projection, synonymous with the Dymaxion map, is implemented in Esri's ArcGIS Pro geographic information system (GIS) software as of its latest versions, enabling users to project global datasets onto an icosahedral net with reduced areal distortion for analysis and visualization.^[1] This digital tool supports coordinate transformations from spherical to the projection's polyhedral surface, facilitating applications in spatial data processing where traditional projections like Mercator introduce significant size biases.^[1] Web-based mapping libraries have incorporated Dymaxion projections for interactive online maps. In 2011, a custom JavaScript implementation integrated the projection into the OpenLayers framework, allowing dynamic rendering of icosahedral unfoldings with tiled data overlays.^[25] Similarly, Mike Bostock's Protovis library, a predecessor to D3.js, featured a Dymaxion map example projecting Earth onto an unfolded icosahedron for browser-based exploration.^[44] Interactive demonstrations extend the projection's digital reach. The Wolfram Demonstrations Project hosts a manipulable Dymaxion map model, simulating the gnomic projection onto an icosahedron for educational purposes.^[45] Elumenati's WorldViewer software, updated as of 2011, supports real-time remapping of global animations into the Dymaxion format for immersive dome projections and virtual environments.^[46] These tools demonstrate the projection's adaptability to modern computing, though adoption remains niche compared to cylindrical or conic standards in mainstream GIS platforms.^[47]

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[PDF] FULLER PROJECTION: DYMAXION AIR-OCEAN WORLD
In 1954 Fuller called his final icosahedral projection the “Dymaxion. Air-Ocean World.” The term Dymaxion was coined in the 1930s from Fuller's most commonly.
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" Human Migration 200-5 Ka " by Geoff Christou, a dymaxion ...
" Human Migration 200-5 Ka " by Geoff Christou, a dymaxion projection of Homo sapiens migration. Migration cannot be readily seen. Yet the study of ...
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Dymaxion Map vs. Dymaxion-like conformal projection
Buckminster Fuller (1943) ... Dymaxion Map Tissot Indicatrix. Dymaxion-like conformal projection. Dymaxion-like conformal projection Tissot Indicatrix.
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Introducing the Elastic projections - Wuslopebology
Dec 29, 2023 · It allows you to easily convert equirectangular maps to a wide variety of map projections – Dymaxion, Cahill-Keyes, AuthaGraph (sort of), and ...
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World maps get Africa's size wrong: cartographers explain why fixing ...
Aug 28, 2025 · For example the Dymaxion projection, developed by the American engineer Buckminster Fuller, was designed to challenge ideas of the north and the ...
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Protovis - Dymaxion Map
The Dymaxion map, designed by Buckminster Fuller, projects the world onto the surface of an icosahedron. This polyhedron is then unfolded to form a two- ...
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Buckminster Fuller's Dymaxion Map - Wolfram Demonstrations Project
This Demonstration is an attempt to draw Fuller's gnomic Dymaxion map. The Dymaxion map is a projection of the globe onto the surface of an icosahedron.Missing: online | Show results with:online
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Interactive Dymaxion Mapping in WorldViewer - The Elumenati
Aug 27, 2011 · Check out the video demonstration of real-time remappings of global animations into Buckminster Fuller's Dymaxion projection.
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Plotting data on a Fuller-like projection - GIS Stack Exchange
Jan 15, 2023 · I believe this is the Airocean projection from the Dymaxion/Fuller/Airocean family. World map of prehistoric human migrations. Example of ...