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| Hi J. M. Thanks for sharing the very interesting post with the lovely Japanese Anime. **1. Check another japanese blog [美しすぎるハートの数式][1]** The equation of (x^2+y^2-1)^3==4x^2 y^3 comes from Eugen Beutel in a German math book [Algebraische... |
| I am looking for this pattern for a long time, thanks for the share. |
| ![enter image description here][1] &[Wolfram Notebook][2] [1]: https://community.wolfram.com//c/portal/getImageAttachment?filename=Main03022025.png&userId=20103 [2]: https://www.wolframcloud.com/obj/c6974916-a865-4dfe-ac23-4d6d90339e7c |
| Hi Kaurov, Gyroid is my favorite minimal surface. Thank you for the share. I attached two images of groid surface applyed in jewelry design. ![enter image description here][1] ![enter image description here][2] [1]:... |
| My daughters, as middle school students, first found the mathematical constant Pi interesting and memorized dozens of its digits. However, Pi is primarily associated with circles, angles, and rotations, and that's about it. Later, I bought a book,... |
| Mark, Thank you for sharing this. I am also intent to create my own style Wolfram poker. You idea and examples are brilliant and inspired me a lot. |
| Hi Kelly, You can contact me by email: wu_fei_1978@163.com, or we can disuss your issue in Wolfram Community. |
| The problem appears very simliar with anthor problem in silicon industry, how to optimize dies distribute on a wafer? https://www.waferworld.com/post/what-is-a-die http://www.silicon-edge.co.uk/j/index.php/resources/die-per-wafer ... |
| ![enter image description here][1] &[Wolfram Notebook][2] [1]: https://community.wolfram.com//c/portal/getImageAttachment?filename=animate_X_4.gif&userId=20103 [2]: https://www.wolframcloud.com/obj/eec122d4-8de6-4764-a305-0372b3981472 |
| You might be interesting to find Escher's Doric Columns (1945). ![enter image description here][1] https://www.wikiart.org/en/m-c-escher/doric-columns [1]:... |