{"version":"1.0","author_url":"https://blog.hatena.ne.jp/spherical_harmonics/","title":"1922\u5e74(\u5927\u6b6311\u5e74)\u4eac\u90fd\u5e1d\u570b\u5927\u5b78\u5de5\u5b78\u90e8-\u6578\u5b78(\u51684\u554f)","width":"100%","provider_url":"https://hatena.blog","html":"<iframe src=\"https://hatenablog-parts.com/embed?url=https%3A%2F%2Fspherical-harmonics.hateblo.jp%2Fentry%2FKyodai%2F1922%2FKougaku_0\" title=\"1922\u5e74(\u5927\u6b6311\u5e74)\u4eac\u90fd\u5e1d\u570b\u5927\u5b78\u5de5\u5b78\u90e8-\u6578\u5b78(\u51684\u554f) - [\u5225\u9928]\u7403\u9762\u5036\u697d\u90e8\u96f6\u516b\u5f0fmarkIISR\" class=\"embed-card embed-blogcard\" scrolling=\"no\" frameborder=\"0\" style=\"display: block; width: 100%; height: 190px; max-width: 500px; margin: 10px 0px;\"></iframe>","provider_name":"Hatena Blog","author_name":"spherical_harmonics","height":"190","image_url":null,"description":"2025.01.13\u8a18 [1] Find the common area of two equal circles (radii ), the center of each being of the circumference of the other.[2] Find the values of between and , satisfying the equation .[3] Find the radius of curvature of an ellipse (semi major and minor axes , and ) at the major axis end.[4] Fin\u2026","url":"https://spherical-harmonics.hateblo.jp/entry/Kyodai/1922/Kougaku_0","blog_title":"[\u5225\u9928]\u7403\u9762\u5036\u697d\u90e8\u96f6\u516b\u5f0fmarkIISR","published":"1922-02-01 14:48:35","categories":[],"type":"rich","blog_url":"https://spherical-harmonics.hateblo.jp/"}