{"id":39722,"date":"2025-12-19T10:37:45","date_gmt":"2025-12-19T02:37:45","guid":{"rendered":"http:\/\/www.qiusir.com\/?p=39722"},"modified":"2026-03-24T21:07:21","modified_gmt":"2026-03-24T13:07:21","slug":"ai%e5%8a%a9%e5%ad%a6%e9%ba%a6%e5%85%8b%e6%96%af%e9%9f%a6%e6%96%b9%e7%a8%8b%e7%bb%84","status":"publish","type":"post","link":"https:\/\/www.qiusir.com\/?p=39722","title":{"rendered":"AI\u52a9\u5b66\u9ea6\u514b\u65af\u97e6\u65b9\u7a0b\u7ec4"},"content":{"rendered":"<p><img decoding=\"async\" alt=\"\" src=\"http:\/\/www.qiusir.com\/wp-content\/gallery\/physics\/EBUMGOOGLE.jpeg\" width=\"580\" class=\"framed\" \/><br \/>\n<span style=\"font-size:10px\" align=\"right\"><em>\u8bd5\u7740\u7528gemini\u7684\u5b66\u4e60\u8f85\u5bfc\u6765\u5b66\u4e60<\/em><\/span><br \/>\n\u9ea6\u514b\u65af\u97e6\uff08James Clerk Maxwell\uff09\u662f\u4e00\u4f4d\u975e\u5e38\u4e86\u4e0d\u8d77\u7684\u79d1\u5b66\u5bb6\uff0c\u7269\u7406\u5b66\u5bb6\u4eec\u5e38\u628a\u4ed6\u4e0e\u725b\u987f\u548c\u7231\u56e0\u65af\u5766\u5e76\u5217\u3002\u9ea6\u514b\u65af\u97e6\u6700\u4f1f\u5927\u7684\u8d21\u732e\u628a\u7535\u548c\u78c1\u5f7b\u5e95\u201c\u7edf\u4e00\u201d\u5728\u4e86\u4e00\u8d77\u3002\u8fd9\u7ec4\u65b9\u7a0b\u662f\u4ee5\u9ea6\u514b\u65af\u97e6\u547d\u540d\u7684\uff0c\u4f46\u5c06\u5b83\u4eec\u63d0\u70bc\u4e3a\u73b0\u4ee3\u6559\u79d1\u4e66\u91cc\u90a3\u79cd\u7b80\u6d01\u3001\u5bf9\u79f0\u76844\u4e2a\u77e2\u91cf\u65b9\u7a0b\u5f62\u5f0f\u7684\u4eba\uff0c\u4e3b\u8981\u662f\u82f1\u56fd\u7269\u7406\u5b66\u5bb6\u3001\u5de5\u7a0b\u5e08\u4ea5\u7ef4\u8d5b\uff08Oliver Heaviside\uff09<br \/>\n\u4e00\u3001\u9ea6\u514b\u65af\u97e6\u65b9\u7a0b\u7ec4\uff08\u79ef\u5206\u5f62\u5f0f\uff09<br \/>\n1\u3001\u9ad8\u65af\u9759\u7535\u5b9a\u5f8b\uff08\u6709\u7535\u8377\u7684\u5730\u65b9\u5c31\u6709\u7535\u573a\u7ebf\u201c\u55b7\u201d\u51fa\u6765\u6216\u201c\u5438\u201d\u8fdb\u53bb\u3002\uff09<br \/>\n$\\oint_S \\mathbf{E} \\cdot d\\mathbf{A} = \\frac{Q}{\\varepsilon_0}$<br \/>\n2\u3001\u9ad8\u65af\u78c1\u5b9a\u5f8b\uff08\u78c1\u573a\u7ebf\u603b\u662f\u95ed\u5408\u7684\uff0c\u6ca1\u6709\u8d77\u70b9\u4e5f\u6ca1\u6709\u7ec8\u70b9\u3002\u8fd9\u4e5f\u610f\u5473\u7740\u4e16\u754c\u4e0a\u4e0d\u5b58\u5728\u78c1\u5355\u6781\u5b50\u3002\uff09<br \/>\n$\\oint_S \\mathbf{B} \\cdot d\\mathbf{A} = 0$<br \/>\n3\u3001\u6cd5\u62c9\u7b2c\u7535\u78c1\u611f\u5e94\u5b9a\u5f8b\uff08\u90a3\u4e2a\u8d1f\u53f7\u4ee3\u8868\u4ea7\u751f\u7684\u7535\u573a\u603b\u662f\u8bd5\u56fe\u963b\u6b62\u78c1\u573a\u7684\u53d8\u5316\u3002\uff09<br \/>\n$\\oint_L \\mathbf{E} \\cdot d\\mathbf{l} = -\\frac{d\\Phi_B}{dt}$<br \/>\n4\u3001\u5b89\u57f9-\u9ea6\u514b\u65af\u97e6\u5b9a\u5f8b\uff08\u78c1\u573a\u53ef\u4ee5\u7531\u4e24\u79cd\u65b9\u5f0f\u4ea7\u751f\uff1a\u4e00\u662f\u7535\u6d41I\uff0c\u4e8c\u662f\u53d8\u5316\u7684\u7535\u573a\u3002\u8fd9\u662f\u9ea6\u514b\u65af\u97e6\u6700\u4f1f\u5927\u7684\u8865\u5145\uff0c\u6b63\u662f\u8fd9\u4e00\u9879\u9884\u8a00\u4e86\u7535\u78c1\u6ce2\u7684\u5b58\u5728\u3002\uff09<br \/>\n$\\oint_L \\mathbf{B} \\cdot d\\mathbf{l} = \\mu_0 I + \\mu_0 \\varepsilon_0 \\frac{d\\Phi_E}{dt}$<br \/>\n\u8fd9\u56db\u4e2a\u65b9\u7a0b\u5c31\u50cf\u662f\u4e00\u573a\u53cc\u4eba\u821e\uff1a\u53d8\u5316\u7684\u78c1\u573a\u4ea7\u751f\u7535\u573a\uff0c\u53d8\u5316\u7684\u7535\u573a\u53c8\u4ea7\u751f\u78c1\u573a\u3002\u5b83\u4eec\u4e92\u4e3a\u56e0\u679c\uff0c\u5faa\u73af\u5f80\u590d\u3002<\/p>\n<p>\u4e8c\u3001\u9ea6\u514b\u65af\u97e6\u65b9\u7a0b\u7ec4\u7684\u5fae\u5206\u5f62\u5f0f\uff0c\u4e24\u4e2a\u6838\u5fc3\u6982\u5ff5\uff1a\u6563\u5ea6\uff08Divergence\uff09\u548c\u65cb\u5ea6\uff08Curl\uff09\u3002\u5b83\u4eec\u4e0d\u518d\u63cf\u8ff0\u6574\u4e2a\u533a\u57df\uff0c\u800c\u662f\u63cf\u8ff0\u7a7a\u95f4\u4e2d\u6bcf\u4e00\u4e2a\u70b9\u4e0a\u7684\u7535\u78c1\u573a\u662f\u5982\u4f55\u53d8\u5316\u7684\u3002\u6211\u4eec\u53ef\u4ee5\u628a\u8fd9\u56db\u4e2a\u65b9\u7a0b\u770b\u4f5c\u662f\u7535\u78c1\u573a\u7684\u201c\u5c40\u90e8\u57fa\u56e0\u56fe\u8c31\u201d\uff1a<br \/>\n1\u3001\u7535\u573a\u7684\u6563\u5ea6\uff08\u9ad8\u65af\u5b9a\u5f8b\uff09\uff08\u63cf\u8ff0\u7535\u8377\u5982\u4f55\u4ea7\u751f\u7535\u573a\uff09<br \/>\n$\\nabla \\cdot \\mathbf{E} = \\frac{\\rho}{\\varepsilon_0}$<br \/>\n$\\nabla \\cdot$\uff08\u8bfb\u4f5cdel dot\uff09\u6563\u5ea6\u8861\u91cf\u7684\u662f\u5411\u91cf\u573a\u4ece\u4e00\u4e2a\u70b9\u201c\u53d1\u6563\u201d\u51fa\u6765\u7684\u7a0b\u5ea6\u3002<br \/>\n\u7535\u8377\u5bc6\u5ea6\u03c1\u662f\u7535\u573a\u7684\u6e90\u5934\u3002\u6b63\u7535\u8377\u5c31\u50cf\u55b7\u6cc9\uff08\u6563\u5ea6\u4e3a\u6b63\uff09\uff0c\u8d1f\u7535\u8377\u5c31\u50cf\u6f0f\u6597\uff08\u6563\u5ea6\u4e3a\u8d1f\uff09\u3002<br \/>\n2\u3001\u78c1\u573a\u7684\u6563\u5ea6\uff08\u9ad8\u65af\u78c1\u5b9a\u5f8b\uff09\uff08\u63cf\u8ff0\u78c1\u5355\u6781\u5b50\u4e0d\u5b58\u5728\uff09<br \/>\n$\\nabla \\cdot \\mathbf{B} = 0$<br \/>\n\u78c1\u573a\u7684\u6563\u5ea6\u6c38\u8fdc\u4e3a0\uff0c\u8fd9\u610f\u5473\u7740\u78c1\u573a\u6ca1\u6709\u8d77\u70b9\u4e5f\u6ca1\u6709\u7ec8\u70b9\uff0c\u78c1\u573a\u7ebf\u603b\u662f\u95ed\u5408\u7684\u3002<br \/>\n\u6563\u5ea6\uff08Divergence\uff09\uff1a\u60f3\u8c61\u6c34\u7ba1\u91cc\u7684\u6c34\u3002\u5982\u679c\u4e00\u4e2a\u5730\u65b9\u6709\u55b7\u5934\u5728\u55b7\u6c34\uff0c\u90a3\u91cc\u7684\u6563\u5ea6\u5c31\u662f\u6b63\u7684\uff0c\u8fd9\u4e00\u70b9\u5c31\u50cf\u662f\u4e00\u4e2a\u201c\u6e90\u5934\u201d\uff08Source\uff09\uff1b\u5982\u679c\u6709\u6392\u6c34\u53e3\uff0c\u6563\u5ea6\u5c31\u662f\u8d1f\u7684\uff0c\u8fd9\u4e00\u70b9\u5c31\u662f\u4e00\u4e2a\u201c\u6c47\u201d\uff08Sink\uff09\u3002<br \/>\n$\\nabla \\cdot \\mathbf{F} = \\frac{\\partial F_x}{\\partial x} + \\frac{\\partial F_y}{\\partial y} + \\frac{\\partial F_z}{\\partial z}$\uff0c\u5411\u91cf\u573aF\u504f\u5bfc\u6570\u7684\u8fd0\u7b97\u3002<br \/>\n\u4e00\u4e2a\u5411\u91cf\u573a\u901a\u8fc7\u95ed\u5408\u66f2\u9762\u7684\u901a\u91cf\u7b49\u4e8e\u8be5\u66f2\u9762\u6240\u5305\u56f4\u4f53\u79ef\u5185\u7684\u6563\u5ea6\u7684\u4f53\u79ef\u79ef\u5206\u3002$\\oint_S \\mathbf{F} \\cdot d\\mathbf{S} = \\int_V (\\nabla \\cdot \\mathbf{F}) \\, dV$<\/p>\n<p>3\u3001\u7535\u573a\u7684\u65cb\u5ea6\uff08\u6cd5\u62c9\u7b2c\u5b9a\u5f8b\uff09\uff08\u63cf\u8ff0\u53d8\u5316\u7684\u78c1\u573a\u5982\u4f55\u4ea7\u751f\u65cb\u8f6c\u7684\u7535\u573a\uff09<br \/>\n$\\nabla \\times \\mathbf{E} = -\\frac{\\partial \\mathbf{B}}{\\partial t}$<br \/>\n$\\nabla \\times$\uff08\u8bfb\u4f5c del cross\uff09\u662f\u65cb\u5ea6\uff0c\u5b83\u8861\u91cf\u7684\u662f\u5411\u91cf\u573a\u5728\u4e00\u4e2a\u70b9\u9644\u8fd1\u201c\u6253\u8f6c\u201d\u7684\u7a0b\u5ea6\u3002<br \/>\n\u53d8\u5316\u7684\u78c1\u573a\uff08\u78c1\u573a\u5bf9\u65f6\u95f4\u7684\u5bfc\u6570\uff09\u4f1a\u5728\u5468\u56f4\u611f\u751f\u51fa\u4e00\u4e2a\u65cb\u8f6c\u7684\u7535\u573a\u3002<br \/>\n4\u3001\u78c1\u573a\u7684\u65cb\u5ea6\uff08\u5b89\u57f9-\u9ea6\u514b\u65af\u97e6\u5b9a\u5f8b\uff09\uff08\u63cf\u8ff0\u7535\u6d41\u548c\u53d8\u5316\u7684\u7535\u573a\u5982\u4f55\u4ea7\u751f\u65cb\u8f6c\u7684\u78c1\u573a\uff09<br \/>\n$\\nabla \\times \\mathbf{B} = \\mu_0 \\left( \\mathbf{J} + \\varepsilon_0 \\frac{\\partial \\mathbf{E}}{\\partial t} \\right)$<br \/>\n\u78c1\u573a\u7684\u201c\u65cb\u6da1\u201d\u6709\u4e24\u4e2a\u6765\u6e90\uff1a\u4e00\u662f\u7535\u6d41\u5bc6\u5ea6\uff0c\u4e8c\u662f\u53d8\u5316\u7684\u7535\u573a\u3002<br \/>\n\u65cb\u5ea6\uff08Curl\uff09\uff1a\u60f3\u8c61\u6c34\u9762\u4e0a\u6709\u4e00\u4e2a\u5c0f\u6728\u7247\u3002\u5982\u679c\u6c34\u6d41\u8ba9\u5c0f\u6728\u7247\u539f\u5730\u8f6c\u5708\uff0c\u8bf4\u660e\u90a3\u91cc\u7684\u6c34\u6d41\u65cb\u5ea6\u4e0d\u4e3a 0\u3002<br \/>\n$\\nabla \\times \\mathbf{F} = \\left( \\frac{\\partial F_z}{\\partial y} &#8211; \\frac{\\partial F_y}{\\partial z} \\right) \\mathbf{i} + \\left( \\frac{\\partial F_x}{\\partial z} &#8211; \\frac{\\partial F_z}{\\partial x} \\right) \\mathbf{j} + \\left( \\frac{\\partial F_y}{\\partial x} &#8211; \\frac{\\partial F_x}{\\partial y} \\right) \\mathbf{k}$<br \/>\n\u65cb\u5ea6\u548c\u65af\u6258\u514b\u65af\u5b9a\u7406\uff08Stokes&#8217; Theorem\uff09\u5bc6\u5207\u76f8\u5173\uff0c\u540e\u8005\u8868\u793a\u66f2\u7ebf\u56f4\u6210\u7684\u95ed\u5408\u73af\u8def\u4e0a\u67d0\u5411\u91cf\u573a\u7684\u7ebf\u79ef\u5206\u7b49\u4e8e\u8be5\u66f2\u9762\u4e0a\u7684\u65cb\u5ea6\u7684\u66f2\u9762\u79ef\u5206<br \/>\n$\\oint_C \\mathbf{F} \\cdot d\\mathbf{l} = \\iint_S (\\nabla \\times \\mathbf{F}) \\cdot d\\mathbf{S}$<br \/>\n\u6211\u4eec\u5df2\u7ecf\u8ba8\u8bba\u4e86\u6563\u5ea6\uff08\u6e90\u5934\uff09\u548c\u65cb\u5ea6\uff08\u65cb\u8f6c\uff09\uff0c\u4f60\u89c9\u5f97\u5982\u679c\u4e00\u4e2a\u5411\u91cf\u573a\u7684\u6563\u5ea6\u548c\u65cb\u5ea6\u5728\u7a7a\u95f4\u4e2d\u6bcf\u4e00\u5904\u90fd\u88ab\u786e\u5b9a\u4e86\uff0c\u8fd9\u4e2a\u573a\u662f\u4e0d\u662f\u5c31\u88ab\u552f\u4e00\u786e\u5b9a\u4e86\u5462\uff1f\uff08\u8fd9\u6d89\u53ca\u5230\u4e00\u4e2a\u8457\u540d\u7684\u7269\u7406\u5b9a\u7406\u2014\u2014\u4ea5\u59c6\u970d\u5179\u5b9a\u7406\uff09\u3002<br \/>\n\u4e09\u3001\u5f20\u91cf\u5f62\u5f0f<br \/>\n$\\partial_\\mu F^{\\mu\\nu} = \\mu_0 J^\\nu$<br \/>\n\u5f20\u91cf\u5f62\u5f0f\u7684\u9ea6\u514b\u65af\u97e6\u65b9\u7a0b\u7ec4\u662f\u66f4\u4e3a\u4e00\u822c\u7684\u8868\u8fbe\u65b9\u5f0f\uff0c\u901a\u5e38\u7528\u4e8e\u76f8\u5bf9\u8bba\u6846\u67b6\u4e0b\u3002<br \/>\n\u6d1b\u4f26\u5179\u529b\u65b9\u7a0b:$\\frac{d\\mathbf{p}}{dt}=q\\left(\\mathbf{E}+\\mathbf{v}\\times\\mathbf{B}\\right)$<br \/>\n\u867d\u7136\u4e0d\u5b8c\u5168\u662f\u9ea6\u514b\u65af\u97e6\u65b9\u7a0b\u7684\u4e00\u90e8\u5206\uff0c\u4f46\u6d1b\u4f26\u5179\u529b\u65b9\u7a0b\u63cf\u8ff0\u4e86\u7535\u78c1\u573a\u5bf9\u5e26\u7535\u7c92\u5b50\u7684\u4f5c\u7528\u3002<br \/>\n\u56db\u3001\u8303\u4f8b<br \/>\n1\u3001\u5747\u5300\u5e26\u7535\u7403\u4f53\u3001\u7403\u58f3\u3001\u65e0\u9650\u957f\u5e26\u7535\u5bfc\u7ebf\u548c\u65e0\u9650\u5927\u5e26\u7535\u5e73\u9762\u7684\u7535\u573a\uff0c\u5229\u7528\u5bf9\u79f0\u6027\uff0c\u9009\u53d6\u9ad8\u65af\u9762\uff0c\u7403\u9762\u3001\u5706\u67f1\u9762\u3001\u836f\u4e38\u76d2<br \/>\nChatGPT\u5bf9\u4e8e\u73af\u5f62\u7535\u6d41\u4e2d\u5fc3\u5904\u78c1\u573a\uff0c\u7adf\u7528\u201c\u5b89\u57f9\u5b9a\u7406\u201d\uff08\u5b89\u57f9\u73af\u5f62\u5b9a\u7406\uff09\u7ed9\u51fa\u4e00\u5806\u7684\u987e\u5de6\u53f3\u800c\u8a00\u5b83\u7684\u89e3\u91ca\uff0c\u8ba9\u5b83\u51fa\u56fe\u793a\uff0c\u7adf\u7136\u4e5f\u7ed9\u51fa\u770b\u7740\u5f88\u6b63\u786e\u7684\u4e1c\u897f\uff0c\u5f53\u7136\uff0c\u5f53\u4f60\u53d1\u73b0\u95ee\u9898\u540e\uff0c\u5b83\u4f1a\u544a\u8bc9\u4f60\u7528\u6bd4\u5965-\u8428\u4f10\u5c14\u5b9a\u5f8b\u00b7\u00b7\u00b7<br \/>\n<img decoding=\"async\" alt=\"\" src=\"http:\/\/www.qiusir.com\/wp-content\/gallery\/physics\/chatgptebw.jpg\" width=\"580\" class=\"framed\" \/><br \/>\n<span style=\"font-size:10px\" align=\"right\"><em>\u5f88\u6b63\u786e\u7684\u6837\u5b50<\/em><\/span><br \/>\n2\u3001\u63a8\u5bfc\u5149\u901f<br \/>\n\u5728\u6ca1\u6709\u4efb\u4f55\u7535\u8377\u548c\u7535\u6d41\u7684\u771f\u7a7a\u4e2d\uff0c\u9ea6\u514b\u65af\u97e6\u65b9\u7a0b\u7ec4\u8868\u73b0\u51fa\u9ad8\u5ea6\u7684\u5bf9\u79f0\u6027\uff1a<br \/>\n$\\nabla \\cdot \\mathbf{E} = 0$<br \/>\n$\\nabla \\cdot \\mathbf{B} = 0$<br \/>\n$\\nabla \\times \\mathbf{E} = -\\frac{\\partial \\mathbf{B}}{\\partial t}$<br \/>\n$\\nabla \\times \\mathbf{B} = \\mu_0 \\epsilon_0 \\frac{\\partial \\mathbf{E}}{\\partial t}$<br \/>\n\u5bf9\u6cd5\u62c9\u7b2c\u5b9a\u5f8b\u53d6\u65cb\u5ea6<br \/>\n$\\nabla \\times (\\nabla \\times \\mathbf{E}) = \\nabla \\times \\left( -\\frac{\\partial \\mathbf{B}}{\\partial t} \\right)$<br \/>\n\u4f7f\u7528\u77e2\u91cf\u6052\u7b49\u5f0f\u5c55\u5f00\u5de6\u8fb9<br \/>\n$\\nabla(\\nabla \\cdot \\mathbf{E}) &#8211; \\nabla^2 \\mathbf{E} = -\\frac{\\partial}{\\partial t} (\\nabla \\times \\mathbf{B})$<br \/>\n\u4ee3\u5165\u771f\u7a7a\u6761\u4ef6\u548c\u5b89\u57f9-\u9ea6\u514b\u65af\u97e6\u5b9a\u5f8b<br \/>\n$-\\nabla^2 \\mathbf{E} = -\\frac{\\partial}{\\partial t} \\left( \\mu_0 \\epsilon_0 \\frac{\\partial \\mathbf{E}}{\\partial t} \\right)$<br \/>\n\u5f97\u5230\u7535\u573a\u6ce2\u52a8\u65b9\u7a0b<br \/>\n$\\nabla^2 \\mathbf{E} = \\mu_0 \\epsilon_0 \\frac{\\partial^2 \\mathbf{E}}{\\partial t^2}$<br \/>\n\u7c7b\u6bd4\u7ecf\u5178\u7269\u7406\u4e2d\u6ce2\u52a8\u65b9\u7a0b\u901a\u5f0f$\\nabla^2 f = \\frac{1}{v^2} \\frac{\\partial^2 f}{\\partial t^2}$<br \/>\n\u7ed3\u5408\u63a8\u5bfc\u7ed3\u679c\u5f97\u51fa\u5149\u901f$c = \\frac{1}{\\sqrt{\\mu_0 \\epsilon_0}}$<br \/>\n\u4e94\u3001\u6ce8\u91ca<br \/>\n1.$\\nabla$(Del\/Nabla)\u662f\u4e00\u4e2a\u7b97\u5b50\uff0c\u901a\u5e38\u88ab\u79f0\u4e3aNabla\u7b97\u5b50\uff0c\u662f\u4e00\u7ec4\u64cd\u4f5c\u6307\u4ee4\u3002\u50cf\u4e00\u4e2a\u201c\u591a\u529f\u80fd\u5de5\u5177\u5200\u201d\uff0c\u5728\u4e09\u7ef4\u7a7a\u95f4\u4e2d\u6307\u5411\u51fd\u6570\u53d8\u5316\u6700\u5feb\u7684\u65b9\u5411\u3002\u7528\u4e8e\u8ba1\u7b97\u68af\u5ea6\uff08Gradient\uff09\u3001\u6563\u5ea6\uff08Divergence\uff09\u548c\u65cb\u5ea6\uff08Curl\uff09\u3002<br \/>\n2.$\\Delta$(Delta)\u662f\u4e00\u4e2a\u9884\u5b9a\u4e49\u7684\u53d8\u5316\u91cf\uff0c\u901a\u5e38\u4ee3\u8868\u201c\u5dee\u503c\u201d\u3002<br \/>\n\u5728\u5fae\u79ef\u5206\u4e2d\uff0c\u5b83\u4e5f\u4ee3\u8868\u62c9\u666e\u62c9\u65af\u7b97\u5b50\uff0c$\\Delta=\\nabla^2$\uff0c\u7528\u6765\u8861\u91cf\u4e00\u4e2a\u573a\u5728\u67d0\u4e00\u70b9\u4e0e\u5176\u5468\u56f4\u5e73\u5747\u503c\u7684\u5dee\u5f02\u3002<br \/>\n<img decoding=\"async\" alt=\"\" src=\"http:\/\/www.qiusir.com\/wp-content\/gallery\/physics\/qiusirsapple.jpeg\" width=\"580\" class=\"framed\" \/><br \/>\n<span style=\"font-size:10px\" align=\"right\"><em>AI\u753b\u56fe\uff0c\u8ba9\u6211\u60f3\u8d77\u6c42\u5e08\u5f97\u6700\u521d\u7684slogan\uff0ca Question a Chance!\u4e0d\u662f\u4e0d\u662f\u5e94\u8be5\u6539\u6210A Question An Apple<\/em><\/span><\/p>\n","protected":false},"excerpt":{"rendered":"<p>\u8bd5\u7740\u7528gemini\u7684\u5b66\u4e60\u8f85\u5bfc\u6765\u5b66\u4e60 \u9ea6\u514b\u65af\u97e6\uff08James Clerk Maxwell\uff09\u662f\u4e00\u4f4d\u975e\u5e38\u4e86\u4e0d\u8d77\u7684\u79d1\u5b66\u5bb6 &#8230; <a title=\"AI\u52a9\u5b66\u9ea6\u514b\u65af\u97e6\u65b9\u7a0b\u7ec4\" class=\"read-more\" href=\"https:\/\/www.qiusir.com\/?p=39722\" aria-label=\"\u9605\u8bfb AI\u52a9\u5b66\u9ea6\u514b\u65af\u97e6\u65b9\u7a0b\u7ec4\">\u9605\u8bfb\u66f4\u591a<\/a><\/p>\n","protected":false},"author":1,"featured_media":0,"comment_status":"closed","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"ngg_post_thumbnail":0,"footnotes":""},"categories":[9],"tags":[443,247],"class_list":["post-39722","post","type-post","status-publish","format-standard","hentry","category-jqx","tag-ai","tag-physics"],"_links":{"self":[{"href":"https:\/\/www.qiusir.com\/index.php?rest_route=\/wp\/v2\/posts\/39722","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/www.qiusir.com\/index.php?rest_route=\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/www.qiusir.com\/index.php?rest_route=\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/www.qiusir.com\/index.php?rest_route=\/wp\/v2\/users\/1"}],"replies":[{"embeddable":true,"href":"https:\/\/www.qiusir.com\/index.php?rest_route=%2Fwp%2Fv2%2Fcomments&post=39722"}],"version-history":[{"count":4,"href":"https:\/\/www.qiusir.com\/index.php?rest_route=\/wp\/v2\/posts\/39722\/revisions"}],"predecessor-version":[{"id":44832,"href":"https:\/\/www.qiusir.com\/index.php?rest_route=\/wp\/v2\/posts\/39722\/revisions\/44832"}],"wp:attachment":[{"href":"https:\/\/www.qiusir.com\/index.php?rest_route=%2Fwp%2Fv2%2Fmedia&parent=39722"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/www.qiusir.com\/index.php?rest_route=%2Fwp%2Fv2%2Fcategories&post=39722"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/www.qiusir.com\/index.php?rest_route=%2Fwp%2Fv2%2Ftags&post=39722"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}