{"code": 200, "formatter": "summarize", "rules": "<pre><code class=\"summarize\">Data distribution:\n    \u8679\u819c - \u5f17\u5409\u5c3c\u4e9a: 33.33% (50 instances)\n    \u8679\u819csetosa: 33.33% (50 instances)\n    \u8679\u819c\u4e91\u829d: 33.33% (50 instances)\n\n\nPredicted distribution:\n    \u8679\u819c - \u5f17\u5409\u5c3c\u4e9a: 33.33% (50 instances)\n    \u8679\u819csetosa: 33.33% (50 instances)\n    \u8679\u819c\u4e91\u829d: 33.33% (50 instances)\n\n\nField importance:\n    1. \u82b1\u74e3\u957f: 70.19%\n    2. \u82b1\u74e3\u5bbd: 29.09%\n    3. \u843c\u7247\u5bbd: 0.71%\n\n\nRules summary:\n\n\n\u8679\u819c - \u5f17\u5409\u5c3c\u4e9a: (data 33.33% / prediction 33.33%) \u82b1\u74e3\u957f > 2.45\n    \u00b7 86.00%: \u82b1\u74e3\u957f > 4.85 and \u82b1\u74e3\u5bbd > 1.75 [Confidence: 91.80%]\n\n    \u00b7 6.00%: \u82b1\u74e3\u957f > 4.95 and \u82b1\u74e3\u5bbd <= 1.55 [Confidence: 43.85%]\n\n    \u00b7 4.00%: 2.45 < \u82b1\u74e3\u957f <= 4.85  and \u82b1\u74e3\u5bbd > 1.75 and \u843c\u7247\u5bbd <= 3.1 [Confidence: 34.24%]\n\n    \u00b7 2.00%: 2.45 < \u82b1\u74e3\u957f <= 4.95  and 1.65 < \u82b1\u74e3\u5bbd <= 1.75  [Confidence: 20.65%]\n\n    \u00b7 2.00%: \u82b1\u74e3\u957f > 5.45 and 1.55 < \u82b1\u74e3\u5bbd <= 1.75  [Confidence: 20.65%]\n\n\n\u8679\u819csetosa: (data 33.33% / prediction 33.33%) \u82b1\u74e3\u957f <= 2.45 [Confidence: 92.86%]\n\n\n\u8679\u819c\u4e91\u829d: (data 33.33% / prediction 33.33%) \u82b1\u74e3\u957f > 2.45\n    \u00b7 94.00%: 2.45 < \u82b1\u74e3\u957f <= 4.95  and \u82b1\u74e3\u5bbd <= 1.65 [Confidence: 92.44%]\n\n    \u00b7 4.00%: 4.95 < \u82b1\u74e3\u957f <= 5.45  and 1.55 < \u82b1\u74e3\u5bbd <= 1.75  [Confidence: 34.24%]\n\n    \u00b7 2.00%: 2.45 < \u82b1\u74e3\u957f <= 4.85  and \u82b1\u74e3\u5bbd > 1.75 and \u843c\u7247\u5bbd > 3.1 [Confidence: 20.65%]\n</code></pre>"}