[{"data":1,"prerenderedAt":-1},["ShallowReactive",2],{"$f4Z0z_aV4fHjop6gy7ytd1UrfkszmpUI5Vql1-s4Xd-c":3},{"answer":4,"createTime":5,"id":6,"options":7,"origin":12,"question":19,"related":20,"source":24,"type":25},[],"2025-05-10 15:48:42",186850220,[8,9,10,11],"\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F0143b9b33ef868e60cb91de8c7a9110b.png\">","\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002Fbd6245e6ab903226584ada4de7ad2fd4.png\">","\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F3e0279a0a8c4355ec5421a18828b3ea6.png\">","\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002Fe8ca335c63c0acf37f138285342d8df7.png\">",{"count":13,"courseId":14,"courseImg":15,"courseName":16,"workId":17,"workName":18},78,"ae92f49bc3d23cb23902a948a8b4dc24","https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002Fad190729952741de5b17b1ed210da488.png","高等数学","work_43406271","第十二章 练习题","不定积分《换元积分法,实际上是与微分学中的复合函数求导法相对应的一种积分方法.而分部积分法则是与微分学中的函数乘积求导法相对应的一种积分方法.∫udv=uv-∫vdu,这就是不定积分的分部积分公式.分部积分法主要用于求两类性质不同函数的乘积之积分.当∫udv不好计算,而∫vdu 易于计算,就可用分部积分公式来计算积分.》\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F369918cc07c33b4c6bedb824704525da.png\">结果为( )",[21,26,35,45,54,63,72,81,91,100],{"answer":22,"createTime":5,"id":6,"options":23,"question":19,"source":24,"type":25},[],[8,9,10,11],"v1",0,{"answer":27,"createTime":5,"id":28,"options":29,"question":34,"source":24,"type":25},[],186850222,[30,31,32,33],"\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002Ff9cda5e80350960a916d7dabde3c9a86.png\">","\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002Fad3be46f803805ff0ad2ab28c79b3e1b.png\">","\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F43875fc68c95bdeba5d92cb58034a96d.png\">","\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F9971cfc6dbf1706f99209c61049c1216.png\">","不定积分《换元积分法,实际上是与微分学中的复合函数求导法相对应的一种积分方法.而分部积分法则是与微分学中的函数乘积求导法相对应的一种积分方法.∫udv=uv-∫vdu,这就是不定积分的分部积分公式.分部积分法主要用于求两类性质不同函数的乘积之积分.当∫udv不好计算,而∫vdu 易于计算,就可用分部积分公式来计算积分.》\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F3e47ff8749757237a354413bf5ae67eb.png\">结果为( )",{"answer":36,"createTime":37,"id":38,"options":39,"question":44,"source":24,"type":25},[],"2025-05-22 17:43:50",186850224,[40,41,42,43],"\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F23027d6250b1333060d109fcc88c0ba4.png\">","\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002Fb69eec3620f814ae293e0159659a5eb2.png\">","\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F3a29b1091435945b3c7cbddb69ad7f9f.png\">","\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F272f2f4ec69f6fabca059418454e7f04.png\">","不定积分《换元积分法,实际上是与微分学中的复合函数求导法相对应的一种积分方法.而分部积分法则是与微分学中的函数乘积求导法相对应的一种积分方法.∫udv=uv-∫vdu,这就是不定积分的分部积分公式.分部积分法主要用于求两类性质不同函数的乘积之积分.当∫udv不好计算,而∫vdu 易于计算,就可用分部积分公式来计算积分.》\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002Fdf5ffee60f218a9c294dd765bd39ca12.png\">结果为( )",{"answer":46,"createTime":37,"id":47,"options":48,"question":53,"source":24,"type":25},[],186850226,[49,50,51,52],"\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F3707dc9150a8f3ba681fbd7dd707255a.png\">","\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F7861480b0893be4467f4113f7ed48927.png\">","\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F80c41ec9eb674e166be939a977b8419b.png\">","\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002Fe2eb080b6fb8bc1878258e31884cf2d0.png\">","不定积分《换元积分法,实际上是与微分学中的复合函数求导法相对应的一种积分方法.而分部积分法则是与微分学中的函数乘积求导法相对应的一种积分方法.∫udv=uv-∫vdu,这就是不定积分的分部积分公式.分部积分法主要用于求两类性质不同函数的乘积之积分.当∫udv不好计算,而∫vdu 易于计算,就可用分部积分公式来计算积分.》\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002Fa82d55879309fde03610bc2b6169809d.png\">结果为( )",{"answer":55,"createTime":37,"id":56,"options":57,"question":62,"source":24,"type":25},[],186850228,[58,59,60,61],"\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F17b6a0deda8857a86a48b2636f1400bf.png\">","\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F1d9f80a3edcca58669419298c2eca8be.png\">","\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F106e06eb040643bd97e4ed0a47b35708.png\">","\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F0fdd6a826c585217c217c234a8263949.png\">","不定积分《换元积分法,实际上是与微分学中的复合函数求导法相对应的一种积分方法.而分部积分法则是与微分学中的函数乘积求导法相对应的一种积分方法.∫udv=uv-∫vdu,这就是不定积分的分部积分公式.分部积分法主要用于求两类性质不同函数的乘积之积分.当∫udv不好计算,而∫vdu 易于计算,就可用分部积分公式来计算积分.》\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F8599ee2bb5556fad9d5e3561d23d2761.png\">结果为( )",{"answer":64,"createTime":37,"id":65,"options":66,"question":71,"source":24,"type":25},[],186850230,[67,68,69,70],"\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F9464b0d19939a38f8c299d0b67f40c52.png\">","\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F6514d130325bce4c6858c49f25a43bdc.png\">","\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F067b79b6350d28cde3b5ffda776d6dd8.png\">","\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F805876b2fa358887fdd2de4353629a7d.png\">","不定积分《换元积分法,实际上是与微分学中的复合函数求导法相对应的一种积分方法.而分部积分法则是与微分学中的函数乘积求导法相对应的一种积分方法.∫udv=uv-∫vdu,这就是不定积分的分部积分公式.分部积分法主要用于求两类性质不同函数的乘积之积分.当∫udv不好计算,而∫vdu 易于计算,就可用分部积分公式来计算积分.》\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F3b2052e6ba6e4c64e90f45c8b7312be8.png\">结果为( )",{"answer":73,"createTime":37,"id":74,"options":75,"question":80,"source":24,"type":25},[],186850232,[76,77,78,79],"xcosx+cosx+C","xsinx-cosx+C","xcosx-cosx+C","xsinx+cosx+C","不定积分《换元积分法,实际上是与微分学中的复合函数求导法相对应的一种积分方法.而分部积分法则是与微分学中的函数乘积求导法相对应的一种积分方法.∫udv=uv-∫vdu,这就是不定积分的分部积分公式.分部积分法主要用于求两类性质不同函数的乘积之积分.当∫udv不好计算,而∫vdu 易于计算,就可用分部积分公式来计算积分.》\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F60104415f31de7798464d1ebf177e070.png\">结果为( )",{"answer":82,"createTime":83,"id":84,"options":85,"question":90,"source":24,"type":25},[],"2025-05-10 15:48:43",186850234,[86,87,88,89],"\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F438b25b3718b1589d88751657587be62.png\">","\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F4f9ccad880319b3e22f8aa8a125a2f3d.png\">","\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F89845a438431bdeafc62e61f108e71c2.png\">","\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F45e1069dc8c5b6ac9ac444bfb91dfca2.png\">","不定积分《换元积分法,实际上是与微分学中的复合函数求导法相对应的一种积分方法.而分部积分法则是与微分学中的函数乘积求导法相对应的一种积分方法.∫udv=uv-∫vdu,这就是不定积分的分部积分公式.分部积分法主要用于求两类性质不同函数的乘积之积分.当∫udv不好计算,而∫vdu 易于计算,就可用分部积分公式来计算积分.》\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002Fafab140cec2458d9566a19f92c416869.png\">结果为( )",{"answer":92,"createTime":83,"id":93,"options":94,"question":99,"source":24,"type":25},[],186850236,[95,96,97,98],"\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002Fb23f27bc5bc9237af3007e1ea499d698.png\">","\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F3978607f40eaba6c225f5ab5ad506039.png\">","\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F1ee1ed9a3ce6a437855d448146ffbfcb.png\">","\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F55038a46a5840e739525e31e3f5bdbd1.png\">","不定积分《换元积分法,实际上是与微分学中的复合函数求导法相对应的一种积分方法.而分部积分法则是与微分学中的函数乘积求导法相对应的一种积分方法.∫udv=uv-∫vdu,这就是不定积分的分部积分公式.分部积分法主要用于求两类性质不同函数的乘积之积分.当∫udv不好计算,而∫vdu 易于计算,就可用分部积分公式来计算积分.》\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F6dd8fe8180f6334b950af72b488073de.png\">结果为( )",{"answer":101,"createTime":37,"id":102,"options":103,"question":108,"source":24,"type":25},[],186850238,[104,105,106,107],"\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002Fc76d623f054144c166de3060a4cac958.png\">","\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002Fb36e215a5729722a6ba7d96d95461f39.png\">","\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F378e1a6b24cf0b30a214c8b71d5b6b62.png\">","\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002Fd091790f04b8192b2745c3b0644454a8.png\">","不定积分《换元积分法,实际上是与微分学中的复合函数求导法相对应的一种积分方法.而分部积分法则是与微分学中的函数乘积求导法相对应的一种积分方法.∫udv=uv-∫vdu,这就是不定积分的分部积分公式.分部积分法主要用于求两类性质不同函数的乘积之积分.当∫udv不好计算,而∫vdu 易于计算,就可用分部积分公式来计算积分.》\u003Cimg src=\"https:\u002F\u002Ftihai-oss-cloud.itihey.com\u002Fimg\u002F2c2b24c1c40e2d9edf27e5732cff1169.png\">结果为( )"]