定积分 后面少打了个du
来源:学生作业帮 编辑:搜搜考试网作业帮 分类:数学作业 时间:2024/07/07 04:13:48
定积分
后面少打了个du
![](http://img.wesiedu.com/upload/7/41/741d962351f6a627f01f85ebd613de40.jpg)
后面少打了个du
![](http://img.wesiedu.com/upload/7/41/741d962351f6a627f01f85ebd613de40.jpg)
![定积分 后面少打了个du](/uploads/image/z/20068463-47-3.jpg?t=%E5%AE%9A%E7%A7%AF%E5%88%86+%E5%90%8E%E9%9D%A2%E5%B0%91%E6%89%93%E4%BA%86%E4%B8%AAdu)
求定积分[-π/3,π/3]∫[(3/4)tan²u+(3√3/2)tanu+9/4]du
原式=[-π/3,π/3]∫[(3/4)tan²u+9/4]du+[-π/3,π/3]∫[(3√3/2)tanu]du
=[-π/3,π/3]∫[(3/4)tan²u+9/4]du+0 (tanu是奇函数,在对称区间上的积分=0)
=[-π/3,π/3]∫(3/4)(tan²u+1)du+[-π/3,π/3]∫(6/4)du
=[-π/3,π/3](3/4)∫(sec²udu+[-π/3,π/3]∫(3/2)du
=[(3/4)tanu+(3/2)u]︱[-π/3,π/3]=(3/4)[tan(π/3)-tan(-π/3)]+(3/2)[(π/3)-(-π/3)]
=(3/4)(√3+√3)+(3/2)(π/3+π/3)=[(3/2)√3]+π
原式=[-π/3,π/3]∫[(3/4)tan²u+9/4]du+[-π/3,π/3]∫[(3√3/2)tanu]du
=[-π/3,π/3]∫[(3/4)tan²u+9/4]du+0 (tanu是奇函数,在对称区间上的积分=0)
=[-π/3,π/3]∫(3/4)(tan²u+1)du+[-π/3,π/3]∫(6/4)du
=[-π/3,π/3](3/4)∫(sec²udu+[-π/3,π/3]∫(3/2)du
=[(3/4)tanu+(3/2)u]︱[-π/3,π/3]=(3/4)[tan(π/3)-tan(-π/3)]+(3/2)[(π/3)-(-π/3)]
=(3/4)(√3+√3)+(3/2)(π/3+π/3)=[(3/2)√3]+π