填空题
∫x
3
e
x2
dx= 1.
- 1、
【正确答案】
1、{{*HTML*}}正确答案:
【答案解析】解析:原式=
∫x
2
e
x2
d(x
2
)=
∫x
2
de
x2
=
[x
2
e
x2
-∫e
x2
d(x
2
)]=
(x
2
e
x2
-e
x2
)+C =
∫x
2
e
x2
d(x
2
)=
∫x
2
de
x2
=
[x
2
e
x2
-∫e
x2
d(x
2
)]=
(x
2
e
x2
-e
x2
)+C =