填空题
9.设f(x)二阶连续可导,且f(0)=1,f(2)=3,f'(2)=5,则∫01xf(2x)dx=________.
- 1、
【正确答案】
1、2
【答案解析】∫01xf''(2x)dx=
∫012xf''(2x)d(2x)
∫02tf''(t)dt=
∫02tdf'(t)
=
[tf'(t)|02-∫02f'(t)dt]=
∫012xf''(2x)d(2x)∫02tf''(t)dt=∫02tdf'(t)=
[tf'(t)|02-∫02f'(t)dt]=