作业帮高数积分上限函数
来源:学生作业帮 编辑:作业帮 分类:数学作业 时间:2024/05/15 08:16:40
高数积分上限函数
F(x) = ∫(0->x) xf'(t)dt ; x≠0
=0 ; x=0
∫ (0->x) xf'(t)dt
= ∫(0->x) xdf(t)
=x[f(t)](0->x)
=x[ f(x) - f(0) ]
=xf(x)
lim(x->0) F(x)
=lim(x->0)xf(x)
=0
f(0) cts
F'(0) =lim(h->0)[ F(h) -F(0)] /h
=lim(h->0)hf(h)/h
= f(0)
x≠0
F'(x) = lim(h->0) [F(x+h) - F(x)]/ h
=lim(h->0)[ ∫(0->x+h) (x+h) f'(t)dt - ∫(0->x) xf'(t)dt ] /h
=lim(h->0) [ (x+h)f(x+h) -xf(x) ] /h (0/0)
=lim(h->0) [ (x+h)f'(x+h) + f(x+h) ]
=xf'(x) + f(x)
F'(x) cts 再答: 最后是=F'(0)
再问: x不等于0求导错了吧
再问: 应该是两个相乘求导
再答: f'(x)是不含有t的 可以提到积分符号外面
=0 ; x=0
∫ (0->x) xf'(t)dt
= ∫(0->x) xdf(t)
=x[f(t)](0->x)
=x[ f(x) - f(0) ]
=xf(x)
lim(x->0) F(x)
=lim(x->0)xf(x)
=0
f(0) cts
F'(0) =lim(h->0)[ F(h) -F(0)] /h
=lim(h->0)hf(h)/h
= f(0)
x≠0
F'(x) = lim(h->0) [F(x+h) - F(x)]/ h
=lim(h->0)[ ∫(0->x+h) (x+h) f'(t)dt - ∫(0->x) xf'(t)dt ] /h
=lim(h->0) [ (x+h)f(x+h) -xf(x) ] /h (0/0)
=lim(h->0) [ (x+h)f'(x+h) + f(x+h) ]
=xf'(x) + f(x)
F'(x) cts 再答: 最后是=F'(0)
再问: x不等于0求导错了吧
再问: 应该是两个相乘求导
再答: f'(x)是不含有t的 可以提到积分符号外面