设f(x)在[a,b]上可导,且f'(x)≤M,f(a)=0,求证∫(a,b)f(x)dx≤M/2(b-a)^2
设f(x)在[a,b]上可导,且f'(x)≤M,f(a)=0,求证∫(a,b)f(x)dx≤M/2(b-a)^2
设 f(x)在〔a,b〕上具有一阶连续导数,且|f‘ (x)|≤M,f(a)=f(b)=0,求证∫(a,b)f(x)dx
若f(x)在[a,b]上连续,在(a,b)内可导,|f'(x)|小于等于M,f(a)=0,求证:f(x)dx在[a,b]
设f(x) 在[a,b] 上连续,且f(x)>0.求证:∫(a,b)f(x)dx*∫(a,bdx/f(x)≥(b-a)^
设f‘(x)在[a,b]上连续,且f(a)=0,证明:|∫b a f(x)dx|
设f'(x)在[a,b]上连续,且f(a)=0,│∫(a~b)f(x)dx│≤((b-a)^2)/2)max(a≤x≤b
设f(x)=lgx,a>0,b>0,且a不等于b,求证f(a)+f(b)/2
设f(x)在[a,b]上连续,且f(b)=a,f(a)=b,证明∫(上b下a)f(x)f'(x)dx=1/2(a
设f(x)在[a,b]上连续,且f(x)>0,证明:∫b a f(x)dx*∫b a 1/f(x)dx≥(b-a)^2
设f(x)在[a,b]连续且f′(x)>0,证明∫(a,b) xf(x)dx≥(a+b)/2 ∫(a,b)f(x)dx
设函数f(x)在【a,b】上连续且单调增加,求证∫[a ,b] xf(x)dx >=a+b/2∫[a ,b] f(x)d
设f(x)在[a,b]上连续,在(a,b)内可导,f(a)f(b)>0,f(a)f[(a+b)/2]0,f(a)f[(a