设函数f(x)在[a,b]上连续,证明：∫(a→b)f(x)dx=(b-a)∫(0→1)f[a+(b-a)x]dx

设函数f(x)在[a,b]上连续,证明：∫(a→b)f(x)dx=(b-a)∫(0→1)f[a+(b-a)x]dx 设f‘(x)在[a,b]上连续,且f(a)=0,证明:|∫b a f(x)dx| 设函数f(x)在区间[a,b]上连续,证明:∫f(x)dx=f(a+b-x)dx 设f(x)在区间 [a,b]上连续,证明1/(b-a)∫f(x)dx≤(1/(b-a)∫f²(x)dx)^&# 设f(x)在区间[a,b]上连续,证明∫上限a,下限b.f(x)dx=∫上限a,下限bf(a+b-x)dx. 设f'(x)在[a,b]上连续,证明:lim(λ→+∞)∫(a,b)f(x)cos(λx)dx=0 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]上连续,且f(b)=a,f(a)=b,证明∫(上b下a)f(x)f'(x)dx=1/2(a 设函数f（x）在区间[a,b]上连续,在(a,b)内可导,且∫(a,b)f(x)dx=f(b)(b-a).证明：在(a, 设函数f(x)在对称区间【-a,a】上连续,证明∫(-a,a)f(x)dx=∫(0,a)[f(x)+f(-x)]dx 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)^ 设函数f(x)在闭区间[a,b]上具有二阶导数,且f"(x)＞0,证明∫(a,b)f(x)dx＞f(