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  3. 设f(x)在[a,b]上连续,证明:∫abf(x)dx∫xbf(y)dy=[∫abf(x)dx]2.

设f(x)在[a,b]上连续,证明:∫abf(x)dx∫xbf(y)dy=[∫abf(x)dx]2.

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问题 设f(x)在[a,b]上连续,证明:∫abf(x)dx∫xbf(y)dy=[∫abf(x)dx]2
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答案令F(x)=∫abf(t)dt, 则∫abf(x)dx∫xbf(y)dy=∫abf(x)[F(b)一F(x)]dx =F(b)∫abf(x)dx一∫abf(x)F(x)dx=F2(b)一∫abF(x)dF(x) [*]
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考研数学三

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