作业帮设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
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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]上可导,且f'(x)≤M,f(a)=0,求证∫(a,b)f(x)dx≤M/2(b-a)^2
证明:用中值定理
∵f(a)=0
∴∫(a,b)f(x)dx
=∫(a,b)f(x)dx-f(a)(b-a)
=∫(a,b)[f(x)-f(a)]dx
=∫(a,b)f'(ξ)(x-a)dx
=f'(ξ)∫(a,b)(x-a)dx,其中ξ∈(a,b)
≤M∫(a,b)(x-a)dx
=M/2[(b-a)²]
证毕.
由题意知:f(x)在[a,b]上可导,
所以,f(x)=f(x)-f(a)=f'(ξ)(x-a)≤M(x-a).
两边积分:
∫(a,b)f(x)dx≤∫(a,b)M(x-a)dx=M/2(x-a)^2|(a,b)=M/2(b-a)^2
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