求1/[1+e^(x-1)]在(0,1)上的定积分,
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答:
∫1/[1+e^(x-1)] dx
=∫[1+e^(x-1)-e^(x-1)]/[1+e^(x-1)] dx
=∫1-e^(x-1)/[1+e^(x-1)] dx
=x-∫1/[1+e^(x-1)] d[1+e^(x-1)]
=x-ln[1+e^(x-1)] + C
所以定积分∫(0到1)1/[1+e^(x-1)] dx
=x-ln[1+e^(x-1)] |(0到1)
=1-ln(1+e^0)-0+ln(1+e^(-1))
=1-ln(2+2/e)
∫1/[1+e^(x-1)] dx
=∫[1+e^(x-1)-e^(x-1)]/[1+e^(x-1)] dx
=∫1-e^(x-1)/[1+e^(x-1)] dx
=x-∫1/[1+e^(x-1)] d[1+e^(x-1)]
=x-ln[1+e^(x-1)] + C
所以定积分∫(0到1)1/[1+e^(x-1)] dx
=x-ln[1+e^(x-1)] |(0到1)
=1-ln(1+e^0)-0+ln(1+e^(-1))
=1-ln(2+2/e)
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