计算定积分∫(1~-0)ln(1+x)/(2-x)^2.dx
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计算定积分∫(1~-0)ln(1+x)/(2-x)^2.dx
![计算定积分∫(1~-0)ln(1+x)/(2-x)^2.dx](/uploads/image/z/1538895-39-5.jpg?t=%E8%AE%A1%E7%AE%97%E5%AE%9A%E7%A7%AF%E5%88%86%E2%88%AB%281%7E-0%29ln%281%2Bx%29%2F%282-x%29%5E2.dx)
上下限看不清楚,先做不定积分吧
∫ ln(1 + x)/(2 - x)² dx
= - ∫ ln(1 + x)/(2 - x)² d(2 - x)
= ∫ ln(1 + x) d[1/(2 - x)]
= [ln(1 + x)]/(2 - x) - ∫ 1/(2 - x) · d[ln(1 + x)],分部积分法
= [ln(1 + x)]/(2 - x) - ∫ 1/[(2 - x)(1 + x)] dx
= [ln(1 + x)]/(2 - x) - (1/3)∫ [(2 - x) + (1 + x)]/[(2 - x)(1 + x)] dx
= [ln(1 + x)]/(2 - x) - (1/3)∫ [1/(1 + x) + 1/(2 - x)] dx
= [ln(1 + x)]/(2 - x) - (1/3)[ln|1 + x| - ln|2 - x|] + C
= [ln(1 + x)]/(2 - x) - (1/3)ln| (1 + x)/(2 - x) | + C
若上限是1,下限是0,则定积分
∫(0→1) ln(1 + x)/(2 - x)² dx
= [ln(1 + 1)]/(2 - 1) - (1/3)ln[ (1 + 1)/(2 - 1) ] - { [ln(1 + 0)]/(2 - 0) - (1/3)ln[ (1 + 0)/(2 - 0) ] }
= (1/3)ln(2)
∫ ln(1 + x)/(2 - x)² dx
= - ∫ ln(1 + x)/(2 - x)² d(2 - x)
= ∫ ln(1 + x) d[1/(2 - x)]
= [ln(1 + x)]/(2 - x) - ∫ 1/(2 - x) · d[ln(1 + x)],分部积分法
= [ln(1 + x)]/(2 - x) - ∫ 1/[(2 - x)(1 + x)] dx
= [ln(1 + x)]/(2 - x) - (1/3)∫ [(2 - x) + (1 + x)]/[(2 - x)(1 + x)] dx
= [ln(1 + x)]/(2 - x) - (1/3)∫ [1/(1 + x) + 1/(2 - x)] dx
= [ln(1 + x)]/(2 - x) - (1/3)[ln|1 + x| - ln|2 - x|] + C
= [ln(1 + x)]/(2 - x) - (1/3)ln| (1 + x)/(2 - x) | + C
若上限是1,下限是0,则定积分
∫(0→1) ln(1 + x)/(2 - x)² dx
= [ln(1 + 1)]/(2 - 1) - (1/3)ln[ (1 + 1)/(2 - 1) ] - { [ln(1 + 0)]/(2 - 0) - (1/3)ln[ (1 + 0)/(2 - 0) ] }
= (1/3)ln(2)
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