【如图】这四道求不定积分的题目怎么用分部积分法求出来?
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(1)
∫ln(x^2+1) dx
=xln(x^2+1) - 2∫x^2/(x^2+1) dx
=xln(x^2+1) - 2∫[ 1-1/(x^2+1)] dx
=xln(x^2+1) - 2x +2arctanx +C
(2)
∫ln(lnx)/x dx
=∫ln(lnx) dlnx
=lnx .ln(lnx) - ∫ dx/x
=lnx .ln(lnx) - ln|x| +C
(3)
∫x/(cosx)^2 dx
=∫x(secx)^2 dx
=∫x dtanx
=xtanx - ∫tanx dx
=xtanx + ln|cosx| +C
(4)
∫(1/x^3) e^(1/x) dx
=-∫(1/x) de^(1/x)
=-(1/x)e^(1/x) -∫(1/x^2) e^(1/x) dx
=-(1/x)e^(1/x) + e^(1/x) +C
∫ln(x^2+1) dx
=xln(x^2+1) - 2∫x^2/(x^2+1) dx
=xln(x^2+1) - 2∫[ 1-1/(x^2+1)] dx
=xln(x^2+1) - 2x +2arctanx +C
(2)
∫ln(lnx)/x dx
=∫ln(lnx) dlnx
=lnx .ln(lnx) - ∫ dx/x
=lnx .ln(lnx) - ln|x| +C
(3)
∫x/(cosx)^2 dx
=∫x(secx)^2 dx
=∫x dtanx
=xtanx - ∫tanx dx
=xtanx + ln|cosx| +C
(4)
∫(1/x^3) e^(1/x) dx
=-∫(1/x) de^(1/x)
=-(1/x)e^(1/x) -∫(1/x^2) e^(1/x) dx
=-(1/x)e^(1/x) + e^(1/x) +C
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1. ∫ ln(x² + 1) dx
= xln(x² + 1) - ∫ x dln(x² + 1)
= xln(x² + 1) - ∫ x · (2x)/(x² + 1) dx
= xln(x² + 1) - 2∫ x²/(x² + 1) dx
= xln(x² + 1) - 2∫ [(x² + 1) - 1]/(x² + 1) dx
= xln(x² + 1) - 2∫ [1 - 1/(x² + 1)] dx
= xln(x² + 1) - 2(x - arctan(x)) + C
= xln(x² + 1) - 2x + 2arctan(x) + C
= xln(x² + 1) - ∫ x dln(x² + 1)
= xln(x² + 1) - ∫ x · (2x)/(x² + 1) dx
= xln(x² + 1) - 2∫ x²/(x² + 1) dx
= xln(x² + 1) - 2∫ [(x² + 1) - 1]/(x² + 1) dx
= xln(x² + 1) - 2∫ [1 - 1/(x² + 1)] dx
= xln(x² + 1) - 2(x - arctan(x)) + C
= xln(x² + 1) - 2x + 2arctan(x) + C
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3. ∫ (x/cos²x) dx
= ∫ x dtanx
= x tanx - ∫ tanx dx + c
= x tanx + ∫ (dcosx)/cosx + c
= x tanx + ln |cosx| + c
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