1/x^2(x+1)=(Ax+B)/x^2+C/(x+1)
=[(Ax+B)(x+1)+Cx^2]/x^2(x+1)
=[Ax^2+Ax+Bx+B+Cx^2]/x^2(x+1)
=[(A+C)x^2+(A+B)x+B]/x^2(x+1)
A+C=0
A+B=0
B=1
A=-1
C=1
所以
1/x^2(x+1)=(-x+1)/x^2+1/(x+1)
∫1/x²（x+1）dx
=∫(-x+1)dx/x^2+∫dx/(x+1)
=∫-dx/x+∫dx/x^2+∫d(x+1)/(x+1)
=-lnx+∫dx*x^(-2)+ln(x+1)+C
=ln(x+1)-lnx-1/x+C
=ln(x+1)/x-1/x+C
當(dāng)x->∞時
原式=ln(x+1)/x-1/x+C=ln(1+1/x)-1/x+C=ln1-0+C=C
當(dāng)x->1時
原式=ln2-1+C
所以∫1/x²（x+1）dx 積分區(qū)間為【1,正無窮）=C-（ln2-1+C）=1-ln2