1/[x平方·根号下(2x-1)] 的积分
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令√(2x-1)=t,则x=(t^2+1)/2
原式=∫1/((t^2+1)^2/4*t)*tdt
=4∫dt/(t^2+1)^2
由于∫dt/(t^2+1)^n
=t/(t^2+1)^n-∫t*(-n)/(t^2+1)^(n+1)*2tdt
=t/(t^2+1)^n+2n∫(t^2+1-1)/(t^2+1)^(n+1)dt
=t/(t^2+1)^n+2n∫dt/(t^2+1)^n-2n∫dt/(t^2+1)^(n+1)
所以∫dt/(t^2+1)^(n+1)=1/(2n)*(t/(t^2+1)^n+(2n-1)∫dt/(t^2+1)^n)
令n=1,代入原式得原式=4*1/2*(t/(t^2+1)+∫dt/(t^2+1))
=2t/(t^2+1)+2arctant+C
原式=∫1/((t^2+1)^2/4*t)*tdt
=4∫dt/(t^2+1)^2
由于∫dt/(t^2+1)^n
=t/(t^2+1)^n-∫t*(-n)/(t^2+1)^(n+1)*2tdt
=t/(t^2+1)^n+2n∫(t^2+1-1)/(t^2+1)^(n+1)dt
=t/(t^2+1)^n+2n∫dt/(t^2+1)^n-2n∫dt/(t^2+1)^(n+1)
所以∫dt/(t^2+1)^(n+1)=1/(2n)*(t/(t^2+1)^n+(2n-1)∫dt/(t^2+1)^n)
令n=1,代入原式得原式=4*1/2*(t/(t^2+1)+∫dt/(t^2+1))
=2t/(t^2+1)+2arctant+C
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