求积分∫1 x(1 x²)dx

令t=x*sqrt(x);原式则=2/3*∫sqrt[1/(1-t)]dt＝-4/3sqrt(1-t)+C=-4/3*sqrt[1-x*sqrt(x)]+C

求定积分要有上下限的,否则是求不定积分.对于x/(1+√x)可令y=√x,y²=x,2ydy=dx∫x/(1+√x)dx=2∫y³dy/(1+y)而y³dy/(1+y)=

解∫1/x(x+1)dx=∫[1/x-1/(x+1)]dx=ln|x|-ln|x+1|+C=ln|x/(x+1)|+C

被积函数分子分母除以x²有∫(x^2+1)/(x^4+1)dx=∫(1+1/x²)/(x²+1/x²)dx令u=x-1/x,则du=(1+1/x²)d

答案（x^4)/4再问：详细步骤呢再答：看错题了，你题目没打错吧再问：再答：Y=∫(-1,1)x^2/[1+e^(-x)]dx(-1,1)为积分上下限为-1到1令t=-x则Y=∫(1,-1)t^2/(

利用倒代换即设x=1/t,dx=-1/t^2dt则原式为-(积分号)t/(t-1)dt即-(积分号)dt-(积分号)d(t-1)/(t-1)得-t-ln|t-1|+C再代换回来得-1/x-ln|1/x

原式=∫ln(1-x)d(1-x)=(1-x)ln(1-x)-∫(1-x)dln(1-x)=(1-x)ln(1-x)-∫(1-x)*[-1/(1-x)]dx=(1-x)ln(1-x)+∫dx=(1-x

√(x(1+x))＝√[(x+1/2)^2－(1/2)^2]套用公式：∫dx/√(x^2－a^2)＝ln|x+√(x^2－a^2)|＋C,结果是ln|x＋1/2＋√(x(1+x))|＋C

∫（3x+1/x∧2)dx=-∫（3x+1)d(1/x)=-(3x+1)/x+∫（1/x)d(3x+1)=-(3x+1)/x+1/3∫（1/x)dx=-(3x+1)/x+1/3ln|x|+c回答完毕!

∫x/(1+√x)dxlet√x=(tany)^2[1/(2√x)]dx=2tany(secy)^2dydx=4(tany)^3(secy)^2dy∫x/(1+√x)dx=∫[(tany)^4/(se

∫x^2/(1-x^2)dx=∫[1/(1-x^2)-1]dx=∫[(1/2)/(1+x)+(1/2)/(1-x)-1]dx=(1/2)ln│(1+x)/(1-x)│-x+C(C是积分常数)；∫1/(

嘿嘿,其实这题很简单.令y=1/x、x=1/y、dx=-1/y²dy∫[arctan(1/x)]/(1+x²)dx=∫arctany/(1+1/y²)*(-1/y

∫(arctanx)/(x^2(x^2+1))dxletx=tanadx=(seca)^2da∫(arctanx)/(x^2(x^2+1))dx=∫[a/(tana)^2]da=-∫ad(cota+a

答：凑微分方法∫x(x^2-3)^(1/2)dx=(1/2)∫(x^2-3)^(1/2)d(x^2-3)=(1/2)*(2/3)*(x^2-3)^(3/2)+C=(1/3)*(x^2-3)^(3/2)

(3/2)∫dx/(x^2-x+1)=根号[3]ArcTan[(-1+2x)/根号[3]]+c再问：思路过程？我也知道答案是这个啊Q_Q再答：∫1/(x²-x+1)dx=∫1/[(x-1/2

∫dx/x(x²+1)=∫xdx/x²(x²+1)=0.5∫dx²/x²(x²+1)=0.5∫1/x²-1/(x²+1)

∫(x+1)cos(x+1)dx=∫xcos(x+1)dx+∫cos(x+1)dx=1/2∫cos(x+1)dx^2+∫cos(x+1)d(x+1)前一个用分步积分,后一个直接开,不用再算了吧?

如果是∫ln(1-x)/xdx∫ln(1-x)/xdx=∫ln(1-x)d(lnx)=-∫ln(1-x)d(ln(-x))=∫ln(1-x)d(ln(1-x))=(1/2)(ln(1-x))^2+C再