作业帮1 (1 x^2)不定积分的几何意义
来源:学生作业帮助网 编辑:作业帮 时间:2024/05/11 15:46:47
§dx/[x(lnx-1)]=§dlnx/(lnx-1)=§dlnln(x-1)=lnln(x-1)
∫[2x/(x^2+x+1)]dx=∫[(2x+1)/(x^2+x+1)]dx-∫dx/(x^2+x+1)=ln|x^2+x+1|-∫dx/(x^2+x+1)considerx^2+x+1=(x+1/
原式=∫ln(x+1)d(x+1)=(x+1)ln(x+1)-∫(x+1)dln(x+1)=(x+1)ln(x+1)-∫(x+1)*1/(x+1)d(x+1)=(x+1)ln(x+1)-∫dx=(x+
∫(lnx-1)/x²dx=-∫(lnx-1)d(1/x)=-[(lnx-1)/x-∫1/xd(lnx-1)]=-(lnx-1)/x+∫1/x²dx=-(lnx-1)/x-1/x+
答:1.∫arcsinxdx可用分部积分原式=xarcsinx-∫x/√(1-x^2)dx=xarcsinx+√(1-x^2)+C2.∫e^(√x+1)dx换元,令√(x+1)=t,则x=t^2-1,
∫(x^2-1)sin2xdx先括号拆开=∫x^2*sin2xdx-∫sin2xdx=-1/2*∫x^2dcos2x-1/2*∫sin2xd2x先凑微分=-1/2*∫x^2dcos2x-1/2*∫si
我的解答如下:换元法令x=3/2sint,t∈[-0.5π,0.5π]dx=3/2cost带入后得到∫(1-x)/[√(9-4x^2)]dx=∫(1-1.5sint)1.5costdt/3cost=∫
∫dx/(x²+2x+5)=∫d(x+1)/[(x+1)²+4]=(1/2)arctan[(x+1)/2]+C
原式=∫(x+1)/x²+∫xlnxdx=∫x/x²+∫1/x²+1/2∫lnxdx²=∫1/x+∫1/x²+1/2*x²lnx-1/2∫x
1/(x+1)(x+2)(x+3)=1/(x+1)[1/(x+2)-1/(x+3)]=1/[(x+1)(x+2)]-1/[(x+1)(x+3)]=1/(x+1)-1/(x+2)-1/2[1/(x+1)
∫xlnx/(1+x^2)^2dx=1/2*∫lnx/(1+x^2)^2d(1+x^2)=-1/2*∫lnxd[1/(1+x^2)]=-1/2*lnx*1/(1+x^2)+1/2*∫[1/(1+x^2
F(X)=(1+x)^2-2ln(1+X),点击看详细全都寻求指导,所以:点击看详细F'(x)的=2(1+X)-2*1/(1+X)=2X+2-2/(X+1),点击看详细看到更多的基本功能的推导,以及两
令x=tant,t∈(-π/2,π/2),则√(1+x²)=sect,dx=sec²tdt∫√(1+x²)dx=∫sec³tdt=∫sectd(tant)=se
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1/(1+x^2)d(1+x^2)=ln(1+x^2)+C
∫[(x-1)/(x^2+3)]dx=∫[x/(x^2+3)]dx-∫[1/(x^2+3)]dx=(1/2)∫[1/(x^2+3)]d(x^2+3)-(1/√3)∫{1/[(x/√3)^2+1]}d(
分部积分法再答:
3次分部积分法解用!代表积分号=!(x^3-x+1)(1-cos2x)/2dx=(x^3-x+1)(x/2-sin2x/4)-!(3x^2-1)(x/2-sin2x/4)dx+c=-!(3x^2-1)