求不定积分∫[1/(1+x^3)]dx 要步骤
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1+x^3=(x+1)(x^2-x+1)
用待定系数法:A/(x+1)+(Bx+c)/(x^2-x+1)=1/(x+1)(x^2-x+1)
得A=1/3,B=-1/3,C=2/3
所以∫[1/(1+x^3)]dx =1/3∫(1/(x+1))dx-1/3∫((x-2)/(x^2-x+1))dx
其中1/3∫(1/(x+1))dx=1/3ln|x+1|+c
因为d(x^2-x+1)=(2x-1)dx,所以x-2=1/2(2x-1)-3/2
∫((x-2)/(x^2-x+1))dx=1/2∫(d(x^2-x+1)/(x^2-x+1))-3/2∫(1/(x^2-x+1))dx
其中∫(d(x^2-x+1)/(x^2-x+1))=ln|x^2-x+1|+c
∫(1/(x^2-x+1))dx=∫(dx/((x-1/2)^2+(根号3/2)^2))
因为∫(dx/(x^2+a^2))=(1/a)arctan(x/a)
所以∫(1/(x^2-x+1))dx=∫(dx/((x-1/2)^2+(根号3/2)^2))
=(2/根号3)arctan((x-1/2)/(根号3/2))+c
在乘上系数,整理∫[1/(1+x^3)]dx=1/3ln|x+1|-1/6|x^2-x+1|+(1/根号3)arctan((2x-1)/根号3)+c
用待定系数法:A/(x+1)+(Bx+c)/(x^2-x+1)=1/(x+1)(x^2-x+1)
得A=1/3,B=-1/3,C=2/3
所以∫[1/(1+x^3)]dx =1/3∫(1/(x+1))dx-1/3∫((x-2)/(x^2-x+1))dx
其中1/3∫(1/(x+1))dx=1/3ln|x+1|+c
因为d(x^2-x+1)=(2x-1)dx,所以x-2=1/2(2x-1)-3/2
∫((x-2)/(x^2-x+1))dx=1/2∫(d(x^2-x+1)/(x^2-x+1))-3/2∫(1/(x^2-x+1))dx
其中∫(d(x^2-x+1)/(x^2-x+1))=ln|x^2-x+1|+c
∫(1/(x^2-x+1))dx=∫(dx/((x-1/2)^2+(根号3/2)^2))
因为∫(dx/(x^2+a^2))=(1/a)arctan(x/a)
所以∫(1/(x^2-x+1))dx=∫(dx/((x-1/2)^2+(根号3/2)^2))
=(2/根号3)arctan((x-1/2)/(根号3/2))+c
在乘上系数,整理∫[1/(1+x^3)]dx=1/3ln|x+1|-1/6|x^2-x+1|+(1/根号3)arctan((2x-1)/根号3)+c
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