求不定积分-x^2-2/(x^2+x+1)^2
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解决时间 2021-04-06 00:52
- 提问者网友:藍了天白赴美
- 2021-04-05 00:27
求不定积分-x^2-2/(x^2+x+1)^2
最佳答案
- 五星知识达人网友:行雁书
- 2021-04-05 01:33
求不定积分∫[(-x²-2)/(x²+x+1)²]dx
解:原式=-∫[(x²+2)/(x²+x+1)²]dx
(x²+2)/(x²+x+1)=A/(x²+x+1)+(Bx+C)/(x²+x+1)²=[A(x²+x+1)+Bx+C]/(x²+x+1)²
故得x²+2=Ax²+(A+B)x+A+C;这是恒等式,对应项系数相等:
∴A=1;A+B=0;A+C=2;由此解得A=1,B=-1,C=1;
故原式=-{∫[1/(x²+x+1)]dx-∫(x-1)/(x²+x+1)²]dx}
=-∫dx/[(x+1/2)²+3/4]+∫xdx/(x²+x+1)²-∫dx/(x²+x+1)²
=-∫d(x+1/2)/[(x+1/2)²+3/4]+(1/2)∫d(x²+x+1)/(x²+x+1)²-(1/2)∫dx/(x²+x+1)²-∫dx/(x²+x+1)²
=-(2/√3)arctan[2(x+1/2)/√3]-1/[2(x²+x+1)]-(3/2)∫d(x+1/2)/[(x+1/2)²+3/4]²
=-(2/√3)arctan[2(x+1/2)/√3]-1/[2(x²+x+1)]-(3/2)(2/√3)arctan[2(x+1/2)/√3]+C
=-(4/√3)arctan[(2x+1)/√3]-1/[2(x²+x+1)]+C追问(3/2)∫d(x+1/2)/[(x+1/2)²+3/4]²这个的积分怎么求呢?
解:原式=-∫[(x²+2)/(x²+x+1)²]dx
(x²+2)/(x²+x+1)=A/(x²+x+1)+(Bx+C)/(x²+x+1)²=[A(x²+x+1)+Bx+C]/(x²+x+1)²
故得x²+2=Ax²+(A+B)x+A+C;这是恒等式,对应项系数相等:
∴A=1;A+B=0;A+C=2;由此解得A=1,B=-1,C=1;
故原式=-{∫[1/(x²+x+1)]dx-∫(x-1)/(x²+x+1)²]dx}
=-∫dx/[(x+1/2)²+3/4]+∫xdx/(x²+x+1)²-∫dx/(x²+x+1)²
=-∫d(x+1/2)/[(x+1/2)²+3/4]+(1/2)∫d(x²+x+1)/(x²+x+1)²-(1/2)∫dx/(x²+x+1)²-∫dx/(x²+x+1)²
=-(2/√3)arctan[2(x+1/2)/√3]-1/[2(x²+x+1)]-(3/2)∫d(x+1/2)/[(x+1/2)²+3/4]²
=-(2/√3)arctan[2(x+1/2)/√3]-1/[2(x²+x+1)]-(3/2)(2/√3)arctan[2(x+1/2)/√3]+C
=-(4/√3)arctan[(2x+1)/√3]-1/[2(x²+x+1)]+C追问(3/2)∫d(x+1/2)/[(x+1/2)²+3/4]²这个的积分怎么求呢?
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