不定积分:∫ 1/(1-x^3) dx 有什么好方法
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-1/(x-1)(x²+x+1)
设
=A/(x-1)+(Bx+C)/(x²+x+1)
通分后计算分母得1,所以
A(x²+x+1)+(Bx+C)(x-1)=1
(A+B)x²+(A-B+C)x+A-C=1
A+B=0
A-B+C=0
A-C=1
解得A=1/3,B=-1/3,C=-2/3
原式=A/(x-1)+(Bx+C)/(x²+x+1)
=[1/(x-1)-(x+2)/(x²+x+1)]/3
∫
[1/(x-1)-(x+0.5+1.5)/(x²+x+1)]/3
dx
=∫
[1/(x-1)-(x+0.5)/(x²+x+1)-1.5/(x²+x+1)]/3
dx
=(1/3)[ln|x-1|-0.5ln(x²+x+1)]
-
∫0.5/[(x+1/2)²+3/4]dx
重点解决
∫0.5/[(x+1/2)²+3/4]dx
设(x+1/2)=[(根号3)/2]tant
dx=[(根号3)/2]sec²t
dt
∫0.5/[(x+1/2)²+3/4]dx
=0.5
∫[1/(3/4sec²t)][(根号3)/2]sec²t
dt
=0.5*4*(根号3)/(3*2)∫1
dt
=(根号3/3)t+C
tant=(2x+1)/(根号3)
t=arctan[(2x+1)/(根号3)]
∫0.5/[(x+1/2)²+3/4]dx
=((根号3)/3)*arctan[(2x+1)/(根号3)]
+C
带回
(1/3)[ln|x-1|-0.5ln(x²+x+1)]
-
∫0.5/[(x+1/2)²+3/4]dx
=(1/3)[ln|x-1|-0.5ln(x²+x+1)]
-
((根号3)/3)*arctan[(2x+1)/(根号3)]
+C
设
=A/(x-1)+(Bx+C)/(x²+x+1)
通分后计算分母得1,所以
A(x²+x+1)+(Bx+C)(x-1)=1
(A+B)x²+(A-B+C)x+A-C=1
A+B=0
A-B+C=0
A-C=1
解得A=1/3,B=-1/3,C=-2/3
原式=A/(x-1)+(Bx+C)/(x²+x+1)
=[1/(x-1)-(x+2)/(x²+x+1)]/3
∫
[1/(x-1)-(x+0.5+1.5)/(x²+x+1)]/3
dx
=∫
[1/(x-1)-(x+0.5)/(x²+x+1)-1.5/(x²+x+1)]/3
dx
=(1/3)[ln|x-1|-0.5ln(x²+x+1)]
-
∫0.5/[(x+1/2)²+3/4]dx
重点解决
∫0.5/[(x+1/2)²+3/4]dx
设(x+1/2)=[(根号3)/2]tant
dx=[(根号3)/2]sec²t
dt
∫0.5/[(x+1/2)²+3/4]dx
=0.5
∫[1/(3/4sec²t)][(根号3)/2]sec²t
dt
=0.5*4*(根号3)/(3*2)∫1
dt
=(根号3/3)t+C
tant=(2x+1)/(根号3)
t=arctan[(2x+1)/(根号3)]
∫0.5/[(x+1/2)²+3/4]dx
=((根号3)/3)*arctan[(2x+1)/(根号3)]
+C
带回
(1/3)[ln|x-1|-0.5ln(x²+x+1)]
-
∫0.5/[(x+1/2)²+3/4]dx
=(1/3)[ln|x-1|-0.5ln(x²+x+1)]
-
((根号3)/3)*arctan[(2x+1)/(根号3)]
+C
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