作业帮不定积分∫(1/x^2)√(1-x)/(1+x)dx如何解?还有一道,∫1/(1+x^3)dx,求解
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不定积分∫(1/x^2)√(1-x)/(1+x)dx如何解?还有一道,∫1/(1+x^3)dx,求解
不定积分∫(1/x^2)√(1-x)/(1+x)dx如何解?
还有一道,∫1/(1+x^3)dx,求解
不定积分∫(1/x^2)√(1-x)/(1+x)dx如何解?还有一道,∫1/(1+x^3)dx,求解
∫√[(1-x)/(1+x)] dx/x^2
x=cosu dx=sinu √[(1-x)/(1+x)]=(1-cosu)/sinu
原式=∫(1-cosu)du/(cosu)^2
=∫du/(cosu)^2-∫cosudu/(1-sinu)(1+sinu)
=tanu-∫dsinu/[(1-sinu)(1+sinu)]
=tanu-ln[|1+sinu|/|cosu|] +C
=√[(1/x^2)-1 ] -ln[|1+√(1-x^2)|/|x| ]+C
∫dx/(1+x^3)
=∫dx/[(1+x)(1-x+x^2)]=(1/3)∫(1+x)dx/[x(1-x+x^2)]-(1/3)∫dx/[x(1+x)]
=(1/3)∫xdx/[x^2(1-x+x^2)]+(1/3)∫dx/[(x-1/2)^2+3/4]-(1/3)ln[|1+x|/|x|]
=(1/6)∫dx^2/(x^2(1-x+x^2)+......=(2/3√3)arctan(2x/√3-1/√3)-(1/3)ln|1+x|/|x|
=(1/6)∫dx^2/[(x-1)(1-x+x^2]+(1/6)∫dx^2/[(x-1)x^2]+...
=(1/3)∫xdx/[(x-1)(x^2-x+1)]+(1/3)∫dx/[x(x-1)]+...
=(1/3)∫(x-1)dx/(x^2-x+1)-(1/3)∫dx/(x-1)+(1/3)∫dx/(x-1)-(1/3)∫dx/x+...
=(1/6)ln|x^2-x+1|-(1/6)∫dx/[(x-1/2)^2+3/4]-(1/3)ln|x|+...
=(1/6)ln|x^2-x+1|+(1/3√3)arctan(2x/√3-1/√3)-(1/3)ln|1+x|+C
令x=cos2a 则∫(1/x^2)√(1-x)/(1+x)dx=∫(1/cos^2(2a)*根号((1-cos2a)/(1+cos2a))dcos2a
=∫(1/cos^2(2a)*根号(2sin^2(a)/(2cos^2(a))dcos2a=∫(1/cos^2(2a)*sina/cosa dcos2a
=∫(sina/(cos^2(2a)*cosa) dcos2a
...
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令x=cos2a 则∫(1/x^2)√(1-x)/(1+x)dx=∫(1/cos^2(2a)*根号((1-cos2a)/(1+cos2a))dcos2a
=∫(1/cos^2(2a)*根号(2sin^2(a)/(2cos^2(a))dcos2a=∫(1/cos^2(2a)*sina/cosa dcos2a
=∫(sina/(cos^2(2a)*cosa) dcos2a
=∫sina/(cos^2(2a)*cosa) *(-2sin2a) da
=-4∫(sin^2(a)/(cos^2(2a)) da
= -4∫1/(csc^a-2) da
=-4∫1/(cot^2(a)-1) da
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