如图,求不定积分 要详细过程
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let
x^2 = sinu
2x dx = cosu du
∫x.√[ (1-x^2)/(1+x^2) ] dx
=∫x.(1-x^2)/√(1-x^4) dx
= ∫x/√(1-x^4) dx - ∫x^3/√(1-x^4) dx
= ∫x/√(1-x^4) dx + (1/4) ∫d(1-x^4)/√(1-x^4)
= ∫x/√(1-x^4) dx + (1/2) √(1-x^4)
= (1/2) ∫ cosu du/cosu + (1/2) √(1-x^4)
= (1/2) ∫ du + (1/2) √(1-x^4)
= (1/2) u + (1/2) √(1-x^4) +C
= (1/2) arcsin(x^2) + (1/2) √(1-x^4) +C
x^2 = sinu
2x dx = cosu du
∫x.√[ (1-x^2)/(1+x^2) ] dx
=∫x.(1-x^2)/√(1-x^4) dx
= ∫x/√(1-x^4) dx - ∫x^3/√(1-x^4) dx
= ∫x/√(1-x^4) dx + (1/4) ∫d(1-x^4)/√(1-x^4)
= ∫x/√(1-x^4) dx + (1/2) √(1-x^4)
= (1/2) ∫ cosu du/cosu + (1/2) √(1-x^4)
= (1/2) ∫ du + (1/2) √(1-x^4)
= (1/2) u + (1/2) √(1-x^4) +C
= (1/2) arcsin(x^2) + (1/2) √(1-x^4) +C
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令√[(1-x²)/(1+x²)]=t,则x²=(1-t²)/(1+t²)
∫x√[(1-x²)/(1+x²)]dx
=½∫√[(1-x²)/(1+x²)]d(x²)
=½∫td[(1-t²)/(1+t²)]
=½t(1-t²)/(1+t²) - ½∫[(1-t²)/(1+t²)]dt
=½t(1-t²)/(1+t²) - ∫[1/(1+t²) -½]dt
=½t(1-t²)/(1+t²) - arctant+½t+C
=½x²√[(1-x²)/(1+x²)] -arctan[√[(1-x²)/(1+x²)]] +½√[(1-x²)/(1+x²)] +C
∫x√[(1-x²)/(1+x²)]dx
=½∫√[(1-x²)/(1+x²)]d(x²)
=½∫td[(1-t²)/(1+t²)]
=½t(1-t²)/(1+t²) - ½∫[(1-t²)/(1+t²)]dt
=½t(1-t²)/(1+t²) - ∫[1/(1+t²) -½]dt
=½t(1-t²)/(1+t²) - arctant+½t+C
=½x²√[(1-x²)/(1+x²)] -arctan[√[(1-x²)/(1+x²)]] +½√[(1-x²)/(1+x²)] +C
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