integration log (1-x²) dx
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Step-by-step explanation:
Let I=∫log(1+x2)dx
=∫log(1+x2)∗(1)dx
by using integration by parts
∴I=log(1+x2)∫1dx−∫ddxlog(1+x2)∫1dxdx
=xlog(1+x2)−∫2x21+x2dx
=xlog(1+x2)−2∫x21+x2dx
Let I1=∫x21+x2
=∫x2+1–11+x2dx
=∫x2+1x2+1dx−∫11+x2dx
=x−tan−1x−C
∴ Now I=xlog(1+x2)−2I1
⟹I=xlog(1+x2)−2x+2tan−1x+C
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