The value of the integral ∫log(x+1)−logxx(x+1)dx is:
A
−(1/2)(log(x+1)2−(1/2)(logx)2+log(x+1)logx+C
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B
−[(log(x+1)2−(logx)2]+log(x+1)logx+C
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C
C−(1/2)(log(1+1/x)2
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D
None of these
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Solution
The correct options are A−(1/2)(log(x+1)2−(1/2)(logx)2+log(x+1)logx+C CC−(1/2)(log(1+1/x)2 Let I=∫log(x+1)−logxx(x+1)dx Substitute2 t=1+1x⇒dt=−dxx2 I=−∫logttdt=−12(logt)2+c =−12((log1+1x)2)+c =−12((logx+1)2)−12((logx)2)+(logx+1)logx+c