`∫(log(x + 1) - logx)/{x(x + 1)}`dx is equal to

int(log(x+1)-log x)/(x(x+1))dx is equal to :

int(log_e(x+1)-log_ex)/(x(x+1))dx is equal to (A) -1/2[log(x+1)^2-1/2logx]^2+log_e(x+1)log_ex+C (B) -[(log_e(x+1)-log_ex]^2 (C) c-1/2(log(1+1/x))^2 (D) none of these

int(sqrt(x^(2)+1)[log(x^(2)+1)-2logx])/(x^(4)) dx is equal to

int(e^(x)(x log x+1))/(x)dx is equal to

int_(1)^(x) (logx^(2))/x dx is equal to

int_(0)^(1)log((1)/(x)-1)dx is equal to

int_(1)^(x) (log(x^(2)))/(x) dx is equal to