`int 1/x(log_(ex)e)dx` is equal to

The value of int_1^e 10^(log_e x) dx is equal to

int1/(x"log"x^(2))dx is equal to a) 1/(2)"log"|"log"x^(2)|+C b) "log"|"log"x^(2)|+C c) 2"log"|"log"x^(2)|+C d) 4"log"|"log"x^(2)|+C

int (log x)/(x^(2))dx is equal to a) (log x)/(x) + (1)/(x^(2)) +C b) -(log x)/(x) + (2)/(x) + C c) -(log x)/(x) - (1)/(2x) + C d) -(log x)/(x) - (1)/(x) + C

intx^(x)ln(ex)dx is equal to

int(e^(6 log _e x)-e^(5 log_e x))/(e^(4 log _e x)-e^(3 log _e x))dx is equal to a) x^3/3+c b) x^2/2+c c) x^2/3+c d) (-x^3)/3+c

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

int sqrt(e^(x)-1) dx is equal to :

If an antiderivative of f(x) is e^(x) and that of g(x) is cos x, then int f (x) cos x dx + int g(x) e^(x) dx is equal to :

int (1)/( x (log x) log (log x) ) dx is equal to a) log (log x) + C b) log | log (x log x) + C c) log | log | log (log x) || + C d) log | log (log x) | + C

int (1)/(sin x cos x)dx is equal to