For all `x in (0,1)`, then `log(1+x) < x` (a) 0 (b) -1 (c) 2 (d) none of these

For all x in (0, 1) (A) e^(x) lt 1+x (B) log_e (1+x) lt x (C) sin x gt x (D) log_(epsi) x gt x

For all x in(0,1)e^(x) x(d)log_(e)x>x

int_(0)^(1)x log (1+2 x)dx

Let f(x) be defined for all x in R such that lim_(xrarr0) [f(x)+log(1-(1)/(e^(f(x))))-log(f(x))]=0 . Then f(0) is

The set of all x for which log(1+ x) le x is equal to …… .

Show that the set of all x for which log(1+x) le x is equal to [0, infty]

Let f (x) gt 0 for all x and f'(x) exists for all x. If f is the inverse functin of h and h '(x) = (1)/( 1 + log x). Then f '(x) will be

The function f(x)=log x-(2x)/(x+2) is increasing for all A) x in(-oo,0) , B) x in(-oo,1) C) x in(-1,oo) D) x in(0,oo)