IF `log_e3=1.0986`, then`log_e(9.01)` approximately is

Find the approximate values of the following: log_e(4.04) , given log_10 4 = 0.6021, log_10 e = 0.4343

For the function f(x) = (log_(e )(1+x)-log_(e )(1-x))/(x) to be continuous at x = 0, the value of f(0) should be

If f (x) = log_(x) (log x) , then f'(x) at x = e is …….. .

If "dy"/"dx"=1-y and y(0)=3 , then y(log_e 8) is equal to

The area enclosed between the curve y = log_e (x +e ) and the coordinate axes is

The area enclosed between the curve y=log_e(x+e) and the co-ordinates axes is…….a) 3 sq.units b) 4 sq.units c) 2 sq.units d) 1 sq.units

The differential coefficient of f(log_e x) w.r.t. x, where f(x) = log_e x, is

Find the approximate value of log(e)^(9.01) given log3 = 1.0986