" (v) "f(x)=log_(e)x," on "[1,2]

Find the value of c in Lagrange's mean value theorem for the function f (x) = log _(e) x on [1,2].

Vertify mean value theorem for the following functions: f(x)= log_(e)x, x in [1, 2]

f: R^(+) to R defined by f(x) = log_(e)x, x in (0,1), f(x) =2 log_(e) x, x in [1, infty) is

Verify Langrange's mean value theorem for the following functions : f(x)=log_(e)x" in " 1 le x le 2

Let f(x)=log_(e)|x-1|, x ne 1 , then the value of f'((1)/(2)) is

Let f(x)=log_(e)|x-1|, x ne 1 , then the value of f'((1)/(2)) is

Verify Lagrange's Mean Value Theorem for the functions : f(x)=log_(e)x in the interval [1, 2]

Find the inverse of the following function.( i ) f(x)=sin^(-1)((x)/(3)),x in[-3,3]( ii )f(x)=5^(log_(e)x),x>0 (iii) f(x)=log_(e)(x+sqrt(x^(2)+1))

Find the inverse of the following function. (i) f(x) = sin^(-1)(x/3), x in [-3,3] (ii) f(x) = 5^(log_e x), x gt 0 (iii) f(x) = log_e (x+sqrt(x^2+1))

Find the inverse of the following function. (i) f(x) = sin^(-1)(x/3), x in [-3,3] (ii) f(x) = 5^(log_e x), x gt 0 (iii) f(x) = log_e (x+sqrt(x^2+1))