The value of `c` in Lagranges theorem for the function `f(x)=logsinx` in the interval `[pi/6,(5pi)/6]` is `pi/4` (b) `pi/2` `(2pi)/3` (d) none of these

The value of c in Largrange's theorem for the function f(x)= logsin x in the interval [ pi//6,5pi//6] is

The value of c in Lagranges theorem for the function f(x)=logsinx in the interval [pi/6,(5pi)/6] is (a) pi/4 (b) pi/2 (c) (2pi)/3 (d) none of these

The value of c in Lagranges theorem for the function f(x)=logsinx in the interval [pi/6,(5pi)/6] is (a) pi/4 (b) pi/2 (c) (2pi)/3 (d) none of these

The value of c in Lagranges theorem for the function f(x)=logsinx in the interval [pi/6,(5pi)/6] is (a) pi/4 (b) pi/2 (c) (2pi)/3 (d) none of these

The value of c in Largrange's theorem for the function f(x)= log_(e) sin x in the interval [ pi//6,5pi//6] is

The value of c in Largrange's theorem for the function f(x)= log_(e) sin x in the interval [ pi//6,5pi//6] is

The value of c in Lagranges theorem for the function f(x)=log sin x in the interval [(pi)/(6),(5 pi)/(6)] is (pi)/(4) (b) (pi)/(2)(2 pi)/(3) (d) none of these

The value of 'c' in Lagrange's Theorem for the function f(x)=log(sinx) in the interval [(pi)/(6), (5pi)/(6)] is :

The value of 'c' in lagrange 's theorem for the function f(x)=log (sin x) in the interval [(pi)/(6),(5pi)/(6)] is

Find the value of c in Lagrange's theorem for the function f(x) = log sin x in the interval [(pi)/(6), (5pi)/(6)] .