The function , which is decreasing in the interval `[pi,(3pi)/(2)]` is :

Is the function y = cot x decreasing on the interval (0,pi) ?

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

Verify Rolle's Theorem for the function: f(x) = cosx, defined in the interval [pi/2,pi/2]

Verify Lagrange's mean value theorem for the following functions f(x) = sin x in the interval [pi/2, (5pi)/2]

Verify Rolle's Theorem for the function: f(x) = sin^2x , defined in the interval [0,pi]

Determine whether the following function is increasing or decreasing in the given interval : f(X) = cos (2x + (pi)/(4)), (3pi)/(8)lexle(5pi)/(8) .

Verify Rolle's theorem for function f(x) = e^x cos x in the interval [-pi/2,pi/2] .

Verify Rolle's Theorem for the function: f(x) = sin^4 x + cos^4 x in the interval [0,pi/2]

Verify Rolle's Theorem for the function f(x) = cos {2(x - pi/4)} in the interval [0,pi/2]

Verify Rolle's theorem for function f(x) = sin x + cos x - 1 in the interval [0,pi/2] .