If `f(x)=cosx,0lexle(pi)/2` then the real number c of the mean value theorem is

Let f(x) =e^(x), x in [0,1] , then a number c of the Largrange's mean value theorem is

If (2cosx-1)(3+2cosx)=0, 0lexle2pi, then x=

For the function f(x)=e^x,a=0,b=1 , the value of c in mean value theorem will be

If f(x) satisfies the requirements of Lagrange's mean value theorem on [0,2] and if f(0)=0 and f'(x)<=(1)/(2)

If sqrt3 sin x+cosx-2=(y-1)^(2)" for "0lexle 8pi , then the number of values of the pair (x, y) is equal to

For the function f(x)=(x-1)(x-2) defined on [0,1/2] , the value of 'c' satisfying Lagrange's mean value theorem is

If cos(x+pi/3)+cos x=a has real solutions, then (a) number of integral values of a are 3 (b) sum of number of integral values of a is 0 (c) when a=1 , number of solutions for x in [0,2pi] are 3 (d) when a=1, number of solutions for x in [0,2pi] are 2

Statement I for f(x)={{:((1)/(2)-x",",xlt(1)/(2)),(((1)/(2)-x)^(2)",",xge(1)/(2)):} mean value theorem is applicable in the interval [0, 1] Statement II For application of mean value theorem, f(x) must be continuous in [0,1] and differentiable in (0, 1).