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

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 f(x)=x,-1lexle1 , then function f(x) is

Consider the function f(x)=e^(-2x)sin2x over the interval (0,pi/2) . A real number c in(0,pi/2) , as guaranteed by Rolle's theorem such that f'(c)=0, is

For the function f(x)=e^cosx , Rolle's theorem is

If the p.d.f of a random variable X is f(x)={(0.5x, 0lexle2), (0, "otherwise"):} Then the value of P(0.5 le X le 1.5) is

The p.d.f. of a random variable X is f(x)=2x, 0lexle1 =0 , otherwise Then the value of P(1/3 lt X lt 1/2) is

If f(x) =cos [pi^(2)]x+ cos [-pi^(2)] x, where [x] denots the greatest integer function, then the value of f((pi)/(2)) is-