If `f(x)=cos2x+4sinx+5,` then the difference of maximum and minimum values of `f(x)` is

If f(x)=cos2x+4sin x+5, then the difference of maximum and minimum values of f(x) is

Find the maximum and minimum value of f(x)=3cosx+4sinx

The difference of maximum and minimum value of f(x)=log_(2)((5cos x-12sin x+39)/(13))

Find the maximum and minimum value of f(x) = 5sinx + 12cos x -13 .

Let f(x)=a bsinx+bsqrt(1-a^2)cosx+c , where |a| >0 then (a) c-b,c+b (b) difference of maximum and minimum values of f(x) is 2b (c) f(x)=c if x= -cos^(-1)a (d) f(x)=c if x= cos^(-1)a

Find the maximum and minimum values of the function f(x) = sin (sinx)

Find the maximum and minimum value of f(x)=sinx+1/2cos2xin[0,pi/2]dot

Find the maximum and minimum values of f(x)=sec x+log cos^(2)x,0