If `f_(k)(x)=1/k(sin^(k)x+cos^(k)x), " where " x in R " and " k le 1, " then " f_(4)(x)-f_(0)(x)` is equal to

Let F_(k)(x)=1/k (sin^(k)x+cos^(k)x) , where x in R and k ge 1 , then find the value of F_(4)(x)-F_(6)(x) .

Let F_(k)(x)=1/k (sin^(k)x+cos^(k)x) , where x in R and k ge 1 , then find the value of F_(4)(x)-F_(6)(x) .

Consider two functions f(x)=1+e^(cot^(2)x) " and " g(x)=sqrt(2abs(sinx)-1)+(1-cos2x)/(1+sin^(4)x). bb"Statement I" The solutions of the equation f(x)=g(x) is given by x=(2n+1)pi/2, forall "n" in I. bb"Statement II" If f(x) ge k " and " g(x) le k (where k in R), then solutions of the equation f(x)=g(x) is the solution corresponding to the equation f(x)=k.

If k sin^(2)x+(1)/(k) cosec^(2) x=2, x in (0,(pi)/(2)), then cos^(2)x+5sinxcosx+6sin^(2)x is equal to

If f(x) = {{:((log(1+2ax)-log(1-bx))/(x)",",x ne 0),(" "k",",x = 0):} is continuous at x = 0, then k is equal to

Let f be a function satisfying f(x+y)=f(x) + f(y) for all x,y in R . If f (1)= k then f(n), n in N is equal to

Consider f(x) = {{:((8^(x) - 4^(x) - 2^(x) + 1)/(x^(2))",",x gt 0),(e^(x)sin x + pi x + k log 4",",x lt 0):} , f(x) is continuous at x = 0, then k is

Let f be a positive function. Let I_(1)=int_(1-k)^(k)x f[x(1-x)]dx , I_(2)=int_(1-k)^(k)f[x(1-x)]dx , where 2k-1gt0 . Then (I_(1))/(I_(2)) is