Suppose f, g, and h be three real valued function defined on R.
Let `f(x) = 2x + |x|, g(x) = (1)/(3)(2x-|x|)` and `h(x) = f(g(x))`
The domain of definition of the function ` l (x) = sin^(-1) ( f(x) - g (x) )` is equal to

Suppose f, g and h be three real valued function defined on R Let f(x) =2x+|x| g(x) =1/3(2x-|x|) h(x) =f(g(x)) The range of the function k(x) = 1 + 1/pi(cos^(-1)h(x) + cot^(-1)(h(x))) is equal to

Consider f, g and h be three real valued function defined on R. Let f(x)= sin 3x + cos x , g(x)= cos 3x + sin x and h(x) = f^(2)(x) + g^(2)(x) Q. General solution of the equation h(x) = 4 , is : [where n in I ]

Consider f, g and h be three real valued function defined on R. Let f(x)=sin3x+cosx,g(x)=cos3x+sinx and h(x)=f^(2)(x)+g^(2)(x). Then, The length of a longest interval in which the function h(x) is increasing, is

If g is te inverse of a function f and f'(x) = 1/(1+x^5) then g'(x) is equal to

If f(x) = x+1 And g (X) = 2x, then f (g(x)) is equal to

Functions f and g are defined by f(x) = - 7 x - 5 and g(x) = 10 x - 12 find (f + g)(x)

Consider f,g and h be three real valued differentiable functions defined on R. Let g(x)=x^(3)+g''(1)x^(2)+(3g'(1)-g''(1)-1)x+3g'(1) f(x)=xg(x)-12x+1 and f(x)=(h(x))^(2), where g(0)=1 Which one of the following does not hold good for y=h(x)

Consider f,g and h be three real valued functions defined on R. Let f(x)={:{(-1", "xlt0),(0", "x=0","g(x)(1-x^(2))andh(x) "be such that"),(1", "xgto):} h''(x)=6x-4. Also, h(x) has local minimum value 5 at x=1 The equation of tangent at m(2,7) to the curve y=h(x), is

Let f and g be two functions defined by f(x) = sqrt(x-1) and g(x)= sqrt (4-x^2) . Find : g/f .

Let f and g be two functions defined by f(x) = sqrt(x-1) and g(x)= sqrt (4-x^2) . Find : f/g .