Let `g'(x)gt0andf'(x)lt0AA x inR` . Thus .

Let f and g be two diffrentiable functions on R such that f'(x) gt 0 and g'(x) lt 0 for all x in R . Then for all x

Let f''(x) gt 0 AA x in R and g(x) = g(x) = 2f((x^(2))/(2)) + f(6-x^(2)) . Then show that g(x) possesses one maximum and two minima.

Let g(x)=1+x-[x] and f(x)=-1 if x lt 0 =0 if x=0 then f[g(x)]= =1 if x gt 0

If f, g, h are functions from R to R such that f(x) = x^(2)+1, g(x) =sqrt(x^(2)-1) AA x in R and h(x) = {{:(0, x le 0),(x, x ge 0):} , then AA x in R, ho(fog)(x)=

Let F(x) = f(x).g(x).h(x) x in R , where f(x) , g(x) & h(x) are differentiable function. At some point x_0, F'(x_0) = 21 F(x_0) , f'(x_0) = 4f(x_0),g'(x_0) = -7g(x_0), h'(x_0)= k.h(x_0) then k/4 =

Show that (x)/(1+x) lt ln (1+x) lt x AA x gt 0 .

Let g(x) =1+x-[x] and f(x) ={{:(-1, if, x lt 0),(0, if, x=0),(1, if, x gt 0):} , then (f(g(2009)))/(g(f(2009)) =

Let f(x) and g(x) be two continous functions defined from Rrarr R , such that f(x_(1)) gt f(x_(2)) and g(x_(1)) lt g(x_(2)) AA x_(1) gt x_(2) , then find the solution set of f(g(alpha^(2) - 2 alpha) gt f(g(3 alpha - 4) .