[f:[[-1],[g(x)=|x|f(x)+|4x-7|f(x)],2]rarr Rg:[(-1)/(2),2]rarr Rquad " be functions "quad " defined "quad " by "quad f(x)=],[qquad g(x)=|x|" denotes GIF "]

Let f:[-1/2,2] rarr R and g:[-1/2,2] rarr R be functions defined by f(x)=[x^2-3] and g(x)=|x|f(x)+|4x-7|f(x) , where [y] denotes the greatest integer less than or equal to y for yinR . Then,

Let f:[-1/2,2] rarr R and g:[-1/2,2] rarr R be functions defined by f(x)=[x^2-3] and g(x)=|x|f(x)+|4x-7|f(x) , where [y] denotes the greatest integer less than or equal to y for yinR . Then,

Let f, g: R rarr R be functions defined respectively by f(x)=x+1, g(x)=2 x-3 Find fg.

f and g are real functions defined by f(x)= 2x + 1 and g(x) =4x -7. If f(x) = g(x) then x = …. .

The f: R rarr R be any function. Define g: R rarr R by g(x)=|f(x)| for all x then g is

f and g are functions defined from R rarr R If f(x-2)=x^(2) and g(x)=(x+2)^(2) then f(x)+g(x-2)=?

Let f:R rarr R be a function is defined by f(x)=x^(2)-(x^(2))/(1+x^(2)), then

Let f : R rarr R be any function. Define g : R rarr R by g(x)=|f(x)| for all x. Then g is:

f:R to R is a function defined by f(x)= 10x -7, if g=f^(-1) then g(x)=