`f(x)=1/abs(x), g(x)=sqrt(x^(-2))`

If f,g:R rarr R are two functions as follows: f(x)=sqrt(x-1),g(x)=sqrt(4-x^(2)) then find :f-g

Let f(x)=sqrt(6-x),g(x)=sqrt(x-2) . Find f+g,f-g,f.g and f/g.

Let f and g be real functions, defined by f(x)=sqrt(x+2)andg(x)=sqrt(4-x^(2)) . Find (i) (f+g)(x) (ii) (f-g)(x) (iii)(fg)(x) (iv) (ff)(x) (v) (gg)(x) (vi) ((f)/(g))(x) .

If f(x)=sqrt(2-x) and g(x)=sqrt(1-2x) ,then the domain of f[g(x)] is:

f(x)=sqrt(1-x^(2)), g(x)=sqrt(1-x)*sqrt(1+x) . Identical functions or not?

Let f(x)=(1)/(x) and g(x)=(1)/(sqrt(x)) . Then,

State, given justification for your answer, which of the following pairs are equal : (i) f(x) = (x)/(x^(2)), g(x) = 1 (ii) f(x) = sqrt(x^(2)), g(x) = | x | .

If int((x-1)dx)/(x^(2)sqrt(2x^(2)-2x+1))=(sqrt(f(x)))/(g(x))+C, then f(x)=2x^(2)-2x+1 (b) g(x)=x+1g(x)=x( d) f(x)=sqrt(2x^(2)-2x)

If (f(x))/(g(x))=h(x) where g(x)=sqrt(1-|(x^(2))/(x-1)|) and h(x)=(1)/(sqrt(|x-1|-[x])) then the domain of f(x)

f(x)=tan x,x in(-(pi)/(2),(pi)/(2)) and g(x)=sqrt(1-x^(2)) then g(f(x)) is