`f(x)={(x", if x is rational"),(0", if x is irrational"):}, g(x)={(0", if x is rational"),(x", if x is irrational"):}`
Then, `f-g` is

Two functions f:RtoR and g:RtoR are defined as follows: f(x)={(0,(x"rational")),(1,(x "irrational")):} g(x)={(-1,(x"rational")),(0,(x "irrational")):} then (gof)( e )+(fog) ( pi ) =

Two functions f:Rrarr R, g:R rarr R are defined as follows : f(x)={{:(0,"(x rational)"),(1,"(x irrational)"):}," " g(x)={{:(-1,"(x rational)"),(0,"(x irrational)"):} then (fog)(pi)+(gof)(e)=

If f(x) = {(x,",", x ge 0),(x^(2),",",x lt 0):} , then f(x) is

f(x) = {{:((|x|)/(x)",",x ne 0),(0",",x = 0):}

If f(x) = sin x - cos x , x != 0 , is continuous at x = 0, then f(0) is equal to

If f(x) = (tan(x^(2)-x))/(x), x != 0 , is continuous at x = 0 , then f(0) is

Let the function f, g, h are defined from the set of real numbers RR to RR such that f(x) = x^2-1, g(x) = sqrt(x^2+1), h(x) = {(0, if x lt 0), (x, if x gt= 0):}. Then h o (f o g)(x) is defined by

If f(x) = x for x le 0 = 0 for x gt 0 , then f(x) at x = 0 is

If f(x)=x/(1+|x|) for x in R , then f'(0) =