If ` f : R to R ` is continuous such that
` f(x + y) = f(x) + f(y) x in R , y in R ` and
f(1) = 2 then f(100) =

y=f(x) =x/(1+|x|), x in R, y in R is

If f : R to R such that f(x- f(y)) = f( f(y) ) + x f (y) +f(x) - 1 AA , y in R then f(x) is

If f : R to R is defined as f (x+ y) = f (x) + f (y) AA x, y in R and f (1) = 7, then find sum _(r =1) ^(n) f (r).

If f(x) satisfies the relation f(x+ y) = f ( x) + f( y ) for all x, y in R and f(1) = 5 then

f: R^(+) rarr R is continuous function satisfying f(x/y)=f(x) - f (y) AA x, y in R^(+) . If f'(1) = 1, then

If 'f is a function such that f (x + y) =f (x) f (y) for all x,y in R and f ^(1) (0) exists, show that f ^(1) (x) = f(x) f ^(1)(0) for all x, y in R.

Let f be a non zero continuous function satisfying f(x+y)=f(x) f(y) for all x, y in R . If f(2)=9 then f(3) is