Let a fiunction f defined by `f(x)=(x-|x|)/(x) "for" x ne0` and f(0) =2 then f is

f(x) = (|x|)/(x) , x ne 0 , f(0) = 1 then f(x at x = 0 9s

Let A={x in R : x ne 0, -4le xle4} and f:A rarrR is defined by f(x)=(|x|)/(x) for x in A. Then the range of f is

If f(x)=(x)/(1+e^(1//x))"for "x ne 0, f(0)=0" then at x=0, f(x) is"

Let f be a function defined by f(x)={{:((tanx)/(x)",",x ne0),(1",",x=0):} Statement -I x=0 is point of minimum of f Statement II : f'(0)=0

Let f : R to R be a function defined by f (x + y) = f (x).f (y) and f (x) ne 0 for andy x. If f '(0) exists, show that f '(x) = f (x). F'(0) AA x in R if f '(0) = log 2 find f (x).

Check the continuity of the function ‘f defined by f(x)= {{:((sin2x)/(x),if x ne 0),(1,if x=0):} at x=0

If f(x)=x sin ""1/x"for "x ne 0, f(0)=0" then at x"=0, f(x) is