If f(x), g(x) are primitives of `phi` (x) then

If f(x) and g(x) are two functions such that f(x)+g(x)=e^(x) and f(x)-g(x)=e^(-x) then I: f(x) is an even function II : g(x) is an odd function III : Both f(x) and g(x) are neigher even nor odd.

If f(x) and g(x) are continuous functions satisfysing f(x)=f(a-x)andg(x)+g(a-x)=2 then int_(0)^(a)f(x)g(x)dx=

Assertion (A) : If f(x) , g(x) and h(x) are continueous on [a,b] and differentiable in (a,b) , then, the exists c in (a,b) such that |{:(f(a),g(a),h(a)),(f(b),g(b),h(b)),(f'(c ),g'(c ),h'(c )):}|=0 Reason ( R ) : Lagrange's Mean Value theorem is applicable on [a,b] for phi (x ) =|{:(f(a),g(a),h(a)),(f(b),g(b),h(b)),(f'(c ),g(x ),h(x )):}|=0 Then , which of the following is true?

If f(x) and g(x) are be two functions with all real numbers as their domains, then h(x) =[f(x) + f(-x)][g(x)-g(-x)] is:

If f(x) + g(x) = e^(-x) where f(x) is an even function and g(x) is an odd function then f(x) =

If f(g(x)) = x and g(f(x)) = x then g(x) is the inverse of f(x) . (g'(x))f'(x) = 1 implies g'(f(x))=1/(f'(x)) If f(x) = x^3 +x^2 +log_ex and g is inverse of f then 6'g(6) is equal to

If f(x) = (x)/(1 + x) and g(x) = f(f(x)), then g(x) is equal to