If f and g are differentiable functions such that `g^(')(a) =2` and g(a) = b and if fog is an identity function then `f^(')(b)` has the value equal 'to

Let f , g : (a,b) rarrR be differentiable functions. Show that d(fg) = fdg + gdf.

Let f be a differential function such that f(x)=f(2-x) and g(x)=f(1 +x) then (1) g(x) is an odd function (2) g(x) is an even function (3) graph of f(x) is symmetrical about the line x= 1 (4) f'(1)=0

Let f:R to R and h:R to R be differentiable functions such that f(x)=x^(3)+3x+2,g(f(x))=x and h(g(x))=x for all x in R . Then,

Let g(x) be a function such that g(a+b)=g(a)dotg(b)AAa , b in Rdot If zero is not an element in the range of g, then find the value of g(x)dotg(-x)dot

If f and g are continuous functions with f(3) = 5 and lim_(xto3)[2f(x)-g(x)]=4 , find g(3).

If f(x)=(a x^2+b)^3, then find the function g such that f(g(x))=g(f(x))dot

Let x = f(t) and y = g(t), where x and y are twice differentiable function If f^(')(0) = g^(')(0) = f^('')(0) = 2, g^(")(0) = 6 , then the value of ((d^(2)y)/(dx^(2))_(t=0) is equal to

If f and g are continuous functions with f(3)=5 and lim_(x to 3)[2f(x)-g(x)]=4 , find g(3).

Let f,g: (a,b) to R be differentiable functions show that d ((f)/(g)) = (gf' dx - fg'dx)/(g ^(2)) (where g ne 0)