If `f_(i)=sum_(i=0)^(2)a_(ij)x^(i), `j=1,2,3 and `f_(j)` and are denoted by `(df)/(dx) "and" (d^(2)f_(j))/(dx^(2))` "respectively then g(x) =`|{:(f_(1),f_(2),f_(3)),(f_(1)^('),f_(2)^('),f_(3)^(')),(f_(1)^(''),f_(2)^(''),f_(3)^('')):}|` is

If f_(1) ,(x) and f_(2)(x) are defined on a domain D_(1) , and D_(2) , respectively, then domain of f_(1)(x) + f_(2) (x) is :

Let f : R rarr R be defined by f(x) = x^2 +1 , then, f^-1 (17) and f^-1 (-3) are respectively

If ‘f’ is a real function defined by : f(x)= (x-1)/(x+1) , then prove that f (2x) = (3 f(x)+1)/(f(x)+3) .

If f'(x) = x -(3)/(x^2). F (1) = (11)/(2), find f(x)

Let f_(1) (x) and f_(2) (x) be twice differentiable functions where F(x)= f_(1) (x) + f_(2) (x) and G(x) = f_(1)(x) - f_(2)(x), AA x in R, f_(1) (0) = 2 and f_(2)(0)=1. "If" f'_(1)(x) = f_(2) (x) and f'_(2) (x) = f_(1) (x) , AA x in R then the number of solutions of the equation (F(x))^(2) =(9x^(4))/(G(x)) is...... .

If f((xy)/(2)) = (f(x).f(y))/(2), x, y in R, f(1) = f'(1)."Then", (f(3))/(f'(3)) is.........

Given f(x) =log_(10) x and g(x) = e^(piix) . phi (x) =|{:(f(x).g(x),(f(x))^(g(x)),1),(f(x^(2)).g(x^(2)),(f(x^(2)))^(g(x^(2))),0),(f(x^(3)).g(x^(3)),(f(x^(3)))^(g(x^(3))),1):}| the value of phi (10), is

Show that int_0^a f(x)g(x)dx = 2 int_0^a f(x)dx , if f and g are defined as f(x) = f(a-x) and g(x) + g(a-x) = 4

If f : R rarrR defined by f(x) = x^2 - 2x + 3 , then find f(f(x)) .