If non-zer real numbers b and c are such that min `f(x) gt max (g)x,` where `f(x)=x^(2)+2bx+2c^(2) and g(x)=-x^(2)-2cx+b^(2)(x in R)`, Then `|(c)/(b)|` lies in the interval

For real number x, if the minimum value of f(x) =x^(2) +2bx +2c^(2) is greater than the maximum value of g(x) =-x^(2)-2cx+b^(2) , then

The values of b and c for which the identity f(x+1)-f(x)=8x+3 is satisfied, where f(x)=bx^(2)+cx+d , are

If f(x)=2x-1, g(x)=x^(2) , then (3f-2g)(x)=

If f and g are real valued functions define by f(x)=2x-1 and g(x)=x^(2) then find (i) (3f-2g)(x)

If f: R to R is defined by f(x) = x^(2)-3x+2 and f(x^(2)-3x-2) =ax^(4) + bx^(3) + cx^(2) +dx +e , then a+b+c+d+e =

Statement -I: f: A to B is one -one and g: B to C is a one-one function, then gof : A to C is one-one Statement-II: If f: A to B, g : B to A are two functions such that gof =I_(A) and fog=I_(B) , then f=g^(-1) . Statement-III: f(x) =sec^(2)x- tan^(2)x, g(x) ="cosec"^(2)x-cot^(2)x , then f=g. Which of the above statements is/are true:

If f(x) =|x-2| and g(x) = f(f(x)) , then for x gt 20, g(x) =