The function `f: C -> C` defined by `f(x) = (ax+b)/(cx+d)` for `x in C` where `bd != 0` reduces to a constant function if

The function f: C to C defined by f(x)=(ax+b)/(cx+d) for x in C where bd ne 0 reduces to a constant function if:

Q.2The function f(x) is defined by f(x)=cos-x + K cos22x + sinx, where K is a constant. If the functionf(x) is a constant function, the value of k is(1)-1(B)-1/2(D) 1/2 (E) 1(C) 0

f:C rarr C is defined as f(x)=(ax+b)/(cx+d), bd != 0 then f is a constant function when

Let f:[0,5] -> [0,5) be an invertible function defined by f(x) = ax^2 + bx + C, where a, b, c in R, abc != 0, then one of the root of the equation cx^2 + bx + a = 0 is:

Let f:[0,5] -> [0,5) be an invertible function defined by f(x) = ax^2 + bx + C, where a, b, c in R, abc != 0, then one of the root of the equation cx^2 + bx + a = 0 is:

Function f is defined by f(x)=(3)/(2)x+c . If f(6)=1 , what is the value of f(c) ?

A function f: R to R defined by f(x)=ax^(2)+bx+c, (ane0) is called ____ function.

A function is defined as f(x) = ax^(2) – b|x| where a and b are constants then at x = 0 we will have a maxima of f(x) if

The function f is defined by f(x)=x^4-4x^4 -x^2+cx -12 , where c is a constant.In the xy-plane, the graph of f intersects the x-axis in the four points (-2,0), (1,0), (p,0), and (q,0). What is the value of c ?