The value 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

The values of b and c for which the identity of f(x+1)-f(x)=8x+3 is satisfied,where f(x)=bx^(2)+cx+d, are b=2,c=1 (b) b=4,c=-1b=-1,c=4(d)b=-1,c=1

The value of aand b for which the identity f(x)-4(x-1)=4x+5 is satisfied,where f(x)=ax^(2)+bx+c, are

If f(x) =ax^(2) + bx + c satisfies the identity f(x+1) -f(x)= 8x+ 3 for all x in R Then (a,b)=

Determine the values of a,b,c for which the function f(x)={(sin(a+1)x+sin x)/(x),quad f or x<0c,quad f or x=0(sqrt(x+bx^(2)))/(bx^(3/2)),quad f or x is continuous at x=0

If f(x)=ax+b and the equation f(x)=f^(-1)(x) be satisfied by every real value of x, then

Let f(x)=x^(2)-3x+4, the value(s) of x which satisfies f(1)+f(x)=f(1)f(x) is