The funcrtin `f (x)=0` has eight distinvt real solution and f also satisfy `f (4+x) =f (4-x).` The sum of all the eight solution of `f (x)=0` is :

The function f (x)=0 has eight dinstict real solution and f also satisfy f (4+x) =f (4-x). The sum of all the eight solution of f (x)=0 is : (a). 12 (b). 32 (c). 16 (d). 15

A function f(x) is such that f(x)=0 has 8 distinct real roots and f(4+x)=f(4-x) for x in R . Sum of real roots of the equation f(x)=0 is

There exists a function f(x) satisfying f(0)=1, f'(0)=-1, f(x) gt 0 , for all x, then :

If f(x)=|x|-2|-2 for x in[-4,4] then the number of real solutions of f(f(x))=-1 is

Let f(x)=|x-1|+a|-4,quad if f(x)=0 has three real solution,then the values of lies in

Let f (x) = x^(2)+10x+20. Find the number of real solution of the equation f (f (f (f(x))))=0

Let f (x) = x^(2)+10x+20. Find the number of real solution of the equation f (f (f (f(x))))=0

Find the number of distinct real solutions of the equation f(f(x))=0, where f(x)=x^(2)-1

Let f be a real valued function, satisfying f (x+y) =f (x) f (y) for all a,y in R Such that, f (1_ =a. Then , f (x) =