Let `f(x) =ax^2+bx+c` where a,b,c are real numbers. Suppose `f(x)!=x` for any real number x. Then the number of solutions for f(f(x))=x in real numbers x is

If f(x)=2 for all real numbers x, then f(x+2)=

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)=ax^(2)+bx+c where a,b and c are real constants.If f(x+y)=f(x)+f(y) for all real x and y, then

Let f(x)=a^2+e^x, -oo 3 where a,b,c are positive real numbers and is differentiable then

Let f(x)=a+b|x|+c|x|^(2) , where a,b,c are real constants. The, f'(0) exists if

Let f(x)=a+b|x|+c|x|^(2) , where a,b,c are real constants. The, f'(0) exists if

Let f(x)=a sin x+c , where a and c are real numbers and a>0. Then f(x)lt0, AA x in R if

Let f(x)=a sin x+c , where a and c are real numbers and a>0. Then f(x)lt0, AA x in R if

Let f(x)=a sin x+c , where a and c are real numbers and a>0. Then f(x)lt0, AA x in R if

Let f(x)=(x)/(1+x) and let g(x)=(rx)/(1-x) Let S be the set off all real numbers r such that f(g(x))=g(f(x)) for infinitely many real number x. The number of elements in set s is