Let `f: R to R` be a periodic function such that `f(T+x)=1" "` where T is a `+[1-3f(x)+3(f(x))^(2) -(f(x))^(3)]^(1/3)` fixed positive number, then period of f(x) is

Let f: R rarr R be a periodic function such that f(T + x) = 1 + (2-3f(x) + 3(f(x))^2- (f(x))^3)^(1/3) where T is a fixed positive number, then period of f(x) is (i) T (ii) 2T (iii)3T (iv) none of these

Let f(x) be a real valued periodic function with domain R such that f(x+p)=1+[2-3f(x)+3(f(x))^(2)-(f(x))^(3)]^(1//3) hold good for all x in R and some positive constant p, then the periodic of f(x) is

Let f(x) be a real valued periodic function with domain R such that f(x+p)=1+[2-3f(x)+3(f(x))^(2)-(f(x))^(3)]^(1//3) hold good for all x in R and some positive constant p, then the periodic of f(x) is

Let f(x) be a real valued periodic function with domain R such that f(x+p)=1+[2-3f(x)+3(f(x))^(2)-(f(x))^(3)]^(1//3) hold good for all x in R and some positive constant p, then the periodic of f(x) is

Let f(x) be a real valued periodic function with domain R such that f(x+p)=1+[2-3f(x)+3(f(x))^(2)-(f(x))^(3)]^(1//3) hold good for all x in R and some positive constant p, then the periodic of f(x) is

Let f: R to R , be a periodic function such that {f(x):x in N} is an infinite set then, the period of f(x) cannot be

Let f: R to R , be a periodic function such that {f(x):x in N} is an infinite set then, the period of f(x) cannot be

Let f(x+p)=1+{2-3f(x)+3(f(x))^2-(f(x)^3}^(1//3), for all x in R where p>0 , then prove f(x) is periodic.

Let f(x) be a real valued function with domain R such that f(x+p)= 1 +[2-3f(x)+3(f(x))^(2)-(f(x))^(3)]^(1//3) holds good AA x in R and for some +ve constant 'p' then the period of f(x) is

Let f :R to R be a function such that f(x) = x^3 + x^2 f' (0) + xf'' (2) , x in R Then f(1) equals: