Let `f(x)` be periodic and `k` be a positive real number such that `f(x + k) + f (x) = 0` for all `x in R`. Then the period of `f(x)` is

Let f(x) be periodic and k be a positive real number such that f(x+k) + f(x) = 0 for all x in R . Prove that f(x) is periodic with period 2k.

Let f(x) be periodic and k be a positive real number such that f(x+k)+f(x)=0 for all x in R. Prove that f(x) is periodic with period 2k .

Let f(x) be periodic and k be a positive real number such that f(x+k)+f(x)=0fora l lx in Rdot Prove that f(x) is periodic with period 2kdot

Let f(x) be periodic and k be a positive real number such that f(x+k)+f(x)=0fora l lx in Rdot Prove that f(x) is periodic with period 2kdot

Let f(x) be periodic and k be a positive real number such that f(x+k)+f(x)=0fora l lx in Rdot Prove that f(x) is periodic with period 2kdot

Let f(x) be periodic and k be a positive real number such that f(x+k)+f(x)=0fora l lx in Rdot Prove that f(x) is periodic with period 2kdot

If f(x + 1/2) + f(x - 1/2) = f(x) for all x in R , then the period of f(x) is

If f(x+k) + f(x) = 0 AA x in R and k in R^(+) , then the period of f(x) is

If (x+(1)/(2))+f(x-(1)/(2))=f(x) for all x in R, then the period of f(x) is

If f(x) is a real valued function such that f(x + 6) - f(x + 3) + f(x) = 0, AA x in R , then period of f(x) is