A function f:R→Rf: \mathbb{R} \to \mathbb{R}f:R→R is defined as f(x)=x2f(x) = x^2f(x)=x2 for x∈Qx \in \mathbb{Q}x∈Q and f(x)=0f(x) = 0f(x)=0 for x∉Qx \notin \mathbb{Q}x∈/Q. Where is fff continuous?
Everywhere
Nowhere
Only at x=0x=0x=0
Only at x=1x=1x=1