For the function f(x)=∣x−3∣f(x) = |x - 3|f(x)=∣x−3∣, which statement is true about continuity at x=3x = 3x=3?
fff is not continuous at x=3x=3x=3 because f(3)=0f(3) = 0f(3)=0
fff is continuous at x=3x=3x=3 because limx→3f(x)=f(3)=0\lim_{x\to 3} f(x) = f(3) = 0limx→3f(x)=f(3)=0
fff is not continuous at x=3x=3x=3 because the left and right limits differ
The limit does not exist at x=3x=3x=3