I have not watched the video, but for people reading only comments let me clarify.
Numbers go naturals < integers < rationals < reals. Reals are the union of rationals (quotient of integers) with irrationals.
Rationals may have an infinite decimal expansion, like 1/3 has, but it has a repeating pattern at some point. Irrationals have an infinite decimal expansion and has no repetition of that kind.
This characteristic of irrationals does not depend on the base, it is always the same way. The finitude or infinitude of the representation of a rational depends on the base, but if infinite, there is a repeating pattern.
Numbers go naturals < integers < rationals < reals. Reals are the union of rationals (quotient of integers) with irrationals.
Rationals may have an infinite decimal expansion, like 1/3 has, but it has a repeating pattern at some point. Irrationals have an infinite decimal expansion and has no repetition of that kind.
This characteristic of irrationals does not depend on the base, it is always the same way. The finitude or infinitude of the representation of a rational depends on the base, but if infinite, there is a repeating pattern.