Connected and T1 with at least two points implies dense-in-itself
Statement
Suppose a topological space is both a connected space and a T1 space and it has at least two points. Then, it is a dense-in-itself space, i.e., it has no isolated points.
Suppose a topological space is both a connected space and a T1 space and it has at least two points. Then, it is a dense-in-itself space, i.e., it has no isolated points.