Let $D$ be the open unit disk, and $J$ a Jordan arc (that is, a homeomorphic copy of $[0, 1]$) that lies in $D$, except $J(0)$ lies on the boundary of $D$, say $J(0)=1$.  I would like to see that $D\smallsetminus J([0, 1])$ is a path-connected topological space.  Please help, if you can.  Thanks!