Let $T(S)$ be the Teichmuller space over a hyperbolic Riemann surface $S$. A geodesic disk in $T(S)$ is defined the image of an isometric embedding of the Poincar\'e disk into $T(S)$. In this paper, it is shown that for any non-Strebel point $\tau\in T(S)\backslash\{[0]\}$, there are infinitely many geodesic disks containing the straight line $\{[t\mu]:\,t\in (-1/k,1/k)\}$ where $\mu$ is an extremal representative of $\tau$ with $\|\mu\|_\infty=k$. An infinitesimal version is also obtained.