What are some characteristics of r as in $tau = mr^2alpha$?

Yes, the distance between the axis of rotation and the center of mass is taken into consideration when talking about r. The tangential acceleration is always perpendicular to r. If however a force is applied at an angle to the system, the angle will have to be taken into consideration and we will consider the part of the force perpendicular to r. The angular acceleration vector however is perpendicular to the plane of rotation and not r.

The torque and angular acceleration are related by the moment of inertia. For a general body with an extended mass distribution, the moment of inertia is given by an integral: $$ I = iiint r^2, rho(vec r) ;mathrm dV, $$ where $rho(vec r)$ is the volumetric mass density and $r$ is the (cylindrical) distance to the axis of rotation.

For bodies that are localised in confined regions, the factor of $r^2$ can be factored out, since it takes basically the same value throughout the integral. The remaining integral gives simply the mass, and the formula reduces to the $I=mr^2$ in your question.

However, for general bodies, you just have to integrate.