Each point in the plane belongs to exactly one circle of the pencil.

A point can never belong to both players' territories.

The point belongs to the ball the closest to the cochonnet.

For any point, there are two different lines to which that point belongs.

The lone neutral point does not belong to either player's area.

An orbit is integral if this point belongs to the weight lattice of G.

Each point of the configuration belongs to four lines, and each line contains three points.

Therefore rich points belong to daily life and not only to language.

Each point of the red box belongs to 4 of the 6 boxes.

We take the points belonging to and translate them so that the centre of the square is at the origin.