Parabola

Synthetically, a parabola is the locus of points in a plane that are equidistant from a given line (the directrix) and a given point (the focus). Alternatively, a parabola is a conic section obtained as the intersection of a right circular cone with a plane parallel to a generator of the cone.

Let ${\displaystyle d}$ be a line and ${\displaystyle F}$ a point. In the degenerate when ${\displaystyle F}$ is a point of ${\displaystyle d}$, the "parabola" with directrix ${\displaystyle d}$ and focus ${\displaystyle F}$ is the line through ${\displaystyle F}$ that is perpendicular to ${\displaystyle d}$. In the language of conic sections, this corresponds to the case when the plane contains a generator of the cone.

To avoid the degenerate case, assume that ${\displaystyle F}$ does not lie in ${\displaystyle d}$, let ${\displaystyle \Pi }$ be the unique plane containing ${\displaystyle F}$ and ${\displaystyle d}$ and let ${\displaystyle P}$ be the parabola with focus ${\displaystyle F}$ and directrix ${\displaystyle d}$. The line ${\displaystyle s}$ through ${\displaystyle F}$ and perpendicular to ${\displaystyle d}$ is called the axis of the the parabola ${\displaystyle P}$ and is the unique line of symmetry of ${\displaystyle P}$. The unique point ${\displaystyle V}$ of ${\displaystyle s}$ that is equidistant from ${\displaystyle F}$ and ${\displaystyle d}$ lies on ${\displaystyle P}$ and is known as the vertex of the parabola, and the distance ${\displaystyle FV}$ is called the focal distance of the parabola.

Now let ${\displaystyle F'}$ be a point in ${\displaystyle \Pi }$ and ${\displaystyle d'}$ a line in ${\displaystyle \Pi }$ such that the distance from ${\displaystyle F'}$ to ${\displaystyle d'}$ equals the distance from ${\displaystyle F}$ to ${\displaystyle d}$. Then there is a unique, orientation-preserving rigid motion of ${\displaystyle \Pi }$ taking ${\displaystyle F}$ to ${\displaystyle F'}$ and ${\displaystyle d}$ to ${\displaystyle d'}$ and therefore, the parabola ${\displaystyle P}$ to the parabola with focus ${\displaystyle F'}$ and directrix ${\displaystyle d'}$. In other words, any two parabolas with the same focal distance are congruent.