Construction of Geometric Sequence in Lowest Terms/Porism

Proof
Apparent from the construction.

From Construction of Geometric Progression in Lowest Terms, such a geometric progression is of the form:


 * $P = \left({q^{n-1}, p q^{n-2}, p^2 q^{n-3}, \ldots, p^{n - 2} q, p^{n - 1} }\right)$

Thus when $n = 2$:
 * $P = \left({q^2, p q, p^2}\right)$

and when $n = 3$:
 * $P = \left({q^3, p q^2, p^2 q, p^3}\right)$