In this study, a special Möbiüs transformation group and its action on an extended set of rational numbers
are examined. With the idea of group act, some interesting results were obtained about number theory.
Möbius transformations are the automorphisms of the extended complex plane (Riemann Sphere ℂ̂
=
ℂ ∪ {∞}). A Möbius transformation T is a fractional linear transformation with complex coefficients
with a determinant different from zero in the form of 𝑇(𝑧) =
𝑎𝑧+𝑏
𝑐𝑧+𝑑
. The set of all Möbius
transformations is a group under composition. It is well-known that the image of a line or a circle under
a Mobius transformation is another line or circle and the principle of circle transformation is an invariant
characteristic property of Möbius transformations [1]. It is discussed here that, subgroups of the
Modular group which is the most known Mobius transformation group with integer coefficients with
determinant one. The Pascal numbers were obtained by observing the integer forces of a single
parameter special element of the modular group.
Keywords: Möbius transformations, Pascal numbers, Modular group, Extended rationals.