Part 2/6:
To understand the Troll Pi Illusion, we begin by visualizing a simple geometric configuration: a circle inscribed within a square. The diameter of this circle is assumed to be one unit. Accordingly, both the diameter and the length of the sides of the square equal one.
Using the fundamental definition of pi, we know that:
[ \text{π} = \frac{\text{Circumference}}{\text{Diameter}} ]
In this case, since the diameter is one, the circumference of the circle would also logically equate to the value of pi:
[ \text{π} = \frac{\text{Circumference}}{1} ]
This leads us to conclude, at least superficially, that the circumference is equal to pi in this scenario.