This project shows a very interesting way to calculate PI. A 1000 side poly is drawn to approximate a circle. The PI is calculated by dividing the perimeter of the polygon and the diameter. data:image/png;base64,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This project shows a very interesting way to calculate PI. A 1000 side poly is drawn to approximate a circle. The PI is calculated by dividing the perimeter of the polygon and the diameter.

data:image/png;base64,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2PI1000-150PI