Paris-Erdogan proved that the recursive golden (φn) ratio approaches golden ratio (φ) at constant rate, which can be expressed as φ - φn is approximately equal to [(2C/ (2φ)n. Here C is the paris constant which is equal to 1.09864.
Paris-Erdogan proved that the recursive golden (φn) ratio approaches golden ratio (φ) at constant rate, which can be expressed as φ - φn is approximately equal to [(2C/ (2φ)n. Here C is the paris constant which is equal to 1.09864.
