This paper investigates one of philosophy’s most profound questions: Is mathematics a timeless reality waiting to be discovered, or an ingenious human creation? By examining Platonist and formalist perspectives, analyzing Wigner’s notion of the “unreasonable effectiveness” of mathematics in physics, and exploring mathematical patterns in nature—such as fractals and the Fibonacci sequence—we argue that this dichotomy may be illusory. Rather than representing a binary choice between discovery and invention, mathematics appears to emerge from a dynamic interplay between objective structures in reality and the cognitive frameworks of the human mind. This investigation carries significant implications for science, philosophy, the development of artificial intelligence, and our broader understanding of reality itself.
Revista et al. (Sun,) studied this question.