This study visualized the textbook proof of an equation on permutations using Toulmin’s (2003) argumentation model, derived the corresponding Rules of Proof (RoP), and compared them with proofs constructed by high school students. The textbook proof was structured by setting the left- and right-hand sides as data (D1, D2) and representing the factorial-based reasoning as arguments (A1, A2), forming a D2-A2-A1-D1 structure. Notably, the proof started from the right-hand side (S1), explicitly developed essential arguments (S3) along the deductive order (S2) using factorial representation (W1), substitution (W2), and algebraic manipulation (W3), and justified the equivalence of both sides step by step through equality signs (S4). These proof rules (S1-S4) were identified as core elements ensuring the validity and structural consistency of the textbook proof. In contrast, students’ proofs often partially reflected or implicitly assumed these rules. Some proofs omitted explicit recognition of equivalence when connecting data and arguments, or inadequately represented argumentation and the role of equality. This indicates that students did not fully perceive the regularity and structure underlying the proof, highlighting the critical role of meta-knowledge about proof rules in achieving completeness and acceptability. The findings underscore the importance of making structural rules explicit in teaching, and suggest that Toulmin-based visualizations can effectively strengthen students’ meta-knowledge in proof construction.