Writing a math proof requires a clear, logical, and structured approach. First, understand the statement fully and identify what needs to be proven. Next, review relevant definitions, theorems, and properties that could apply. Then, plan your approach by deciding whether to use direct proof, proof by contradiction, induction, or another method. Begin the proof by stating assumptions clearly, and proceed step by step, ensuring each deduction logically follows from previous statements. Use precise mathematical language and notation to avoid ambiguity. Finally, conclude the proof by clearly indicating that the desired statement has been shown to be true. Reviewing and revising your proof helps ensure clarity, correctness, and rigor
