Concept:The inductive method moves from specific examples to a general rule. It helps students discover geometrical theorems through observation and reasoning.
Explanation:In geometry, proving theorems requires reasoning from particular cases to a general conclusion. The inductive method starts with concrete examples, measurements, or patterns. Students observe these specific instances and then formulate a general law or theorem. This process makes the "how" and "why" of the theorem clear through logical reasoning.
For example, by measuring angles of several triangles, a student can inductively conclude that the sum of interior angles is 180°. This method encourages discovery and active thinking. It proceeds from the concrete to the abstract and from particular to general.
Other methods like deductive (general to specific), analysis (conclusion to hypothesis), or project (real-world task) do not primarily focus on proving theorems through reasoning from examples. Hence, the inductive method is the correct choice.
Answer:D. Inductive method