What is a Corollary?
A corollary is a proposition or theorem that can be readily derived from a previously established result. It is closely related to the main theorem and often represents a special case or a direct consequence.
Key Concepts
- Direct Consequence: Corollaries are not independent results but extensions of existing proofs.
- Minimal Proof: The proof of a corollary is typically short, referencing the main theorem.
- Efficiency: They save time by not requiring entirely new proofs for closely related ideas.
Deep Dive
Consider a theorem T. If a statement C can be proven using the logic and results of T with only a few additional steps, C is a corollary to T. This relationship highlights the interconnectedness of mathematical ideas.
Applications
Corollaries appear frequently in various fields, including geometry (e.g., properties of triangles derived from general polygon theorems) and number theory. They help solidify understanding and expand the applicability of fundamental theorems.
Challenges & Misconceptions
A common misconception is that a corollary is just another theorem. However, its defining characteristic is its dependence on a preceding, proven theorem.
FAQs
Q: How is a corollary different from a lemma?
A lemma is a helping theorem used in the proof of a larger, more important theorem, whereas a corollary is a direct consequence of a proven theorem.
Q: Does every theorem have a corollary?
No, not all theorems have obvious or significant corollaries.