Mathematical induction: Difference between revisions
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In [[mathematics]], an ''' | In [[mathematics]], an '''inductive proof''' is a [[proof]] by cases, applicable whenever the problem can be divided into discrete, enumerable propositions. Inductive proofs consist first prove a base proposition <math>P_0</math>, and then prove an inductive hypothesis <math>\forall i > 0, P_i\implies P_{i+1}</math>. [[modus ponens]] is then used to extend the proof over the entire domain of the problem. | ||
[[Category: Mathematics Workgroup]] [[Category: CZ_Live]] | [[Category: Mathematics Workgroup]] [[Category: CZ_Live]] |
Revision as of 08:12, 15 May 2007
In mathematics, an inductive proof is a proof by cases, applicable whenever the problem can be divided into discrete, enumerable propositions. Inductive proofs consist first prove a base proposition , and then prove an inductive hypothesis . modus ponens is then used to extend the proof over the entire domain of the problem.
Example
Proposition: A tree in graph theory has Euler Characteristic of -1.
Proof: By induction,
Base proposition: the trivial tree ---a single vertex without edges---has Euler characteristic .
Inductive Hypothesis: For a tree , and any extension single vertex extension of that tree , show that .
If , then adding one vertex and one edge to this graph would yield:
.
Since all trees can be constructed in this manner from the trivial tree, it must be the case that all trees have Euler Characteristic -1. QED.