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A recursive sequence defines each term using previous terms. The Fibonacci sequence is the most famous example (each term is the sum of the two before it). Many real-world processes follow recursive patterns.

Formule

General form: aₙ = f(aₙ₋₁, aₙ₋₂, ...) with initial conditions

aₙ: nth term of sequence
aₙ₋₁, aₙ₋₂,...: previous terms
f: recurrence relation function

Guide étape par étape

1Define base cases: a₀, a₁
2Define recurrence: aₙ = f(aₙ₋₁, aₙ₋₂)
3For aₙ = p×aₙ₋₁ + q×aₙ₋₂
4Fibonacci is p=1, q=1

Exemples résolus

Entrée

a₀=1, a₁=1, aₙ=aₙ₋₁+aₙ₋₂

Résultat

1,1,2,3,5,8,13,21 (Fibonacci)

Entrée

a₀=1, a₁=2, aₙ=2aₙ₋₁−aₙ₋₂

Résultat

1,2,3,4,5,6 (arithmetic)

Questions fréquentes

What is the difference between a recursive and explicit formula?

Recursive: defines aₙ using prior terms. Explicit: gives aₙ directly in terms of n.

Can every recursive sequence be expressed as explicit?

Not always easily. Some recursive sequences are difficult to express in closed form.

What are initial conditions in a recursive definition?

The first few terms (e.g., a₀ or a₁, a₂) that anchor the recursion so you can compute all later terms.

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