Solving Recurrence Relations using Fibonacci Sequence

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stanyeo1984
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Recall that the Fibonacci sequence is defined by the initial conditions F0 = 0 and
F1 = 1, and the recurrence relation Fn = Fn−1 + Fn−2 for n > 2.
(a) Let F(z) = F0 + F1z + F2z
2 + F3z
3 + · · · be the generating function of the
Fibonacci numbers. Derive a closed formula for F(z).
(b) Consider the recurrence relation an = 19 (F0 an−1 + F1 an−2 + · · · + Fn−1 a0),
n > 1 with a0 = 9. Derive a closed formula for the generating function A(z)
of the sequence an.
(c) Find an explicit formula for an.
 
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stanyeo1984 said:
Recall that the Fibonacci sequence is defined by the initial conditions F0 = 0 and
F1 = 1, and the recurrence relation Fn = Fn−1 + Fn−2 for n > 2.
(a) Let F(z) = F0 + F1z + F2z
2 + F3z
3 + · · · be the generating function of the
Fibonacci numbers. Derive a closed formula for F(z).
What is your series? First you say "Let F(z) = F0 + F1z + F2z" but then what do the next two lines have to do with it? "2 + F3z, 3 + ... What do these lines mean?

-Dan
 
topsquark said:
What is your series? First you say "Let F(z) = F0 + F1z + F2z" but then what do the next two lines have to do with it? "2 + F3z, 3 + ... What do these lines mean?

-Dan

Recall that the Fibonacci sequence is defined by the initial conditions F0 = 0 and
F1 = 1, and the recurrence relation Fn= Fn-1 + Fn-2 for n >= 2.

(a) Let F(z) = F0 +F1z + F2z2 + F3z3 + ··· be the generating function of the
Fibonacci numbers. Derive a closed formula for F(z).

(b) Consider the recurrence relation an = 19 (F0an-1 + F1an-2 + · · · + Fn-1a0), n >= 1 with a0= 9. Derive a closed formula for the generating function A(z) of the sequence an.

(c) Find an explicit formula for an.
 
stanyeo1984 said:
Recall that the Fibonacci sequence is defined by the initial conditions F0 = 0 and
F1 = 1, and the recurrence relation Fn= Fn-1 + Fn-2 for n >= 2.

(a) Let F(z) = F0 +F1z + F2z2 + F3z3 + ··· be the generating function of the
Fibonacci numbers. Derive a closed formula for F(z).

(b) Consider the recurrence relation an = 19 (F0an-1 + F1an-2 + · · · + Fn-1a0), n >= 1 with a0= 9. Derive a closed formula for the generating function A(z) of the sequence an.

(c) Find an explicit formula for an.

I've solved part a

anyone can solve (b) and (c)?
part b does not look like fibonacci sequence.
 
Hi all,
Here's a solution. Notice as usual with generating functions no attention is paid to convergence, but as usual at the end you can go back and verify the steps for z values where the generating functions converge.

2qltwzc.png