Question

(5) Fibonacci sequences in groups. The Fibonacci numbers Fn are defined recursively by Fo 0, F1 -1, and Fn - Fn-1+Fn-2 forn 2 2. The definition of this sequence only depends on a binary operation. Since every group comes with a binary operation, we can define Fibonacci- type sequences in any group. Let G be a group, and define the sequence {fn in G as follows: Let ao, a1 be elements of G, and define fo-ao, fi-a1, and fn-an-1an-2 forn 2 2 In his paper Fibonacci Series Modulo m (American Mathematical Monthly, Vol. 67, 1960), D.D. Wall writes the following about his introduction to these sequences: The problem arose in connection with a method for generating random numbers but it turned out to be unexpectedly intricate, and so quickly became of interest in its own right. In an interesting application of Fibonacci sequences in groups, Iannis Xenakis (in Formal- ized Music, Indiana University Press, 1971) uses Fibonacci sequences in groups to create Fibonacci motions, which are sequences of musical properties such as pitch, volume, and timbre that give the composition its framework. We will see in this problem that these Fi- bonacci sequences become intricate quite quickly. (a) Explain why fn-Fn if GZ, ao 0, and a 1. (b) Find the elements in {fn) if G-Z3, ao 1 and a 2

0 0
Add a comment Improve this question Transcribed image text
Answer #1

L- 21一个 12 2 ㄈ ㄈ fa ff,千 4 oy 5

Add a comment
Know the answer?
Add Answer to:
(5) Fibonacci sequences in groups. The Fibonacci numbers Fn are defined recursively by Fo 0, F1...
Your Answer:

Post as a guest

Your Name:

What's your source?

Earn Coins

Coins can be redeemed for fabulous gifts.

Not the answer you're looking for? Ask your own homework help question. Our experts will answer your question WITHIN MINUTES for Free.
Similar Homework Help Questions
  • (5) Fibonacci sequences in groups. The Fibonacci numbers F, are defined recursively by Fo = 0,...

    (5) Fibonacci sequences in groups. The Fibonacci numbers F, are defined recursively by Fo = 0, Fi-1, and Fn Fn-1 + Fn-2 for n > 2. The definition of this sequence only depends on a binary operation. Since every group comes with a binary operation, we can define Fibonacc type sequences in any group. Let G be a group, and define the sequence (n in G as follows: Let ao, ai be elements of G, and define fo-ao fa and...

  • 2. The Fibonacci numbers are defined recursively as follows: fo = 0, fi = 1 and...

    2. The Fibonacci numbers are defined recursively as follows: fo = 0, fi = 1 and fn fn-l fn-2 for all n > 2. Prove that for all non-negative integers n: fnfn+2= (fn+1)2 - (-1)" 2. The Fibonacci numbers are defined recursively as follows: fo = 0, fi = 1 and fn fn-l fn-2 for all n > 2. Prove that for all non-negative integers n: fnfn+2= (fn+1)2 - (-1)"

  • The Fibonacci Sequence F1, F2, ... of integers is defined recursively by F1=F2=1 and Fn=Fn-1+Fn-2 for each integer . Pro...

    The Fibonacci Sequence F1, F2, ... of integers is defined recursively by F1=F2=1 and Fn=Fn-1+Fn-2 for each integer . Prove that (picture) Just the top one( not 7.23) n 3 Chapter 7 Reviewing Proof Techniques 196 an-2 for every integer and an ao, a1, a2,... is a sequence of rational numbers such that ao = n > 2, then for every positive integer n, an- 3F nif n is even 2Fn+1 an = 2 Fn+ 1 if n is odd....

  • Exercise 6. Let En be the sequence of Fibonacci numbers: Fo = 0, F1 = 1,...

    Exercise 6. Let En be the sequence of Fibonacci numbers: Fo = 0, F1 = 1, and Fn+2 = Fn+1 + Fn for all natural numbers n. For example, F2 = Fi + Fo=1+0=1 and F3 = F2 + F1 = 1+1 = 2. Prove that Fn = Fla" – BM) for all natural numbers n, where 1 + a=1+ V5 B-1-15 =- 2 Hint: Use strong induction. Notice that a +1 = a and +1 = B2!

  • Recall from class that the Fibonacci numbers are defined as follows: fo = 0,fi-1 and for all n fn...

    Recall from class that the Fibonacci numbers are defined as follows: fo = 0,fi-1 and for all n fn-n-1+fn-2- 2, (a) Let nEN,n 24. Prove that when we divide In by f-1, the quotient is 1 and the remainder is fn-2 (b) Prove by induction/recursion that the Euclidean Algorithm takes n-2 iterations to calculate gcd(fn,fn-1) for n 2 3. Check your answer for Question 1 against this. Recall from class that the Fibonacci numbers are defined as follows: fo =...

  • 3. The sequence (Fn) of Fibonacci numbers is defined by the recursive relation Fn+2 Fn+1+ F...

    3. The sequence (Fn) of Fibonacci numbers is defined by the recursive relation Fn+2 Fn+1+ F for all n E N and with Fi = F2= 1. to find a recursive relation for the sequence of ratios (a) Use the recursive relation for (F) Fn+ Fn an Hint: Divide by Fn+1 N (b) Show by induction that an 1 for all n (c) Given that the limit l = lim,0 an exists (so you do not need to prove that...

  • The Fibonacci numbers are defined as follows, f1=1, f2=1 and fn+2=fn+fn+1 whenever n>= 1. (a) Characterize...

    The Fibonacci numbers are defined as follows, f1=1, f2=1 and fn+2=fn+fn+1 whenever n>= 1. (a) Characterize the set of integers n for which fn is even and prove your answer using induction (b) Please do b as well. The Fibonacci numbers are defined as follows: fi -1, f21, and fn+2 nfn+1 whenever n 21. (a) Characterize the set of integers n for which fn is even and prove your answer using induction. (b) Use induction to prove that Σ. 1...

  • 14. (15 points) Recall that Fibonacci numbers are defined recursively as follows: fnIn-1 +In-2 (for n...

    14. (15 points) Recall that Fibonacci numbers are defined recursively as follows: fnIn-1 +In-2 (for n 2 2), with fo 0, fi-1 Show using induction that fi +f 2.+fn In+2-1. Make sure to indicate whether you are using strong or weak induction, and show all work. Any proof that does not use induction wil ree or no credit.

ADVERTISEMENT
Free Homework Help App
Download From Google Play
Scan Your Homework
to Get Instant Free Answers
Need Online Homework Help?
Ask a Question
Get Answers For Free
Most questions answered within 3 hours.
ADVERTISEMENT
ADVERTISEMENT