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My assignment is to write a program that calculates first seven values of fibonacci number sequence. the formula given is:

Fib(1) = 1, Fib(2) = 1, Fib(n) = Fib(n-1) + Fib(n-2)

I believe that is a function but I do not understand how to incorporate it into code. I need to place the values in EAX register. I am using MASM not that makes any difference. Any hints?

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This is probably a homework assignment so I'll treat it as such. –  Wug Oct 12 '12 at 19:44
1  
The 7th fibonacci number when starting at 1 is 13, so just mov eax, 13 and you're done. That, or you didn't give the full requirements. –  harold Oct 12 '12 at 19:49

1 Answer 1

I suspect that this is an academic assignment so I'm only going to partially answer the question.

The fibonacci sequence is formally defined for non-negative integers as follows:

F(n) = n                   | n < 2
     = F(n - 1) + F(n - 2) | n >= 2

This gives:

  n | F(n)
  0 |   0
  1 |   1
  2 |   1
  3 |   2
  4 |   3
  5 |   5
  6 |   8
  7 |  13
etc etc...

You can do it with just a few registers, let's identify them:

  • Rn (the number of the requested fibonacci number)
  • Rf1 (used to calculate fibonacci numbers)
  • Rf2 (also used to calculate fibonacci numbers)
  • Rx (the register to hold the return value. can overlap with any other register)

Rn is passed as the argument to the function. Rf1 shall start at 0, and Rf2 shall start at 1.

Here's what we do to get the answer, split up by routines:

Begin

  1. Initialize Rf1 to 0.
  2. Initialize Rf2 to 1.
  3. Continue to Loop.

Loop

  1. Subtract 2 from Rn.
  2. If Rn is less than 0, jump to Finish.
  3. Add Rf2 to Rf1, storing the result in Rf1.
  4. Add Rf1 to Rf2, storing the result in Rf2.
  5. Jump to Loop.

Finish

  1. If Rn AND 1 is false (implying that Rn is even) jump to FinishEven.
  2. Store Rf1 as the return value.
  3. Return.

FinishEven

  1. Store Rf2 as the return value.
  2. Return.

Tracing through for Rn = 5:

  1. Rf1 = 0
  2. Rf2 = 1
  3. Rn = Rn - 2 // Rn = 3
  4. Test Rn < 0 // false
  5. Rf1 = Rf1 + Rf2 // Rf1 = 0 + 1 = 1
  6. Rf2 = Rf1 + Rf2 // Rf2 = 1 + 1 = 2
  7. Unconditional Jump to Loop
  8. Rn = Rn - 2 // Rn = 1
  9. Test Rn < 0 // false
  10. Rf1 = Rf1 + Rf2 // Rf1 = 1 + 2 = 3
  11. Rf2 = Rf1 + Rf2 // Rf2 = 3 + 2 = 5
  12. Unconditional Jump to Loop
  13. Rn = Rn - 2 // Rn = -1
  14. Test Rn < 0 // true
  15. Jump to Finish
  16. Test Rn & 1 // true
  17. Rx = Rf2 // 5

Our table shows that F(5) = 5, so this is correct.

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Thanks, usefull but still not at my level. Maybe you could revise in laymens terms the formula? –  user1740117 Oct 13 '12 at 4:01
    
You give them the little finger, and they will want both hands... –  hirschhornsalz Oct 13 '12 at 9:41

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