Question

For Problem 3, a new definition is needed. Recall Euclid's algorithm applied to the pair, (a, b), where a, bEZ and a >b> 0: (0 ri<b) (0 r2 <r) (0r3 <r2) ri q2r2 = r2 . 93 +r3 r1 (0rn-1Tn-2) Tn 2 n-1rn-1 Tn 3 (0 <<rn <rn-1) Tn-1n+Tn Tn-2 I Tn n+1 rn-1 = We will say that the algorithm terminates in n steps if rn+1 = 0, and rk0 for all 1 k<n. 3. Use induction to prove that for all n e Z, Euclid's algorithm applied to the pair (fn+2; fn+3). terminates in n steps, where denotes the nth Fibonacci number.

Answer 1

Induction methad e- nasto Palfors, frez). Efy its) fua fattz f; z fatti fo²fitto since to 20 = r tot algorith terminates in a steps. .nak is suppose that (furs, fete) terminates ain ktl steps... it. fate? futet full l faeza fate tfr 1-0 fz a fitto. I 92 84 : [fraps, fome) = (fary, fars) by definition of fibonacci number a face = futa tfutz - (2) Combining O with ③ we get the Euclidian algorithm with fo = 02 hutz . which terminale in Kt2 steps. (proved)