(4) Let fn be the nth Fibonacci number. Prove that, for n > 0: (a) f + + .+ f = fnfn+1 ... [ fn+1 fn fn fn-1 ] (b) If A = then A" = (c) fn = (()" - ( Hint: use strong induction] %3D

Advanced Engineering Mathematics
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ISBN:9780470458365
Author:Erwin Kreyszig
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Chapter2: Second-order Linear Odes
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(4) Let fn be the nth Fibonacci number. Prove that, for n > 0:
(a)パ++
+ f = fnfn+1
...
(») If A = [ then A" =[A)
1 1
1 0
fn+1 fn
fn fn-1
(c) fn
= [()" - ( ] Hint: use strong induction]
1+
Transcribed Image Text:(4) Let fn be the nth Fibonacci number. Prove that, for n > 0: (a)パ++ + f = fnfn+1 ... (») If A = [ then A" =[A) 1 1 1 0 fn+1 fn fn fn-1 (c) fn = [()" - ( ] Hint: use strong induction] 1+
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