Let displaystyle{F}_{{i}} be in the displaystyle{i}^{{{t}{h}}} Fibonacc number, and let n be ary positive eteger displaystylege{3}Prove thatdisplaystyle{F}_{{n}}=frac{1}{{4}}{left({F}_{{{n}-{2}}}+{F}_{{n}}+{F}_{{{n}+{2}}}right)}

defazajx

defazajx

Answered question

2021-01-19

Let Fi be in the ith Fibonacc number, and let n be any positive integer 3
Prove that
Fn=14(Fn2+Fn+Fn+2)

Answer & Explanation

Dora

Dora

Skilled2021-01-20Added 98 answers

Let us first recall a definition of nth Fibonacci number
Fn=Fn1+Fn2,for n2
Now we have to show
Fn=14(Fn2+Fn+Fn+2),for n3
Now starting from right hand side we get
14(Fn2+Fn+Fn+2)=14(Fn2+Fn+(Fn+1Fn))[Fn+2=Fn+1+Fn]
=14(Fn2+2Fn+Fn+1)[Fn+2=Fn+1+Fn]
=14(Fn2+2Fn+(FnFn1))[Fn+1=Fn+Fn1]
=14((Fn2+Fn1)3Fn)
=14(4Fn)[Fn=Fn1+Fn2]
=Fn
Hence the proved

Do you have a similar question?

Recalculate according to your conditions!

New Questions in Discrete math

Ask your question.
Get an expert answer.

Let our experts help you. Answer in as fast as 15 minutes.

Didn't find what you were looking for?