F_{0},\ F_{1},\ F_{2}\cdots is the Fibonacci sequence. Prove that F_{k+1}^{2}-F_{k}^{2}=F_{k-1}F_{k+2}, for all integers k\geq1

preprekomW

preprekomW

Answered question

2021-08-10

F0, F1, F2 is the Fibonacci sequence.
Prove that Fk+12Fk2=Fk1Fk+2, for all integers k1

Answer & Explanation

pierretteA

pierretteA

Skilled2021-08-11Added 102 answers

Step 1
Recall Fibonacci sequences. Let fn be the ntn term of a Fibonacci sequence,
then f0=0, f1=1,
fn=fn1+fn2, n2, nN
Step 2
Prove what is asked.
Now, for any integer k1
Fk+12Fk2=(Fk+1+Fk)(Fk+1Fk)
=(Fk+2)(Fk+Fk1Fk)
=(Fk+2)(Fk1)

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