F(2n+1)=F(n+1)^2+F(n)^2

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Theorem

The following formula holds: $$F(2n+1)=F(n+1)^2+F(n)^2,$$ where $F(n)$ denotes a Fibonacci number.

Proof

References

S.L. Basin and V.E. Hoggatt, Jr.: A Primer on the Fibonacci Sequence Part I (1963)... (previous)

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