Difference between revisions of "L(n+1)L(n-1)-L(n)^2=5(-1)^(n+1)"

Latest revision as of 00:25, 25 May 2017

The following formula holds: $$L(n+1)L(n-1)-L(n)^2=5(-1)^{n+1},$$ where $L(n)$ denotes a Lucas number.

@@ Line 2: / Line 2: @@
 The following formula holds:
 $$L(n+1)L(n-1)-L(n)^2=5(-1)^{n+1},$$
-where $L(n)$ denotes a [[Lucas number]].
+where $L(n)$ denotes a [[Lucas numbers|Lucas number]].
 ==Proof==
 ==References==
-* {{PaperReference|A Primer on the Fibonacci Sequence Part I|1963|S.L. Basin|author2=V.E. Hoggatt, Jr.|prev=F(n+1)F(n-1)-F(n)^2=(-1)^n|next=findme}}
+* {{PaperReference|A Primer on the Fibonacci Sequence Part I|1963|S.L. Basin|author2=V.E. Hoggatt, Jr.|prev=F(n+1)F(n-1)-F(n)^2=(-1)^n|next=L(n)=F(n+1)+F(n-1)}}
 [[Category:Theorem]]
 [[Category:Unproven]]