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Direct Proofs Using Fibonacci Numbers
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About the lecture
In this mini-lecture, we use the Fibonacci numbers to motivate examples of direct proofs. As we move though this mini-lecture, we consider: (i) the definition of Fibonacci numbers, Fn = Fn-1 + Fn-2, which can be used to create a sequence of numbers; (ii) mathematical patterns in the Fibonacci sequence, such as every third number being even while all others are odd; (iii) a direct proof of a property of Fibonacci numbers, which states that Fn+1 = 2Fn-1 + Fn-2; and (iv) how this property, Fn+1 = 2Fn-1 + Fn-2, can also help us deduce which terms are even and which are odd in the Fibonacci sequence.
About the lecturer
Shabnam Akhtari is an Associate Professor of Mathematics at the University of Oregon. Her research interests are in Number Theory, in particular Diophantine Analysis and the Geometry of Numbers.
Cite this Lecture
APA style
Akhtari, S. (2022, August 30). A: Proof - Direct Proofs Using Fibonacci Numbers [Video]. MASSOLIT. https://massolit.io/options/a-proof-2a91c7da-2241-4a72-97c5-6da5ab989a78?auth=0&lesson=8568&option=11108&type=lesson
MLA style
Akhtari, S. "A: Proof – Direct Proofs Using Fibonacci Numbers." MASSOLIT, uploaded by MASSOLIT, 30 Aug 2022, https://massolit.io/options/a-proof-2a91c7da-2241-4a72-97c5-6da5ab989a78?auth=0&lesson=8568&option=11108&type=lesson