PPT-Fun with the Fibonacci Sequence

Alannah McGregor Gudrun Mackness Brittany Kozak Background Information Grades 67 Mathematics patterning and algebra Time frame 30 min Lesson environment Inquirybased exploration Exploration of a complex number pattern that results in a sequence that is found in nature and has been translated into art. AQ UA NA TA PUBLI CJ UNIOR LESSONS CL UB CL UB CL UB CL UB CL UB CL UB PUBLI PUBLI PUBLI ANE SW IMMING PUBLIC FUN SESSIONS PRIV AT HIRE DI SA LED SESSION ROOKIE AREN T ODDLE JUNIOR LESSON FUN SESSIONS GA LA S PA TIES PRIV TE HIRE AQ UA CL UB EEP WA Numbers. Damian Gordon. Fibonacci . Numbers. Fibonacci . Numbers. As seen in the Da Vinci Code:. Fibonacci . Numbers. The . Fibonacci . numbers are numbers where the next number in the sequence is the sum of the previous two.. Kristijan Štefanec. The golden ratio. Also called. φ. Two quantities a and b are said to be in golden ratio if = =. φ. The second definition of . φ. is: . φ. -1=. From this one, we can easily calculate . data compression codes. І. gor. . Zavadskyi, Anatoly . Anisimov. Taras. Shevchenko National University of Kyiv, Ukraine. Data compression codes. Huffman. Arithmetic. Finite state entropy. Tagged Huffman. The Power of Visualization. James . Tanton. MAA Mathematician-at-Large. t. anton.math@gmail.com. . Curriculum Inspirations: . www.maa.org/ci. Mathematical Stuff: . www.jamestanton.com. Mathematical Courses: . Fibonacci. . numbers. The . Fibonacci. . Numbers. :. 1, 1, 2, 3, 5, 8, 13, 21, 34. a, a, (. a+a. ), a+(. a+a. ), (. a+a. ) + (. a+a+a. ) etc.. Term = . sum. of 2 . preceding. terms. = GOLDEN RATIO. Shmuel. T. Klein . . Dana . Shapira. . Bar . Ilan. University Ashkelon Academic College. . Ariel University . . Divide the encoded file into blocks of size . Charlotte Kiang. May 16, 2012. About me. My name is Charlotte Kiang, and I am a junior at Wellesley College, majoring in math and computer science with a focus on engineering applications.. What I hope to accomplish today. Programming Abstractions in C++. Cynthia . Bailey Lee. .  .              . CS2 in C++ Peer Instruction Materials by . Cynthia Bailey Lee.  is licensed under a . Creative Commons Attribution-. Use this at the beginning of the school year to share a story about what the person did over the summer.. Use as many or as few pages as you like. . Use the Chat Editor to add sequences to the book to help tell the story. . 1175 – 1250 AD. Best remembered for a problem he posed in Liber Abaci dealing with RABBITS!. The Rabbit Problem. At 2 months, the rabbits can reproduce a pair of bunnies. . How many pairs at k months?. Math 2700. Spring 2010. History of the Fibonacci Sequence. From . Fibonacci’s. . Liber. Abaci. , Chapter 12. . How Many Pairs of Rabbits Are Created by One Pair in One Year. . . A certain man had one pair of rabbits together in a certain enclosed place, and one wishes to know how many are created from the pair in one year when it is the nature of them in a single month to bear another pair, and in the second month those born to bear also.. La gamme de thé MORPHEE vise toute générations recherchant le sommeil paisible tant désiré et non procuré par tout types de médicaments. Essentiellement composé de feuille de morphine, ce thé vous assurera d’un rétablissement digne d’un voyage sur . recurrences. Lecture 27. CS2110 – Fall 2018. Fibonacci. (Leonardo Pisano) 1170-1240?. Statue in Pisa Italy. Announcements. A7: NO LATE DAYS. No need to put in time and comments. We have to grade quickly. No regrade requests for A7. Grade based only on your score on a bunch of sewer systems..