PPT-The Golden Ratio and Pythagoras

Old Guys and their formulas Looking for Patterns So whats the pattern Lets start with two numbers 1 and 1 Add these two values to get the next number in the sequence pattern Add the last two values to get the next number . R. atio. By Rachel Lewis. adapted from . http://www.geom.uiuc.edu/~demo5337/s97b/discover.htm. Goal. Given a ruler and various rectangles found in the classroom, students will measure the length and width of each rectangle. Discrete Math. Mr. . Altschuler. What Interests You?. Write on a small piece of paper, a subject of endeavor that . interests . you.. I will try to structure a lesson around each of the subjects that you submit sometime during the . . Pythagoras (560-480 BC), the Greek geometer, was especially interested in the golden section, and proved that it was the basis for the proportions of the human figure. He showed that the human body is built with each part in a definite golden proportion to all the other parts.. Suggest Variable Star Universality. John F. . L. indner, Wooster College. Presented by . John . G. Learned. University of Hawai’i at Mānoa. Collaboration. John F. Lindner. The College of Wooster. Vivek Kohar. Brandon Groeger. March 23, 2010. Chapter 18: Form. and Growth. Chapter 19: Symmetry and Patterns. Chapter 20: . Tilings. Outline. Chapter 18: Form and Growth. Geometric Similarity and Scaling. Physical limits to Scaling. Prepared By : . Murk . Altaf. Anaushey. Quratulain. Golden ratio. In mathematics, two quantities are in the golden ratio if their ratio is the same as the ratio of their sum to the larger of the two quantities. The figure on the right illustrates the geometric relationship.. 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 . Transition. Before the Elizabethan Era fully took hold, there were some changes taking place in England. Political: there was a break in the chain of English rule because of a lack of an heir to the throne; war followed. Research. Memory. Un-jumble the following keywords. Find out about the Golden Ratio.. Name 3 places where you might see the Golden Ratio.. 1. Sanah and Madiyah share some money in the ratio 4:3.. Sanah gets £60. How much does Madiyah get?. 7 Liberal Arts. What are the 7 Liberal Arts?. 1.. . Grammar. 2. Logic. 3. Rhetoric. 4. Arithmetic . 5. Geometry. 6. Music. 7. Astronomy. . The Trivium. The Quadrivium. Robert Fludd (1574 – 1637) . 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.. 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.. By Cayman, . Kord. , . Marah. Born 569 B.C., Samos, Greece. He had 2 or 3 . brothers. He died 500-475 B.C. Metapontum, . Italy. He moved around 530 B.C. To Croton, Itly. Pythagoras’s Life. He had 4 children. Whos names were: Damo, Myia, Telauges, Arignotoe. Math 187. 11/28/11. Pythagoras - philosopher and mathematician. Limited reliable information is available about Pythagoras. Lived 569 BC – 500 BC (estimated). Born on the Greek isle of Samos. Travelled extensively in his youth seeking knowledge.