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Transcript
Maths 190 Lecture 3 I Topic for today: Nature I Numerical Patterns in Vitally important question: What do rabbits, pineapples, daisys, sunflowers and pinecones have in common? 1 / 16 Pineapples and pinecones I Look carefully at your pineapple. I How many spirals does your pineapple have? 2 / 16 How many spirals in a sunflower? 3 / 16 How many spirals in a pinecone? 4 / 16 How many petals on a flower? 5 / 16 Is there a pattern? I Put the numbers we have found in order. I I Can you spot a pattern? 6 / 16 Fibonacci Numbers I 1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89, . . . I Call these F (1), F (2), F (3), etc I Then F (n) + F (n + 1) = F (n + 2) 7 / 16 She loves me, she loves me not...? I Pulling petals off a flower, we’d like to know our chances of getting an odd number - “She loves me”! I Most flowers have a Fibonacci number of petals. I How many of the Fibonacci numbers are odd? 8 / 16 Which are odd? I 1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144, 233, 377, 610, 987, . . . I Looks like every third one is even. I How can we show this is always true? 9 / 16 What about rabbits? I Suppose we start with one breeding pair of rabbits. I Each pair of rabbits produces one pair of offspring each month. I It takes the rabbits one month to mature. I How many rabbits do we have? 10 / 16 How many rabbits? 11 / 16 Ratio of F (n) I What is the ratio F (n + 1)/F (n) as n gets large? I Seems to converge... I The Golden Ratio ψ. 1 1 2 1 3 2 5 3 8 5 13 8 21 13 34 21 = 1 = 2 = 1.5 = 1.6667 = 1.6 = = = 12 / 16 Which is your favourite rectangle? 13 / 16 Fibonacci Building Blocks I Claim: Every natural number is either a Fibonacci number, or can be written as the sum of Fibonacci numbers. I Try it! I In fact, every natural number can be written as the sum of non-consecutive Fibonacci numbers. Use a “greedy” algorithm: I I I subtract the biggest possible Fibonacci number to get a smaller number. repeat as required. 14 / 16 Important ideas from today: I Certain patterns, and sequences of number reappear throughout nature. One common one is the Fibonacci sequence. I Rabbits breeding, the numbers of spirals on pinecones and daisies, all follow the Fibonacci sequence. 15 / 16 For next time I Read 2.3. 16 / 16
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