9 The Mathematics of Spiral Growth

2. 9 The Mathematics of Spiral Growth 9.1 Fibonacci’s Rabbits 9.2 Fibonacci Numbers 9.3 The Golden Ratio 9.4 Gnomons 9.5 Spiral Growth in Nature

3. Golden Ratio This number is one of the most famous and most studied numbers in all mathematics. The ancient Greeks gave it mystical properties and calledit the divine proportion, and over the years, the number has taken many differentnames: the golden number, the golden section, and in modern times the goldenratio, the name that we will use from here on. The customary notation is to usethe Greek lowercase letter  (phi) to denote the golden ratio.

4. Golden Ratio The golden ratio is an irrational number–it cannot be simplified into a fraction, and if you want to write it as a decimal, you can only approximate it to somany decimal places. For most practical purposes, a good enough approximation is 1.618.

5. THE GOLDEN RATIO The sequence of numbers shown above is called the Fibonacci sequence, and theindividual numbers in the sequence are known as the Fibonacci numbers.

6. The Golden Property Find a positive number such that when you add 1 to ityou get the square of the number. To solve this problem we let x be the desired number. The problem thentranslates into solving the quadratic equation x2 = x + 1. To solve this equationwe first rewrite it in the form x2 – x – 1 = 0 and then use the quadratic formula.In this case the quadratic formula gives the solutions

7. The Golden Property and the otheris the Of the two solutions, one is negative golden ratio It follows that  is theonly positive number with the property that when you add one to the number youget the square of the number, that is,2 =  + 1. We will call this property thegolden property. As we will soon see, the golden property has really important algebraic and geometric implications.

8. Fibonacci Numbers - Golden Property We will use the golden property 2 =  + 1 to recursively compute higher andhigher powers of . Here is how: If we multiply both sides of 2 =  + 1 by , we get 3 = 2 +  Replacing 2 by  + 1 on the RHS gives 3 = ( + 1) +  = 2 + 1

9. Fibonacci Numbers - Golden Property If we multiply both sides of 3 = 2 + 1 by , we get 4 = 22 +  Replacing 2 by  + 1 on the RHS gives 4 = 2( + 1) +  = 3 + 2

10. Fibonacci Numbers - Golden Property If we multiply both sides of 4 = 3 + 2 by , we get 5 = 32 + 2 Replacing 2 by  + 1 on the RHS gives 5 = 3( + 1) + 2 = 5 + 3

11. Fibonacci Numbers - Golden Property If we continue this way, we can express every power of  in terms of : 6 = 8 + 5 7 = 13 + 8 8 = 21 + 13 and so on. Notice that on the right-hand side we always get an expression involving two consecutive Fibonacci numbers. The general formula that expresses higher powers ofin terms of and Fibonacci numbers is as follows.

12. POWERS OF THE GOLDEN RATIO N = FN+ FN – 1

13. Ratio: Consecutive Fibonacci Numbers We will now explore what is probably the most surprising connection betweenthe Fibonacci numbers and the golden ratio. Take alook at what happens when we take the ratio of consecutive Fibonacci numbers.The table that appears on the following two slides shows the first 16 values of the ratio FN / FN – 1.

14. Ratio: Consecutive Fibonacci Numbers

15. Ratio: Consecutive Fibonacci Numbers

16. Ratio: Consecutive Fibonacci Numbers The table shows an interesting pattern: As N gets bigger, the ratio of consecutive Fibonacci numbersappears to settle down to a fixed value, and that fixed value turns out tobe the golden ratio!

17. RATIO OF CONSECUTIVE FIBONACCI NUMBERS FN/ FN – 1 ≈  and the larger the value of N, the better the approximation.