The Discovery of the Fibonacci Numbers
The Fibonacci numbers were first discovered by a man named Leonardo
Pisano. He was known by his nickname, Fibonacci. The Fibonacci sequence is a
sequence in which each term is the sum of the 2 numbers preceding it. The first 10
Fibonacci numbers are: (1, 1, 2, 3, 5, 8, 13, 21, 34, 55, 89). These numbers are
obviously recursive.
Fibonacci was born around 1170 in Italy, and he died around 1240 in Italy.
He played an important role in reviving ancient mathematics and made significant
contributions of his own. Even though he was born in Italy he was educated in
North Africa where his father held a diplomatic post. He did a lot of traveling with
his father. He published a book called Liber abaci, in 1202, after his return to Italy.
This book was the first time the Fibonacci numbers had been discussed. It was
based on bits of Arithmetic and Algebra that Fibonacci had accumulated during his
travels with his father. Liber abaci introduced the Hindu-Arabic place-valued
decimal system and the use of Arabic numerals into Europe. This book, though,
was somewhat contraversial because it contradicted and even proved some of the
foremost Roman and Grecian Mathematicians of the time to be false. He published
many famous mathematical books. Some of them were Practica geometriae in
1220 and Liber quadratorum in 1225.
The Fibonacci sequence is also used in the Pascal trianle.
The sum of each diagnal row is a
fibonacci number. They are also in the right sequence: 1,1,2,5,8.........
Fibonacci sequence has been a big factor in many patterns of things in nature.
One has found that the fractions u/v representing the screw-like arrangement of
leaves quite often are members of the fibonacci sequence. On many plants, the
number of petals is a Fibonacci number: buttercups have 5 petals; lilies and iris
have 3 petals; some delphiniums have 8; corn marigolds have 13 petals; some asters
have 21 whereas daisies can be found with 34, 55 or even 89 petals. Fibonacci
nmbers are also used with animals. The first problem Fibonacci had wehn using the
Fibonacci numbers was trying to figure out was how fast rabbits could breed in
ideal circumstances. Using the sequence he was ale to approximate the answer.
The Fibonacci numbers can also be found in many other patterns. The diagram
below is what is known as the Fibonacci spiral. We can make another picture
showing the Fibonacci numbers 1,1,2,3,5,8,13,21,.. if we start with two small
squares of size 1, one on top of the other. Now on the right of these draw a square
of size 2 (=1+1). We can now draw a square on top of these, which has sides 3
units long, and another on the left of the picture which as side 5.
We can continue adding squares around the picture, each new square
having a side which is as long as the sum of the latest two squares
drawn.
If we take the ratio of two successive numbers in Fibonacci's series,
(1 1 2 3 5 8 1 3..) we find:
1/1=1; 2/1=2; 3/2=1.5; 5/3=1.666...; 8/5=1.6; 13/8=1.625;
It is easier to see what is happening if we plot the ratios on a graph:
The ratio seems to be settling down to a particular value, which the
Greeks called the golden ratio and has the value 1.61803. It has some interesting
properties, for instance, to square it, you just add 1. To take its reciprocal, you just
subtract 1. This means all its powers are just whole multiples of itself plus another
whole integer (and guess what these whole integers are? Yes! The Fibonacci
numbers again!) Fibonacci numbers are a big factor in Math, The Golden Ratio,
The Pascal Triangle, the production of many species, plants, and much much
more.
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