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Maths in NaturePatterns in nature are visible regularities of form found

in the natural world. These patterns recur in different

contexts and are modelled mathematically. Natural

patterns include symmetries, trees, spirals, meanders,

waves, foams, arrays, cracks and stripes. Early Greek

philosophers studied these patterns, with Plato,

Pythagoras and Empedocles attempting to explain

order in nature. The modern understanding of visible

patterns developed gradually over time."The laws of nature are but the mathematical thoughts

of God" - Euclidrdthakur78@gmail.com

Rabbits, rabbits, rabbits. Leonardo Fibonacci was a

well-travelled Italian who introduced the concept of

zero and the Hindu-Arabic numeral system to Europe

in 1200AD. He also described the Fibonacci sequence of

numbers using an idealised breeding population of

rabbits. Each rabbit pair produces another pair every

month, taking one month first to mature, and giving

the sequence 0,1,1,2,3,5,8,13,... Each number in the

sequence is the sum of the previous two.

Fibonacci sequence

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As if this were not enough, Leonardo of Pisa gave us

another interesting, if less known gift of mathematics.

If you have never heard of the Fibonacci sequence,

don't worry. To be honest, the sequence sees little

publicity these days outside of a Dan Brown novel and

the occasionally nerdy conversation which may or may

not involve warp core propulsion mechanics. However,

the Fibonacci sequence is an amazing bit of numbers

that ties nature and mathematics together in surprising

ways. From deep sea creatures to flowers to the make-

up of your own body, Fibonacci is everywhere.

Nautilus Shell

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If you construct a series of squares with

lengths equal to the Fibonacci numbers

(1,1,2,3,5, etc) and trace a line through the

diagonals of each square, it forms a Fibonacci

spiral. Many examples of the Fibonacci spiral

can be seen in nature, including in the

chambers of a nautilus shell.

Fibonacci spiral

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Sunflower

Evolutionarily speaking, the best way to ensure

success is to have as many offspring as possible (ergo

the Baldwin brothers). The sunflower naturally

evolved a method to pack as many seeds on its

flower as space could allow. Amazingly, the

sunflower seeds grow adjacently at an angle of

137.5 degrees from each other, which corresponds

exactly to the golden ratio. Additionally, the number

of lines in the spirals on a Sunflower is almost

always a number of the Fibonacci sequence.rdthakur78@gmail.com

Golden ratio (phi)

The ratio of consecutive numbers in the

Fibonacci sequence approaches a number

known as the golden ratio, or phi

(=1.618033989...). The aesthetically

appealing ratio is found in much human

architecture and plant life. A Golden Spiral

formed in a manner similar to the Fibonacci

spiral can be found by tracing the seeds of a

sunflower from the centre outwards.rdthakur78@gmail.com

Fibonacci spiral

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Fibonacci spiral

Bighorn sheep Ovis canadensisrdthakur78@gmail.com

Spirals: phyllotaxis of spiral aloe,Aloe polyphylla rdthakur78@gmail.com

Spirals: phyllotaxis of spiral aloe,Aloe polyphylla rdthakur78@gmail.com

Multiple Fibonacci spirals : seed head of

Sunflower, Helianthus annuus.rdthakur78@gmail.com

Multiple

Fibonacci

spirals : red

cabbage in

cross

section

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Fibonacci

patterns

occur widely

in plant

structures

including

this cone of

Queen sago,

Cycas

circinalisrdthakur78@gmail.com

Fibonacci Spiral AloeLeonardo of Pisa was born around 1170 AD in (of course)

Pisa, Italy. While not quite as famous as some other

Italian or Ninja Turtle Leonardos, we do have a lot to

thank him for. His most notable contribution to your life is

probably found on the top row of your keyboard. While

traveling through North Africa, Leo discovered that the

local number system of 0-9 was far superior than the

obscure combination of X's, V's and I's the Romans had

invented a millennium earlier to confuse later generations

of elementary school students. Leonardo brought this

number system to Europe and eventually we invented

Sudoku with it. rdthakur78@gmail.com

Pine ConeLike the sunflower, the pine cone evolved

the best way to stuff as many seeds as

possible around its core. Also, in what was

surely an accident, it evolved into perhaps

the best substitute for toilet paper when in a

pinch. The golden ratio is the key yet again.

As with the sunflower, the number of

spirals almost always is a Fibonacci number.rdthakur78@gmail.com

Human bodyThe golden ratio is found throughout your body,

all the way to your DNA.

Here's one you can see for yourself, dear reader, if

you're still with us. If you use your fingernail

length as a unit of measure, the bone in the tip of

your finger should be about 2 fingernails,

followed by the mid portion at 3 fingernails,

followed by the base at about 5 fingernails. The

final bone goes all the way to about therdthakur78@gmail.com

middle of your palm, which is a length of about 8 fingernails.

Again, it's Fibonacci at work and the ratio of each bone to the

next comes very close to the golden ratio.

Continuing with the length of your hand to your arm is, again,

the golden ratio.

Fibonacci applies even down to what makes you, you. A DNA

strand is exactly 34 by 21 angstroms.

The Fibonacci sequence is truly a wonder. The examples are

vast, and go way beyond the scale of this article. The patterns

in which a tree grows branches, the way water falls in

spiderwebs, even the way your own capillaries are formed can

all be linked to Fibonacci. Science is just beginning to

understand the implications of this simple sequence and some

of the most amazing discoveries may be yet to come.rdthakur78@gmail.com

Spiral GalaxiesIf we take the above spiral and rotate it around the the central axis, we

get an almost perfect approximation of a spiral galaxy.The Golden Ratio

Most of the interesting things we find that relate to the Fibonacci

sequence are actually more closely related to a number that is derived

from Fibonacci, called the golden ratio. If we take each number of the

Fibonacci sequence and divide it by the previous number in the sequence

(i.e. 2/1, 3/2, 5/3, 8/5), a pattern quickly emerges. As the numbers

increase, the quotient approaches the golden ratio, which is

approximately 1.6180339887. Approximately. The golden ratio actually

predates Fibonacci and has been breaking the brains of western

intellectuals for around 2400 years. Applications for the golden ratio

have been found in architecture, economics, music, aesthetics, and, of

course, nature.rdthakur78@gmail.com

Praise the Creator !!

He is Great !!!

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Watching us !!

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Compiled ByRupesh Dinkar Thakur,A. V. S. Vidyamandir, Virar, Indiardthakur78@gmail.com

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