![]() The Nautilus shell is a perfect example of this.Īs we have seen, the Fibonacci sequence can be seen in many parts of our natural universe. Shells follow a growth pattern that is unmistakably rooted in the Fibonacci sequence. Shells – Shells provide a beautiful illustration of Fibonacci numbers in nature.The structure of trees are such that big branches grow out to form smaller branches, and smaller branches grow out to form even smaller branches, and so on and so forth. ![]() But have you ever taken the time to really study the amazing components of a tree? They display the most obvious characteristics of a fractal universe. Trees – Trees are everywhere around us.From our ears, to our nose, to our mouth, there are numerous Fibonacci relationships that exist on the human face, and the entire human body for that matter. Your face displays a high degree of Fibonacci proportions. Human Face – The human face is one of the most beautiful and symmetrical representation of the Fibonacci number sequence.Just turn on the weather channel during the hurricane season, and you will see multiple instances of this. Storms and Hurricane – Many storm systems that can be seen on meteorological maps have a spiral shape.Let’s take a closer look at few examples. The Fibonacci Sequence is found in many different growth patterns in nature. Some examples include flowers, plants, sea shells, and the spiraling galaxy. Among the most prevalent formation that includes the Golden ratio is the Golden Spiral, which can be seen in many parts of the natural world. The Golden Ratio can be applied to many different mathematical and geometric forms including Rectangles, Circles, Triangles, and others. As you divide any Fibonacci number by its previous number, the resulting number approaches Phi, represented by 1.618. The Golden Ratio is represented as Phi or 1.618, which is an irrational number and projects into infinite. The Fibonacci sequence provides us with the means to understand the Golden Ratio. This was the origin of the Fibonacci sequence. “How many pairs of rabbits would be produced over a course of one year, beginning with a single pair, assuming that each pair bears a new pair every month, and the new pairs become productive beginning the second month.Īs Fibonacci was pondering the solution, he eventually concluded that within a span of a year, 233 pairs of rabbits would be produced. ![]() The problem that he was trying to solve was the following: ![]() Oddly enough, Fibonacci first became aware of the sequence while he was working on a mathematical problem regarding the breeding habits of rabbits. This was the inspiration behind Liber Abaci, and the roots for his passion and work in the development of mathematical concepts that ultimately led him to the Fibonacci sequence. It was in his travel to North Africa, where Fibonacci was introduced to the Ancient Hindu-Arabic number system. He was a son of a merchant trader, and traveled extensively. This number series is named after Leonardo Pisano Fibonacci, who first wrote about it in this 1202 book entitled “Liber Abaci”. The Fibonacci sequence is a set of numbers which are derived by adding the two numbers prior starting with 0 and 1. This article aims to shed a light on the mysterious Fibonacci sequence, and provide insights into some ways that traders can benefit from its use in market speculation. You have probably heard of the Fibonacci sequence, but do you know the historical context and practical trading applications behind these important numbers? ![]()
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