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Fibonacci series definition and meaning
The Golden Ratio, also sometimes known as the Fibonacci Series, is an important mathematical concept that dates back to the Ancient Greeks which serves as a universal rule for beauty and harmony of form. It's found all around us in nature and throughout many forms of art and design, as well as architecture and even human body proportions. In this blog, we'll explore the various applications of the Golden Ratio and its corresponding theorem.
First, let's start with what exactly the Golden Ratio is. It's a number expressed by 1:1.618, or sometimes written out as Phi (Φ). This ratio is derived from the Fibonacci Series – a sequence of numbers starting at 0 and 1 where each number is equal to the sum of its two predecessors (0, 1, 1, 2, 3, 5, 8 etc.) The ratio created by these numbers (1:1.618) appears in many aspects of nature such as snail shells or flower petals.
Next, we can look at how this ratio applies to mathematics and nature. The Fibonacci Spiral – derived from dividing every number in the Fibonacci series by its two predecessors – has been found everywhere from sunflower heads to galaxy arms to whirlpools in rivers! It's a universal shape based on the perfect balance between growth and decay that brings physical form into existence.
The Golden Ratio has also been used throughout history in works of art and design due to its balance between permanence and variability. Architects such as Le Corbusier employed it in their designs while artists like Salvador Dali used it to create their famous surrealist paintings.
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