The golden ratio has been in mathematics and architectural works since the ancient times. In architecture, the esthetics and layout of a structure are closely related to this ratio. This rate, especially in Egyptian pyramids, is known as "Fibonacci numbers." In mathematics, this ratio is defined as: If the ratio of the large to the smaller is equal to the ratio of the sum of the quantities to the larger quantity, this is the golden ratio.
The golden ratio represents an irrational number in mathematics, and that value is equal to 1.618. We can find many examples of gold in the human body and nature.In the human body, our hair is not perpendicular to a point called the knot point, but as a curve, the angle that this curve is doing with the head is equal to that ratio.
In nature, we can also capture the golden ratio in the lineup between the middle of a sunflower and its leaves. Examples of gold in the sequence by making curves in the seed alignment in a fixed point below a pine cone, from the top to the top.The tangent of the curved region, formed in a groove from the inner surface to the outer surface, also gives the same ratio in the shells. The ratio of the rectangular region in which the snails form in the linear plane to the transverse ratio of the size of the rectangular region gives the same value.
Would you like to follow the trail of the golden place in nature? Take a closer look at the curves on the horns of pine cones, snails, goats and lambs. Would you be surprised if you counted the branches of a tree, the daisy leaves? You can see that nature loves the golden part.If you say this ratio numerically, you will see a number like 1.618.
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