Channel: Signs Global

Category: Education

Tags: ateistallahdarwinismislamsocialdajjalsciencecreationsdeistpoliticaladnan oktargod

Description: The Human Hand Lift your hand from the computer mouse and look at the shape of your index finger. You will in all likelihood witness a golden proportion there. Our fingers have three sections. The proportion of the first two to the full length of the finger gives the golden ratio (with the exception of the thumbs). You can also see that the proportion of the middle finger to the little finger is also a golden ratio. (4) You have two hands, and the fingers on them consist of three sections. There are five fingers on each hand, and only eight of these are articulated according to the golden number: 2, 3, 5, and 8 fit the Fibonacci numbers. The Golden Ratio in the Human Face There are several golden ratios in the human face. Do not pick up a ruler and try to measure people's faces, however, because this refers to the "ideal human face" determined by scientists and artists. For example, the total width of the two front teeth in the upper jaw over their height gives a golden ratio. The width of the first tooth from the centre to the second tooth also yields a golden ratio. These are the ideal proportions that a dentist may consider. Some other golden ratios in the human face are: Length of face / width of face, Distance between the lips and where the eyebrows meet / length of nose, Length of face / distance between tip of jaw and where the eyebrows meet, Length of mouth / width of nose, Width of nose / distance between nostrils, Distance between pupils / distance between eyebrows. Golden Proportion in the Lungs In a study carried out between 1985 and 1987 (5), the American physicist B. J. West and Dr. A. L. Goldberger revealed the existence of the golden ratio in the structure of the lung. One feature of the network of the bronchi that constitutes the lung is that it is asymmetric. For example, the windpipe divides into two main bronchi, one long (the left) and the other short (the right). This asymmetrical division continues into the subsequent subdivisions of the bronchi. (6) It was determined that in all these divisions the proportion of the short bronchus to the long was always 1/1.618. THE GOLDEN RECTANGLE AND THE DESIGN IN THE SPIRAL A rectangle the proportion of whose sides is equal to the golden ratio is known as a "golden rectangle." A rectangle whose sides are 1.618 and 1 units long is a golden rectangle. Let us assume a square drawn along the length of the short side of this rectangle and draw a quarter circle between two corners of the square. Then, let us draw a square and a quarter circle on the remaining side and do this for all the remaining rectangles in the main rectangle. When you do this you will end up with a spiral.