The numbers of the Fibonacci sequence are:
Posted: Sun Feb 09, 2025 8:51 am
The thing is that our eye looks - feeling the space with the help of certain eye movements - saccades (in translation - the flapping of a sail). The eye makes a "clap" and sends a signal to the brain "adhesion" to the surface has occurred. Everything is in order. Information is such and such. And during life the eye gets used to a certain rhythm of these saccades. And when this rhythm changes dramatically (from a city landscape to a forest, from the Golden Section to symmetry) – that’s when some brain work is required to reconfigure.
Now for the details:
The definition of the Golden Section is dividing a segment into two parts in such a ratio that the larger part relates to the smaller one as their sum (the entire segment) relates to the larger one.
That is, if we take the entire segment c as 1, then segment a will be equal to 0.618, segment b – 0.382. Thus, if we take a building, for example, a temple built according to the venezuela mobile database Section principle, then with its height, say, 10 meters, the height of the drum with the dome will be equal to 3.82 cm, and the height of the base of the building will be 6.18 cm. (It is clear that the numbers are taken as whole numbers for clarity). In this case, the bulk of the materials is located below, near the base of the building, while the dome is much lighter.
Then you can calculate the height of the door, windows, cross. And the Golden Section principle will be visible everywhere.
What is the connection between the 3C and the Fibonacci numbers? Let's repeat a little:
and the ratio of adjacent numbers (the smaller one divided by the larger one) approaches the 3C ratio.
So, 21:34 = 0.617, and 34:55 = 0.618.
And the ratio of adjacent numbers (greater by smaller), surprisingly, the result is:
34:21 = 1.619, and 55:34 = 1.618
That is, the basis of the ZS are the numbers of the Fibonacci sequence.
Where else can you find the ZS principle and the numbers of the Fibonacci sequence?
• Leaves in plants are described by the Fibonacci sequence. Sunflower seeds, pine cones, flower petals, pineapple cells are also arranged according to the Fibonacci sequence.
• Bird's egg
• The lengths of the human finger phalanges are related approximately as Fibonacci numbers. The golden ratio can be seen in the proportions of the face.
• Emil Rozenov studied the Golden Ratio in the music of the Baroque and Classical periods using the works of Bach, Mozart, and Beethoven as an example.
Now for the details:
The definition of the Golden Section is dividing a segment into two parts in such a ratio that the larger part relates to the smaller one as their sum (the entire segment) relates to the larger one.
That is, if we take the entire segment c as 1, then segment a will be equal to 0.618, segment b – 0.382. Thus, if we take a building, for example, a temple built according to the venezuela mobile database Section principle, then with its height, say, 10 meters, the height of the drum with the dome will be equal to 3.82 cm, and the height of the base of the building will be 6.18 cm. (It is clear that the numbers are taken as whole numbers for clarity). In this case, the bulk of the materials is located below, near the base of the building, while the dome is much lighter.
Then you can calculate the height of the door, windows, cross. And the Golden Section principle will be visible everywhere.
What is the connection between the 3C and the Fibonacci numbers? Let's repeat a little:
and the ratio of adjacent numbers (the smaller one divided by the larger one) approaches the 3C ratio.
So, 21:34 = 0.617, and 34:55 = 0.618.
And the ratio of adjacent numbers (greater by smaller), surprisingly, the result is:
34:21 = 1.619, and 55:34 = 1.618
That is, the basis of the ZS are the numbers of the Fibonacci sequence.
Where else can you find the ZS principle and the numbers of the Fibonacci sequence?
• Leaves in plants are described by the Fibonacci sequence. Sunflower seeds, pine cones, flower petals, pineapple cells are also arranged according to the Fibonacci sequence.
• Bird's egg
• The lengths of the human finger phalanges are related approximately as Fibonacci numbers. The golden ratio can be seen in the proportions of the face.
• Emil Rozenov studied the Golden Ratio in the music of the Baroque and Classical periods using the works of Bach, Mozart, and Beethoven as an example.