{"id":2087,"date":"2024-05-31T14:59:15","date_gmt":"2024-05-31T14:59:15","guid":{"rendered":"http:\/\/tabelionatoalves.com.br\/?p=2087"},"modified":"2025-01-13T15:59:20","modified_gmt":"2025-01-13T15:59:20","slug":"nature-s-harmony-tropical-plants-and-the-golden","status":"publish","type":"post","link":"http:\/\/tabelionatoalves.com.br\/?p=2087","title":{"rendered":"Nature&#8217;s harmony: Tropical plants and the golden ratio"},"content":{"rendered":"<p><img decoding=\"async\" src=\"data:image\/jpg;base64,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\" width=\"702px\" alt=\"golden ratio in nature\"\/><\/p>\n<p><p>As the merger unraveled, AOL&#8217;s CEO, Steve Case, walked away with a golden parachute worth $165 million. This staggering payout only added insult to injury for shareholders who suffered substantial losses. The case highlights the potential pitfalls of golden parachutes in hostile takeovers and raises questions about the accountability of executives. FasterCapital will become the technical cofounder to help you build your MVP\/prototype and provide full tech development services. But we don&#8217;t see this in all plants, as nature has many different methods of survival.<\/p>\n<\/p>\n<ol>\n<li>There is a cosmic constant called the \u2018golden ratio\u2019 which South African researchers say governs the entire universe.<\/li>\n<li>One of the most intriguing phenomena in nature is the Golden Ratio, which is a mathematical concept that appears in many natural forms and structures.<\/li>\n<li>Golden ratio is an irrational number that is symbolized by the Greek numeral phi (\u03c6).<\/li>\n<li>Musicians and composers have utilized the Golden Ratio in composing melodies and structuring musical pieces.<\/li>\n<\/ol>\n<p><h2>Sunflower Petals<\/h2>\n<\/p>\n<ol>\n<li>By combining these two tools, traders can create a powerful strategy for identifying entry and exit points.<\/li>\n<li>The science behind Phi and the Golden Ratio provides insight into why certain compositions and designs are considered aesthetically pleasing.<\/li>\n<li>In architecture, Phi is used to create harmonious proportions and balance in buildings.<\/li>\n<li>These beauties have 55 clockwise spirals and either 34 or 89 counterclockwise spirals \u2014 all Fibonacci numbers \u2014 growing at a constant of the golden ratio.<\/li>\n<li>Application examples you can see in the articles Pentagon with a given side length, Decagon with given circumcircle and Decagon with a given side length.<\/li>\n<li>In the world of trading, the use of technical analysis is essential to make informed decisions.<\/li>\n<\/ol>\n<p><p>They are both examples of absolute symmetry, which is the perfect balance of absolute value. The Fibonacci sequence is found in many natural phenomena, such as the branching of trees and the arrangement of leaves on stems. The golden ratio is found in many natural phenomena, such as the proportions of the human body and the shape of seashells. The relationship between the Fibonacci sequence and the golden ratio is fascinating and is evident in the spiral patterns found in nature.<\/p>\n<\/p>\n<p><p>A Phi ellipse is an ellipse where the ratio between the major and minor axes is Phi. These ellipses have a unique symmetry and beauty that is pleasing to the eye. They can be found in the design of musical instruments, like violins and cellos, and in the artwork of M.C. These famous examples of golden coffins from around the world demonstrate the incredible craftsmanship and artistry involved in creating these burial masterpieces. Each coffin tells a unique story, reflecting the cultural, religious, and historical context of the time.<\/p>\n<\/p>\n<p><p>Golden Ratio, approximately equal to 1.618, is a mathematical concept that appears in various forms throughout nature. This unique ratio, often denoted by the Greek letter \u03c6 (phi), is known for its aesthetically pleasing properties and is  found in many natural patterns and structures. Combine the Golden Ratio and McClellan Summation to identify entry and exit points. By combining these two tools, traders can create a powerful strategy for identifying entry and exit points.<\/p>\n<\/p>\n<p><h2>Other properties<\/h2>\n<\/p>\n<p><div style='text-align:center'><iframe width='561' height='313' src='https:\/\/www.youtube.com\/embed\/WVt3z0o42V0' frameborder='0' alt='golden ratio in nature' allowfullscreen><\/iframe><\/div>\n<\/p>\n<p><p>However, there are also those who argue that the use of the golden ratio in music is limiting, and that it can lead to a lack of creativity and originality. One of the most famous examples of the golden ratio in music is found in the structure of Beethoven&#8217;s Fifth Symphony. The first movement of the symphony follows a pattern that approximates the Fibonacci sequence, with the first four notes of the main theme representing the first four numbers in the sequence. Another example is found in the music of Debussy, who used the golden ratio to create complex musical structures that were both beautiful and balanced. The golden ratio can be used in combination with other technical indicators to confirm potential areas of support and resistance.<\/p>\n<\/p>\n<p><img decoding=\"async\" src=\"data:image\/jpg;base64,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\" width=\"700px\" alt=\"golden ratio in nature\"\/><\/p>\n<p><h2>The Fibonacci Sequence and the Golden RatioOriginal Blog<\/h2>\n<\/p>\n<p><p>In the human body, the proportions of limbs, fingers, and facial features adhere to this ratio asa well. The best option for identifying potential levels of support and resistance in multiple tops patterns depends on the trader&#8217;s preference and experience. Some traders prefer to use Fibonacci retracement because it is a widely used technique that has proven to be effective in identifying potential levels of support and resistance. Other traders prefer to use the golden ratio because it is a more precise technique that takes into account the natural order of price movement. The Golden Ratio is a ubiquitous mathematical concept that has found its way into the world of trading through Fibonacci retracements. While the significance of the Golden Ratio in trading is undeniable, it is not a standalone tool and must be used in conjunction with other analysis methods.<\/p>\n<\/p>\n<p><div style='text-align:center'><iframe width='567' height='310' src='https:\/\/www.youtube.com\/embed\/AgnCbtz1TyI' frameborder='0' alt='golden ratio in nature' allowfullscreen><\/iframe><\/div>\n<\/p>\n<p><h2>Spiral Leaf Growth<\/h2>\n<\/p>\n<p><p>The Golden Ratio is closely linked to the Fibonacci sequence, which is a series of numbers where each number is the sum of the preceding two digits. As we progress in the sequence, the ratio between consecutive numbers approaches the value of the Golden Ratio. Photographers use the Golden Ratio to compose images that are aesthetically pleasing. The Rule of Thirds is a simplified version of this principle, dividing an image into sections that are pleasing to the eye. Many modern logos incorporate the Golden Ratio to create visually appealing and balanced designs, such as the Apple and Pepsi logos. In a regular pentagon, the ratio of a diagonal to a side is the Golden Ratio.<\/p>\n<\/p>\n<p><p>Its significance lies in its ability <a href=\"https:\/\/www.1investing.in\/15-uncanny-examples-of-the-golden-ratio-in-nature\/\">golden ratio in nature<\/a>  to create a sense of balance and harmony, which is why it has been used in so many different fields. Whether you are an artist, architect, or mathematician, the Golden Ratio is a concept that is worth exploring further. The Fibonacci sequence and Golden Ratio have been used in architecture and interior design for centuries. The Golden Ratio can be used to determine the proportions of a building or room, creating a sense of balance and harmony.<\/p>\n<\/p>\n<p><p>In this paper we will be discussing the connection between Fibonacci sequence (a series of numbers where every number is equal to the sum of two numbers before it) and Golden ratio. Secondly, how this mathematical idea shows up in a nature, such as sunflower and human DNA. By using the Golden Ratio and McClellan Summation to identify support and resistance levels, traders can set stop-loss orders to minimize their losses if the market moves against them. The golden ratio has been used in music for centuries, dating back to the ancient Greeks. They believed that the ratio represented the perfect balance between simplicity and complexity, and used it in the design of their temples and musical instruments.<\/p>\n<\/p>\n<p><div style='text-align:center'><iframe width='568' height='319' src='https:\/\/www.youtube.com\/embed\/sm-QMmGMA2M' frameborder='0' alt='golden ratio in nature' allowfullscreen><\/iframe><\/div>\n<\/p>\n<p><p>The Golden Ratio\u2019s generality has led to recognized as the geometrical blueprint for life. It was even named the \u201ckey to the physics of the cosmos\u201d by a great Greek philosopher. Fibonacci spiral is generally the term used for spirals that approximate golden spirals using Fibonacci number-sequenced squares and quarter-circles. Some 20th-century artists and architects, including Le Corbusier and Salvador Dal\u00ed, have proportioned their works to approximate the golden ratio, believing it to be aesthetically pleasing. Just like you saw in the video, you can use a piece of graph paper to create your own golden spiral!<\/p>\n<\/p>\n<p><div style='text-align:center'><iframe width='565' height='310' src='https:\/\/www.youtube.com\/embed\/IU193mZu0I0' frameborder='0' alt='golden ratio in nature' allowfullscreen><\/iframe><\/div><\/p>\n","protected":false},"excerpt":{"rendered":"<p>As the merger unraveled, AOL&#8217;s CEO, Steve Case, walked away with a golden parachute worth $165 million. This staggering payout only added insult to injury for shareholders who suffered substantial losses. The case highlights the potential pitfalls of golden parachutes in hostile takeovers and raises questions about the accountability of executives. FasterCapital will become the [&hellip;]<\/p>\n","protected":false},"author":1,"featured_media":0,"comment_status":"closed","ping_status":"closed","sticky":false,"template":"","format":"standard","meta":{"footnotes":""},"categories":[40],"tags":[],"class_list":["post-2087","post","type-post","status-publish","format-standard","hentry","category-forex-trading"],"_links":{"self":[{"href":"http:\/\/tabelionatoalves.com.br\/index.php?rest_route=\/wp\/v2\/posts\/2087","targetHints":{"allow":["GET"]}}],"collection":[{"href":"http:\/\/tabelionatoalves.com.br\/index.php?rest_route=\/wp\/v2\/posts"}],"about":[{"href":"http:\/\/tabelionatoalves.com.br\/index.php?rest_route=\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"http:\/\/tabelionatoalves.com.br\/index.php?rest_route=\/wp\/v2\/users\/1"}],"replies":[{"embeddable":true,"href":"http:\/\/tabelionatoalves.com.br\/index.php?rest_route=%2Fwp%2Fv2%2Fcomments&post=2087"}],"version-history":[{"count":0,"href":"http:\/\/tabelionatoalves.com.br\/index.php?rest_route=\/wp\/v2\/posts\/2087\/revisions"}],"wp:attachment":[{"href":"http:\/\/tabelionatoalves.com.br\/index.php?rest_route=%2Fwp%2Fv2%2Fmedia&parent=2087"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"http:\/\/tabelionatoalves.com.br\/index.php?rest_route=%2Fwp%2Fv2%2Fcategories&post=2087"},{"taxonomy":"post_tag","embeddable":true,"href":"http:\/\/tabelionatoalves.com.br\/index.php?rest_route=%2Fwp%2Fv2%2Ftags&post=2087"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}