<?xml version="1.0" encoding="UTF-8"?><rss xmlns:dc="http://purl.org/dc/elements/1.1/" xmlns:content="http://purl.org/rss/1.0/modules/content/" xmlns:atom="http://www.w3.org/2005/Atom" version="2.0" xmlns:itunes="http://www.itunes.com/dtds/podcast-1.0.dtd" xmlns:googleplay="http://www.google.com/schemas/play-podcasts/1.0"><channel><title><![CDATA[LEM Unicamp: MMA]]></title><description><![CDATA["Matemática Mais Avançada" é uma seção que explora a área em sua forma mais abstrata e pura. Textos para quem não tem medo de desafiar a lógica e mergulhar nos conceitos mais profundos e fascinantes da matemática.]]></description><link>https://lemunicamp.substack.com/s/matematica-mais-avancada</link><image><url>https://substackcdn.com/image/fetch/$s_!OxzK!,w_256,c_limit,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F0fcead9e-8dd3-40a7-8609-c7a1a81638fa_1004x1004.png</url><title>LEM Unicamp: MMA</title><link>https://lemunicamp.substack.com/s/matematica-mais-avancada</link></image><generator>Substack</generator><lastBuildDate>Sat, 11 Jul 2026 17:32:35 GMT</lastBuildDate><atom:link href="https://lemunicamp.substack.com/feed" rel="self" type="application/rss+xml"/><copyright><![CDATA[LEM Unicamp]]></copyright><language><![CDATA[pt-br]]></language><webMaster><![CDATA[lemunicamp@substack.com]]></webMaster><itunes:owner><itunes:email><![CDATA[lemunicamp@substack.com]]></itunes:email><itunes:name><![CDATA[LEM Unicamp]]></itunes:name></itunes:owner><itunes:author><![CDATA[LEM Unicamp]]></itunes:author><googleplay:owner><![CDATA[lemunicamp@substack.com]]></googleplay:owner><googleplay:email><![CDATA[lemunicamp@substack.com]]></googleplay:email><googleplay:author><![CDATA[LEM Unicamp]]></googleplay:author><itunes:block><![CDATA[Yes]]></itunes:block><item><title><![CDATA[Sequência e Matriz de Fibonacci]]></title><description><![CDATA[Matem&#225;tica Mais Avan&#231;ada #001]]></description><link>https://lemunicamp.substack.com/p/sequencia-e-matriz-de-fibonacci</link><guid isPermaLink="false">https://lemunicamp.substack.com/p/sequencia-e-matriz-de-fibonacci</guid><dc:creator><![CDATA[LEM Unicamp]]></dc:creator><pubDate>Thu, 25 Jun 2026 10:03:17 GMT</pubDate><enclosure url="https://substackcdn.com/image/fetch/$s_!c7eh!,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F7c50ba45-5c26-4248-94c3-d0ce220eef7c_736x1039.jpeg" length="0" type="image/jpeg"/><content:encoded><![CDATA[<div class="captioned-image-container"><figure><a class="image-link image2" target="_blank" href="https://substackcdn.com/image/fetch/$s_!8v_z!,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F7129f6a9-f7d8-44a1-91f7-4286f66b7006_1280x256.png" data-component-name="Image2ToDOM"><div class="image2-inset"><picture><source type="image/webp" srcset="https://substackcdn.com/image/fetch/$s_!8v_z!,w_424,c_limit,f_webp,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F7129f6a9-f7d8-44a1-91f7-4286f66b7006_1280x256.png 424w, https://substackcdn.com/image/fetch/$s_!8v_z!,w_848,c_limit,f_webp,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F7129f6a9-f7d8-44a1-91f7-4286f66b7006_1280x256.png 848w, https://substackcdn.com/image/fetch/$s_!8v_z!,w_1272,c_limit,f_webp,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F7129f6a9-f7d8-44a1-91f7-4286f66b7006_1280x256.png 1272w, https://substackcdn.com/image/fetch/$s_!8v_z!,w_1456,c_limit,f_webp,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F7129f6a9-f7d8-44a1-91f7-4286f66b7006_1280x256.png 1456w" sizes="100vw"><img src="https://substackcdn.com/image/fetch/$s_!8v_z!,w_1456,c_limit,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F7129f6a9-f7d8-44a1-91f7-4286f66b7006_1280x256.png" width="1280" height="256" data-attrs="{&quot;src&quot;:&quot;https://substack-post-media.s3.amazonaws.com/public/images/7129f6a9-f7d8-44a1-91f7-4286f66b7006_1280x256.png&quot;,&quot;srcNoWatermark&quot;:null,&quot;fullscreen&quot;:null,&quot;imageSize&quot;:null,&quot;height&quot;:256,&quot;width&quot;:1280,&quot;resizeWidth&quot;:null,&quot;bytes&quot;:161155,&quot;alt&quot;:null,&quot;title&quot;:null,&quot;type&quot;:&quot;image/png&quot;,&quot;href&quot;:null,&quot;belowTheFold&quot;:false,&quot;topImage&quot;:true,&quot;internalRedirect&quot;:&quot;https://lemunicamp.substack.com/i/203490995?img=https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F7129f6a9-f7d8-44a1-91f7-4286f66b7006_1280x256.png&quot;,&quot;isProcessing&quot;:false,&quot;align&quot;:null,&quot;offset&quot;:false}" class="sizing-normal" alt="" srcset="https://substackcdn.com/image/fetch/$s_!8v_z!,w_424,c_limit,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F7129f6a9-f7d8-44a1-91f7-4286f66b7006_1280x256.png 424w, https://substackcdn.com/image/fetch/$s_!8v_z!,w_848,c_limit,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F7129f6a9-f7d8-44a1-91f7-4286f66b7006_1280x256.png 848w, https://substackcdn.com/image/fetch/$s_!8v_z!,w_1272,c_limit,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F7129f6a9-f7d8-44a1-91f7-4286f66b7006_1280x256.png 1272w, https://substackcdn.com/image/fetch/$s_!8v_z!,w_1456,c_limit,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F7129f6a9-f7d8-44a1-91f7-4286f66b7006_1280x256.png 1456w" sizes="100vw" fetchpriority="high"></picture><div></div></div></a></figure></div><p><span>Antes de se tornar popularmente conhecida, a sequ&#234;ncia de Fibonacci j&#225; havia sido estudada pelo matem&#225;tico indiano Pingala no livro </span><em><span>Chanda&#7717;&#347;&#257;stra</span></em><span>, por volta de 450 a.C. Apesar de ter sido descoberta nessa &#233;poca, a f&#243;rmula e o conceito eram diferentes do que conhecemos hoje. Al&#233;m disso, os gregos, por volta de 200 a.C, possu&#237;am conhecimento da propor&#231;&#227;o &#225;urea, mas sem saber sua poss&#237;vel rela&#231;&#227;o com a sequ&#234;ncia.</span></p><p style="text-align: justify;"><span>O famoso N&#250;mero de Ouro, tamb&#233;m chamado de propor&#231;&#227;o &#225;urea, &#233; considerado um padr&#227;o de harmonia visual agrad&#225;vel aos olhos humanos. Um exemplo disso &#233; a obra Monalisa de Leonardo da Vinci, que segue essa propor&#231;&#227;o dada por</span></p><div class="captioned-image-container"><figure><a class="image-link image2 is-viewable-img" target="_blank" href="https://substackcdn.com/image/fetch/$s_!c7eh!,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F7c50ba45-5c26-4248-94c3-d0ce220eef7c_736x1039.jpeg" data-component-name="Image2ToDOM"><div class="image2-inset"><picture><source type="image/webp" srcset="https://substackcdn.com/image/fetch/$s_!c7eh!,w_424,c_limit,f_webp,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F7c50ba45-5c26-4248-94c3-d0ce220eef7c_736x1039.jpeg 424w, https://substackcdn.com/image/fetch/$s_!c7eh!,w_848,c_limit,f_webp,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F7c50ba45-5c26-4248-94c3-d0ce220eef7c_736x1039.jpeg 848w, https://substackcdn.com/image/fetch/$s_!c7eh!,w_1272,c_limit,f_webp,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F7c50ba45-5c26-4248-94c3-d0ce220eef7c_736x1039.jpeg 1272w, https://substackcdn.com/image/fetch/$s_!c7eh!,w_1456,c_limit,f_webp,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F7c50ba45-5c26-4248-94c3-d0ce220eef7c_736x1039.jpeg 1456w" sizes="100vw"><img src="https://substackcdn.com/image/fetch/$s_!c7eh!,w_1456,c_limit,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F7c50ba45-5c26-4248-94c3-d0ce220eef7c_736x1039.jpeg" width="360" height="508.20652173913044" data-attrs="{&quot;src&quot;:&quot;https://substack-post-media.s3.amazonaws.com/public/images/7c50ba45-5c26-4248-94c3-d0ce220eef7c_736x1039.jpeg&quot;,&quot;srcNoWatermark&quot;:null,&quot;fullscreen&quot;:null,&quot;imageSize&quot;:null,&quot;height&quot;:1039,&quot;width&quot;:736,&quot;resizeWidth&quot;:360,&quot;bytes&quot;:null,&quot;alt&quot;:null,&quot;title&quot;:null,&quot;type&quot;:null,&quot;href&quot;:null,&quot;belowTheFold&quot;:false,&quot;topImage&quot;:false,&quot;internalRedirect&quot;:null,&quot;isProcessing&quot;:false,&quot;align&quot;:null,&quot;offset&quot;:false}" class="sizing-normal" alt="" srcset="https://substackcdn.com/image/fetch/$s_!c7eh!,w_424,c_limit,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F7c50ba45-5c26-4248-94c3-d0ce220eef7c_736x1039.jpeg 424w, https://substackcdn.com/image/fetch/$s_!c7eh!,w_848,c_limit,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F7c50ba45-5c26-4248-94c3-d0ce220eef7c_736x1039.jpeg 848w, https://substackcdn.com/image/fetch/$s_!c7eh!,w_1272,c_limit,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F7c50ba45-5c26-4248-94c3-d0ce220eef7c_736x1039.jpeg 1272w, https://substackcdn.com/image/fetch/$s_!c7eh!,w_1456,c_limit,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F7c50ba45-5c26-4248-94c3-d0ce220eef7c_736x1039.jpeg 1456w" sizes="100vw"></picture><div class="image-link-expand"><div class="pencraft pc-display-flex pc-gap-8 pc-reset"><button tabindex="0" type="button" class="pencraft pc-reset pencraft icon-container restack-image"><svg role="img" width="20" height="20" viewBox="0 0 20 20" fill="none" stroke-width="1.5" stroke="var(--color-fg-primary)" stroke-linecap="round" stroke-linejoin="round" xmlns="http://www.w3.org/2000/svg"><g><title></title><path d="M2.53001 7.81595C3.49179 4.73911 6.43281 2.5 9.91173 2.5C13.1684 2.5 15.9537 4.46214 17.0852 7.23684L17.6179 8.67647M17.6179 8.67647L18.5002 4.26471M17.6179 8.67647L13.6473 6.91176M17.4995 12.1841C16.5378 15.2609 13.5967 17.5 10.1178 17.5C6.86118 17.5 4.07589 15.5379 2.94432 12.7632L2.41165 11.3235M2.41165 11.3235L1.5293 15.7353M2.41165 11.3235L6.38224 13.0882"></path></g></svg></button><button tabindex="0" type="button" class="pencraft pc-reset pencraft icon-container view-image"><svg xmlns="http://www.w3.org/2000/svg" width="20" height="20" viewBox="0 0 24 24" fill="none" stroke="currentColor" stroke-width="2" stroke-linecap="round" stroke-linejoin="round" class="lucide lucide-maximize2 lucide-maximize-2"><polyline points="15 3 21 3 21 9"></polyline><polyline points="9 21 3 21 3 15"></polyline><line x1="21" x2="14" y1="3" y2="10"></line><line x1="3" x2="10" y1="21" y2="14"></line></svg></button></div></div></div></a><figcaption class="image-caption">Propor&#231;&#227;o &#225;urea e Mona Lisa. Fonte: Michael Paukner, Flickr</figcaption></figure></div><div class="latex-rendered" data-attrs="{&quot;persistentExpression&quot;:&quot;\\varphi = \\frac{1 + \\sqrt{5}}{2} \\approx 1,6180339\\dots&quot;,&quot;id&quot;:&quot;SBIJAIKANJ&quot;}" data-component-name="LatexBlockToDOM"></div><p><span>A sequ&#234;ncia de Fibonacci que conhecemos hoje foi desenvolvida pelo matem&#225;tico italiano Leonardo Fibonacci no s&#233;culo XII, sendo demonstrada matematicamente no livro Liber Abaci de Fibonacci (1202). Inicialmente, surgiu a partir de um problema populacional ao tentar contar a quantidade de casal de coelhos ideais (n&#227;o realista), seguindo as regras abaixo.</span></p><ol><li><p><span>No primeiro m&#234;s, temos um casal de coelhos rec&#233;m-nascidos (um macho e uma f&#234;mea).</span></p></li><li><p><span>Eles levam exatamente um m&#234;s para crescer e atingir a maturidade sexual.</span></p></li><li><p><span>A partir do segundo m&#234;s, j&#225; adultos, esse casal gera um novo casal de filhotes todo m&#234;s.</span></p></li><li><p><span>Por serem coelhos te&#243;ricos e ideais, n&#227;o possuem problemas gen&#233;ticos e s&#227;o considerados imortais.</span></p></li><li><p><span>O ciclo se repete com os novos casais.</span></p></li></ol><div class="captioned-image-container"><figure><a class="image-link image2 is-viewable-img" target="_blank" href="https://substackcdn.com/image/fetch/$s_!bqUz!,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F98fd2401-b657-4329-9a71-c737ad74e831_937x723.png" data-component-name="Image2ToDOM"><div class="image2-inset"><picture><source type="image/webp" srcset="https://substackcdn.com/image/fetch/$s_!bqUz!,w_424,c_limit,f_webp,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F98fd2401-b657-4329-9a71-c737ad74e831_937x723.png 424w, https://substackcdn.com/image/fetch/$s_!bqUz!,w_848,c_limit,f_webp,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F98fd2401-b657-4329-9a71-c737ad74e831_937x723.png 848w, https://substackcdn.com/image/fetch/$s_!bqUz!,w_1272,c_limit,f_webp,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F98fd2401-b657-4329-9a71-c737ad74e831_937x723.png 1272w, https://substackcdn.com/image/fetch/$s_!bqUz!,w_1456,c_limit,f_webp,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F98fd2401-b657-4329-9a71-c737ad74e831_937x723.png 1456w" sizes="100vw"><img src="https://substackcdn.com/image/fetch/$s_!bqUz!,w_1456,c_limit,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F98fd2401-b657-4329-9a71-c737ad74e831_937x723.png" width="540" height="416.6702241195304" data-attrs="{&quot;src&quot;:&quot;https://substack-post-media.s3.amazonaws.com/public/images/98fd2401-b657-4329-9a71-c737ad74e831_937x723.png&quot;,&quot;srcNoWatermark&quot;:null,&quot;fullscreen&quot;:null,&quot;imageSize&quot;:null,&quot;height&quot;:723,&quot;width&quot;:937,&quot;resizeWidth&quot;:540,&quot;bytes&quot;:228407,&quot;alt&quot;:null,&quot;title&quot;:null,&quot;type&quot;:&quot;image/png&quot;,&quot;href&quot;:null,&quot;belowTheFold&quot;:false,&quot;topImage&quot;:false,&quot;internalRedirect&quot;:&quot;https://lemunicamp.substack.com/i/203490995?img=https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F12aecd38-337c-4455-8c56-bb46719bd966_1920x1080.png&quot;,&quot;isProcessing&quot;:false,&quot;align&quot;:null,&quot;offset&quot;:false}" class="sizing-normal" alt="" srcset="https://substackcdn.com/image/fetch/$s_!bqUz!,w_424,c_limit,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F98fd2401-b657-4329-9a71-c737ad74e831_937x723.png 424w, https://substackcdn.com/image/fetch/$s_!bqUz!,w_848,c_limit,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F98fd2401-b657-4329-9a71-c737ad74e831_937x723.png 848w, https://substackcdn.com/image/fetch/$s_!bqUz!,w_1272,c_limit,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F98fd2401-b657-4329-9a71-c737ad74e831_937x723.png 1272w, https://substackcdn.com/image/fetch/$s_!bqUz!,w_1456,c_limit,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F98fd2401-b657-4329-9a71-c737ad74e831_937x723.png 1456w" sizes="100vw"></picture><div class="image-link-expand"><div class="pencraft pc-display-flex pc-gap-8 pc-reset"><button tabindex="0" type="button" class="pencraft pc-reset pencraft icon-container restack-image"><svg role="img" width="20" height="20" viewBox="0 0 20 20" fill="none" stroke-width="1.5" stroke="var(--color-fg-primary)" stroke-linecap="round" stroke-linejoin="round" xmlns="http://www.w3.org/2000/svg"><g><title></title><path d="M2.53001 7.81595C3.49179 4.73911 6.43281 2.5 9.91173 2.5C13.1684 2.5 15.9537 4.46214 17.0852 7.23684L17.6179 8.67647M17.6179 8.67647L18.5002 4.26471M17.6179 8.67647L13.6473 6.91176M17.4995 12.1841C16.5378 15.2609 13.5967 17.5 10.1178 17.5C6.86118 17.5 4.07589 15.5379 2.94432 12.7632L2.41165 11.3235M2.41165 11.3235L1.5293 15.7353M2.41165 11.3235L6.38224 13.0882"></path></g></svg></button><button tabindex="0" type="button" class="pencraft pc-reset pencraft icon-container view-image"><svg xmlns="http://www.w3.org/2000/svg" width="20" height="20" viewBox="0 0 24 24" fill="none" stroke="currentColor" stroke-width="2" stroke-linecap="round" stroke-linejoin="round" class="lucide lucide-maximize2 lucide-maximize-2"><polyline points="15 3 21 3 21 9"></polyline><polyline points="9 21 3 21 3 15"></polyline><line x1="21" x2="14" y1="3" y2="10"></line><line x1="3" x2="10" y1="21" y2="14"></line></svg></button></div></div></div></a><figcaption class="image-caption">Cen&#225;rio de coelhos ideais. Fonte: Autor.</figcaption></figure></div><p><span>Para resolver esse problema foi necess&#225;rio criar uma f&#243;rmula matem&#225;tica que contasse os casais, surgindo ent&#227;o a sequ&#234;ncia: 1, 1, 2, 3, 5, 8, 13, 21&#8230;. tamb&#233;m escrita pela f&#243;rmula de recorr&#234;ncia:</span></p><div class="latex-rendered" data-attrs="{&quot;persistentExpression&quot;:&quot;F_n = F_{n-1} + F_{n-2}&quot;,&quot;id&quot;:&quot;ZUJTMPPVSF&quot;}" data-component-name="LatexBlockToDOM"></div><p>Existem algumas varia&#231;&#245;es da f&#243;rmula acima que permitem o c&#225;lculo fechado sem depender de termos anteriores, como a f&#243;rmula de Binet, que faz o uso da propor&#231;&#227;o &#225;urea:</p><div class="latex-rendered" data-attrs="{&quot;persistentExpression&quot;:&quot;F_n = \\frac{1}{\\sqrt{5}} \\left( \\left( \\frac{1 + \\sqrt{5}}{2} \\right)^n - \\left( \\frac{1 - \\sqrt{5}}{2} \\right)^n \\right)&quot;,&quot;id&quot;:&quot;FRNTJNJIIB&quot;}" data-component-name="LatexBlockToDOM"></div><p>Ou sua vers&#227;o expandida com bin&#244;mio de Newton:</p><div class="latex-rendered" data-attrs="{&quot;persistentExpression&quot;:&quot;F_n = \\frac{1}{\\sqrt{5}} \\sum_{k=0}^{n} \\binom{n}{k} \\left(\\frac{1}{2}\\right)^{n-k} \\left(\\frac{\\sqrt{5}}{2}\\right)^k (1 - (-1)^k)&quot;,&quot;id&quot;:&quot;XZRULKMJLE&quot;}" data-component-name="LatexBlockToDOM"></div><p>A sequ&#234;ncia de Fibonacci possui uma propriedade interessante que mostra sua rela&#231;&#227;o com o N&#250;mero de Ouro: quando pegamos um termo qualquer da sequ&#234;ncia e o dividimos pelo seu antecessor obtemos um valor que se aproxima de &#966;. Nesse sentido, se aplicarmos limite tendendo ao infinito podemos escrever que</p><div class="latex-rendered" data-attrs="{&quot;persistentExpression&quot;:&quot;\\lim_{n \\to \\infty} \\frac{F_{n+1}}{F_n} = \\varphi&quot;,&quot;id&quot;:&quot;VUXIAVFTCH&quot;}" data-component-name="LatexBlockToDOM"></div><p><span>Podemos tamb&#233;m visualizar essa rela&#231;&#227;o a partir da geometria anal&#237;tica. Se utilizarmos os n&#250;meros da sequ&#234;ncia como coordenadas de pontos consecutivos, como (1, 1), (1, 2), (2, 3), (3, 5), (5, 8), (8, 13)..., podemos calcular o coeficiente angular </span><em><span>m</span></em><span> do segmento de reta que une dois desses pontos.</span></p><div class="latex-rendered" data-attrs="{&quot;persistentExpression&quot;:&quot;m = \\frac{y_2 - y_1}{x_2 - x_1}&quot;,&quot;id&quot;:&quot;NXHUHGXVBD&quot;}" data-component-name="LatexBlockToDOM"></div><div class="captioned-image-container"><figure><a class="image-link image2 is-viewable-img" target="_blank" href="https://substackcdn.com/image/fetch/$s_!GCS_!,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F73573330-d462-4f14-a882-57ffe8ffadb8_661x350.png" data-component-name="Image2ToDOM"><div class="image2-inset"><picture><source type="image/webp" srcset="https://substackcdn.com/image/fetch/$s_!GCS_!,w_424,c_limit,f_webp,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F73573330-d462-4f14-a882-57ffe8ffadb8_661x350.png 424w, https://substackcdn.com/image/fetch/$s_!GCS_!,w_848,c_limit,f_webp,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F73573330-d462-4f14-a882-57ffe8ffadb8_661x350.png 848w, https://substackcdn.com/image/fetch/$s_!GCS_!,w_1272,c_limit,f_webp,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F73573330-d462-4f14-a882-57ffe8ffadb8_661x350.png 1272w, https://substackcdn.com/image/fetch/$s_!GCS_!,w_1456,c_limit,f_webp,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F73573330-d462-4f14-a882-57ffe8ffadb8_661x350.png 1456w" sizes="100vw"><img src="https://substackcdn.com/image/fetch/$s_!GCS_!,w_1456,c_limit,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F73573330-d462-4f14-a882-57ffe8ffadb8_661x350.png" width="519" height="274.8108925869894" data-attrs="{&quot;src&quot;:&quot;https://substack-post-media.s3.amazonaws.com/public/images/73573330-d462-4f14-a882-57ffe8ffadb8_661x350.png&quot;,&quot;srcNoWatermark&quot;:null,&quot;fullscreen&quot;:null,&quot;imageSize&quot;:null,&quot;height&quot;:350,&quot;width&quot;:661,&quot;resizeWidth&quot;:519,&quot;bytes&quot;:null,&quot;alt&quot;:null,&quot;title&quot;:null,&quot;type&quot;:null,&quot;href&quot;:null,&quot;belowTheFold&quot;:true,&quot;topImage&quot;:false,&quot;internalRedirect&quot;:null,&quot;isProcessing&quot;:false,&quot;align&quot;:null,&quot;offset&quot;:false}" class="sizing-normal" alt="" srcset="https://substackcdn.com/image/fetch/$s_!GCS_!,w_424,c_limit,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F73573330-d462-4f14-a882-57ffe8ffadb8_661x350.png 424w, https://substackcdn.com/image/fetch/$s_!GCS_!,w_848,c_limit,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F73573330-d462-4f14-a882-57ffe8ffadb8_661x350.png 848w, https://substackcdn.com/image/fetch/$s_!GCS_!,w_1272,c_limit,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F73573330-d462-4f14-a882-57ffe8ffadb8_661x350.png 1272w, https://substackcdn.com/image/fetch/$s_!GCS_!,w_1456,c_limit,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F73573330-d462-4f14-a882-57ffe8ffadb8_661x350.png 1456w" sizes="100vw" loading="lazy"></picture><div class="image-link-expand"><div class="pencraft pc-display-flex pc-gap-8 pc-reset"><button tabindex="0" type="button" class="pencraft pc-reset pencraft icon-container restack-image"><svg role="img" width="20" height="20" viewBox="0 0 20 20" fill="none" stroke-width="1.5" stroke="var(--color-fg-primary)" stroke-linecap="round" stroke-linejoin="round" xmlns="http://www.w3.org/2000/svg"><g><title></title><path d="M2.53001 7.81595C3.49179 4.73911 6.43281 2.5 9.91173 2.5C13.1684 2.5 15.9537 4.46214 17.0852 7.23684L17.6179 8.67647M17.6179 8.67647L18.5002 4.26471M17.6179 8.67647L13.6473 6.91176M17.4995 12.1841C16.5378 15.2609 13.5967 17.5 10.1178 17.5C6.86118 17.5 4.07589 15.5379 2.94432 12.7632L2.41165 11.3235M2.41165 11.3235L1.5293 15.7353M2.41165 11.3235L6.38224 13.0882"></path></g></svg></button><button tabindex="0" type="button" class="pencraft pc-reset pencraft icon-container view-image"><svg xmlns="http://www.w3.org/2000/svg" width="20" height="20" viewBox="0 0 24 24" fill="none" stroke="currentColor" stroke-width="2" stroke-linecap="round" stroke-linejoin="round" class="lucide lucide-maximize2 lucide-maximize-2"><polyline points="15 3 21 3 21 9"></polyline><polyline points="9 21 3 21 3 15"></polyline><line x1="21" x2="14" y1="3" y2="10"></line><line x1="3" x2="10" y1="21" y2="14"></line></svg></button></div></div></div></a></figure></div><p><span>Assim, &#224; medida que avan&#231;amos na sequ&#234;ncia, observamos que </span><em><span>m </span></em><span>tende cada vez mais ao valor de &#966; &#8776; 1,61803&#8230;</span></p><div class="captioned-image-container"><figure><a class="image-link image2 is-viewable-img" target="_blank" href="https://substackcdn.com/image/fetch/$s_!0Cui!,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F11c50fe5-41e7-47d6-8acc-d77f033d7f2f_532x454.png" data-component-name="Image2ToDOM"><div class="image2-inset"><picture><source type="image/webp" srcset="https://substackcdn.com/image/fetch/$s_!0Cui!,w_424,c_limit,f_webp,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F11c50fe5-41e7-47d6-8acc-d77f033d7f2f_532x454.png 424w, https://substackcdn.com/image/fetch/$s_!0Cui!,w_848,c_limit,f_webp,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F11c50fe5-41e7-47d6-8acc-d77f033d7f2f_532x454.png 848w, https://substackcdn.com/image/fetch/$s_!0Cui!,w_1272,c_limit,f_webp,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F11c50fe5-41e7-47d6-8acc-d77f033d7f2f_532x454.png 1272w, https://substackcdn.com/image/fetch/$s_!0Cui!,w_1456,c_limit,f_webp,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F11c50fe5-41e7-47d6-8acc-d77f033d7f2f_532x454.png 1456w" sizes="100vw"><img src="https://substackcdn.com/image/fetch/$s_!0Cui!,w_1456,c_limit,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F11c50fe5-41e7-47d6-8acc-d77f033d7f2f_532x454.png" width="516" height="440.34586466165416" data-attrs="{&quot;src&quot;:&quot;https://substack-post-media.s3.amazonaws.com/public/images/11c50fe5-41e7-47d6-8acc-d77f033d7f2f_532x454.png&quot;,&quot;srcNoWatermark&quot;:null,&quot;fullscreen&quot;:null,&quot;imageSize&quot;:null,&quot;height&quot;:454,&quot;width&quot;:532,&quot;resizeWidth&quot;:516,&quot;bytes&quot;:null,&quot;alt&quot;:null,&quot;title&quot;:null,&quot;type&quot;:null,&quot;href&quot;:null,&quot;belowTheFold&quot;:true,&quot;topImage&quot;:false,&quot;internalRedirect&quot;:null,&quot;isProcessing&quot;:false,&quot;align&quot;:null,&quot;offset&quot;:false}" class="sizing-normal" alt="" srcset="https://substackcdn.com/image/fetch/$s_!0Cui!,w_424,c_limit,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F11c50fe5-41e7-47d6-8acc-d77f033d7f2f_532x454.png 424w, https://substackcdn.com/image/fetch/$s_!0Cui!,w_848,c_limit,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F11c50fe5-41e7-47d6-8acc-d77f033d7f2f_532x454.png 848w, https://substackcdn.com/image/fetch/$s_!0Cui!,w_1272,c_limit,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F11c50fe5-41e7-47d6-8acc-d77f033d7f2f_532x454.png 1272w, https://substackcdn.com/image/fetch/$s_!0Cui!,w_1456,c_limit,f_auto,q_auto:good,fl_progressive:steep/https%3A%2F%2Fsubstack-post-media.s3.amazonaws.com%2Fpublic%2Fimages%2F11c50fe5-41e7-47d6-8acc-d77f033d7f2f_532x454.png 1456w" sizes="100vw" loading="lazy"></picture><div class="image-link-expand"><div class="pencraft pc-display-flex pc-gap-8 pc-reset"><button tabindex="0" type="button" class="pencraft pc-reset pencraft icon-container restack-image"><svg role="img" width="20" height="20" viewBox="0 0 20 20" fill="none" stroke-width="1.5" stroke="var(--color-fg-primary)" stroke-linecap="round" stroke-linejoin="round" xmlns="http://www.w3.org/2000/svg"><g><title></title><path d="M2.53001 7.81595C3.49179 4.73911 6.43281 2.5 9.91173 2.5C13.1684 2.5 15.9537 4.46214 17.0852 7.23684L17.6179 8.67647M17.6179 8.67647L18.5002 4.26471M17.6179 8.67647L13.6473 6.91176M17.4995 12.1841C16.5378 15.2609 13.5967 17.5 10.1178 17.5C6.86118 17.5 4.07589 15.5379 2.94432 12.7632L2.41165 11.3235M2.41165 11.3235L1.5293 15.7353M2.41165 11.3235L6.38224 13.0882"></path></g></svg></button><button tabindex="0" type="button" class="pencraft pc-reset pencraft icon-container view-image"><svg xmlns="http://www.w3.org/2000/svg" width="20" height="20" viewBox="0 0 24 24" fill="none" stroke="currentColor" stroke-width="2" stroke-linecap="round" stroke-linejoin="round" class="lucide lucide-maximize2 lucide-maximize-2"><polyline points="15 3 21 3 21 9"></polyline><polyline points="9 21 3 21 3 15"></polyline><line x1="21" x2="14" y1="3" y2="10"></line><line x1="3" x2="10" y1="21" y2="14"></line></svg></button></div></div></div></a></figure></div><p><span>J&#225; a matriz de Fibonacci, &#233; uma matriz quadrada de ordem 2&#215;2, cujos elementos s&#227;o 1, 1, 1 e 0, e possui uma propriedade em comum com sua sequ&#234;ncia. Toda vez que a elevamos a um expoente </span><em><span>n</span></em><span> (com </span><em><span>n</span></em><span> sendo a posi&#231;&#227;o de um n&#250;mero na sequ&#234;ncia), geramos uma parte da sequ&#234;ncia e descobrimos qual &#233; esse n&#250;mero</span></p><div class="latex-rendered" data-attrs="{&quot;persistentExpression&quot;:&quot;\\begin{bmatrix} F_{n+1} &amp; F_n \\\\ F_n &amp; F_{n-1} \\end{bmatrix}&quot;,&quot;id&quot;:&quot;YVWFCJAMJI&quot;}" data-component-name="LatexBlockToDOM"></div><p><span>Por exemplo, ao pegarmos a matriz inicial e elevarmos a </span><em><span>n </span></em><span>= 4 descobrimos que o quarto termo da sequ&#234;ncia de Fibonacci &#233; igual a 3 e geramos o trecho (..., 2, 3, 5&#8230;).</span></p><div class="latex-rendered" data-attrs="{&quot;persistentExpression&quot;:&quot;A^4 = \\begin{bmatrix} 1 &amp; 1 \\\\ 1 &amp; 0 \\end{bmatrix}^4 = \\begin{bmatrix} 5 &amp; 3 \\\\ 3 &amp; 2 \\end{bmatrix}&quot;,&quot;id&quot;:&quot;UQDJQSIMXN&quot;}" data-component-name="LatexBlockToDOM"></div><p><span>Al&#233;m disso, podemos analisar a matriz de Fibonacci no contexto da &#193;lgebra Linear. Ao estudarmos seu comportamento quando multiplicada por um vetor n&#227;o nulo </span><em><span>v</span></em><span>, buscaremos os valores de um escalar &#945; que satisfa&#231;am a equa&#231;&#227;o de autovalores e autovetores:</span></p><div class="latex-rendered" data-attrs="{&quot;persistentExpression&quot;:&quot;\\begin{aligned}\n\\begin{bmatrix} 1 &amp; 1 \\\\ 1 &amp; 0 \\end{bmatrix} v = \\alpha v &amp;\\iff \\left( \\begin{bmatrix} 1 &amp; 1 \\\\ 1 &amp; 0 \\end{bmatrix} - \\begin{bmatrix} \\alpha &amp; 0 \\\\ 0 &amp; \\alpha \\end{bmatrix} \\right) v = 0 \\\\\n&amp;\\iff \\begin{bmatrix} 1-\\alpha &amp; 1 \\\\ 1 &amp; -\\alpha \\end{bmatrix} v = 0\n\\end{aligned}&quot;,&quot;id&quot;:&quot;GIFQMJSMFD&quot;}" data-component-name="LatexBlockToDOM"></div><p><span>Para possuir uma solu&#231;&#227;o em que o vetor </span><em><span>v</span></em><span> seja n&#227;o nulo, observe que o determinante da matriz resultante deve ser igual a zero. Assim, calculando o determinante, obtemos a seguinte equa&#231;&#227;o caracter&#237;stica:</span></p><div class="latex-rendered" data-attrs="{&quot;persistentExpression&quot;:&quot;\\alpha^2 - \\alpha - 1 = 0&quot;,&quot;id&quot;:&quot;BPUJZSBIVQ&quot;}" data-component-name="LatexBlockToDOM"></div><p>Cujas solu&#231;&#245;es s&#227;o:</p><div class="latex-rendered" data-attrs="{&quot;persistentExpression&quot;:&quot;\\alpha = \\frac{1 \\pm \\sqrt{5}}{2}&quot;,&quot;id&quot;:&quot;XFVXWFMOJB&quot;}" data-component-name="LatexBlockToDOM"></div><p><span>Isso gera dois autovalores distintos: &#945; &#8776; 1,618, correspondendo exatamente ao N&#250;mero de Ouro (&#966; ), e &#945; &#8776; -0,618. Como estamos analisando o crescimento positivo da sequ&#234;ncia de Fibonacci, olharemos apenas o autovalor positivo dominante, concluindo que &#945; = &#966;.</span></p><p><span>Esse resultado indica que cada termo tende a ser o anterior multiplicado pela propor&#231;&#227;o &#225;urea conforme o crescimento da sequ&#234;ncia. Por exemplo, ao multiplicarmos 5 por &#966;, obtemos aproximadamente 8,09, um valor bem pr&#243;ximo do termo seguinte da sequ&#234;ncia, mostrando uma boa precis&#227;o.</span></p><p><span>Dessa forma, a matriz de Fibonacci evidencia que o comportamento da sequ&#234;ncia vai muito al&#233;m da aritm&#233;tica b&#225;sica, conectando-se profundamente com conceitos de &#193;lgebra Linear, como autovalores e autovetores.</span></p><div><hr></div><h2><strong>Refer&#234;ncias:</strong></h2><p><strong>1.</strong> <span>BITZ,J. The Fibonacci Matrix. Youtube. Dispon&#237;vel em: </span><a href="https://www.youtube.com/watch?v=RPbAqlrVp5Y"><span>https://www.youtube.com/watch?v=RPbAqlrVp5Y</span></a><span>.</span></p><p><strong><span>2.</span></strong><span> POSSANI,C. Matriz e sequ&#234;ncia de Fibonacci. Youtube. Dispon&#237;vel em: </span><a href="https://www.youtube.com/watch?v=gxVT-LsM2mg&amp;t=62s"><span>https://www.youtube.com/watch?v=gxVT-LsM2mg&amp;t=62s</span></a><span>.</span></p><p><strong>3. </strong><span>SANTOS, A. A.; ALVES, F. R. V. A f&#243;rmula de Binet como modelo de generaliza&#231;&#227;o e extens&#227;o da sequ&#234;ncia de Fibonacci a outros conceitos matem&#225;ticos. C.Q.D. - Revista Eletr&#244;nica Paulista de Matem&#225;tica, v. 9, 2017. Dispon&#237;vel em: </span><a href="https://www.fc.unesp.br/Home/Departamentos/Matematica/revistacqd2228/v09a01-a-formula-de-binet-como-modelo.pdf"><span>https://www.fc.unesp.br/Home/Departamentos/Matematica/revistacqd2228/v09a01-a-formula-de-binet-como-modelo.pdf</span></a><span>.</span></p>]]></content:encoded></item></channel></rss>