[b]INTRODUÇÃO[br][br]1.[/b] Nesta construção, o ponto preto indica o valor de x sobre o eixo numérico, e o controle deslizante permite acrescentar um valor [b]Δx[/b], representado pelo segmento em vermelho.[br][br]Ao movimentar o controle [b]Δx[/b], observe a movimentação do ponto x+Δx e a sua variação correspondente no eixo.
[b][i][b][i][I[sub]i [/sub]- CP][/i][/b] [/i]a)[/b] Coloque o controle deslizante "[b]x[/b]" em [b]x = 3[/b] e em seguida posicione o controle deslizante "[b][color=#ff0000]Δx[/color]"[/b] em [b][color=#ff0000]Δx = 3[/color].[br][/b]Ao realizar esses procedimentos qual é o valor de x + Δx ?
[b][i][b][i][I[sub]i [/sub]- CP][/i][/b] [/i]b)[/b] Agora mude o controle deslizante "[b]x[/b]" para [b]x = 5[/b] e o "[b][color=#ff0000]Δx" [/color][/b]para [color=#ff0000][b]Δx= 4[/b][/color]. Qual é o valor de x + Δx?
[i][b][I[sub]i [/sub]- CP] [/b][/i][b]c) [/b]Por fim, para qualquer que seja o número real x[sub] [/sub]e o valor de [color=#ff0000][b]Δx[/b] [/color]também um número real qualquer, ou seja, um x[sub]1[/sub]. Qual será o valor de x + Δx?
[b]2.[/b] Agora que já compreendemos o significado de acrescentar Δx a um ponto x no eixo horizontal, vamos investigar o que acontece com a área sob o gráfico da função quando o limite superior da integral é aumentado em Δx, mantendo o limite inferior fixo.[br][br]A construção abaixo mostra a função f(t) = 1+t[sup]2 [/sup] e uma região sob o seu gráfico.[br][br][b]Observação:[/b] Nela você pode movimentar os controles deslizantes "x" e "Δx"
[b][b][i][I[sub]e[/sub]] [/i][/b]a)[/b] Ao clicar na caixa [b]“Inserir o acréscimo Δx a x”[/b], o que você observa acontecer no gráfico?
[b][b][b][i][I[sub]e[/sub]] [/i][/b][/b]b)[/b] Ao variar o valor de [b]Δx[/b], o que acontece com a [b]nova área[/b] (em azul)?
[b][b][b][i][I[sub]r[/sub]] [/i][/b][/b]c) [/b]Considerando [img]data:image/png;base64,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[/img], qual seria a expressão que representa [b]G(x+Δx)[/b]?
[b][b][b][i][I[sub]r[/sub]] [/i][/b][/b]d)[/b] Sabendo qual é a expressão de [b]G(x+Δx)[/b], utilizando a propriedade da soma das integrais:[b][img]data:image/png;base64,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[/img] [br][/b]como você poderia reescrever [b]G(x+Δx) [/b]de forma algebrica ?
[b][b][b][i][b][b][b][i][I[sub]r[/sub]] [/i][/b][/b][/b][/i][/b][/b]e)[/b] Com base nos exercicios anteriores e na construção anterior, determine o resultado de [b]G(x+ Δx) - G(x).[/b]
[b]3. [b][b][b][i][I[sub]e[/sub]][/i][/b][/b][/b][/b]Agora que você já sabe o resultado da expressão [b]G(x+ Δx) - G(x), [/b]vamos observar como esse resultado é representado geometricamente utilzando a construção abaixo.[br][br]Sendo assim, siga os seguintes passos:[br][b]Passo 1:[/b] Selecione a caixa Inserir G(x+ Δx)[br][b]Passo 2: [/b] Selecione a caixa inserir G(x)[br][b]Passo 3:[/b] Selecione a caixa inserir G(x+ Δx) - G(x)[br][br]Após clicar nas três caixas observe as regiões formadas e observe o resultado da expressão [b]G(x+ Δx) - G(x).[/b][br]
[b][b][b][b][i][I[sub]f[/sub]] [/i][/b][/b][/b]FORMALIZANDO O PENSAMENTO[br][br] [/b]Ao retomar a definição[br][img]data:image/png;base64,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[/img][br]podemos descrever com mais precisão o que foi observado nas atividades desta parte. Quando substituímos x por x+Δx, obtemos[br][img]data:image/png;base64,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[/img][br][br] Pela propriedade da integral em relação aos limites, a área acumulada de −1 até x+Δx pode ser decomposta em duas parcelas: a área de −1 até x e a área de x até x+Δx, isto é,[br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAWgAAAA8CAYAAABLjSCAAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAABFFSURBVHhe7d1/bJP3nQfwd0+V6go9MqeeSbVmeLcZnNEsZiXYdwzs68LCqibQKQndlSzbQumOOcmtZ0J/5HItcSO6mE4lySqSHQNySNsSVJpkAtl0Hc5NcH7QAbZUFOcEIh1IeaYi2RXInhLpc3/Yju0n/m3z5LHzfUmWyPex/WB/Ps/neZ7v832+foSICAzDMIzs/I24gWEYhpEHVqAZhmFkihVohmEYmWIFmmEYRqaKt0AvCPDc8ItbGYaRm7seeNmmmpOiLdDC8T3Y+k9WOBfESxiGkQ8Bwy1bse2QU7yAyYD8CrSHB/9A3Ciy4IRt6nGYgsOwHhfESxmGkUIm2+qUDVOcCcH/tGL4rnghk478CvRdF1xpaq5wfATKrkn0WtTg37GBZ0fRDCO9tNuqgOHTSnSf6UXnWh7Wo7z4CUwaEhVoP/jTB9D8QjNsFzxwdDej/pVheNLtfRNZcMLm/i46NwBVP/sP1PqHYT0typIFAY6f70VjQxvGLvMY7mhE4xsOpMwlRjosPvJVyNhM2eCp7YT20Sp0vF0L/zErRsRH0XcdsL3SiMaOMfCXh9HW0Iiu8zmtrTRRgfncdhr/0E7uz6Ntt4/10KiPiALjtIeroSHvKO3hVGS5FPvKsHP91H9T3Bg1d8JMPVejf7s6y4krt5BrPtISIPuRfnLPE9GnfVSpstDFqz1UydXRqbno6xhpLM0HFh+5yDs2KbfVOTq1vyf0XkRE8y6ylHNU3umKPuW+nfoG3URENP1uJalevUjudyqJe/4UJVrdSvQIFfBWb+/Rbdj84U786VdfQV+LEy1/GETtqiC8M35o15cBlw9gzatqXPmffVgt/BWPlSmBK8M48F+e6Jt85oZbqYNOGWnQouVwO/SrACzw6OqYxcEPmrC4+O4I6r/ehsd+/WecaVQCEOCdUUK7XgHhZD3WXWrHFx8Y4fcDyicUi6thHr7E+cDiIwe5xCaYzbZ6uQttdw9isHFxYeg9Ox7D8T+fQZMSwF0vvKu10K4SMFK3Dk7zFzhu9MMPJZSrFl+2sokrds5u9lM1V0k9nxLZ93PEcRyZHfFPuf1+NWneDu0xk0qxV/aNWeKOniMuvqoi7umYvXWYfR9HDWOB+EZGGhnkA4vPMilUbJJuqz4a7Vy6PdL8RbKoOKoU14B5O7VyDTR6P76ZISpYH7Rz0Arv2t3YvQEwfL8TTY29aNkCALMYfmEzrFcEOC94YXymKvT8Q1ZkdclgwYP+yTLs+pIAQYh/VPygE7rPbOj7KAg8cOBAdTPGBB6Oj7QwVClCFysOjeTWj8bkJGk+sPgsu4cem2v9GH9iF8ruibbVexVosegw+14fxh4AwQsHsPmHYxCuODC53oCqVQDuDsN6Mqu1lbTCdHEsOHHgS/UYN/8J//dWqABH8eja2o8nm56El7+O6bKf4CdPXcftzQfRaYye/iw6P4ABbTvavxrfHDzTjDWtE/GNYms7ceUPalhf8sBgBFweJ7ClG7VBF9DUi5b14hcwD0WqfBBG0Mzis3wKGZuE22oQY3vWYO9kbNtS6teu4GO1FXs8BpjggvsTwNBViyAP7La2QPuo+BUrlPiQOieXLKTiOGo9J14QNh8gX+T05b6PAuJTn1hJT5uyEPCRL3x2FvD5KM2JGlNo6fKBxWf5FDI2BdhWo+sIkC+yYmZRQbo4PI5xBGGC6RnxkrBHFdFO/1VKKFLtHZ8T75FzoFBCGb7epFAqwS49SSttPrD4LJuCxqYA22p0HQooIytmFhWgQM/CeV4AyvTYWCZexqw8LB/ki8Wm2ORfoAUnHDcAbNNB3PvMrEAsH+SLxabo5F+geSecAHSbdOIlzErE8kG+WGyKTt4Fmv/vSQAKGJ5RixcxKxDLB/lisSk+eRboWbimggAMqMrzYkEx8l+ZAH9P3Co2C8cZHitjOlz55QOLUYT8YiOljPIgyGNsUl5jsPMr0A94OG8AUGhRUWIXHYK3JmDtaENb7wSEBLPl+c+3oe6EAtonxEvE1DCsGkHdTx05FYCg4IHj7AQmzk7AI55oRm4kzgcWoyxIHBsp+S8Po6ujDV1DiXeyGeeBQo+qW3uw/Zde8ZKMBGecmDg7gYmzTnhzmQguEfG4u6w4zMRxXOlNbnLnFNVxNdR3wkKav00wZtQ3Sg2a2AmaYswHyPf50vGcrk4NNYz5xM1puU+YybyrkjhOI7rNPUC+uTTjVKUmZT6wGGVHythI6ZKFylUWGhqsIRVXvXRcdtZ5MEennq9OOKVEanNkf9dMe76lIk5823rC9WQmryNor8cFAFBsqEAp7ZS9J21wrt8BvWIOWLsTJm3s0iAcnWb4DnRCn2A8t3C6CV/+ezMconb9v3bC99N/gyPLPWvVjwbR+awCwA4Yvhmz4PK/Y9267fjVrZi2ZSZlPpR0jG454SzwkbiUsZFOEGODw/DXGbHRJ0BZVQtD3IfLJQ/K0HLQhIH9A5iNa0+nDLWvDaJlQxD4pik0YVRY4vVkSFyxMxeg0d2hiVbSTqpSVG5Tv5Ejbp9dvCDkzhDViPeQi8LfScKjlNCymmNLl6Q2R6ee54jbPRp3JOZ+W0OcykIxkzcuMynzocRjdK516RlBXqSMjZTsZOY4qn7/tnhBSM554KYejYosTnF7Oi6yqDjRhHCp1pNeHkfQU3CeB4Ay6L5WQncALbhx/Rqg08Udki0SLkyCN+6EMeF0iKHvRPsdU4KjFAWMz5nAT9qzm3hmwQ3nFKAz6mPu6pqF8xMBeKEW+rgnLycJ84HFKEsSxkZKM264ABg2JB6VknseVGHH94CR32c1nRtwywVnENixJXaUear1ZEBcsTPm7aNqjiOOa6XxRP07xeb+OJkrNKTRqEJ9deUa0lRoqOFE/H5v/MfiPWRocvOaJa+tof5P459GV3tIk+77mp+j8dcbaOumSqp8uobefLuVVJG+zcj/saI8tB5V6P9oPieDoyIp8mGlxKjQR9BSxEZKkViWh84KVBoNaSoq6U3REW8+eRAYayBuUx9NxzfH87loaF8dVW/SUOW39lDPqzXR/ucM15NOzgU6MNYQWnG6D1FsJlqJS/YLEnSb+g0c1YkKQsTtwa3Eca1kT7YRzPbT1kQXMiLmp6nfyFH1u9OhU+V5N/U8Hdqw4t7TYSYu1fssuk2jr5vJ3J7h4/VRSnKymJak+VBSMUqgwAVa0thIaPpIdYoupDzzwGEOLRe3R/js1FquotYPwxeVfaPUwHHEGfrjtqG060kj5wLt6gzvGfYn/QhFKXW/oZ1ak84ElklfU+j14snRI1yd5cSpLHRxMZj5920GfHM0N5f6sTjTYB6kzIfUn7/4YrREgQu0lLGRTrpY5pkHN/upmttK/bPiBRSN+beHYl5f+P5nyr0PehYuVxAAYNKX0m2jQXhvCMCzhhzmKsi8rymQYMwuhBFYj/mh+NFumCJXnMN9m9otufdtKpRlKCtL/cj/54WkzIdSihEP247t2C5+dDvg6E7QvsOW3Y9cABLHRkozmL4KlG3emDaWS2WaB0EgUR5ctuHAFGD6wa7o68P9z0Z9Afufc79RxQvvNQBQQKvNddVy5IHrj4BWX5V6msVErrlghwImfeILFrEeTzDkB1dD8yTUb4vZpK84MIky7DTGvOcDHs5rgGlLZhtb0L/0F2iSPu6FNuTsSZkPpRQjPTrtH+Nj8cNai1prgnZ7Z5qCn4iUsZGQcB28gMVfaMpKxnmgABLkwSzvRBBaGLdEv09hygEvavFdY8wTM15PcrkV6PDVU8AIQw7fj2x95oIrCFStTzw6ANBi4wbgL8LSa/yCm4eAehg3h/7mu9swJr6t6TMvZqCF9mui9kVabHw6+lcoEYwwfAPge7vgCALwuDAVkxzC6TbYrkVfE28Wk+9aYe3N8HFkMsuxn2FS5kPJxeghkzI2UvLwcEKLimRpkG8e3PTCi/XQrhW1L6qCLuZXZtyXnMAGE/SrBIy9MQBvBusJ+tMfEOVWoL3T8AJA5HfESoXXCzd02Jj0wEcN9QZgenZp0EMB2gjdowBmBtDn34l68S963fNhDlVQJwq6+itQAwhGTqn8DvQc8QJGE3RwYvSqGjpFpCCEk8PvgPWsFrtjb46Io0bT4UEM9mf4ONyEnPb1UuZDycXoIZMyNhKanXEDMMQVyXj55UHQPwesr0i4PZQ9FdorLObBzACsvwUURgPUd8fxu79WQZtmPcLJeqz58hrUn176/4uVU4H2XJ0K/UOvQ9IdWBHyelyAwgBDoo0zTLdJB+HK9SXjZI1NLVDecmLk6F7UH1Ki9xe1S07BBTcPwWiCIcFpEzZ0YNAMDO/vwsDRvdj2QxdePNwEJT8BW4cVwX9pQRkAdX0LdPDAcbQL9XucaPp1e8IkkpKU+cBilB0pYyMl9/+6AaMeSffTeeaBh5+C4tumhN+Z4oVuDH5nCta9Axh4ox7bjijR/ZYOwakhdHU4YGozAenWo3gMgBLqMvERgoj4qmF6pXpXUvhzJbs7LSLV3Un3fTSX9J770PsnG/azSPwe9300J/6ttoCP5uQyx4Ok+bBCYlSwURxSxkZKburRpLiDMCLnPAjfSXhJ3B4v4JuLi3vAl2BEVMr1pJdDgQ59ORxXTX1e8bIi5O2nmnINvXnpIllUmdzeGaDRl3K4HfjOENXEDc8qFRLkw0qL0R03ue+IG3MhQWwk5DtnJk15HZ26Gpooayjtd5RjHjgtpIobQrd8su/ieOCFW0Ca/p/iMXthFPwDNZ686YD9691oj70Km5ACTX2DePyIDXyiIThJ8EdtWP1Bd3R4VqmQIB9WXIyeqkLVU+LGHEgQGym5JkcgKNR4nJ/A9eaDaEn7HeWSBwJG+pxoP/JKzkPjCkpcsdMK/2y7eGB+0fK5aOh1M5nfGafbWXwg3zkzbd1vp0wmp8zmuUVHinxgMcqNFLGR0p1x6mk305vHXOTL4iwnm9hOv19DNYPyud8y6wI9d6KOuFQzSK0gPn6cXJ+LW8V85JpwZZQcxUju+bCSYyT32EgpozwITJP9Ezl0bERl3cUxe8MF5Dn4ulQoN++EPt2vNEAJfb0eaa7VFi2558NKjpHcYyOljPJAoUXts7Lo2FiUZYGO3DYaHXzNrGQsH+SLxaYUZFmgw7eNJhsnmpEghPM2jHjE7UzxYfkgX4WIDbPcsivQ4dtGc538g39vO+pffBkvd1gL/pM+zDJg+SBfecaGkYesCnTQ44I3jz4tveVjTP6uF7Xp+oKYosDyQb7yjQ0jD1kVaA8/BaAetaxPi2H5IGtJY7MgwPHzvWhsaMPYZR7DHY1ofMOx5HZoRh6yKNAe2M8Gge+/iFrWp8WwfJCxZLEJwnF0FE9ajuOMVY2eXaPQ/lgH7y8HYGcVWpYeISISN0b4p2zoOqNAy+F26IUBbN5ohen3f8ER8Z1ct8bQ9b4T4hn7IrT/fATt/xiZJmQWA//wDVx/6wscf070REbWMs2H4OUBHPiNN75xkRKmn/Wi6auRv1k+FEJmsRHgnVFCu14B4WQ91l1qxxcfGOH3A8onxNMFMbIgHhgdy74vNNGK2UE0/U7lkt/byk3ot8IKMxkMIyWWD/KVbWzs+0ptAqXSlLKLw9jUAu33jqP972x4+b3V6B1ZvmkTmeXH8kG+MorNAwcOVDdjTODh+EgLQ5UCgIDhQyOsD1qmUnZxAIDfM4KRP66GqXknqvK82i5csME66YLzpAO+zU3YVfsiul+rZcOAigjLB/lKGxthBM0veWAwAi6PE9jSjdqgC2jqRUsJTKZUitIWaIZhSkjQDz+UUCqAoN8PKJVLJqtn5IMVaIZhGJlK2QfNMAzDLB9WoBmGYWSKFWiGYRiZYgWaYRhGpliBZhiGkSlWoBmGYWSKFWiGYRiZ+n/UTckAP7TXgQAAAABJRU5ErkJggg==[/img][br][br]Como 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segue 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[/img][br][br][/b] Em termos geométricos, essa igualdade expressa que a diferença entre as áreas acumuladas de -1 até x+Δx e até x coincide exatamente com a área da faixa adicional que surge quando o limite superior da integral é deslocado de x para x+Δx.