<div id="pf1" class="pf w0 h0" data-page-no="1"><div class="pc pc1 w0 h0"><img class="bi x0 y0 w1 h1" alt="" src="https://files.passeidireto.com/d87fcf00-7c50-48e0-823f-440875d852e7/bg1.png"><div class="c x0 y1 w2 h2"><div class="t m0 x1 h3 y2 ff1 fs0 fc0 sc0 ls0 ws17">27/11/22 19<span class="ff2 ls1">:</span><span class="ws0">34<span class="blank _0"></span><span class="ls2 ws17">Atividade 2 (A2)<span class="blank _1"></span>: Revisão da t<span class="blank _1"></span>entativa<span class="blank _1"></span></span></span></div></div><div class="c x0 y3 w2 h2"><div class="t m0 x2 h3 y4 ff1 fs0 fc0 sc0 lsc ws17">Pag<span class="blank _2"> </span>e <span class="blank _2"> </span>1 <span class="blank _2"> </span>of<span class="blank _2"> </span> 4<span class="blank _3"></span><span class="ls3 ws1">https://ambienteacademico.<span class="blank _1"></span>com.br<span class="blank _1"></span>/mod/quiz/re<span class="blank _1"></span>view<span class="blank _4"></span>.php<span class="ff2 ls4">?<span class="ff1 ws2">attempt=1462109&cmid=509253</span></span></span></div></div><div class="c x0 y0 w2 h1"><div class="t m0 x3 h4 y5 ff3 fs1 fc1 sc0 lsd ws3">!"#$%&'("&)"*+"#%&</div><div class="t m0 x4 h4 y6 ff3 fs1 fc1 sc0 lsd ws3">,,,-.-/00/1'2'3453657'185931(7'<span class="ff4 ls5">\ue600</span><span class="ws4">'6!1':1-94:;5<span class="blank"> </span>6<9(1(;',<span class="blank"> </span><span class="lse ws5">1=">"?%?@','A1,B</span></span></div></div><div class="c x5 y0 w3 h5"><div class="t m0 x6 h6 y7 ff5 fs2 fc2 sc0 ls6 ws6">!"#$%&'(<span class="ff3 fs3 lsd ws7">C<span class="blank _5"></span>C</span></div><div class="t m0 x6 h7 y8 ff3 fs2 fc2 sc0 lsf ws8">3DEE@=D</div><div class="t m0 x6 h7 y9 ff3 fs2 fc2 sc0 lsd ws9">1="#F"G'CH//'?@</div><div class="t m0 x6 h7 ya ff3 fs2 fc2 sc0 ls10">CH//</div><div class="t m0 x6 h6 yb ff5 fs2 fc2 sc0 ls6 ws6">!"#$%&'(<span class="ff3 fs3 lsd ws7">,<span class="blank _5"></span>,</span></div><div class="t m0 x6 h7 yc ff3 fs2 fc2 sc0 lsf ws8">3DEE@=D</div><div class="t m0 x6 h7 yd ff3 fs2 fc2 sc0 lsd ws9">1="#F"G'CH//'?@</div><div class="t m0 x6 h7 ye ff3 fs2 fc2 sc0 ls10">CH//</div><div class="t m0 x7 h4 yf ff3 fs1 fc2 sc0 ls11 wsa">9#")"%?D'@I<span class="blank _6"></span>9#")"%?D'@I<span class="blank"> </span><span class="lsd ws3">?DI"#FDH',J'#D>',/,,H'CKLCM</span></div><div class="t m0 x8 h4 y10 ff3 fs1 fc2 sc0 ls7 wsb">;&=%?D<span class="blank _7"></span>;&=%?D<span class="blank"> </span><span class="ls5">N"#%+"O%?%</span></div><div class="t m0 x9 h4 y11 ff3 fs1 fc2 sc0 ls8 wsc">3D#)+GP?%'@I<span class="blank _8"></span>3D#)+GP?%'@I<span class="blank"> </span><span class="lsd ws3">?DI"#FDH',J'#D>',/,,H'CKLQR</span></div><div class="t m0 x8 h4 y12 ff3 fs1 fc2 sc0 ls9 wsd">S@I*D<span class="blank _7"></span>S@I*D</div><div class="t m0 xa h4 y13 ff3 fs1 fc2 sc0 lsa wse">@I*E@F%?D<span class="blank _9"></span>@I*E@F%?D</div><div class="t m0 xb h4 y12 ff3 fs1 fc2 sc0 lsd ws3">CJ'I"#G=D&'C0'&@FG#?D&</div><div class="t m0 x8 h4 y14 ff3 fs1 fc2 sc0 ls11 wsf">1>%+"%E<span class="blank _a"></span>1>%+"%E<span class="blank"> </span><span class="ls9 wsd">KH//<span class="blank _b"></span>KH//<span class="blank _4"></span><span class="ls12 ws9">'?@'GI'ITU"ID'?@'C/H//A<span class="ls9 wsd">K/<span class="blank _c"></span>K/<span class="blank _4"></span><span class="ls13">VB</span></span></span></span></div><div class="t m0 xc h8 y15 ff6 fs1 fc3 sc0 lsb ws17">Ao calcular limites, pode ocorrer uma indeterminação matemática do tipo 0/0. Nesse caso, para determinar o</div><div class="t m0 xc h8 y16 ff6 fs1 fc3 sc0 lsb ws17">limite, devemos utilizar artifícios matemáticos para simplificar a função. Para funções racionais polinomiais de</div><div class="t m0 xc h8 y17 ff6 fs1 fc3 sc0 lsb ws17">grau 2, é recomendável utilizar a fatoração do polinômio, através da regra prática em que </div><div class="t m0 xd h8 y18 ff6 fs1 fc3 sc0 lsd ws17">. Assim, basta encontrar as raízes do polinômio por Bhaskara. Isso facilita</div><div class="t m0 xc h8 y19 ff6 fs1 fc3 sc0 lsb ws17">bastante os cálculos. Nesse sentido, encontre o limite <span class="blank _d"> </span> e assinale a alternativa que indique qual é o</div><div class="t m0 xc h8 y1a ff6 fs1 fc3 sc0 lsb ws17">resultado obtido para o limite.</div></div><div class="c xe y1b w4 h9"><div class="t m0 x6 h4 y1c ff3 fs1 fc3 sc0 ls13 ws10">%W<span class="blank"> </span><span class="ls12">CW</span></div><div class="t m0 x6 ha y1d ff3 fs1 fc3 sc0 ls12 ws11">XW<span class="blank"> </span>2,W<span class="ff7 fs4 fc4 lsd v1">!</span></div><div class="t m0 x6 h4 y1e ff3 fs1 fc3 sc0 lsd ws12">)W<span class="blank"> </span><span class="ls12">/W</span></div><div class="t m0 x6 h4 y1f ff3 fs1 fc3 sc0 ls12 ws11">?W<span class="blank"> </span><span class="ff6 lsd ws13">-1.</span></div><div class="t m0 x6 h4 y20 ff3 fs1 fc3 sc0 ls14 ws14">@W<span class="blank"> </span><span class="ls12">,W</span></div></div><div class="c x5 y0 w3 h5"><div class="t m0 xc h8 y21 ff6 fs1 fc3 sc0 lsb ws17">Seja a função espaço tempo <span class="blank _e"> </span>, em que t representa o tempo. A<span class="blank _4"></span> velocidade média em um intervalo de</div><div class="t m0 xc h8 y22 ff6 fs1 fc3 sc0 lsb ws17">tempo inicial (<span class="blank _f"> </span> e tempo final <span class="blank _10"> </span> é dada por <span class="blank _11"> </span>. A<span class="blank _4"></span> derivada de uma função aplicada em um</div><div class="t m0 xc h8 ye ff6 fs1 fc3 sc0 lsb ws17">ponto pode ser vista como uma taxa de variação instantânea. Na cinemática, dizemos que a função velocidade </div><div class="t m0 xf h8 y23 ff6 fs1 fc3 sc0 lsb ws17"> é a derivada da função espaço em relação ao tempo <span class="blank _12"> </span>, enquanto que a aceleração </div><div class="t m0 xf h8 y24 ff6 fs1 fc3 sc0 lsb ws17">é a derivada da função velocidade em relação ao tempo<span class="blank _13"> </span>. Com essas informações,</div><div class="t m0 xc h8 y25 ff6 fs1 fc3 sc0 lsb ws17"><span class="fc5 sc0">c</span><span class="fc5 sc0">ons</span><span class="fc5 sc0">ider</span><span class="fc5 sc0">e </span><span class="fc5 sc0">a </span><span class="fc5 sc0">s</span><span class="fc5 sc0">eguint</span><span class="fc5 sc0">e </span><span class="fc5 sc0">s</span><span class="fc5 sc0">it</span><span class="fc5 sc0">uaç</span><span class="fc5 sc0">ão </span><span class="fc5 sc0">pr</span><span class="fc5 sc0">oblem</span><span class="fc5 sc0">a:</span><span class="fc5 sc0"> </span><span class="fc5 sc0">o </span><span class="fc5 sc0">des</span><span class="fc5 sc0">loc</span><span class="fc5 sc0">am</span><span class="fc5 sc0">ent</span><span class="fc5 sc0">o </span><span class="fc5 sc0">(</span><span class="fc5 sc0">em</span><span class="fc5 sc0"> </span><span class="fc5 sc0">m</span><span class="fc5 sc0">et</span><span class="fc5 sc0">r</span><span class="fc5 sc0">os</span><span class="fc5 sc0">)</span><span class="fc5 sc0"> </span><span class="fc5 sc0">de </span><span class="fc5 sc0">um</span><span class="fc5 sc0">a </span><span class="fc5 sc0">par</span><span class="fc5 sc0">t</span><span class="fc5 sc0">í</span><span class="fc5 sc0">c</span><span class="fc5 sc0">ula,</span><span class="fc5 sc0"> </span><span class="fc5 sc0">m</span><span class="fc5 sc0">ov</span><span class="fc5 sc0">endo-</span><span class="fc5 sc0">s</span><span class="fc5 sc0">e </span><span class="fc5 sc0">ao </span><span class="fc5 sc0">longo</span></div><div class="t m0 xc h8 y26 ff6 fs1 fc3 sc0 lsb ws17">de uma reta, é dado pela equação do movimento <span class="blank _14"> </span>, em que t é medido em segundos. </div><div class="t m0 xc h8 y27 ff6 fs1 fc3 sc0 lsd ws17">Neste contexto, analise as afirmativas a seguir:</div><div class="t m0 xc h8 y28 ff6 fs1 fc3 sc0 lsd ws17"> </div><div class="t m0 xc h8 y29 ff6 fs1 fc3 sc0 lsb ws17">I. A<span class="blank _4"></span> velocidade média para o período de tempo que começa quando <span class="blank _15"> </span><span class="ls12"> e <span class="blank _16"> </span><span class="lsd"> é igual a 40,0 m/s. </span></span></div><div class="t m0 xc h8 y2a ff6 fs1 fc3 sc0 lsb ws17">II. A<span class="blank _4"></span> velocidade instantânea quando <span class="blank _17"> </span><span class="ls12"> é igual a <span class="blank _18"> </span>. </span></div><div class="t m0 xc h8 y2b ff6 fs1 fc3 sc0 lsd ws17">III. A<span class="blank _4"></span> aceleração é sempre constante.</div><div class="t m0 xc h8 y2c ff6 fs1 fc3 sc0 lsb ws17">IV<span class="blank _4"></span>. A<span class="blank _4"></span> aceleração quando o tempo é <span class="blank _17"> </span><span class="ls12"> é igual a <span class="blank _19"> </span><span class="lsd">.</span></span></div><div class="t m0 xc h8 y2d ff6 fs1 fc3 sc0 lsd ws17"> </div><div class="t m0 xc h8 y2e ff6 fs1 fc3 sc0 lsd ws17">Assinale a alternativa que apresenta a(s) afirmativa(s) correta(s).</div></div><div class="c xe y0 w4 hb"><div class="t m0 x6 h4 y2f ff3 fs1 fc3 sc0 ls13 ws10">%W<span class="blank"> </span><span class="ff6 lsd ws17">I, II e IV<span class="blank _4"></span>,<span class="blank _1"></span> apenas.</span></div><div class="t m0 x6 h4 y30 ff3 fs1 fc3 sc0 ls12 ws11"><span class="fc5 sc0">XW</span><span class="blank"> </span><span class="lse ws5"><span class="fc5 sc0">9H</span><span class="fc5 sc0">'</span><span class="fc5 sc0">99'</span><span class="fc5 sc0">@</span><span class="fc5 sc0">'</span><span class="fc5 sc0">999H</span><span class="fc5 sc0">'</span><span class="fc5 sc0">%</span><span class="fc5 sc0">*</span><span class="fc5 sc0">@</span><span class="fc5 sc0">#%</span><span class="fc5 sc0">&</span><span class="fc5 sc0">W</span></span></div></div><div class="c x0 y0 w2 h1"><div class="t m0 x10 h4 y31 ff3 fs1 fc1 sc0 lsd ws15">.G"%'("F"=%+<span class="blank"> </span>3%EE@"E%&'@'9#=@E#%)"D#%+"O%YZD<span class="blank"> </span><span class="ls15 ws16"><18<span class="blank"> </span>381<span class="blank"> </span></span><span class="ws3">-@&*D#&%X"+"?%?@'[D)"D%IX"@#=%+</span></div></div><a class="l"><div class="d m1" style="border-style:none;position:absolute;left:38.286290px;bottom:649.670400px;width:98.772410px;height:19.159200px;background-color:rgba(255,255,255,0.000001);"></div></a><a class="l"><div class="d m1" style="border-style:none;position:absolute;left:133.677600px;bottom:662.067500px;width:236.497400px;height:19.159300px;background-color:rgba(255,255,255,0.000001);"></div></a><a class="l"><div class="d m1" style="border-style:none;position:absolute;left:366.793900px;bottom:662.067500px;width:69.302700px;height:19.159300px;background-color:rgba(255,255,255,0.000001);"></div></a><a class="l"><div class="d m1" style="border-style:none;position:absolute;left:432.715500px;bottom:662.067500px;width:87.229300px;height:19.159300px;background-color:rgba(255,255,255,0.000001);"></div></a><a class="l"><div class="d m1" style="border-style:none;position:absolute;left:155.108600px;bottom:214.078600px;width:63.227300px;height:21.413300px;background-color:rgba(255,255,255,0.000001);"></div></a><a class="l"><div class="d m1" style="border-style:none;position:absolute;left:218.335900px;bottom:214.078600px;width:139.706000px;height:21.413300px;background-color:rgba(255,255,255,0.000001);"></div></a><a class="l"><div class="d m1" style="border-style:none;position:absolute;left:358.041900px;bottom:214.078600px;width:34.831900px;height:21.413300px;background-color:rgba(255,255,255,0.000001);"></div></a><a class="l"><div class="d m1" style="border-style:none;position:absolute;left:392.873800px;bottom:214.078600px;width:33.792900px;height:21.413300px;background-color:rgba(255,255,255,0.000001);"></div></a><a class="l"><div class="d m1" style="border-style:none;position:absolute;left:426.666700px;bottom:214.078600px;width:150.333300px;height:21.413300px;background-color:rgba(255,255,255,0.000001);"></div></a></div><div class="pi" data-data="{"ctm":[1.000000,0.000000,0.000000,1.000000,0.000000,0.000000]}"></div></div> <div id="pf2" class="pf w0 h0" data-page-no="2"><div class="pc pc2 w0 h0"><img class="bi x0 y0 w2 hc" alt="" src="https://files.passeidireto.com/d87fcf00-7c50-48e0-823f-440875d852e7/bg2.png"><div class="c x0 y1 w2 h2"><div class="t m0 x1 h3 y2 ff1 fs0 fc0 sc0 ls0 ws17">27/11/22 19<span class="ff2 ls1">:</span><span class="ws0">34<span class="blank _0"></span><span class="ls2 ws17">Atividade 2 (A2)<span class="blank _1"></span>: Revisão da t<span class="blank _1"></span>entativa<span class="blank _4"></span></span></span></div></div><div class="c x0 y3 w2 h2"><div class="t m0 x2 h3 y4 ff1 fs0 fc0 sc0 lsc ws17">Pag<span class="blank _2"> </span>e <span class="blank _2"> </span>2 <span class="blank _2"> </span>of<span class="blank _2"> </span> 4<span class="blank _3"></span><span class="ls3 ws1">https://ambienteacademico.<span class="blank _4"></span>com.br/mod/quiz/review<span class="blank _4"></span>.php<span class="ff2 ls4">?<span class="ff1 ws2">att<span class="blank _1"></span>empt=1462109&cmid=509253</span></span></span></div></div><div class="c x5 y0 w3 h1"><div class="t m0 x6 h6 y32 ff5 fs2 fc2 sc0 ls6 ws6">!"#$%&'(<span class="ff3 fs3 lsd ws7">Q<span class="blank _5"></span>Q</span></div><div class="t m0 x6 h7 y33 ff3 fs2 fc2 sc0 lsd ws9">9#)DEE@=D</div><div class="t m0 x6 h7 y34 ff3 fs2 fc2 sc0 lsd ws9">1="#F"G'/H//'?@</div><div class="t m0 x6 h7 y35 ff3 fs2 fc2 sc0 ls10">CH//</div><div class="t m0 x6 h6 y36 ff5 fs2 fc2 sc0 ls6 ws6">!"#$%&'(<span class="ff3 fs3 lsd ws7">R<span class="blank _5"></span>R</span></div><div class="t m0 x6 h7 y37 ff3 fs2 fc2 sc0 lsf ws8">3DEE@=D</div><div class="t m0 x6 h7 y38 ff3 fs2 fc2 sc0 lsd ws9">1="#F"G'CH//'?@</div><div class="t m0 x6 h7 y39 ff3 fs2 fc2 sc0 ls10">CH//</div><div class="t m0 x6 h6 y3a ff5 fs2 fc2 sc0 ls6 ws6">!"#$%&'(<span class="ff3 fs3 lsd ws7">0<span class="blank _5"></span>0</span></div><div class="t m0 x6 h7 y3b ff3 fs2 fc2 sc0 lsf ws8">3DEE@=D</div><div class="t m0 x6 h7 y3c ff3 fs2 fc2 sc0 lsd ws9">1="#F"G'CH//'?@</div><div class="t m0 x6 h7 y3d ff3 fs2 fc2 sc0 ls10">CH//</div></div><div class="c xe y3e w4 hd"><div class="t m0 x6 h4 y3f ff3 fs1 fc3 sc0 ls12 ws11">XW<span class="blank"> </span><span class="lse ws5">9H'99'@'999H'%*@#%&W</span></div><div class="t m0 x6 ha y40 ff3 fs1 fc3 sc0 lsd ws12">)W<span class="blank"> </span><span class="lse ws5">99'@'9:H'%*@#%&W</span><span class="ff7 fs4 fc4 v1">!</span></div><div class="t m0 x6 h4 y41 ff3 fs1 fc3 sc0 ls12 ws11">?W<span class="blank"> </span><span class="lse ws5">99'@'999H'%*@#%&W</span></div><div class="t m0 x6 h4 y42 ff3 fs1 fc3 sc0 ls14 ws14">@W<span class="blank"> </span><span class="lse ws5">9H'999'@'9:H'%*@#%&W</span></div></div><div class="c x5 y0 w3 h1"><div class="t m0 xc h8 y43 ff6 fs1 fc3 sc0 lsb ws17">Uma função, <span class="blank _1a"> </span>definida por várias sentenças pode ser derivada, respeitando-se a limitação do domínio</div><div class="t m0 xc h8 y44 ff6 fs1 fc3 sc0 lsb ws17">para cada sentença e atendendo a condição para que a derivada de uma função exista num ponto <span class="blank _1b"> </span><span class="ls12">: as</span></div><div class="t m0 xc h8 y45 ff6 fs1 fc3 sc0 lsb ws17">derivadas laterais a direita, <span class="blank _16"> </span>, e a derivada lateral à esquerda, <span class="blank _16"> </span>, existem e são iguais. Segundo</div><div class="t m0 xc h8 y46 ff6 fs1 fc3 sc0 lsb ws17">Fleming (2006) nem toda função contínua num ponto é derivável, no entanto, foi comprovado por teorema que</div><div class="t m0 xc h8 y47 ff6 fs1 fc3 sc0 lsb ws17">toda função derivável num ponto é contínua. Considere a função f(x) a seguir<span class="blank _4"></span>, definida por várias sentenças:</div><div class="t m0 xc h8 y48 ff6 fs1 fc3 sc0 lsd ws17">FLEMING, D. M. Cálculo A. São Paulo: Pearson Prentice Hall, 2006.</div><div class="t m0 xc h8 y49 ff6 fs1 fc3 sc0 lsd ws17"> </div><div class="t m0 xc h8 y4a ff6 fs1 fc3 sc0 lsd ws17">Nesse contexto, analise as afirmativas a seguir e assinale V para a(s) verdadeira(s) e F para a(s) falsa(s). </div><div class="t m0 xc h8 y4b ff6 fs1 fc3 sc0 lsd ws17"> </div><div class="t m0 xc h8 y4c ff6 fs1 fc3 sc0 lsd ws17">I. ( ) A<span class="blank _4"></span> função <span class="blank _1c"> </span> é derivável em <span class="blank _1d"> </span>.</div><div class="t m0 xc h8 y4d ff6 fs1 fc3 sc0 lsd ws17">II. ( ) A<span class="blank _4"></span> derivada de <span class="blank _1c"> </span>existe, pois as derivadas laterais são: <span class="blank _1e"> </span>.</div><div class="t m0 xc h8 y4e ff6 fs1 fc3 sc0 lsd ws17">III. ( ) A<span class="blank _4"></span> função <span class="blank _1c"> </span> não é derivável em <span class="blank _1f"> </span>porque <span class="blank _1c"> </span> não é contínua em <span class="blank _1d"> </span>.</div><div class="t m0 xc h8 y4f ff6 fs1 fc3 sc0 lsd ws17">IV<span class="blank _4"></span>. ( ) A<span class="blank _4"></span> função <span class="blank _20"> </span> é derivável em <span class="blank _1d"> </span>, porque <span class="blank _1c"> </span> é contínua em <span class="blank _1d"> </span><span class="ls12">. </span></div><div class="t m0 xc h8 y50 ff6 fs1 fc3 sc0 lsd ws17"> </div><div class="t m0 xc h8 y51 ff6 fs1 fc3 sc0 lsb ws17">Assinale a alternativa que apresenta a sequência correta.</div></div><div class="c xe y52 w4 h9"><div class="t m0 x6 h4 y53 ff3 fs1 fc3 sc0 ls13 ws10">%W<span class="blank"> </span><span class="ff6 lsb ws17">V<span class="blank _4"></span>, V<span class="blank _21"></span>, V<span class="blank _21"></span>, V<span class="blank _4"></span>.<span class="blank _21"></span></span></div><div class="t m0 x6 h4 y54 ff3 fs1 fc3 sc0 ls12 ws11">XW<span class="blank"> </span><span class="ls5">NH':H'NH':W</span></div><div class="t m0 x6 h4 y55 ff3 fs1 fc3 sc0 lsd ws12">)W<span class="blank"> </span><span class="ls5">NH'NH':H'NW</span></div><div class="t m0 x6 h4 y56 ff3 fs1 fc3 sc0 ls12 ws11">?W<span class="blank"> </span><span class="lsb">:H':H'NH'NW</span></div><div class="t m0 x6 ha y57 ff3 fs1 fc3 sc0 ls14 ws14">@W<span class="blank"> </span><span class="ls5 ws18">NH'NH'NH'NW<span class="blank"> </span><span class="ff7 fs4 fc6 lsd v1">"</span></span></div></div><div class="c x5 y0 w3 h1"><div class="t m0 xc h8 y58 ff6 fs1 fc3 sc0 lsb ws17">Para derivar funções, é necessário saber como derivar as funções elementares, que são tabeladas, e também</div><div class="t m0 xc h8 y59 ff6 fs1 fc3 sc0 lsb ws17">as regras operatórias: soma, produto e quociente. Para derivar a função <span class="blank _22"> </span>, é necessário conhecer</div><div class="t m0 xc h8 y5a ff6 fs1 fc3 sc0 lsb ws17">a derivada da função exponencial, logarítmica e a regra do quociente. Nesse sentido, assinale a alternativa que</div><div class="t m0 xc h8 y5b ff6 fs1 fc3 sc0 lsb ws17">determine o valor de </div></div><div class="c xe y5c w4 he"><div class="t m0 x6 ha y5d ff3 fs1 fc3 sc0 ls13 ws19">%W<span class="blank"> </span><span class="ls16">W<span class="ff7 fs4 fc4 lsd v1">!</span></span></div><div class="t m0 x6 h4 y5e ff3 fs1 fc3 sc0 ls12">XW</div><div class="t m0 x6 h4 y5f ff3 fs1 fc3 sc0 lsd ws1a">)W<span class="blank"> </span><span class="ff6">.</span></div><div class="t m0 x9 h8 y60 ff6 fs1 fc3 sc0 lsd ws17"> </div><div class="t m0 x6 h4 y61 ff3 fs1 fc3 sc0 ls12 ws1b">?W<span class="blank"> </span><span class="lsd">W</span></div><div class="t m0 x6 h4 y62 ff3 fs1 fc3 sc0 ls14">@W</div></div><div class="c x5 y0 w3 h1"><div class="t m0 xc h8 y63 ff6 fs1 fc3 sc0 lsb ws17">As derivadas das funções elementares podem ser obtidas através dos resultados tabelados. Os resultados da</div><div class="t m0 xc h8 y64 ff6 fs1 fc3 sc0 lsb ws17">tabela foram obtidos através do limite por definição da derivada. Assim, é importante conhecer as derivadas das</div><div class="t m0 xc h8 y65 ff6 fs1 fc3 sc0 lsb ws17">funções elementares para derivar funções com maior facilidade. </div><div class="t m0 xc h8 y66 ff6 fs1 fc3 sc0 lsb ws17">A<span class="blank _4"></span> respeito das derivadas de funções elementares, considere <span class="blank _23"> </span> e analise as afirmativas a seguir e</div><div class="t m0 xc h8 y67 ff6 fs1 fc3 sc0 lsd ws17">assinale V para a(s) verdadeira(s) e F para a(s) falsa(s). </div><div class="t m0 xc h8 y68 ff6 fs1 fc3 sc0 lsd ws17">I. ( ) Se <span class="blank _24"> </span><span class="ls12">, então <span class="blank _22"> </span></span>.</div><div class="t m0 xc h8 y69 ff6 fs1 fc3 sc0 lsd ws17">II. ( ) Se <span class="blank _25"> </span><span class="ls12">, então </span></div></div></div><div class="pi" data-data="{"ctm":[1.000000,0.000000,0.000000,1.000000,0.000000,0.000000]}"></div></div> <div id="pf3" class="pf w0 h0" data-page-no="3"><div class="pc pc3 w0 h0"><img fetchpriority="low" loading="lazy" class="bi x0 y0 w2 h1" alt="" src="https://files.passeidireto.com/d87fcf00-7c50-48e0-823f-440875d852e7/bg3.png"><div class="c x0 y1 w2 h2"><div class="t m0 x1 h3 y2 ff1 fs0 fc0 sc0 ls0 ws17">27/11/22 19<span class="ff2 ls1">:</span><span class="ws0">34<span class="blank _0"></span><span class="ls2 ws17">Atividade 2 (A2)<span class="blank _1"></span>: Revisão da t<span class="blank _1"></span>entativa<span class="blank _4"></span></span></span></div></div><div class="c x0 y3 w2 h2"><div class="t m0 x11 h3 y4 ff1 fs0 fc0 sc0 lsc ws17">Pag<span class="blank _2"> </span>e <span class="blank _2"> </span>3 <span class="blank _2"> </span>of<span class="blank _2"> </span> 4<span class="blank _3"></span><span class="ls3 ws1">https://ambienteacademico.<span class="blank _4"></span>com.br/mod/quiz/review<span class="blank _4"></span>.php<span class="ff2 ls4">?<span class="ff1 ws2">att<span class="blank _1"></span>empt=1462109&cmid=509253</span></span></span></div></div><div class="c x5 y0 w3 h1"><div class="t m0 x6 h6 y6a ff5 fs2 fc2 sc0 ls6 ws6">!"#$%&'(<span class="ff3 fs3 lsd ws7">M<span class="blank _5"></span>M</span></div><div class="t m0 x6 h7 y6b ff3 fs2 fc2 sc0 lsf ws8">3DEE@=D</div><div class="t m0 x6 h7 y6c ff3 fs2 fc2 sc0 lsd ws9">1="#F"G'CH//'?@</div><div class="t m0 x6 h7 y6d ff3 fs2 fc2 sc0 ls10">CH//</div><div class="t m0 x6 h6 y6e ff5 fs2 fc2 sc0 ls6 ws6">!"#$%&'(<span class="ff3 fs3 lsd ws7">J<span class="blank _5"></span>J</span></div><div class="t m0 x6 h7 y6f ff3 fs2 fc2 sc0 lsf ws8">3DEE@=D</div><div class="t m0 x6 h7 y70 ff3 fs2 fc2 sc0 lsd ws9">1="#F"G'CH//'?@</div><div class="t m0 x6 h7 y71 ff3 fs2 fc2 sc0 ls10">CH//</div><div class="t m0 x6 h6 y72 ff5 fs2 fc2 sc0 ls6 ws6">!"#$%&'(<span class="ff3 fs3 lsd ws7">\<span class="blank _5"></span>\</span></div><div class="t m0 x6 h7 y73 ff3 fs2 fc2 sc0 lsf ws8">3DEE@=D</div><div class="t m0 x6 h7 y74 ff3 fs2 fc2 sc0 lsd ws9">1="#F"G'CH//'?@</div><div class="t m0 x6 h7 y75 ff3 fs2 fc2 sc0 ls10">CH//</div><div class="t m0 xc h8 y76 ff6 fs1 fc3 sc0 lsd ws17">II. ( ) Se <span class="blank _25"> </span><span class="ls12">, então </span></div><div class="t m0 xc h8 y77 ff6 fs1 fc3 sc0 lsd ws17">III. ( ) Se <span class="blank _26"> </span><span class="ls12">, então <span class="blank _27"> </span></span>.</div><div class="t m0 xc h8 y78 ff6 fs1 fc3 sc0 lsd ws17">IV<span class="blank _21"></span>. ( ) Se <span class="blank _28"> </span><span class="ls12"> então <span class="blank _11"> </span></span>.</div><div class="t m0 xc h8 y79 ff6 fs1 fc3 sc0 lsd ws17"> </div><div class="t m0 xc h8 y7a ff6 fs1 fc3 sc0 lsb ws17">Assinale a alternativa que apresenta a sequência correta.</div></div><div class="c xe y7b w4 h9"><div class="t m0 x6 ha y7c ff3 fs1 fc3 sc0 ls13 ws10">%W<span class="blank"> </span><span class="lsb ws7">:H'NH':H'NW<span class="ff7 fs4 fc4 lsd v1">!</span></span></div><div class="t m0 x6 h4 y7d ff3 fs1 fc3 sc0 ls12 ws11">XW<span class="blank"> </span><span class="ff6 lsb ws17">V<span class="blank _21"></span>, V<span class="blank _4"></span>, V<span class="blank _21"></span>, V<span class="blank _4"></span>.<span class="blank _21"></span></span></div><div class="t m0 x6 h4 y7e ff3 fs1 fc3 sc0 lsd ws12">)W<span class="blank"> </span><span class="lsb">:H':H'NH'NW</span></div><div class="t m0 x6 h4 y7f ff3 fs1 fc3 sc0 ls12 ws11">?W<span class="blank"> </span><span class="ls5">NH'NH'NH'NW</span></div><div class="t m0 x6 h4 y80 ff3 fs1 fc3 sc0 ls14 ws14">@W<span class="blank"> </span><span class="ls5">NH':H'NH':W</span></div></div><div class="c x5 y0 w3 h1"><div class="t m0 xc h8 y81 ff6 fs1 fc3 sc0 lsb ws17">Ao derivar uma função composta, é necessário aplicar a regra da cadeia. V<span class="blank _4"></span>erifique que a função </div><div class="t m0 x12 h8 y82 ff6 fs1 fc3 sc0 lsb ws17"> é uma composição da função seno com a função polinomial elevado a 2 (função potência).</div><div class="t m0 xc h8 y83 ff6 fs1 fc3 sc0 lsb ws17">Assim, para derivar essa função, aplica-se inicialmente a derivada da função potência, em seguida, da função</div><div class="t m0 xc h8 y84 ff6 fs1 fc3 sc0 lsb ws17">seno e, por fim, a função polinomial. </div><div class="t m0 xc h8 y85 ff6 fs1 fc3 sc0 lsb ws17">Nesse sentido, assinale a alternativa que indique qual é o valor de </div></div><div class="c xe y86 w4 hf"><div class="t m0 x6 h4 y87 ff3 fs1 fc3 sc0 ls13 ws1c">%W<span class="blank"> </span><span class="lsd">W</span></div><div class="t m0 x6 h4 y88 ff3 fs1 fc3 sc0 ls12 ws1d">XW<span class="blank"> </span><span class="lsd">W</span></div><div class="t m0 x6 h4 y89 ff3 fs1 fc3 sc0 lsd ws1e">)W<span class="blank"> </span>W</div><div class="t m0 x6 h4 y8a ff3 fs1 fc3 sc0 ls12 ws1f">?W<span class="blank"> </span><span class="ff6 lsd">.</span></div><div class="t m0 x9 h8 y8b ff6 fs1 fc3 sc0 lsd ws17"> </div><div class="t m0 x6 ha y8c ff3 fs1 fc3 sc0 ls14 ws20">@W<span class="blank"> </span><span class="ls16">W<span class="ff7 fs4 fc4 lsd v1">!</span></span></div></div><div class="c x5 y0 w3 h1"><div class="t m0 xc h4 y8d ff3 fs1 fc3 sc0 lsd ws3"><GI%'%>%+"%YZDH'GI'*ED]@&&DE'&D+")"=DG'^G@'D&'%+G#D&'@#)D#=E%&&@I'%'?@E">%?%'?%'&@FG"#=@']G#YZD</div><div class="t m0 xc h4 y8e ff3 fs1 fc3 sc0 lsd ws21">E%)"D#%+'*D+"#DI"%+L'<span class="blank"> </span>W'3$%IDG'%'%=@#YZD'?D'*ED]@&&DE'%'E@&D+GYZD'?D'%+G#D'8%G+DH'^G@'?@E">DG'%</div><div class="t m0 xc h4 y8f ff3 fs1 fc3 sc0 lsd ws3">]G#YZD'GI%'>@O'@']@O'%&'%_EI%Y`@&'?@&)E"=%&'#%&'%&&@EY`@&'9'@'99H'%'&@FG"EW'</div><div class="t m0 xc h4 y90 ff3 fs1 fc3 sc0 lsd">a</div><div class="t m0 xc h4 y91 ff3 fs1 fc3 sc0 lsd ws3">1'*%E="E'?D'%*E@&@#=%?DH'%#%+"&@'%&'%&&@EY`@&'9'@'99a'@'%'E@+%YZD'*ED*D&=%'@#=E@'@+%&W'</div><div class="t m0 xc h4 y92 ff3 fs1 fc3 sc0 lsd">a</div><div class="t m0 xc h4 y93 ff3 fs1 fc3 sc0 lsd ws3">9W'1'?@E">%?%'?%']G#YZD'ba'"FG%+'</div><div class="t m0 xc h4 y94 ff3 fs1 fc3 sc0 ls17 ws22">8D"&L</div><div class="t m0 xc h4 y95 ff3 fs1 fc3 sc0 lse ws23">99W'*%E%'?@E">%E'<span class="blank"> </span><span class="lsd ws3">#@&&@')%&D'b'#@)@&&TE"D'G&%E'%'E@FE%'?D'^GD)"@#=@W'</span></div><div class="t m0 xc h4 y96 ff3 fs1 fc3 sc0 lsd">a</div><div class="t m0 xc h4 y97 ff3 fs1 fc3 sc0 lsd ws3">1'&@FG"EH'%&&"#%+@'%'%+=@E#%=">%')DEE@=%W</div></div><div class="c xe y98 w4 h10"><div class="t m0 x6 h4 y99 ff3 fs1 fc3 sc0 ls13 ws10">%W<span class="blank"> </span><span class="lsd ws3">1&'%&&@EY`@&'9'@'99'&ZD'*ED*D&"Y`@&'>@E?%?@"E%&H'I%&'%'99'#ZD'b'GI%'cG&="_)%=">%')DEE@=%'?%'9W</span></div><div class="t m0 x6 ha y9a ff3 fs1 fc3 sc0 ls12 ws11">XW<span class="blank"> </span><span class="lsd ws3">1'%&&@EYZD'9'b'GI%'*ED*D&"YZD']%+&%H'@'%'99'b'GI%'*ED*D&"YZD'>@E?%?@"E%W<span class="ff7 fs4 fc4 v1">!</span></span></div><div class="t m0 x6 h4 y9b ff3 fs1 fc3 sc0 lsd ws12">)W<span class="blank"> </span>1&'%&&@EY`@&'9'@'99'&ZD'*ED*D&"Y`@&'>@E?%?@"E%&H'@'%'99'b'GI%'cG&="_)%=">%')DEE@=%'?%'9W</div><div class="t m0 x6 h4 y9c ff3 fs1 fc3 sc0 ls12 ws11">?W<span class="blank"> </span><span class="lsd ws3">1'%&&@EYZD'9'b'GI%'*ED*D&"YZD'>@E?%?@"E%H'@'%'%&&@EYZD'99'b'GI%'*ED*D&"YZD']%+&%W</span></div><div class="t m0 x6 h4 y9d ff3 fs1 fc3 sc0 ls14 ws14">@W<span class="blank"> </span><span class="lsd ws3">1&'%&&@EY`@&'9'@'99'&ZD'*ED*D&"Y`@&']%+&%&W</span></div><div class="t m0 x9 h4 y9e ff3 fs1 fc3 sc0 lsd">a</div></div><div class="c x5 y0 w3 h1"><div class="t m0 xc h8 y9f ff6 fs1 fc3 sc0 lsb ws17">O estudante de uma universidade, para ter acesso ao seu armário, precisa de um código com 4 dígitos. O</div><div class="t m0 xc h8 ya0 ff6 fs1 fc3 sc0 lsb ws17">professor disponibilizou o código da seguinte forma: 1º dígito: <span class="blank _29"> </span>, em que <span class="blank _2a"> </span><span class="ls12">, 2º dígito: <span class="blank _29"> </span><span class="lsd">,</span></span></div><div class="t m0 xc h8 ya1 ff6 fs1 fc3 sc0 lsb ws17">em que <span class="blank _2b"> </span><span class="ls12">, 3º dígito: <span class="blank _29"> </span><span class="lsd">, em que <span class="blank _2c"> </span></span>, 4º dígito: <span class="blank _2d"> </span><span class="lsd">, em que <span class="blank _23"> </span> Para</span></span></div><div class="t m0 xc h8 ya2 ff6 fs1 fc3 sc0 lsb ws17">descobrir qual é o código, encontre o valor das derivadas. </div></div></div><div class="pi" data-data="{"ctm":[1.000000,0.000000,0.000000,1.000000,0.000000,0.000000]}"></div></div> <div id="pf4" class="pf w0 h0" data-page-no="4"><div class="pc pc4 w0 h0"><img fetchpriority="low" loading="lazy" class="bi x0 ya3 w2 h11" alt="" src="https://files.passeidireto.com/d87fcf00-7c50-48e0-823f-440875d852e7/bg4.png"><div class="c x0 y1 w2 h2"><div class="t m0 x1 h3 y2 ff1 fs0 fc0 sc0 ls0 ws17">27/11/22 19<span class="ff2 ls1">:</span><span class="ws0">34<span class="blank _0"></span><span class="ls2 ws17">Atividade 2 (A2)<span class="blank _1"></span>: Revisão da t<span class="blank _1"></span>entativa<span class="blank _4"></span></span></span></div></div><div class="c x0 y3 w2 h2"><div class="t m0 x11 h3 y4 ff1 fs0 fc0 sc0 lsc ws17">Pag<span class="blank _2"> </span>e <span class="blank _2"> </span>4 <span class="blank _2"> </span>of<span class="blank _2"> </span> 4<span class="blank _3"></span><span class="ls3 ws1">https://ambienteacademico.<span class="blank _4"></span>com.br/mod/quiz/review<span class="blank _4"></span>.php<span class="ff2 ls4">?<span class="ff1 ws2">att<span class="blank _1"></span>empt=1462109&cmid=509253</span></span></span></div></div><div class="c x5 ya4 w3 h12"><div class="t m0 x6 h6 ya5 ff5 fs2 fc2 sc0 ls6 ws6">!"#$%&'(<span class="ff3 fs3 lsd ws7">K<span class="blank _5"></span>K</span></div><div class="t m0 x6 h7 ya6 ff3 fs2 fc2 sc0 lsf ws8">3DEE@=D</div><div class="t m0 x6 h7 ya7 ff3 fs2 fc2 sc0 lsd ws9">1="#F"G'CH//'?@</div><div class="t m0 x6 h7 ya8 ff3 fs2 fc2 sc0 ls10">CH//</div><div class="t m0 x6 h6 ya9 ff5 fs2 fc2 sc0 ls6 ws6">!"#$%&'(<span class="ff3 fs3 ls18 ws24">C/<span class="blank _2e"></span>C/</span></div><div class="t m0 x6 h7 yaa ff3 fs2 fc2 sc0 lsf ws8">3DEE@=D</div><div class="t m0 x6 h7 yab ff3 fs2 fc2 sc0 lsd ws9">1="#F"G'CH//'?@</div><div class="t m0 x6 h7 yac ff3 fs2 fc2 sc0 ls10">CH//</div><div class="t m0 xc h8 yad ff6 fs1 fc3 sc0 lsb ws17">descobrir qual é o código, encontre o valor das derivadas. </div><div class="t m0 xc h8 yae ff6 fs1 fc3 sc0 lsb ws17">Nesse sentido, assinale a alternativa que indique o código do armário do estudante.</div></div><div class="c xe yaf w4 h9"><div class="t m0 x6 h4 yb0 ff3 fs1 fc3 sc0 ls13 ws10">%W<span class="blank"> </span><span class="ls12">,H'CH'CH'0W</span></div><div class="t m0 x6 ha yb1 ff3 fs1 fc3 sc0 ls12 ws11">XW<span class="blank"> </span><span class="ff6 lsb ws17">2, 1, 1, 4.<span class="ff7 fs4 fc4 lsd v1">!</span></span></div><div class="t m0 x6 h4 yb2 ff3 fs1 fc3 sc0 lsd ws12">)W<span class="blank"> </span><span class="ls12">CH',H'CH'RW</span></div><div class="t m0 x6 h4 yb3 ff3 fs1 fc3 sc0 ls12 ws11">?W<span class="blank"> </span>,H'CH',H'RW</div><div class="t m0 x6 h4 yb4 ff3 fs1 fc3 sc0 ls14 ws14">@W<span class="blank"> </span><span class="ls12">QH'CH'CH'RW</span></div></div><div class="c x5 ya4 w3 h12"><div class="t m0 xc h8 yb5 ff6 fs1 fc3 sc0 lsb ws17">Existem funções que são definidas na forma implícita, ou seja, a variável dependente y não se apresenta</div><div class="t m0 xc h8 yb6 ff6 fs1 fc3 sc0 lsd ws17">explicitamente como <span class="blank _2f"> </span> A<span class="blank _4"></span> forma implícita pode ser representada como <span class="blank _30"> </span>. Nem sempre é possível</div><div class="t m0 xc h8 yb7 ff6 fs1 fc3 sc0 lsb ws17">explicitar a variável y na expressão implícita, portanto, deve-se derivar a função dada na forma implícita. </div><div class="t m0 xc h8 yb8 ff6 fs1 fc3 sc0 lsb ws17">Nesse contexto, dada a função <span class="blank _31"> </span>, definida implicitamente, assinale a alternativa que</div><div class="t m0 xc h8 yb9 ff6 fs1 fc3 sc0 lsb ws17">determine o valor de <span class="blank _20"> </span>.</div></div><div class="c xe yba w4 h13"><div class="t m0 x6 h4 ybb ff3 fs1 fc3 sc0 ls13 ws25">%W<span class="blank"> </span><span class="ff6 lsd v2">.</span></div><div class="t m0 x6 h4 ybc ff3 fs1 fc3 sc0 ls12 ws26">XW<span class="blank"> </span><span class="lsd v2">W</span></div><div class="t m0 x6 h4 ybd ff3 fs1 fc3 sc0 lsd ws27">)W<span class="blank"> </span><span class="v2">W</span></div><div class="t m0 x6 h4 ybe ff3 fs1 fc3 sc0 ls12 ws28">?W<span class="blank"> </span><span class="lsd v2">W</span></div><div class="t m0 x6 ha ybf ff3 fs1 fc3 sc0 ls14 ws29">@W<span class="blank"> </span><span class="ls16 v2">W</span><span class="ff7 fs4 fc4 lsd v1">!</span></div></div><div class="c x5 ya4 w3 h12"><div class="t m0 xc h8 yc0 ff6 fs1 fc3 sc0 lsb ws17">Seja a função espaço tempo <span class="blank _e"> </span>, em que t representa o tempo. A<span class="blank _4"></span> velocidade média em um intervalo de</div><div class="t m0 xc h8 yc1 ff6 fs1 fc3 sc0 lsb ws17">tempo inicial (<span class="blank _f"> </span> e tempo final <span class="blank _10"> </span> é dada por <span class="blank _11"> </span>. A<span class="blank _4"></span> derivada de uma função aplicada a um</div><div class="t m0 xc h8 yac ff6 fs1 fc3 sc0 lsb ws17">ponto pode ser vista como uma taxa de variação instantânea. Na cinemática, dizemos que a função velocidade </div><div class="t m0 xf h8 yc2 ff6 fs1 fc3 sc0 lsb ws17"> é a derivada da função espaço em relação ao tempo <span class="blank _12"> </span>, enquanto que a aceleração </div><div class="t m0 x13 h8 yc3 ff6 fs1 fc3 sc0 lsb ws17">é a derivada da função velocidade em relação ao tempo<span class="blank _13"> </span>. Com essas informações,</div><div class="t m0 xc h8 yc4 ff6 fs1 fc3 sc0 lsb ws17">considere a seguinte situação-problema: uma bola é atirada no ar com uma velocidade inicial de 40 m/s e sua</div><div class="t m0 xc h8 yc5 ff6 fs1 fc3 sc0 lsd ws17">altura (em metros), após t segundos, é dada por </div><div class="t m0 xc h8 yc6 ff6 fs1 fc3 sc0 lsd ws17">Nesse contexto, analise as afirmativas a seguir:</div><div class="t m0 xc h8 yc7 ff6 fs1 fc3 sc0 lsb ws17">I. A<span class="blank _4"></span> velocidade média para o período de tempo que começa quando <span class="blank _32"> </span> e dura <span class="blank _33"> </span> é igual a -25,6 m/s. </div><div class="t m0 xc h8 yc8 ff6 fs1 fc3 sc0 lsb ws17">II. A<span class="blank _4"></span> velocidade instantânea quando <span class="blank _32"> </span><span class="ls12"> é igual a <span class="blank _34"> </span>. </span></div><div class="t m0 xc h8 yc9 ff6 fs1 fc3 sc0 lsb ws17">III. O instante em que a velocidade é nula é <span class="blank _35"> </span>.</div><div class="t m0 xc h8 yca ff6 fs1 fc3 sc0 lsb ws17">IV<span class="blank _21"></span>. A altura <span class="blank _1"></span>máxima atingida pela bola é de 25 metros. </div><div class="t m0 xc h8 ycb ff6 fs1 fc3 sc0 lsd ws17"> </div><div class="t m0 xc h8 ycc ff6 fs1 fc3 sc0 lsd ws17">Está correto o que se afirma em:</div></div><div class="c xe ycd w4 h9"><div class="t m0 x6 h4 yce ff3 fs1 fc3 sc0 ls13 ws10">%W<span class="blank"> </span><span class="lse ws5">9'@'9:H'%*@#%&W</span></div><div class="t m0 x6 h4 ycf ff3 fs1 fc3 sc0 ls12 ws11">XW<span class="blank"> </span><span class="lse ws5">9H'99'@'999H'%*@#%&W</span></div><div class="t m0 x6 ha yd0 ff3 fs1 fc3 sc0 lsd ws12">)W<span class="blank"> </span><span class="lse ws5">9H'999'@'9:H'%*@#%&W</span><span class="ff7 fs4 fc4 v1">!</span></div><div class="t m0 x6 h4 yd1 ff3 fs1 fc3 sc0 ls12 ws11">?W<span class="blank"> </span><span class="lse ws5">99'@'999H'%*@#%&W</span></div><div class="t m0 x6 h4 yd2 ff3 fs1 fc3 sc0 ls14 ws14">@W<span class="blank"> </span><span class="ff6 lsd ws17">I, II e IV<span class="blank _21"></span>, apenas.</span></div></div><div class="c x5 ya4 w3 h12"><div class="t m0 x5 h4 yd3 ff8 fs1 fc7 sc0 lsd ws2a">\u25c0<span class="ff3 ls12 ws9">'3DI*%E="+$@</span></div></div><div class="c x14 yd4 w5 h14"><div class="t m0 x15 h4 yd5 ff3 fs1 fc8 sc0 lsd ws3">[@FG"E'*%E%WWW</div></div><div class="c x5 ya4 w3 h12"><div class="t m0 x16 h4 yd3 ff3 fs1 fc7 sc0 lsb ws7">-@>"&ZD'1=">"?%?@','A1,B'<span class="ff9 ls15">\u25b6\ufe0e</span></div></div><a class="l"><div class="d m1" style="border-style:none;position:absolute;left:46.738910px;bottom:113.633300px;width:74.074890px;height:20.286300px;background-color:rgba(255,255,255,0.000001);"></div></a><a class="l"><div class="d m1" style="border-style:none;position:absolute;left:430.611200px;bottom:113.633300px;width:117.632300px;height:20.286300px;background-color:rgba(255,255,255,0.000001);"></div></a></div><div class="pi" data-data="{"ctm":[1.000000,0.000000,0.000000,1.000000,0.000000,0.000000]}"></div></div>
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