<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/76e44da7-70fb-4c96-8c33-7cd7045c5520/bg1.png" alt="Pré-visualização de imagem de arquivo"><div class="t m0 x1 h2 y1 ff1 fs0 fc0 sc0 lsd ws30">Pr<span class="blank _0"> </span>o<span class="blank _1"> </span>f<span class="blank _2"></span>ª.<span class="blank _2"></span> <span class="blank _3"></span>R<span class="blank _4"></span>e<span class="blank _1"> </span>n<span class="blank _1"> </span>il<span class="blank _4"></span>d<span class="blank _1"> </span>e<span class="blank _1"> </span>s<span class="blank _0"> </span> <span class="blank _5"></span>M<span class="blank _0"> </span>a<span class="blank _0"> </span>t<span class="blank _4"></span>o<span class="blank _1"> </span>s<span class="blank _1"> </span> <span class="blank _6"></span>d<span class="blank _1"> </span>e<span class="blank _1"> </span> <span class="blank _5"></span>F<span class="blank _1"> </span>r<span class="blank _0"> </span>e<span class="blank _1"> </span>it<span class="blank _4"></span>a<span class="blank _0"> </span> </div><div class="t m0 x1 h2 y2 ff1 fs0 fc0 sc0 lsd ws30">Dis<span class="blank _1"> </span>c<span class="blank _1"> </span>ipli<span class="blank _4"></span>n<span class="blank _1"> </span>a<span class="blank _0"> </span>:<span class="blank _1"> </span> <span class="ff2">C<span class="blank _1"> </span>ÁL<span class="blank _0"> </span>CU<span class="blank _4"></span>L<span class="blank _1"> </span>O<span class="blank _1"> </span> DI<span class="blank _0"> </span>FE<span class="blank _1"> </span>R<span class="blank _1"> </span>E<span class="blank _1"> </span>N<span class="blank _4"></span>CI<span class="blank _0"> </span>A<span class="blank _1"> </span>L<span class="blank _1"> </span> E I<span class="blank _1"> </span>N<span class="blank _4"></span>T<span class="blank _1"> </span>E<span class="blank _1"> </span>GR<span class="blank _1"> </span>A<span class="blank _1"> </span>L<span class="blank _1"> </span> I<span class="blank _1"> </span>I<span class="blank _7"> </span>I<span class="blank _0"> </span> </span></div><div class="t m0 x1 h2 y3 ff1 fs0 fc0 sc0 ls0 ws0">201<span class="lsd ws30">8<span class="blank _1"> </span>/1º<span class="blank _1"> </span> </span></div><div class="t m0 x1 h3 y4 ff3 fs1 fc0 sc0 lsd ws30"> </div><div class="t m0 x2 h2 y5 ff1 fs0 fc0 sc0 lsd ws30">L<span class="blank _1"> </span>ista 2<span class="blank _1"> </span> de<span class="blank _1"> </span> Ex<span class="blank _1"> </span>e<span class="blank _0"> </span>r<span class="blank _1"> </span>c<span class="blank _1"> </span>ícios<span class="blank _0"> </span> (<span class="blank _4"></span>E<span class="blank _1"> </span>q<span class="blank _1"> </span>u<span class="blank _1"> </span>a<span class="blank _1"> </span>ç<span class="blank _0"> </span>õe<span class="blank _1"> </span>s<span class="blank _1"> </span> Dif<span class="blank _2"></span>e<span class="blank _1"> </span>r<span class="blank _1"> </span>e<span class="blank _1"> </span>n<span class="blank _1"> </span>c<span class="blank _0"> </span>i<span class="blank _4"></span>a<span class="blank _0"> </span>i<span class="blank _4"></span>s<span class="blank _8"> </span> de<span class="blank _1"> </span> 1ª Or<span class="blank _1"> </span>d<span class="blank _1"> </span>e<span class="blank _0"> </span>m) </div><div class="t m0 x3 h4 y6 ff1 fs2 fc0 sc0 lsd ws30">E<span class="blank _2"></span>x<span class="blank _4"></span>ercí<span class="blank _3"></span>ci<span class="blank _3"></span>o<span class="blank _1"> </span>s </div><div class="t m0 x3 h5 y7 ff4 fs1 fc0 sc0 lsd ws30"> </div><div class="t m0 x3 h5 y8 ff4 fs1 fc0 sc0 lsd ws30">R<span class="blank _4"></span>esol<span class="blank _6"></span>v<span class="blank _4"></span>er<span class="blank _4"></span> cada u<span class="blank _3"></span>m<span class="blank _3"></span>a<span class="blank _2"></span> <span class="blank _9"> </span>das<span class="blank _2"></span> seg<span class="blank _3"></span>u<span class="blank _3"></span>i<span class="blank _a"></span>n<span class="blank _3"></span>te<span class="blank _1"> </span>s <span class="blank _b"> </span>equ<span class="blank _3"></span>ações<span class="blank _4"></span> <span class="blank _0"> </span>di<span class="blank _3"></span>f<span class="blank _a"></span>ere<span class="blank _2"></span>n<span class="blank _3"></span>c<span class="blank _0"> </span>i<span class="blank _a"></span>a<span class="blank _0"> </span>is<span class="blank _4"></span>.<span class="blank _0"> </span> </div><div class="t m0 x3 h5 y9 ff4 fs1 fc0 sc0 lsd ws30"> </div><div class="c x4 ya w2 h6"><div class="t m0 x5 h5 yb ff4 fs1 fc0 sc0 lsd ws30">1. </div></div><div class="c x6 yc w3 h7"><div class="t m1 x7 h8 yd ff4 fs3 fc0 sc0 lsd">0</div><div class="t m1 x8 h9 ye ff4 fs4 fc0 sc0 ls1">2<span class="ff5 fs3 lsd ws1 v1"><span class="blank _c"></span> <span class="ff6 lse ws2">dx<span class="blank _d"></span><span class="lsd ws3">y<span class="blank _e"></span>x<span class="blank _2"></span>dy</span></span></span></div></div><div class="c x4 ya w2 h6"><div class="t m0 x9 h5 yb ff4 fs1 fc0 sc0 lsd ws30"> </div></div><div class="c xa ya w2 h6"><div class="t m0 x5 h5 yf ff4 fs1 fc0 sc0 lsd ws30">9. </div></div><div class="c xb y10 w4 ha"><div class="t m2 xc hb y11 ff4 fs5 fc0 sc0 lsd">0</div><div class="t m2 x3 hc y12 ff4 fs6 fc0 sc0 ls2">2<span class="ff5 fs5 lsd ws4 v2"><span class="blank _f"></span> <span class="ff6 v3">y</span></span></div><div class="t m2 xd hd y13 ff6 fs5 fc0 sc0 lsd">e</div><div class="t m2 x5 hd y14 ff6 fs5 fc0 sc0 lsf">dx</div><div class="t m2 x5 he y13 ff6 fs5 fc0 sc0 lsf ws5">dy <span class="fs6 lsd v4">x</span></div></div><div class="c xa ya w2 h6"><div class="t m0 xe h5 yf ff4 fs1 fc0 sc0 lsd ws30"> </div></div><div class="c x4 y15 w2 hf"><div class="t m0 x5 h5 y16 ff4 fs1 fc0 sc0 lsd ws30">2. </div></div><div class="c x6 y17 w5 h10"><div class="t m3 x9 h11 yd ff4 fs3 fc0 sc0 lsd ws6">0<span class="blank _10"></span>3 <span class="fs4 ws7 v4">2<span class="blank _11"></span>3 <span class="ff5 fs3 ws8 v1"><span class="blank _12"></span> <span class="ff6 ws3">x<span class="blank _2"></span>y<span class="blank _4"></span>dy<span class="blank _13"></span><span class="ls10 ws9">dx<span class="blank _d"></span><span class="lsd ws3">y<span class="blank _11"></span>x</span></span></span></span></span></div></div><div class="c x4 y15 w2 hf"><div class="t m0 xf h5 y16 ff4 fs1 fc0 sc0 lsd ws30"> </div></div><div class="c xa y15 w2 hf"><div class="t m0 x5 h3 y18 ff4 fs1 fc0 sc0 lsd wsa">10.<span class="ff3 ws30"> </span></div></div><div class="c x10 y19 w6 h12"><div class="t m4 x11 h13 y1a ff4 fs7 fc0 sc0 lsd">0</div><div class="t m4 x12 h14 y1b ff4 fs8 fc0 sc0 ls3">3<span class="ff5 fs7 lsd wsb v1"><span class="blank _14"></span> <span class="ff6 fs8 wsc v4">x<span class="blank _c"></span>x <span class="fs7 v1">e</span></span></span></div><div class="t m4 x13 h15 y1c ff6 fs7 fc0 sc0 ls11">dx</div><div class="t m4 x13 h15 y1d ff6 fs7 fc0 sc0 ls11">dy</div><div class="t m4 x14 h15 y1e ff6 fs7 fc0 sc0 lsd">e</div></div><div class="c xa y15 w2 hf"><div class="t m0 x15 h5 y18 ff4 fs1 fc0 sc0 lsd ws30"> </div></div><div class="c x4 y1f w2 h16"><div class="t m0 x5 h5 y20 ff4 fs1 fc0 sc0 lsd ws30">3. </div></div><div class="c x6 y21 w7 h17"><div class="t m5 x16 h18 y22 ff4 fs9 fc0 sc0 lsd wsd">0<span class="blank _15"></span><span class="ff5 wse"><span class="blank _16"></span> <span class="ff6 wsf">ydx<span class="blank _17"></span>xdy</span></span></div></div><div class="c x4 y1f w2 h16"><div class="t m0 x17 h5 y20 ff4 fs1 fc0 sc0 lsd ws30"> </div></div><div class="c xa y1f w2 h16"><div class="t m0 x5 h3 y23 ff4 fs1 fc0 sc0 lsd wsa">11.<span class="ff3 ws30"> </span></div></div><div class="c x10 y24 w8 h19"><div class="t m6 x18 h1a y25 ff4 fsa fc0 sc0 lsd ws10">0<span class="blank _18"></span>3<span class="blank _19"></span>1 <span class="fsb ls4 v4">2</span><span class="ff5 ws11"><span class="blank _16"></span><span class="blank _1a"></span> <span class="ff6 ls12 ws12">dy<span class="blank _1b"></span>dx<span class="blank _1c"></span><span class="lsd ws13">y<span class="blank _1d"></span>x</span></span></span></div></div><div class="c xa y1f w2 h16"><div class="t m0 x19 h5 y23 ff4 fs1 fc0 sc0 lsd ws30"> </div></div><div class="c x4 y26 w2 h1b"><div class="t m0 x5 h3 y27 ff4 fs1 fc0 sc0 lsd wsa">4.<span class="ff3 ws30"> </span></div></div><div class="c x6 y28 w9 h1c"><div class="t m7 x1a h18 y22 ff4 fs9 fc0 sc0 lsd ws14">0<span class="blank _1e"></span>c os<span class="blank _1f"></span>s e<span class="blank _2"></span>c<span class="blank _20"> </span><span class="ff5 ws15"><span class="blank _1e"></span> <span class="ff6 wsf">e<span class="blank _2"></span>c<span class="blank _2"></span>y<span class="blank _2"></span>dx<span class="blank _21"></span>xd<span class="blank _2"></span>y</span></span></div></div><div class="c x4 y26 w2 h1b"><div class="t m0 x19 h5 y27 ff4 fs1 fc0 sc0 lsd ws30"> </div></div><div class="c xa y26 w2 h1b"><div class="t m0 x5 h5 y29 ff4 fs1 fc0 sc0 lsd ws30">12. (1 + x</div><div class="t m0 x1b h1d y2a ff4 fsc fc0 sc0 ls5">2<span class="fs1 lsd ws30 v1">)<span class="blank _2"></span>dy<span class="blank _3"></span> <span class="blank _22"> </span><span class="ff7 ws16">–</span> dx<span class="blank _3"></span> <span class="blank _0"> </span>= 0 <span class="blank _23"> </span> </span></div></div><div class="c x4 y2b w2 h1e"><div class="t m0 x5 h5 y2c ff4 fs1 fc0 sc0 lsd ws30">5. </div></div><div class="c x6 y2d wa h1f"><div class="t m8 x1c h20 y2e ff6 fsd fc0 sc0 lsd">y</div><div class="t m8 x1d h20 y2f ff6 fsd fc0 sc0 lsd">x</div><div class="t m8 x5 h20 y30 ff6 fsd fc0 sc0 ls13">dx</div><div class="t m8 x5 h21 y31 ff6 fsd fc0 sc0 ls13 ws17">dy <span class="ff4 fse lsd v4">2</span></div><div class="t m8 x0 h22 y32 ff5 fsd fc0 sc0 lsd"></div></div><div class="c x4 y2b w2 h1e"><div class="t m0 x16 h5 y2c ff4 fs1 fc0 sc0 lsd ws30"> </div></div><div class="c xa y2b wb h1e"><div class="t m0 x5 h3 y33 ff4 fs1 fc0 sc0 lsd wsa">13.<span class="ff3 ls6 ws30"> </span><span class="ws30">(<span class="blank _2"></span>1 + x</span></div><div class="t m0 x1b h1d y34 ff4 fsc fc0 sc0 ls5">2<span class="fs1 lsd ws30 v1">)<span class="blank _2"></span>dy<span class="blank _3"></span> <span class="blank _22"> </span>+ x<span class="blank _3"></span>dx<span class="blank _3"></span> <span class="blank _22"> </span>= 0 </span></div></div><div class="c x4 y35 w2 h23"><div class="t m0 x5 h5 y2c ff4 fs1 fc0 sc0 lsd ws30">6. </div></div><div class="c x6 y36 wc h24"><div class="t m9 x1e h25 y37 ff4 fsf fc0 sc0 lsd">3</div><div class="t m9 x3 h26 y38 ff4 fs10 fc0 sc0 ls7">2<span class="ff5 fsf lsd v1"></span></div><div class="t m9 x0 h27 y39 ff5 fsf fc0 sc0 ls8"><span class="ff6 lsd v3">x</span></div><div class="t m9 x8 h28 y3a ff6 fsf fc0 sc0 ls14">xy</div><div class="t m9 x5 h28 y3b ff6 fsf fc0 sc0 ls15">dx</div><div class="t m9 x5 h28 y3c ff6 fsf fc0 sc0 ls15">dy</div></div><div class="c x4 y35 w2 h23"><div class="t m0 xe h5 y2c ff4 fs1 fc0 sc0 lsd ws30"> </div></div><div class="c xa y35 w2 h23"><div class="t m0 x5 h5 y2c ff4 fs1 fc0 sc0 lsd ws30">14. </div></div><div class="c x10 y3d wd h29"><div class="t ma xf h14 y3e ff4 fs8 fc0 sc0 lsd ws18">2<span class="blank _24"></span>2<span class="blank _25"></span>2<span class="blank _26"></span>2</div><div class="t ma x1f h13 y3f ff4 fs7 fc0 sc0 ls9">1<span class="ff6 lsd ws19">y<span class="blank _24"></span>x<span class="blank _26"></span>y<span class="blank _26"></span>x</span></div><div class="t ma x5 h15 y40 ff6 fs7 fc0 sc0 ls16">dx</div><div class="t ma x5 h15 y41 ff6 fs7 fc0 sc0 ls16 ws1a">dy <span class="ff5 lsd ws1b v5"><span class="blank _27"></span><span class="blank _28"></span><span class="blank _29"></span></span></div></div><div class="c xa y35 w2 h23"><div class="t m0 x20 h5 y2c ff4 fs1 fc0 sc0 lsd ws30"> </div></div><div class="c x4 y42 w2 h2a"><div class="t m0 x5 h5 y43 ff4 fs1 fc0 sc0 lsd ws30">7. </div></div><div class="c x6 y44 we h29"><div class="t mb xe h13 y1a ff4 fs7 fc0 sc0 lsd ws1c">0<span class="blank _2a"></span>c os</div><div class="t mb x1c h14 y45 ff4 fs8 fc0 sc0 lsa">3<span class="ff5 fs7 lsd ws1d v1"><span class="blank _2b"></span> <span class="ff6 ws19">x<span class="blank _2c"></span>y</span></span></div><div class="t mb x5 h15 y40 ff6 fs7 fc0 sc0 ls11">dx</div><div class="t mb x5 h15 y41 ff6 fs7 fc0 sc0 ls11">dy</div></div><div class="c x4 y42 w2 h2a"><div class="t m0 x21 h5 y43 ff4 fs1 fc0 sc0 lsd ws30"> </div></div><div class="c xa y42 w2 h2a"><div class="t m0 x5 h5 y43 ff4 fs1 fc0 sc0 lsd ws30">15. </div></div><div class="c x10 y44 wf h29"><div class="t mc x6 h2b y3e ff6 fs8 fc0 sc0 lsd ws1e">y<span class="blank _2d"></span>x</div><div class="t mc x1f h15 y1a ff6 fs7 fc0 sc0 lsd">e</div><div class="t mc x5 h15 y40 ff6 fs7 fc0 sc0 ls17">dx</div><div class="t mc x5 h15 y41 ff6 fs7 fc0 sc0 ls17 ws1f">dy <span class="ff5 fs8 lsd v6"></span></div><div class="t mc x0 h2c y3f ff5 fs7 fc0 sc0 lsd"></div></div><div class="c xa y42 w2 h2a"><div class="t m0 x22 h5 y43 ff4 fs1 fc0 sc0 lsd ws30"> </div></div><div class="c x4 y46 w2 h2d"><div class="t m0 x5 h3 y47 ff4 fs1 fc0 sc0 lsd wsa">8.<span class="ff3 ws30"> </span></div></div><div class="c x6 y48 w10 h2e"><div class="t md x23 h2f y49 ff5 fs11 fc0 sc0 lsd ws20"> </div><div class="t me x24 h11 yd ff4 fs3 fc0 sc0 lsd ws21">0<span class="blank _2e"></span>s e<span class="blank _4"></span>c<span class="blank _2f"></span>1<span class="blank _30"></span>3<span class="blank _31"> </span><span class="fs4 lsb v4">2</span><span class="ff5 ws22"><span class="blank _32"></span><span class="blank _33"></span> <span class="ff6 ls18 ws23">dy<span class="blank _34"></span><span class="lsd ws3">y<span class="blank _35"></span>e<span class="blank _13"></span><span class="ls18 ws23">dx<span class="blank _36"></span><span class="lsd ws24">tgy<span class="blank _37"></span>e <span class="fs4 ws25 v4">x<span class="blank _38"></span>x</span></span></span></span></span></span></div></div><div class="c x4 y46 w2 h2d"><div class="t m0 x25 h5 y47 ff4 fs1 fc0 sc0 lsd ws30"> </div></div><div class="c xa y46 w2 h2d"><div class="t m0 x5 h3 y47 ff4 fs1 fc0 sc0 lsd wsa">16.<span class="ff3 ws30"> </span></div></div><div class="c x10 y48 w11 h2e"><div class="t mf x14 h2f y49 ff5 fs11 fc0 sc0 lsd ws26"><span class="blank _39"> </span> <span class="blank _3a"> </span></div><div class="t m10 x26 h8 yd ff4 fs3 fc0 sc0 lsd">0</div><div class="t m10 x18 h9 ye ff4 fs4 fc0 sc0 lsd ws27">2<span class="blank _3b"></span>2 <span class="ff5 fs3 ws28 v1"><span class="blank _3c"></span><span class="blank _3d"></span><span class="blank _3e"></span> <span class="ff6 ls18 ws23">dy<span class="blank _29"></span><span class="lsd ws3">y<span class="blank _24"></span>x<span class="blank _3f"></span>y<span class="blank _28"></span><span class="ls18 ws23">dx<span class="blank _29"></span><span class="lsd ws3">x<span class="blank _11"></span>y<span class="blank _3f"></span>x</span></span></span></span></span></div></div><div class="c xa y46 w2 h2d"><div class="t m0 x27 h5 y47 ff4 fs1 fc0 sc0 lsd ws30"> </div></div><div class="t m0 x3 h5 y4a ff4 fs1 fc0 sc0 lsd ws30"> </div><div class="t m0 x3 h5 y4b ff4 fs1 fc0 sc0 lsd ws30">D<span class="blank _4"></span>et<span class="blank _2"></span>er<span class="blank _4"></span>m<span class="blank _3"></span>i<span class="blank _a"></span>nar<span class="blank _4"></span> <span class="blank _40"> </span>a s<span class="blank _2"></span>ol<span class="blank _a"></span>u<span class="blank _3"></span>ção <span class="blank _9"> </span>par<span class="blank _2"></span>t<span class="blank _4"></span>i<span class="blank _a"></span>cu<span class="blank _3"></span>l<span class="blank _3"></span>ar<span class="blank _4"></span> <span class="blank _b"> </span>de cada <span class="blank _0"> </span>u<span class="blank _3"></span>m<span class="blank _a"></span>a <span class="blank _22"> </span>das<span class="blank _4"></span> <span class="blank _8"> </span>seg<span class="blank _a"></span>u<span class="blank _4"></span>i<span class="blank _a"></span>n<span class="blank _3"></span>te<span class="blank _2"></span>s <span class="blank _b"> </span>e<span class="blank _2"></span>qu<span class="blank _3"></span>ações<span class="blank _4"></span> <span class="blank _22"> </span>di<span class="blank _a"></span>f<span class="blank _3"></span>er<span class="blank _4"></span>en<span class="blank _3"></span>c<span class="blank _0"> </span>i<span class="blank _3"></span>a<span class="blank _0"> </span>l<span class="blank _a"></span> <span class="blank _b"> </span>su<span class="blank _3"></span>j<span class="blank _4"></span>ei<span class="blank _a"></span>t<span class="blank _0"> </span>as às<span class="blank _4"></span> <span class="blank _8"> </span>con<span class="blank _3"></span>di<span class="blank _a"></span>ções<span class="blank _2"></span> <span class="blank _9"> </span>dadas<span class="blank _4"></span>. <span class="blank _1"> </span> </div><div class="t m0 x3 h5 y4c ff4 fs1 fc0 sc0 lsd ws30"> </div><div class="c x4 y4d w12 h30"><div class="t m0 x5 h5 yf ff4 fs1 fc0 sc0 lsd ws30">17. </div></div><div class="c x1e y4e w13 h31"><div class="t m11 x6 h14 y3e ff4 fs8 fc0 sc0 lsd ws29">4<span class="blank _24"></span>2 <span class="ff6 fs7 ws19 v1">y<span class="blank _24"></span>x</span></div><div class="t m11 x5 h15 y4f ff6 fs7 fc0 sc0 ls11">dx</div><div class="t m11 x5 h15 y50 ff6 fs7 fc0 sc0 ls11 ws2a">dy <span class="ff5 lsd v5"></span></div></div><div class="c x4 y4d w12 h30"><div class="t m0 x28 h5 yf ff4 fs1 fc0 sc0 lsd ws30">;<span class="blank _4"></span> y<span class="blank _4"></span> <span class="blank _0"> </span>(1)<span class="blank _4"></span> <span class="blank _8"> </span>= 1 </div></div><div class="c x29 y4d w14 h30"><div class="t m0 x5 h5 yf ff4 fs1 fc0 sc0 lsd ws30">19. </div></div><div class="c xb y51 w15 h32"><div class="t m12 x16 h33 y52 ff6 fs12 fc0 sc0 lsd ws2b">y<span class="blank _41"></span>x<span class="blank _42"></span>y</div><div class="t m12 x6 h33 y53 ff6 fs12 fc0 sc0 lsd">x</div><div class="t m12 x5 h33 y54 ff6 fs12 fc0 sc0 ls19">dx</div><div class="t m12 x5 h33 y53 ff6 fs12 fc0 sc0 ls19">dy</div><div class="t m12 x1e h34 y55 ff4 fs13 fc0 sc0 lsd">2</div><div class="t m12 x2a h35 y53 ff4 fs12 fc0 sc0 lsd">2</div><div class="t m12 x8 h36 y52 ff5 fs12 fc0 sc0 lsd"></div><div class="t m12 x0 h36 y56 ff5 fs12 fc0 sc0 lsd"></div></div><div class="c x29 y4d w14 h30"><div class="t m0 x9 h5 yf ff4 fs1 fc0 sc0 lsd ws30">;<span class="blank _4"></span> y<span class="blank _4"></span> <span class="blank _0"> </span>(0)<span class="blank _4"></span> <span class="blank _8"> </span>= 4 </div></div><div class="c x4 y57 w12 hf"><div class="t m0 x5 h5 y58 ff4 fs1 fc0 sc0 lsd ws30">18. </div></div><div class="c x1e y59 w16 h37"><div class="t m13 x2b h13 y1a ff4 fs7 fc0 sc0 lsd ws2c">0<span class="blank _33"></span>2 <span class="ff5 ws1b"><span class="blank _43"></span></span></div><div class="t m13 x2c h38 y3e ff5 fs8 fc0 sc0 lsd"></div><div class="t m13 x1d h15 y5a ff6 fs7 fc0 sc0 ls1a">dx</div><div class="t m13 x1d h15 y5b ff6 fs7 fc0 sc0 ls1a">dy</div><div class="t m13 x5 h39 y1a ff6 fs7 fc0 sc0 ls1b ws2d">ye <span class="fs8 lsd v4">x</span></div></div><div class="c x4 y57 w12 hf"><div class="t m0 x21 h5 y58 ff4 fs1 fc0 sc0 lsd ws30">;<span class="blank _4"></span> y<span class="blank _4"></span> <span class="blank _0"> </span>(0)<span class="blank _4"></span> <span class="blank _8"> </span>= 2 </div></div><div class="c x29 y57 w14 hf"><div class="t m0 x5 h5 y5c ff4 fs1 fc0 sc0 lsd ws30">20. </div></div><div class="c x2d y5d w17 h3a"><div class="t m14 x2e h3b y5e ff6 fs14 fc0 sc0 lsd ws2e">yd<span class="blank _4"></span>x<span class="blank _2a"></span><span class="ls1c ws2f">dy<span class="blank _d"></span><span class="lsc">x<span class="ff5 lsd"></span></span></span></div><div class="t m14 x2f h3c y5f ff4 fs15 fc0 sc0 lsd">2</div></div><div class="c x29 y57 w14 hf"><div class="t m0 x17 h5 y5c ff4 fs1 fc0 sc0 lsd ws30">;<span class="blank _4"></span> y<span class="blank _4"></span> <span class="blank _0"> </span>(1)<span class="blank _4"></span> <span class="blank _8"> </span>= 1 </div></div><div class="t m0 x3 h4 y60 ff1 fs2 fc0 sc0 lsd ws30"> </div></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 x30 y61 w18 h3d" alt src="https://files.passeidireto.com/76e44da7-70fb-4c96-8c33-7cd7045c5520/bg2.png" alt="Pré-visualização de imagem de arquivo"><div class="t m0 x3 h4 y62 ff1 fs2 fc0 sc0 lsd ws30">Re<span class="blank _4"></span>s<span class="blank _4"></span>po<span class="blank _4"></span>sta<span class="blank _2"></span>s </div><div class="c x4 y63 w19 h3e"><div class="t m0 x5 h3f y64 ff8 fs16 fc0 sc0 lsd ws30">1<span class="blank _4"></span>)<span class="blank _1"> </span> <span class="ff9">y.l<span class="blank _1"> </span>n<span class="blank _1"> </span>x<span class="blank _1"> </span> +<span class="blank _4"></span> 1<span class="blank _3"></span> =<span class="blank _4"></span> Cy<span class="ff8"> </span></span></div></div><div class="c x31 y63 w1a h3e"><div class="t m0 x5 h40 y64 ff8 fs16 fc0 sc0 ls23 ws31">8) <span class="ff9 lsd ws30"> <span class="blank _2"></span>y =<span class="blank _4"></span> <span class="blank _1"> </span>arc<span class="blank _4"></span> <span class="blank _0"> </span>tg[<span class="blank _1"> </span>(<span class="blank _1"> </span>e<span class="blank _0"> </span><span class="fs17 ls1d v4">x</span> <span class="blank _4"></span><span class="ffa ws32">–<span class="ff9 ws30"> <span class="blank _4"></span>1<span class="blank _4"></span>)<span class="blank _0"> </span>³.k]<span class="blank _1"> </span><span class="ff8"> </span></span></span></span></div></div><div class="c x32 y65 w1b h41"><div class="t m0 x5 h3f y66 ff8 fs16 fc0 sc0 ls23 ws33">15) <span class="ff9 lsd ws30"> <span class="blank _1"> </span>y<span class="blank _1"> </span> =<span class="blank _4"></span> </span></div></div><div class="c x33 y67 w1c h42"><div class="t m15 x4 h43 y68 ff5 fs18 fc0 sc0 lsd ws34"> </div><div class="t m16 x34 h44 y69 ff5 fs19 fc0 sc0 lsd ws35"> </div><div class="t m17 x35 h45 y6a ff6 fs1a fc0 sc0 lsd ws36">C<span class="blank _44"></span>e <span class="fs1b ls1e v4">x</span><span class="ff5 ws37"><span class="blank _2a"></span> <span class="ff4 ws38">/<span class="blank _45"></span>1<span class="blank _46"></span><span class="ls24">ln</span></span></span></div></div><div class="c x32 y65 w1b h41"><div class="t m0 x36 h46 y66 ff8 fs16 fc0 sc0 lsd ws30"> </div></div><div class="c x4 y6b w1b h47"><div class="t m0 x5 h3f y6c ff8 fs16 fc0 sc0 lsd ws30">2<span class="blank _4"></span>)<span class="blank _1"> </span> <span class="ff9">y <span class="blank _4"></span>= <span class="blank _1"> </span>k.</span></div></div><div class="c x11 y6d w1d h48"><div class="t m18 x34 h49 y6e ff4 fs1c fc0 sc0 lsd">3</div><div class="t m18 x12 h4a y6f ff4 fs1d fc0 sc0 lsd">x</div><div class="t m18 x14 h4b y70 ff4 fs1e fc0 sc0 lsd">e</div></div><div class="c x4 y6b w1b h47"><div class="t m0 x35 h46 y6c ff8 fs16 fc0 sc0 lsd ws30"> </div></div><div class="c x31 y6b w1a h47"><div class="t m0 x5 h3f y71 ff8 fs16 fc0 sc0 ls23 ws31">9) <span class="ff9 lsd ws30"> <span class="blank _2"></span>y =<span class="blank _4"></span> </span></div></div><div class="c x37 y72 w1e h4c"><div class="t m19 x14 h4a y73 ff4 fs1d fc0 sc0 ls1f">3<span class="ls20 v7">x</span><span class="fs1e lsd ws39 v8">k<span class="blank _25"></span>e<span class="blank _47"></span>3 <span class="ff5"></span></span></div></div><div class="c x31 y6b w1a h47"><div class="t m0 xe h46 y71 ff8 fs16 fc0 sc0 lsd ws30"> </div></div><div class="c x32 y6b w1b h47"><div class="t m0 x5 h3f y74 ff8 fs16 fc0 sc0 ls23 ws33">16) <span class="ff9 lsd ws30"> <span class="blank _1"> </span>y<span class="blank _1"> </span> =<span class="blank _4"></span> </span></div></div><div class="c x33 y75 w1f h4d"><div class="t m1a x0 h4e y76 ff5 fs1f fc0 sc0 lsd ws3a"><span class="blank _48"> </span> <span class="blank _49"> </span></div><div class="t m1b x17 h4f y77 ff4 fs20 fc0 sc0 lsd ws3b">2<span class="blank _4a"></span>2 <span class="fs21 ws3c v1">1<span class="blank _4b"></span>/ <span class="ff6 ws3d">x<span class="blank _c"></span>x<span class="blank _3f"></span>k <span class="ff5 ws3e"><span class="blank _1a"></span><span class="blank _f"></span></span></span></span></div></div><div class="c x32 y6b w1b h47"><div class="t m0 x38 h46 y74 ff8 fs16 fc0 sc0 lsd ws30"> </div></div><div class="c x4 y78 w19 h50"><div class="t m0 x5 h3f y20 ff8 fs16 fc0 sc0 lsd ws30">3<span class="blank _4"></span>)<span class="blank _1"> </span> <span class="ff9">y <span class="blank _4"></span>= <span class="blank _1"> </span>C/x<span class="blank _0"> </span><span class="ff8"> </span></span></div></div><div class="c x31 y78 w1a h50"><div class="t m0 x5 h40 y20 ff8 fs16 fc0 sc0 ls23 ws33">10) <span class="ff9 lsd ws30"> <span class="blank _1"> </span>2y <span class="blank _4"></span>+ <span class="blank _1"> </span>e<span class="blank _1"> </span><span class="fs17 ls21 v4">-<span class="ls25">2x</span></span></span></div><div class="t m0 x39 h3f y20 ff9 fs16 fc0 sc0 lsd ws30"> <span class="blank _2"></span>=<span class="blank _4"></span> C<span class="ff8"> </span></div></div><div class="c x32 y78 w20 h50"><div class="t m0 x5 h3f y20 ff8 fs16 fc0 sc0 ls23 ws33">17) <span class="ff9 lsd ws30"> <span class="blank _1"> </span>(<span class="blank _0"> </span>2<span class="blank _4"></span> <span class="blank _2"></span><span class="ffa ws32">–<span class="blank _4"></span><span class="ff9 ws30"> <span class="blank _0"> </span>x<span class="blank _1"> </span>³)<span class="blank _1"> </span>.<span class="blank _1"> </span>y³ =<span class="blank _4"></span> 1<span class="blank _4"></span><span class="ff8"> </span></span></span></span></div></div><div class="c x4 y79 w19 h51"><div class="t m0 x5 h3f y7a ff8 fs16 fc0 sc0 ls23 ws3f">4) <span class="ff9 lsd ws30"> <span class="blank _2"></span>y =<span class="blank _4"></span> <span class="blank _1"> </span>arc<span class="blank _4"></span> <span class="blank _0"> </span>cos(s<span class="blank _1"> </span>e<span class="blank _1"> </span>n<span class="blank _1"> </span>x<span class="blank _1"> </span> <span class="ffa ws32">–<span class="blank _4"></span><span class="ff9 ws30"> <span class="ls26 ws40">c) </span><span class="ff8"> </span></span></span></span></div></div><div class="c x31 y7b w1a h52"><div class="t m0 x5 h3f y7c ff8 fs16 fc0 sc0 ls23 ws33">11) <span class="ff9 lsd ws30"> <span class="blank _1"> </span>y<span class="blank _1"> </span> =<span class="blank _4"></span> <span class="blank _2"></span>se<span class="blank _1"> </span>n</span></div></div><div class="c x3a y7d w21 h53"><div class="t m1c x5 h54 y7e ff5 fs22 fc0 sc0 lsd ws41"> </div><div class="t m1d x14 h55 y7f ff5 fs23 fc0 sc0 lsd ws42"> </div><div class="t m1e x3b h56 y80 ff6 fs24 fc0 sc0 lsd ws43">C<span class="blank _4c"></span>x <span class="ff5 ws44"><span class="blank _11"></span><span class="ff4 ws45">6<span class="blank _4d"></span>/</span></span></div><div class="t m1e x2c h57 y81 ff4 fs25 fc0 sc0 lsd">2</div></div><div class="c x31 y7b w1a h52"><div class="t m0 x3c h46 y7c ff8 fs16 fc0 sc0 lsd ws30"> </div></div><div class="c x32 y7b w1b h52"><div class="t m0 x5 h3f y82 ff8 fs16 fc0 sc0 ls23 ws33">18) <span class="ff9 lsd ws30"> <span class="blank _1"> </span>y<span class="blank _1"> </span> =<span class="blank _4"></span> </span></div></div><div class="c x33 y83 w22 h4c"><div class="t m1f x3b h4a y84 ff4 fs1d fc0 sc0 lsd">x</div><div class="t m1f x2e h4b y85 ff4 fs1e fc0 sc0 lsd ws46">e<span class="blank _4e"></span>4<span class="blank _42"></span>8 <span class="ff5 ws47"><span class="blank _44"></span></span></div></div><div class="c x32 y7b w1b h52"><div class="t m0 x3d h46 y82 ff8 fs16 fc0 sc0 lsd ws30"> </div></div><div class="c x4 y86 w19 h50"><div class="t m0 x5 h3f y18 ff8 fs16 fc0 sc0 ls23 ws3f">5) <span class="ff9 lsd ws30"> <span class="blank _2"></span>3<span class="blank _4"></span>y² <span class="blank _0"> </span>=<span class="blank _4"></span> 2<span class="blank _4"></span>x<span class="blank _1"> </span>³ +<span class="blank _4"></span> <span class="blank _1"> </span>C<span class="blank _1"> </span><span class="ff8"> </span></span></div></div><div class="c x31 y86 w1a h50"><div class="t m0 x5 h3f y18 ff8 fs16 fc0 sc0 ls23 ws33">12) <span class="ff9 lsd ws30"> <span class="blank _1"> </span>y<span class="blank _1"> </span> =<span class="blank _4"></span> <span class="blank _2"></span>ar<span class="blank _4"></span>c <span class="blank _1"> </span>tg x +<span class="blank _4"></span> C<span class="ff8"> </span></span></div></div><div class="c x32 y86 w20 h50"><div class="t m0 x5 h3f y18 ff8 fs16 fc0 sc0 ls23 ws33">19) <span class="ff9 lsd ws30"> <span class="blank _1"> </span>y<span class="blank _1"> </span>² =<span class="blank _4"></span> <span class="blank _4"></span>2.l<span class="blank _1"> </span>n(<span class="blank _1"> </span>x<span class="blank _0"> </span>² <span class="blank _4"></span>+ <span class="blank _4"></span>1<span class="blank _4"></span>)<span class="blank _0"> </span> <span class="blank _4"></span>+ <span class="blank _4"></span>1<span class="blank _4"></span>6<span class="ff8"> </span></span></div></div><div class="c x4 y87 w1b h58"><div class="t m0 x5 h3f y88 ff8 fs16 fc0 sc0 ls23 ws3f">6) <span class="ff9 lsd ws30"> <span class="blank _2"></span>y =<span class="blank _4"></span> <span class="blank _1"> </span>k<span class="blank _1"> </span>. </span></div></div><div class="c x3e y89 w23 h4c"><div class="t m20 x1c h59 y8a ff4 fs1e fc0 sc0 lsd ws48">3<span class="blank _25"></span>x <span class="fs26 ls22 v4">2</span><span class="ff5"></span></div></div><div class="c x4 y87 w1b h58"><div class="t m0 x17 h46 y88 ff8 fs16 fc0 sc0 lsd ws30"> </div></div><div class="c x31 y87 w1a h58"><div class="t m0 x5 h3f y8b ff8 fs16 fc0 sc0 ls23 ws33">13) <span class="ff9 lsd ws30"> <span class="blank _1"> </span>y<span class="blank _1"> </span> =<span class="blank _4"></span> <span class="blank _2"></span>-<span class="blank _1"> </span> </span></div></div><div class="c x3f y8c w24 h5a"><div class="t m21 x2b h5b y8d ff6 fs27 fc0 sc0 lsd ws49">C<span class="blank _4c"></span>x <span class="ff5 ws4a"><span class="blank _42"></span> <span class="ff4 ws4b">1<span class="blank _4f"></span><span class="ls27 ws4c">ln<span class="blank _4b"></span><span class="lsd ws4d">.<span class="blank _50"></span>5<span class="blank _50"></span>,<span class="blank _50"></span>0 <span class="fs20 v4">2</span></span></span></span></span></div></div><div class="c x31 y87 w1a h58"><div class="t m0 x40 h46 y8b ff8 fs16 fc0 sc0 lsd ws30"> </div></div><div class="c x32 y87 w1b h58"><div class="t m0 x5 h3f y43 ff8 fs16 fc0 sc0 ls23 ws33">20) <span class="ff9 lsd ws30"> <span class="blank _1"> </span>y<span class="blank _1"> </span> =<span class="blank _4"></span> </span></div></div><div class="c x33 y8e w25 h5c"><div class="t m22 x41 h5d y8f ff4 fs28 fc0 sc0 lsd">x</div><div class="t m22 x42 h5d y90 ff4 fs28 fc0 sc0 lsd ws4e">1<span class="blank _51"></span>x</div><div class="t m22 x14 h5e y91 ff4 fs29 fc0 sc0 lsd">e</div><div class="t m22 x41 h5f y90 ff5 fs28 fc0 sc0 lsd"></div></div><div class="c x32 y87 w1b h58"><div class="t m0 x35 h46 y43 ff8 fs16 fc0 sc0 lsd ws30"> </div></div><div class="c x4 y92 w19 h60"><div class="t m0 x5 h3f y93 ff8 fs16 fc0 sc0 ls23 ws3f">7) <span class="ff9 lsd ws30"> <span class="blank _2"></span>1<span class="blank _4"></span> <span class="blank _0"> </span>=<span class="blank _4"></span> <span class="blank _0"> </span>2<span class="blank _4"></span>y².<span class="blank _1"> </span>(<span class="blank _1"> </span>se<span class="blank _0"> </span>nx<span class="blank _1"> </span> +<span class="blank _4"></span> <span class="blank _2"></span>C)<span class="blank _0"> </span><span class="ff8"> </span></span></div></div><div class="c x31 y94 w1a h60"><div class="t m0 x5 h3f y95 ff8 fs16 fc0 sc0 ls23 ws33">14) <span class="ff9 lsd ws30"> <span class="blank _1"> </span>arc<span class="blank _4"></span> tg <span class="blank _1"> </span>y =<span class="blank _4"></span> x +<span class="blank _4"></span> </span></div></div><div class="c x29 y96 w26 h61"><div class="t m23 x14 h54 y97 ff5 fs22 fc0 sc0 lsd ws4f"> </div><div class="t m24 x43 h56 y80 ff4 fs24 fc0 sc0 lsd ws45">3<span class="blank _4d"></span>/</div><div class="t m24 x34 h57 y98 ff4 fs25 fc0 sc0 lsd">3</div><div class="t m24 x44 h62 y99 ff6 fs24 fc0 sc0 lsd">x</div></div><div class="c x31 y94 w1a h60"><div class="t m0 x3c h3f y95 ff9 fs16 fc0 sc0 ls28 ws50">+C <span class="ff8 lsd ws30"> </span></div></div><div class="c x32 y92 w20 h60"><div class="t m0 x5 h46 y93 ff8 fs16 fc0 sc0 lsd ws30"> </div></div><div class="t m0 x3 h3f y9a ff9 fs16 fc0 sc0 lsd ws30"> </div><div class="t m0 x3 h3f y9b ff9 fs16 fc0 sc0 lsd ws30"> </div><div class="t m0 x3 h3f y9c ff9 fs16 fc0 sc0 lsd ws30"> </div></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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