<div id="pf1" class="pf w0 h0" data-page-no="1"><div class="pc pc1 w0 h0"><img class="bi x0 y0 w0 h0" alt="" src="https://files.passeidireto.com/f0e8cf6e-768a-4214-aca5-97b054e3c056/bg1.png"><div class="t m0 x1 h1 y1 ff1 fs0 fc0 sc0 ls0 ws0">Mecânica <span class="_0 blank"></span>dos fluidos </div><div class="t m0 x2 h2 y2 ff1 fs1 fc0 sc0 ls0 ws0">AUL<span class="_1 blank"></span>A 07: EQU<span class="_0 blank"></span>AÇÕE<span class="_1 blank"></span>S DE NA<span class="_0 blank"></span>VIE<span class="_2 blank"> </span>R-ST<span class="_1 blank"></span>OKES </div><div class="t m0 x3 h1 y3 ff2 fs0 fc1 sc0 ls0 ws0">ME<span class="_1 blank"></span>CÂNICA DOS FL<span class="_0 blank"></span>UIDOS </div><div class="t m0 x3 h3 y4 ff1 fs2 fc2 sc0 ls0 ws0">Aula 07: <span class="_0 blank"></span>Equações <span class="_1 blank"></span>de Na<span class="_1 blank"></span>vier-St<span class="_1 blank"></span>ok<span class="_0 blank"></span>es </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 x0 y0 w0 h0" alt="" src="https://files.passeidireto.com/f0e8cf6e-768a-4214-aca5-97b054e3c056/bg2.png"><div class="t m0 x1 h1 y1 ff1 fs0 fc0 sc0 ls0 ws0">Mecânica <span class="_0 blank"></span>dos fluidos </div><div class="t m0 x2 h2 y2 ff1 fs1 fc0 sc0 ls0 ws0">AUL<span class="_1 blank"></span>A 07: EQU<span class="_0 blank"></span>AÇÕE<span class="_1 blank"></span>S DE NA<span class="_0 blank"></span>VIE<span class="_2 blank"> </span>R-ST<span class="_1 blank"></span>OKES </div><div class="t m0 x1 h4 y5 ff1 fs3 fc3 sc0 ls0 ws0">T<span class="_3 blank"></span>emas/<span class="_0 blank"></span>o<span class="_2 blank"> </span>bjetivos d<span class="_1 blank"></span>est<span class="_1 blank"></span>a aula </div><div class="t m0 x4 h5 y6 ff1 fs4 fc3 sc0 ls0 ws0">PRÓXIMOS <span class="_0 blank"></span> </div><div class="t m0 x5 h6 y7 ff1 fs5 fc3 sc0 ls0 ws0">PASSOS </div><div class="t m0 x6 h5 y8 ff1 fs4 fc3 sc0 ls0 ws0">DEDUÇÃO <span class="_1 blank"></span>DAS EQ<span class="_1 blank"></span>UAÇÕES </div><div class="t m0 x7 h5 y9 ff1 fs4 fc3 sc0 ls0 ws0">DE NAVI<span class="_1 blank"></span>ER-STOKES<span class="_2 blank"> </span> </div><div class="t m0 x8 h1 ya ff1 fs0 fc4 sc0 ls0 ws0">1 </div><div class="t m0 x9 h5 yb ff1 fs4 fc3 sc0 ls0 ws0">CONTINUIDA<span class="_1 blank"></span>DE </div><div class="t m0 xa h1 yc ff1 fs0 fc4 sc0 ls0 ws0">2 </div><div class="t m0 xb h5 y8 ff1 fs4 fc3 sc0 ls0 ws0">QUANTIDA<span class="_1 blank"></span>DE DE </div><div class="t m0 xc h5 y9 ff1 fs4 fc3 sc0 ls0 ws0">MOVIMENTO <span class="_0 blank"></span>LINEAR </div><div class="t m0 xd h1 ya ff1 fs0 fc4 sc0 ls0 ws0">3 </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 w0 h0" alt="" src="https://files.passeidireto.com/f0e8cf6e-768a-4214-aca5-97b054e3c056/bg3.png"><div class="t m0 x1 h1 y1 ff1 fs0 fc0 sc0 ls0 ws0">Mecânica <span class="_0 blank"></span>dos fluidos </div><div class="t m0 x2 h2 y2 ff1 fs1 fc0 sc0 ls0 ws0">AUL<span class="_1 blank"></span>A 07: EQU<span class="_0 blank"></span>AÇÕE<span class="_1 blank"></span>S DE NA<span class="_0 blank"></span>VIE<span class="_2 blank"> </span>R-ST<span class="_1 blank"></span>OKES </div><div class="t m0 xe h7 yd ff3 fs0 fc3 sc0 ls1">\u2022<span class="ff4 ls0 ws0">A hidr<span class="_0 blank"></span>odinâmica é gov<span class="_1 blank"></span>ernada p<span class="_1 blank"></span>elas equaç<span class="_1 blank"></span>ões de Navier-Stok<span class="_0 blank"></span>es; </span></div><div class="t m0 xe h7 ye ff3 fs0 fc3 sc0 ls1">\u2022<span class="ff4 ls0 ws0">Descr<span class="_1 blank"></span>ev<span class="_1 blank"></span>em c<span class="_0 blank"></span>omo as velocidades e as pr<span class="_0 blank"></span>opriedades de um fluido em<span class="_1 blank"></span> um c<span class="_0 blank"></span>ampo de escoamen<span class="_0 blank"></span>to </span></div><div class="t m0 xf h8 yf ff4 fs6 fc3 sc0 ls0 ws0">variam<span class="_0 blank"></span> no espaç<span class="_0 blank"></span>o <span class="_2 blank"> </span>e te<span class="_1 blank"></span>mpo; </div><div class="t m0 xe h7 y10 ff3 fs0 fc3 sc0 ls1">\u2022<span class="ff4 ls0 ws0">Utiliz<span class="_1 blank"></span>adas par<span class="_1 blank"></span>a estimar p<span class="_0 blank"></span>erfis<span class="_2 blank"> </span> de velocidad<span class="_1 blank"></span>es; </span></div><div class="t m0 xe h7 y11 ff3 fs0 fc3 sc0 ls1">\u2022<span class="ff4 ls0 ws0">Ant<span class="_1 blank"></span>es só es<span class="_1 blank"></span>tudá<span class="_0 blank"></span>vamos quando os esc<span class="_1 blank"></span>oamen<span class="_1 blank"></span>tos pu<span class="_1 blank"></span>dessem ser admitidos como <span class="_0 blank"></span>unidimensionais. </span></div><div class="t m0 x1 h4 y5 ff1 fs3 fc3 sc0 ls0 ws0">Eq<span class="_1 blank"></span>uações de Navier - Stok<span class="_0 blank"></span>es </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 y0 w0 h0" alt="" src="https://files.passeidireto.com/f0e8cf6e-768a-4214-aca5-97b054e3c056/bg4.png"><div class="t m0 x1 h1 y1 ff1 fs0 fc0 sc0 ls0 ws0">Mecânica <span class="_0 blank"></span>dos fluidos </div><div class="t m0 x2 h2 y2 ff1 fs1 fc0 sc0 ls0 ws0">AUL<span class="_1 blank"></span>A 07: EQU<span class="_0 blank"></span>AÇÕE<span class="_1 blank"></span>S DE NA<span class="_0 blank"></span>VIE<span class="_2 blank"> </span>R-ST<span class="_1 blank"></span>OKES </div><div class="t m0 x1 h4 y5 ff1 fs3 fc3 sc0 ls0 ws0">Dedução das equações de <span class="_2 blank"> </span>Navier - Stok<span class="_0 blank"></span>es </div><div class="t m0 x10 h9 y12 ff1 fs6 fc3 sc0 ls0 ws0">E<span class="_1 blank"></span>quação <span class="_0 blank"></span>de con<span class="_1 blank"></span>tinuidade: </div><div class="t m0 x10 h7 y13 ff3 fs0 fc3 sc0 ls2">\u2022<span class="ff4 ls0 ws0">P<span class="_1 blank"></span>ar<span class="_1 blank"></span>a o <span class="_1 blank"></span>volume <span class="_1 blank"></span>de con<span class="_0 blank"></span>trole mostr<span class="_0 blank"></span>ado na Figur<span class="_1 blank"></span>a em<span class="_1 blank"></span> um <span class="_1 blank"></span>sistem<span class="_1 blank"></span>a de c<span class="_1 blank"></span>oorden<span class="_1 blank"></span>adas cart<span class="_1 blank"></span>esianas, o </span></div><div class="t m0 x11 h7 y14 ff4 fs0 fc3 sc0 ls0 ws0">ve<span class="_1 blank"></span>tor <span class="_1 blank"></span>posição é <span class="ff5 ws1">(<span class="_1 blank"></span>x,y<span class="_4 blank"></span>,z)<span class="ff4 ws0"> e o vet<span class="_0 blank"></span>or velocidade é <span class="ff5 ws1">(u,v<span class="_4 blank"></span>,w)<span class="ff4 ws0">. </span></span></span></span></div><div class="t m0 x10 ha y15 ff4 fs0 fc3 sc0 ls0 ws0"> <span class="_5 blank"> </span><span class="fc2 v1">z </span></div><div class="t m0 x12 h7 y16 ff4 fs0 fc2 sc0 ls0 ws0">y </div><div class="t m0 x13 h7 y17 ff4 fs0 fc2 sc0 ls0 ws0">x </div><div class="t m0 x14 h7 y18 ff1 fs0 fc5 sc0 ls3 ws2">dy<span class="ff4 fc2 ls0 ws0"> </span></div><div class="t m0 x15 h7 y19 ff1 fs0 fc5 sc0 ls3 ws2">dz<span class="ff4 fc2 ls0 ws0"> </span></div><div class="t m0 x16 h7 y1a ff1 fs0 fc5 sc0 ls3 ws2">dx<span class="ff4 fc2 ls0 ws0"> </span></div></div><div class="pi" data-data='{"ctm":[1.000000,0.000000,0.000000,1.000000,0.000000,0.000000]}'></div></div> <div id="pf5" class="pf w0 h0" data-page-no="5"><div class="pc pc5 w0 h0"><img fetchpriority="low" loading="lazy" class="bi x0 y0 w0 h0" alt="" src="https://files.passeidireto.com/f0e8cf6e-768a-4214-aca5-97b054e3c056/bg5.png"><div class="t m0 x1 h1 y1 ff1 fs0 fc0 sc0 ls0 ws0">Mecânica <span class="_0 blank"></span>dos fluidos </div><div class="t m0 x2 h2 y2 ff1 fs1 fc0 sc0 ls0 ws0">AUL<span class="_1 blank"></span>A 07: EQU<span class="_0 blank"></span>AÇÕE<span class="_1 blank"></span>S DE NA<span class="_0 blank"></span>VIE<span class="_2 blank"> </span>R-ST<span class="_1 blank"></span>OKES </div><div class="t m0 x10 h9 y12 ff1 fs6 fc3 sc0 ls0 ws0">E<span class="_1 blank"></span>quação <span class="_0 blank"></span>de con<span class="_1 blank"></span>tinuidade: </div><div class="t m0 x10 h7 y13 ff3 fs0 fc3 sc0 ls2">\u2022<span class="ff4 ls0 ws0">Aplicand<span class="_1 blank"></span>o a c<span class="_1 blank"></span>onservaç<span class="_1 blank"></span>ão de massa no v<span class="_0 blank"></span>ol<span class="_2 blank"> </span>ume de c<span class="_0 blank"></span>ontrole: </span></div><div class="t m0 x11 h7 y1b ff4 fs0 fc3 sc0 ls0 ws0"> </div><div class="t m0 x11 h8 y1c ff4 fs6 fc3 sc0 ls0 ws0"> </div><div class="t m0 x11 h7 y1d ff4 fs0 fc3 sc0 ls0 ws0"> </div><div class="t m0 x10 h7 y1e ff3 fs0 fc3 sc0 ls2">\u2022<span class="ff4 ls0 ws0">Onde <span class="_1 blank"></span>a massa do volum<span class="_1 blank"></span>e de c<span class="_1 blank"></span>ontr<span class="_0 blank"></span>ole é: </span></div><div class="t m0 x10 h8 y1f ff3 fs6 fc3 sc0 ls4">\u2022<span class="ff4 ls0 ws0">Dividindo p<span class="_1 blank"></span>or <span class="ff5 ws3">dx<span class="_0 blank"></span>dydz<span class="ff4 ws0"> e aplicand<span class="_1 blank"></span>o o limite <span class="_1 blank"></span>quand<span class="_1 blank"></span>o tendo a 0<span class="_1 blank"></span>: </span></span></span></div><div class="t m0 x1 h4 y5 ff1 fs3 fc3 sc0 ls0 ws0">Dedução das equações de <span class="_2 blank"> </span>Navier - Stok<span class="_0 blank"></span>es </div></div><div class="pi" data-data='{"ctm":[1.000000,0.000000,0.000000,1.000000,0.000000,0.000000]}'></div></div> <div id="pf6" class="pf w0 h0" data-page-no="6"><div class="pc pc6 w0 h0"><img fetchpriority="low" loading="lazy" class="bi x0 y0 w0 h0" alt="" src="https://files.passeidireto.com/f0e8cf6e-768a-4214-aca5-97b054e3c056/bg6.png"><div class="t m0 x1 h1 y1 ff1 fs0 fc0 sc0 ls0 ws0">Mecânica <span class="_0 blank"></span>dos fluidos </div><div class="t m0 x2 h2 y2 ff1 fs1 fc0 sc0 ls0 ws0">AUL<span class="_1 blank"></span>A 07: EQU<span class="_0 blank"></span>AÇÕE<span class="_1 blank"></span>S DE NA<span class="_0 blank"></span>VIE<span class="_2 blank"> </span>R-ST<span class="_1 blank"></span>OKES </div><div class="t m0 x1 h4 y5 ff1 fs3 fc3 sc0 ls0 ws0">Dedução das equações de <span class="_2 blank"> </span>Navier - Stok<span class="_0 blank"></span>es </div><div class="t m0 x10 h1 y20 ff1 fs0 fc3 sc0 ls0 ws0">E<span class="_1 blank"></span>quação <span class="_0 blank"></span><span class="ls3 ws2">de<span class="ls0 ws0"> continuidade: </span></span></div><div class="t m0 x10 h7 y21 ff3 fs0 fc3 sc0 ls2">\u2022<span class="ff4 ls0 ws0">P<span class="_1 blank"></span>ar<span class="_1 blank"></span>a <span class="ls5 ws4">um</span> flu<span class="_1 blank"></span>ido inc<span class="_1 blank"></span>ompr<span class="_1 blank"></span>essível e <span class="ls6 ws5">em</span> r<span class="_0 blank"></span>egime estacionário<span class="_0 blank"></span>, a equação <span class="ls5 ws4">de</span> con<span class="_0 blank"></span>tinuidade <span class="_2 blank"> </span>é: </span></div></div><div class="pi" data-data='{"ctm":[1.000000,0.000000,0.000000,1.000000,0.000000,0.000000]}'></div></div> <div id="pf7" class="pf w0 h0" data-page-no="7"><div class="pc pc7 w0 h0"><img fetchpriority="low" loading="lazy" class="bi x0 y0 w0 h0" alt="" src="https://files.passeidireto.com/f0e8cf6e-768a-4214-aca5-97b054e3c056/bg7.png"><div class="t m0 x1 h1 y1 ff1 fs0 fc0 sc0 ls0 ws0">Mecânica <span class="_0 blank"></span>dos fluidos </div><div class="t m0 x2 h2 y2 ff1 fs1 fc0 sc0 ls0 ws0">AUL<span class="_1 blank"></span>A 07: EQU<span class="_0 blank"></span>AÇÕE<span class="_1 blank"></span>S DE NA<span class="_0 blank"></span>VIE<span class="_2 blank"> </span>R-ST<span class="_1 blank"></span>OKES </div><div class="t m0 x1 h4 y5 ff1 fs3 fc3 sc0 ls0 ws0">Dedução das equações de <span class="_2 blank"> </span>Navier - Stok<span class="_0 blank"></span>es </div><div class="t m0 x10 h1 y22 ff1 fs0 fc3 sc0 ls0 ws0">Princípio <span class="ls3 ws2">da</span> <span class="_1 blank"></span>quantidade <span class="_0 blank"></span><span class="ls3 ws2">de<span class="ls0 ws0"> moviment<span class="_1 blank"></span>o <span class="_0 blank"></span>para <span class="_0 blank"></span>o volume <span class="_1 blank"></span><span class="ls3 ws2">de<span class="ls0 ws0"> c<span class="_1 blank"></span>ontrole <span class="_0 blank"></span>diferencial </span></span></span></span></div><div class="t m0 x10 h7 y23 ff3 fs0 fc3 sc0 ls2">\u2022<span class="ff4 ls0 ws0">O <span class="_6 blank"> </span>princípio <span class="_6 blank"> </span><span class="ls5 ws4">de</span> <span class="_7 blank"> </span>quantidade <span class="_6 blank"> </span><span class="ls7 ws6">de</span> <span class="_6 blank"> </span>movimen<span class="_1 blank"></span>to <span class="_6 blank"> </span><span class="ls8 ws7">já</span> <span class="_6 blank"> </span>foi <span class="_6 blank"> </span>estu<span class="_1 blank"></span>dado <span class="_6 blank"> </span><span class="ls5 ws4">no</span> <span class="_6 blank"> </span>caso <span class="_6 blank"> </span>macrosc<span class="_0 blank"></span>ópico. <span class="_6 blank"> </span>F<span class="_1 blank"></span>oi <span class="_6 blank"> </span>obtido <span class="_6 blank"> </span>pela </span></div><div class="t m0 x11 h7 y24 ff4 fs0 fc3 sc0 ls0 ws0">segunda lei <span class="ls5 ws4">de</span> Newt<span class="_1 blank"></span>on como:<span class="_1 blank"></span> </div><div class="t m0 x11 h7 y25 ff4 fs0 fc3 sc0 ls0 ws0"> </div><div class="t m0 x10 h7 y26 ff3 fs0 fc3 sc0 ls2">\u2022<span class="ff4 ls0 ws0">Lembr<span class="_0 blank"></span>ando: </span></div><div class="t m0 x11 h7 y27 ff4 fs0 fc3 sc0 ls0 ws0"> </div><div class="t m0 x10 h7 y28 ff4 fs0 fc3 sc0 ls0 ws0"> </div></div><div class="pi" data-data='{"ctm":[1.000000,0.000000,0.000000,1.000000,0.000000,0.000000]}'></div></div> <div id="pf8" class="pf w0 h0" data-page-no="8"><div class="pc pc8 w0 h0"><img fetchpriority="low" loading="lazy" class="bi x0 y0 w0 h0" alt="" src="https://files.passeidireto.com/f0e8cf6e-768a-4214-aca5-97b054e3c056/bg8.png"><div class="t m0 x1 h1 y1 ff1 fs0 fc0 sc0 ls0 ws0">Mecânica <span class="_0 blank"></span>dos fluidos </div><div class="t m0 x2 h2 y2 ff1 fs1 fc0 sc0 ls0 ws0">AUL<span class="_1 blank"></span>A 07: EQU<span class="_0 blank"></span>AÇÕE<span class="_1 blank"></span>S DE NA<span class="_0 blank"></span>VIE<span class="_2 blank"> </span>R-ST<span class="_1 blank"></span>OKES </div><div class="t m0 x1 h4 y5 ff1 fs3 fc3 sc0 ls0 ws0">Dedução das equações de <span class="_2 blank"> </span>Navier - Stok<span class="_0 blank"></span>es </div><div class="t m0 x10 h8 y12 ff3 fs6 fc3 sc0 ls4">\u2022<span class="ff4 ls0 ws0">P<span class="_1 blank"></span>ar<span class="_1 blank"></span>a o <span class="_0 blank"></span>volume <span class="ls9 ws8">de</span> con<span class="_0 blank"></span>trole dif<span class="_0 blank"></span>eren<span class="_1 blank"></span>cial: </span></div><div class="t m0 x11 h7 y13 ff4 fs0 fc3 sc0 ls0 ws0"> </div><div class="t m0 x10 h7 y1b ff4 fs0 fc3 sc0 ls0 ws0"> </div><div class="t m0 x10 h8 y1c ff3 fs6 fc3 sc0 ls4">\u2022<span class="ff4 ls0 ws0">Multiplic<span class="_0 blank"></span>ando por: </span></div><div class="t m0 x11 h7 y1d ff4 fs0 fc3 sc0 ls0 ws0"> </div><div class="t m0 x10 h7 y1e ff3 fs0 fc3 sc0 ls2">\u2022<span class="ff4 ls0 ws0">E aplic<span class="_0 blank"></span>ando <span class="_2 blank"> </span>limite tem<span class="_1 blank"></span>os: </span></div><div class="t m0 x11 h8 y1f ff4 fs6 fc3 sc0 ls0 ws0"> </div></div><div class="pi" data-data='{"ctm":[1.000000,0.000000,0.000000,1.000000,0.000000,0.000000]}'></div></div> <div id="pf9" class="pf w0 h0" data-page-no="9"><div class="pc pc9 w0 h0"><img fetchpriority="low" loading="lazy" class="bi x0 y0 w0 h0" alt="" src="https://files.passeidireto.com/f0e8cf6e-768a-4214-aca5-97b054e3c056/bg9.png"><div class="t m0 x1 h1 y1 ff1 fs0 fc0 sc0 ls0 ws0">Mecânica <span class="_0 blank"></span>dos fluidos </div><div class="t m0 x2 h2 y2 ff1 fs1 fc0 sc0 ls0 ws0">AUL<span class="_1 blank"></span>A 07: EQU<span class="_0 blank"></span>AÇÕE<span class="_1 blank"></span>S DE NA<span class="_0 blank"></span>VIE<span class="_2 blank"> </span>R-ST<span class="_1 blank"></span>OKES </div><div class="t m0 x1 h4 y5 ff1 fs3 fc3 sc0 ls0 ws0">Dedução das equações de <span class="_2 blank"> </span>Navier - Stok<span class="_0 blank"></span>es </div><div class="t m0 x10 h7 y29 ff3 fs0 fc3 sc0 ls2">\u2022<span class="ff4 ls0 ws0">Definiç<span class="_0 blank"></span>ão<span class="_2 blank"> </span> <span class="ls5 ws4">de</span> deriv<span class="_0 blank"></span>ada <span class="_2 blank"> </span>parcial <span class="ff1 fc0">(tópic<span class="_1 blank"></span>o <span class="ls3 ws2">de</span> <span class="_0 blank"></span>cálculo <span class="lsb ws9">II)</span><span class="ff4 fc3">: </span></span></span></div><div class="t m0 x11 h7 y2a ff4 fs0 fc3 sc0 ls0 ws0"> </div><div class="t m0 x11 h7 y2b ff4 fs0 fc3 sc0 ls0 ws0"> </div><div class="t m0 x10 h7 y2c ff3 fs0 fc3 sc0 ls2">\u2022<span class="ff4 ls0 ws0">Aplicand<span class="_1 blank"></span>o r<span class="_1 blank"></span>egr<span class="_1 blank"></span>a <span class="ls5 ws4">da</span> derivad<span class="_1 blank"></span>a <span class="ls5 ws4">do</span> produt<span class="_1 blank"></span>o: </span></div><div class="t m0 x11 h7 y2d ff4 fs0 fc3 sc0 ls0 ws0"> </div><div class="t m0 x11 h7 y2e ff4 fs0 fc3 sc0 ls0 ws0"> </div><div class="t m0 x11 h7 y2f ff4 fs0 fc3 sc0 ls0 ws0"> </div><div class="t m0 x10 h7 y30 ff4 fs0 fc3 sc0 lsa ws0"> <span class="_2 blank"> </span> <span class="ff1 fc6 ls0">(I) </span></div></div><div class="pi" data-data='{"ctm":[1.000000,0.000000,0.000000,1.000000,0.000000,0.000000]}'></div></div> <div id="pfa" class="pf w0 h0" data-page-no="a"><div class="pc pca w0 h0"><img fetchpriority="low" loading="lazy" class="bi x0 y0 w0 h0" alt="" src="https://files.passeidireto.com/f0e8cf6e-768a-4214-aca5-97b054e3c056/bga.png"><div class="t m0 x1 h1 y1 ff1 fs0 fc0 sc0 ls0 ws0">Mecânica <span class="_0 blank"></span>dos fluidos </div><div class="t m0 x2 h2 y2 ff1 fs1 fc0 sc0 ls0 ws0">AUL<span class="_1 blank"></span>A 07: EQU<span class="_0 blank"></span>AÇÕE<span class="_1 blank"></span>S DE NA<span class="_0 blank"></span>VIE<span class="_2 blank"> </span>R-ST<span class="_1 blank"></span>OKES </div><div class="t m0 x1 h4 y5 ff1 fs3 fc3 sc0 ls0 ws0">Dedução das equações de <span class="_2 blank"> </span>Navier - Stok<span class="_0 blank"></span>es </div><div class="t m0 x10 h7 y31 ff3 fs0 fc3 sc0 ls2">\u2022<span class="ff4 ls0 ws0">P<span class="_1 blank"></span>or <span class="_1 blank"></span>outr<span class="_1 blank"></span>o lado: </span></div><div class="t m0 x11 h7 y32 ff4 fs0 fc3 sc0 ls0 ws0"> </div><div class="t m0 x10 h7 y33 ff4 fs0 fc3 sc0 lsa ws0"> <span class="_2 blank"> </span> <span class="ff1 fc6 ls0">(II) </span></div><div class="t m0 x10 h1 y34 ff1 fs0 fc3 sc0 ls0 ws0"> </div><div class="t m0 x10 h1 y35 ff1 fs0 fc3 sc0 ls0 ws0"> </div><div class="t m0 x10 h1 y36 ff1 fs0 fc3 sc0 ls0 ws0"> </div><div class="t m0 x10 h1 y37 ff1 fs0 fc3 sc0 ls0 ws0"> </div><div class="t m0 x10 h1 y38 ff1 fs0 fc3 sc0 ls0 ws0"> </div><div class="t m0 x10 h1 y39 ff3 fs0 fc6 sc0 ls2">\u2022<span class="ff1 ls0 ws0">O último t<span class="_1 blank"></span>ermo <span class="_1 blank"></span>é a <span class="_1 blank"></span>equação <span class="_0 blank"></span><span class="ls3 ws2">de<span class="ls0 ws0"> continuidade!<span class="ff5"> <span class="_4 blank"></span><span class="ff6 fc3 wsa">\u2202<span class="ff5 ws1">P<span class="_4 blank"></span>/<span class="ff6 wsa">\u2202</span><span class="ws0">t <span class="_2 blank"> </span><span class="ff1"> </span></span></span></span></span></span></span></span></div><div class="t m0 x10 h1 y3a ff1 fs0 fc3 sc0 ls0 ws0"> </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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