[justify]El proceso de intercambio de calor entre dos fluido que están a diferentes temperaturas y separado por una pared sólida ocurre en muchas aplicaciones de ingeniería, el dispositivo que se utiliza para llevar a cabo es el intercambio de calor.[/justify]

[justify]El intercambiador de calor de coraza y tubos, es el tipo más común de intercambiador de calor usado en la industria, un conjunto de tubos llamados haz de tubos contiene el primer fluido, mientras que el segundo fluido o gas corre a través de los tubos en el lado de la carcasa para que el calor pueda ser transferido entre ellos. [br][/justify][br][br]

[justify]Para el modelo matemático del sistema se estudiará el intercambiador de calor de tubo y coraza.[/justify][center][b]Balance 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[/img][br][br][b]Ecuación diferencial[br][br][/b]Reemplazando la ecuación de balance energético, obtenemos la siguiente ecuación diferencial:[br][br][img]data:image/png;base64,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[/img][br][/center][justify][/justify][list=1][*]La solución de esta ecuación será: [math]T_{c,o}\left(t\right)[/math], siendo la variable a controlar en el sistema.[br][br][/*][*]Las variables a manipular serán:[/*][/list][list][*]La temperatura de vapor [math]T_v\left(t\right)[/math][/*][*]El flujo másico [math]m'_h\left(t\right)[/math].[/*][/list][br]

Si consideramos las ecuaciones:[br][br][center][img]data:image/png;base64,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[/img][/center]El reemplazo en la ecuación, da como resultado:[br][br][center][img]data:image/png;base64,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[/img][/center][br]En condiciones iniciales:[br][center][img]data:image/png;base64,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[/img][/center][br]Donde:[br][center][img]data:image/png;base64,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[/img][/center][br]El desarrollo de este análisis da como resultado:[br][br][center][img]data:image/png;base64,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[/img][/center][br]Donde:[br][br][center][img]data:image/png;base64,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[/img][/center]

Considerando el modelo matemático linealizado de la planta:[br][br][center][img]data:image/png;base64,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[/img][/center]Aplicando la transformada de Laplace:[br][br][center][img]data:image/png;base64,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[/img][/center][br]Donde: [br][center][img]data:image/png;base64,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[/img][/center][br][br]Por lo tanto, la ecuación en términos de frecuencia será:[br][center][br][img]data:image/png;base64,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[/img][/center]Donde: [br][center][img]data:image/png;base64,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[/img][/center]Al despejar la variable controlada, se obtiene:[br][br][center][img]data:image/png;base64,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[/img][/center]

[justify]Los parámetros óptimos de la planta diseñada cumple con los siguientes parámetros:[/justify][br][center][img]data:image/png;base64,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[/img][br][br][/center]Parámetros modificables en esta aplicación:[br][br][center][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAnoAAACeCAYAAACl4KexAAAgAElEQVR4Ae2d25EcybFEqQJkuCpAB4qwMlAF/OB7NYAGlGD/aUYFoAA1gA64dkCeXUcgq98909XtaTabVZHx9IjMjOkZ7Pzte0cRKAJFoAgUgSJQBIrAUyLwt6eMqkEVgSJQBIpAESgCRaAIfG+j1yIoAkWgCBSBIlAEisCTItBG70kT27CKQBEoAkWgCBSBItBGrzVQBIpAESgCRaAIFIEnRWDZ6H3+/Pl7v4pBa6A10BpoDbQGWgOtgX3UwFafumz0tphLLwJFoAgUgSJQBIpAEdgPAm309pOreloEikARKAJFoAgUgbMQaKN3FlxlLgJFoAgUgSJQBIrAfhBoo3dFrv79739//9vf/rb5xfqth/b+85//3Fr1UX3YvkdMRw2X4SYI/OMf//izVqdC15ifcfz+++8/Yv/73/9+dnjIIN9xGAHPptUZcWjtkNZT61K+S/I77evrP//5z7nU9ysRcB+C8Wq4/n//93+r5SXNfK3qbinwgsQ12i8IxCUhU1gW2dZ8y+LzMLvE12tkaCqN75bxXONTZc9HwPohlzzncG3Sk2fPz14g5zYCXDjg1UbvePYPnRGH1g5pPrUu5Ts3vyvb+tpGb4XOdbS8S1b4XrLfzFfvpu3ctNHbxuboSjZ6k9nie4aLMzdnN9PM9H7evQytzfxU2LVnqNdVRtrorVC5Lc26Wp0Rh9Zu4YX120bvFmjeVwc5oh7mWXPpPXPv2rovGm+jvY3eFTgfavRWFwvfwViUznkoelgx+52NB1faUja/I1IWfp/h45mxomXo6nR2LTefa/iWdGNlPeOR3zkbC/SnDnlSXh863waBrAHwtrbQ7pr1osVVjlxjzprOZ2pkrktLee2a/6zptJ3P8E4/0ekFstJljWbMK5n0kWd1OeOH9PQ1Yzc+ZbTNuzIzbtb2Pox3tYfnmniB5TzbxAg8xGnmO3PNs3yZ31kz+EAuckwe/YI3/Ug6a9MfdFoXxjptpd1Xfs79kDhIB8cc5lZcmXNIn3WXNQJP5hN586VdeMzZrMmsK21P/auakPe9558Re29vdmY/i2G6bvGZ/OR1zVnZVUFTePMwUo6ZNcZKVj4L2nfmLPqk5zO6V7bRt6IjyzgU66l2fyjqf26KgDWSB5T5cI3ZwVrWQz6TY8YhnlXdpX5tpl6ePWy3akx+fcePlS345PEwzwN7y74+rnTik3R1Txx+APP9+xI75PXFOJzTN3XsaTYOayN9n2uH6gZecGKYI3MCLetXvc6JobQ569+p9bXla9ra8ilrJPF45efE3VyAh/vK/Q/tlL1iflOXtDlnHWkvedDBV9J8ht9hXbrmnL7L+whzG70rsrBVECadeR5YbvxVsWfxKId7FnsWkTbUt5LNw8dNIM2CV7fvaU/aytekySeUbqA8COHRZ/gSO+X0LeN0rfP1CJgDZvPu4ZVrWjJfrDnMkXJ5CVqL6kbeXEpTLutH3ZOW71lL1pd+pQ/IMLSn3HyHx/i0L48+QtcWaw5pxgs9fZBP/fogXXl9XcnKu6fZeD1r0ve5ljGLbeZbbGddrniSJtbqt0bwRdy1Z77xzZE0fVAu45q0GZ969Ef9nf+LgPiZn8whzw75pJnXzNnE3ppJnpQzj+pmzkHOkDX/rE2asvKof+pKve/5/FeFv6cXO7WdzYrFlvNWWBaNvBaeBXrocJBHWQtNesqeQpu+qJfZos1NqK8rGvEm3c0pDupGR/KlLXk73x4B64GZYT64lOZa1nZ6knnj2QMOXY5TaMmjHznPGrHusDF9ne/6kfOhizdjwgfrHnkPdOQd0tx70DMe+Ywn+VxzlsdZ+h5nY8hcGcdcW+EF78R25la5zBFy8uX5p21zrw/m0rPPd/nlw9asDdecldVv6ch1bCNgTszjfF9Jiq2zPL5bd+Zi7ruZb/nM4dSn3pypM4a6XNO2Oh5t/ut0fjTPduAPyTXRx9z1gJI/Z4vEw8piUmfaSTmeLWZl86A7hWaxT728uwnzsNPXpOWhlr7qv7O29HkLE9eV63wbBKwH6yvx31qzBtIDa4Vcpw55TqF5sKtrzujeqjF9tdZ9Ny79yFl7yrA2D2t9yJit2bwMpGWdrmJWn3tGf/TX9Zzl2eNsHDNeYplr4pVYwye24i1W5nZLbuY3a0fbzuo2/76LuT5gi1iUW83KbtnTb3V3/i8CiRcYb+XC/K+wF0vXrLv5Lp+6zEnmWZ70Sz05Kwt/0n3O80WdjzC30bsiC3kIHFNjIVgoWVAW6CxEdVqQWUTq4zBiKJs8p9DUrR5t5rzyNWk8O7borOuz8SrD7AEODz513B4B64HZYf7NjWtbtT3zm3lT5ym0eTErm/O05ZpxWOu+67t8OU976aP1KE/Wn/h4oaNTGjocqU+amKofeuKq/EpWHXuaV7jg/yqPxpxYw6sO8Z653ZKTz5pgnmfJ1C2PtsTavGEr8+X6sTnjRRfvHb8iYD7M3cQqsScXDPMPr8N8uc/Uq4x8M98rvszdOXnTB2b90O4jzH+h9Qje7MyHLMRDrmfxWARZsNIseOYcFpGFm3alKetBh/wpNHkoeocbIv3QB33NmOaGcAOtfEEPY3WpJib60vl2CJjrzGvWErnJNXOeNGvDelnl7BRa2rWmptxWjRmH9ZVy1mLSst6UWdXfjA05adkMWN+JizTrG1nxMz5o0y9oxpOy0Pc2xGrGsYpPHKwjYxVH8VZWrLMm0MFImvmdepJH3dZA+ps09ZtH5VIXuc1aZm36lPn/sdj//EAgsQZjcyc81kjmx3pImvkR5xVP6pLPGjHP2pVuzUHXBrwz/8olj7RHmdvoXZGJ3ODH1Fg8FkPOFp4FmgWG3jxAU45ni1TZ3Cyn0LJop24PLXzINWJJueSDN3FJufR36ky+GT+8HdcjYD1MfKWTg1zLwzHzw7M1mzx6eCptq65XF2rWmP5mrW/tL3V5qShzqEbR5Zg+4of2Jya+K+u7WEHPfeN6zsrucT4Wm7kgNmsksYZuHuUV66xLaYmbz+b3EI+6safcasZHhrUzebQFz6wTeWd8PxT2Pz8QmPWSeYFhroupszD6nvtM2pyzjqw186w+a3PKZi4P1Zd6Hmluo3dFNvKyOKZmFi2yFosF7nsWo3qz6ChEDx95lc3D51QaNlI/z3PM4s94eF6NqXPF52aT13hW+kq7DgHrYWKcuTy0Zo7Si6wL6afS4NcndSPrSL+ydpTJWkdmXrbuK9bcLykjDdse4vqhvfSBNS+TtIXsKmZ1KWNcyQsPw30weZXZ02zcOc+4xEDcjU8czJ25nnWZ+PMsX+ZXXfiBPm0mz8yvPMjw7Eg6a9Mf+PTBuGds6ur8FwKZI/fcX6t/fUMgpqwpY0255rvyWSPwZD5Tz6Szhi71MmfNqD/PD3lde7T51xv90TysP0WgCBSBIlAEikARKAIXIdBG7yLYKlQEikARKAJFoAgUgcdHoI3e4+eoHhaBIlAEikARKAJF4CIE2uhdBFuFikARKAJFoAgUgSLw+Ai00Xv8HNXDIlAEikARKAJFoAhchEAbvYtgq1ARKAJFoAgUgSJQBB4fgWWj9/nz5+/9KgatgdZAa6A10BpoDbQG9lEDWy3nstHbYi69CBSBIlAEikARKAJFYD8ItNHbT67qaREoAkWgCBSBIlAEzkKgjd5ZcJW5CBSBIlAEikARKAL7QWB3jZ5/asTZP5XzHpDzJ29Wf7blWl/4kyyrP8tyrd5nkPdP08w/d/MWsVFz71lvbxFjbRSBIlAEbo1A/rmw1Z+P27LHmXvqWT//BN097mb89A6yB3H2zvad+V4+bOG1Rd9No2ehzKQD5urv0G0FfCs6Sb1HIikM9Fo0t/K3eq5HgLy00bsex2ooAkXgtRDw/j4n6vk3bQ/J0gPk3xbW3j0aLe7mtLXy6179wcrWKbRdNHp20LPJI8D3aozulcj3iueUYnl1njZ671MB+cfJPQM8yMnJe3yj9z5I1GoR2CcC7tdTvPcOZG/z5Z7fkrU/mE0dzRh2bz345PDYp5L36g8ujWUXjR6gHjrMSfQsBr8bsFgSIJNggchzTAdyDOWVy2LKS4n1LAgLeNpV3nX1ZsyHbGZsPosZs/rmdyHYxYY+p71D+CHnJlI382rk+jX2zY3Y+Y5NadpKzFknLmiHsIAv19GVeLAOzVzx3vE2CHz79u0X7L9+/fonjfWOIlAEHhcBzk3Oz1OGZ6/nep71K3nO7XlWr/huReMesxfY0ul9PZvPLf57009D/t5eHNFvU3GE7c9lC0WCRSboJiEbDy95ZSicLB5lpg7fkZsyrGVz4Ds05dRrMcsD3TF5oKde+XI2noyB54xZXGbzcgw/5VKX9vTBOKA7Jo96VvZTTj50zs0vNokXfs24J168pw2eMx58njxTh3F1vi8C5tyGjnfyS7PXUQSKwOMj4Bl+jqfue+ZDg7OA89u7gHOaL+/YQ7KXrKGbu0I7zNNHfbmXD+f6vYtGDyBnM7AV6FZBkRgvdpOQybExkQb/yqaJU4fvyK0Sjh6bDm1MvWlLHvQ70ndp2vd9zsSKPzmmbrEyBnilpRzP6YM8KQdP5mnVOE2elR5p0z7v2Js4p1/KTB7why8HdqRNXOSbchmfPJ3vjwC5+vjx44/88/zly5f7G62FIlAEbobAoXN9y8g8x7f4OMc5m73f4fP+m3dU6uB8R86vXEtdSdenXPcuZs0h7ZB9ed9i/rkTeAuLF9g454IleXzNkRf7Kgle9ibLQrEZmPpWOpLH4mHWH20gmwMb+MeYPL7rl3JbdNfxX7vSmNPWavOdgl9imbqRdQNgx+fkSb9W9nM95Xx2ozGLwcQT3oxzFdNWDMqaP/Q4zqlDZTpfjwBNnvn48OHDdz/Zu15zNRSBIvAWCKzO+mN286w/xMsZnee0vNBWdxDr3Bl5p+qf50yuqe/QPO+YY/3BIV33WNtFo3coYROUCbjrebGvkrBqGuQz+eh2uIacg3V5LTB8V25lA9mMb/JY7OqdM36sxlbDlLYs7pQ/Bb/Ecks27SRP+nWOfXWIB/PESh5m7KOfsYpp2sYvsTVfzOhxsK5OaZ3vi4C/n/fHH3/8+WnuVs3f15NqLwJF4FIE5nl7ip486w/xn3LXHJK/xRrx5V2x6g9uYedSHbto9LI5WAXKuiCvLnVkkmeVhENNA/LKoCffkVu9/yD+r+GwcdiykYU6eU4tdu05b2GGLZuV1eY7Bb9Z1NpEVnwyJteZU/859tWReEys5GHOpixtypO2U6frzMhZV1Nn8vX5fgjQ4JFLP8UjJ3zC11EEisB+EMjzFq9995vrPGeNautcdt2ZO8d7Rxrz1h2YPLd6Jp6MwX7B/uBWdi7Vs4tGzwudxM/hGkAzLKDJl43HKgnqYW1rZMNgEZrILbsUMnKMLRvpG3zIpB+8G5++aX+FCTwUOXI5tK/MyucVDR3pozzGro30G/tZ+MljLOpxjXlFy/UZd/ol3+TJvMmTdlb1AB+6M4ZVHtTX+T4IUEfZ2Jnb/kOM++C9Z63uafapX569e47rGXw3N+fE4l5nPjQ4v/Oclhcadm85vCumTuqMs8oh37wjXX/r+edO4K2tn2HPQgFAh43LTDKbPDe4soK+SoK61I+OTJzrFo5FqE7flcdHfEhf1JE88OF/2kImefQ/Cx6ZjFFMnNE3Y5gy6lXGOX2GJp+x+p72ec48GGvGpU/aUY/vztPvxNZnsQCnideME9/S14yJZ33FH4e+ZkzYSR55O98HAT7F43fyZu5o/LKuaPp+++2373z6xxf8uX/u4121PhoCnifsU79m7Tyaz6/ij7k5J9551h+S5ZzOM8Hz+5DMpWvUVtaVsXk/otd7KWmX2ruF3G4aPYI18W5i5q2Ll8QnX4K1SoKXfV4QKb+ypQ0LzIQrx7s09K9s4NdWkUJ36LO6ten6nFlHnoJUJosTfn2bsrwbm7LJo5ybCZ70NXmVX/GoJ/l9nvZt7KwB3+GXpq2JDXEfi32FrzRtoR+fO94Ggaxd92Xm2n99S775ogEkP/DSIHYUgSLwGAgcOuu3PHSve/7Kt6UrzwvO6nuOeT9NW94dbfQmMn2/KQJcfFvN17WGtjbatXorXwQuReDTp09//m9XOFzb6F2KZOWKwO0ReLU7o43e7WuoGhcItNFbgFLS0yLAp3n+gw1qn8avowgUgcdAoI3e++bhvp9vvm9sL229jd5Lp/+lgvd/wUKzx6fY/AjHpu+lgGiwReBBEbDR40eq3E3PPPwVIub+6PaZM93YikAReDME+DEJn+Dxuzz917hvBnsNFYEisBME+oneThJVN4tAEVgjcM9Pr9cWSy0CRaAI7AeBNnr7yVU9LQJFYIEAn+LNf5m3YCupCBSBIvCSCLTRe8m0N+giUASKQBEoAkXgFRBoo/cKWW6MRaAIFIEiUASKwEsi0EbvJdPeoItAESgCRaAIFIFXQGDZ6H3+/Pl7v4pBa6A10BpoDbQGWgOtgX3UwFbTumz0tphLLwJFoAgUgSJQBIpAEdgPAm309pOreloEikARKAJFoAgUgbMQaKN3FlxlLgJFoAgUgSJQBIrAfhDYdaPnHw5+lD85wp9euse4hV7+NNS5f3qGP1vz6P9/MrC5BT73yFt1FoEiUASKwGkI8OfC8i5XatK5l+41uO/Sh7SVa9ynexq7bfQAeoJt48f81uNeDYd/I/Ct47Go2+i9NfK1VwSKQBF4PQRs6Ob9TeOVDdd8vxVS3nlpf2Vrj3+JZ5eN3iGg36sxaqN3q+12np574X6eF+W+NwIewhy8+Qku7349+jcl98ao+ovAnhFYNXrc51sf6Nw6VvqKPFvQv7J/qP+4tU+30rfLRo+DPbvuBINi4SsPfXi9DJjzuwNkKSRoJFm+mfC8aOTRbsqxhn3GSsY11i0sbKuT2THpGTM+r2SUnTP82GOIx/RPzCZdOWR5TrvKpL1cJwbxhUfdGZuyU/fMAXyJNc9+qWPy4EtizjO0tO/6KfbTTp/fFoFPnz59//Dhw/dv3779afi33377/vHjx5/2+5+LfSgCRWA3CHg25z3H+Z73D8HIt7p7bh2s91fqxR/utD2Nv7qKnXhto+DlfMxtL/QsCi76LB6bJgvMQkKW4bvr0GaDMd/1M+3aSOiz79MXdDn033dm/D3Gk/zKaMdGL4tVX5Q7xf8Vzxa2YqlM+o9N7Kc/0KauibE+py50pB5jNQ/mMnlOtS82nd8HAfJMs8eg2SP/1tX7eFSrRaAI3AoBz+a8ZzmnV3ucuyH5buVD6tGfaX91V6XcIz7vrtHz4iYJpwwKYiZq6qCYsllAL8mUZnMybeY7vPIjP9+hademw0Yl45BHGr4Tg8P1tM3a1oZQjnXsMdShH9DQhx1pxuy768jmSJzUm+vqMQe+p54t3WCI3wzlZtz4LO7anzyZC23pD7qlpU/Q0/4PJ/qfd0WAXP/xxx8/vqi7med3da7Gi0ARuAqB1TnMns+zWgPQ53ntmnrg4ct7j3XukS055ZmV9W7JNfR5LyX9kZ//6iAe2cvwbesyD5Y/H20OmOfIQskmSL5sYKCZ+FXRsZ7NhDqckVGeWX9WBWN8U9b36dcxuusZozbyonRz6NvEThn1OSd9yzdiFrepVz0546t4uaGQ9zl5E/cVnvCmj8YJbWus7G/xlv42CNDgWRNZT29jvVaKQBG4NwKrs3lrr0PfOsO5B3Jcc557d6e+rXsmeR7teXeN3imNgiAf4s1CoRBmcaySSVOBnF9ZaNlwYF/b8lLENhysMVY25IGfMQtt+qB+5lUj9EPJ/z7xM8ZpA565yfRfX/Uj7eUz8hODtI08Y+qVB9/Uhx4GszEh77My8si/whMe4+V5xqmuY/bl6/w+CPAjW34Xj5F18T7e1GoRKAK3RmB1NnPme3ekPe4KzvW3GNhKH7bumbfw5VIbu2v0CPRYkk3MVlMxC4piInk5jiWTywY7NkK823CgZ6XThkOZlQ158JFBgWHHMe1IPzanP9MGshOTid30Y2WPeBIDeXKzTr3wrGjQ0YUsY8t+4rHCc8rOOFk/xf4PJ/qfd0OAJs/fzzNffMo3x5cvX97sApi2+14EisDlCKzOZs53zvUc8nEOvMXI+wt7W/fMW/hyqY2/OohLNbyDHJe+DcA0b0NAMTBs+pJvNjromsV0LJkWG7oY8GeTs7Krbxboysb0zXf9V4fvztnwSMs5Y1SnGME34/FdX71cfVd3+qNe11IvfIyVHuXSH3jx2Tyv5OABZ3Hf0pPYGBe8ji25tC9v57dHwJxlY0dO+Re3c3z9+vWnf5U71/v+vAh4FnEm+OXZ8LxRP09k7vM8m8mpd4CRel77fqs57wl1rnxa3dvyP+q8y0YPMEk+mzmHG92mgjVp2aAgR7Ic6Mp36JlMCyt1qJdCkD8PFZ6zQG1UsK2etKEv2lKv764zoyNtyaPe5PU5Y5RfG/DMgvY9dWIzMZcn8V5hC00ecUi9Kz1gg1xiODGVJ7GAP2WMVXvagu6Qpo/Q1Z265O/8tgi418wh1v2dPXLn4BO/rAXpnV8DAeuEc8Ov1sN+cu85fOhslifP6ltF6F2R9ud9gq3VvX0rH+6l5+dO6V5W7qTXy9hNzZwHv2ZNoHyzSEgmunLMZE4d05YNDHQvJO05o59nbU0brGsn41A+/cZn6czJn3H4nDGubLiBWHNwSKI7D0t8TrvJr1yue/jquziJkTL6pCx2pCWvPsEHD+/pH/qSB77EZhUnMto6Zl9/O78NAtYLeaGGHeaYH+maX3I4a0H+zkWgCDw2Altns3TPZu+Se0ST5w32VufJ6t6+hy+31LnrRu+WQFTX/RBgw3AJdxSBeyJAjd3zErin79VdBF4dARu6R78r2ui9eqW+ePx+eucnLMCxx03x4mncbfjUGt+RZ/3tNpg6XgReDIE2evdLeD/Rux+2L6mZy9aP2Jnzx20vCUiDfjME+DEL9fbonwi8GSA1VAR2hICNnvfHo7meP9bd273WRu/Rqqn+FIEicBECXBT9NO8i6CpUBIrAEyPQRu+Jk9vQikARKAJFoAgUgddGoI3ea+e/0ReBIlAEikARKAJPjEAbvSdObkMrAkWgCBSBIlAEXhuBNnqvnf9GXwSKQBEoAkWgCDwxAm30nji5Da0IFIEiUASKQBF4bQTa6L12/ht9ESgCRaAIFIEi8MQILBu9z58/f+9XMWgNtAZaA62B1kBroDWwjxrY6lWXjd4Wc+lFoAgUgSJQBIpAESgC+0Ggjd5+clVPi0ARKAJFoAgUgSJwFgJt9M6Cq8xFoAgUgSJQBIpAEdgPAk/Z6M2/mcffznvPv3/J3+C8x+Dvyt7jTz6BFZhdq/v333//oeeWsfP3BtHrAIO9/d1Bfe9cBIpAEXglBM75e7HeQ/7t27c657lT+FoNfNCfvNfPiWul9960p2v0SNBsUmz8tpJ3T5Dv0ezgr5vg2mZsFfs9da/snUMjt9nonSNb3iJQBIpAEXg/BGyImA8N76Dko7G6d7Pnfb3qFbCfzd18Jx7k7u3jIdy21p6q0bM4Vs3PqQW2BdSldAvnUvktuUOxbsmcSr+n7lN92OJro7eFzPPSOVD9LtqD330FPQ/f50WhkRWB/SNw6j3Mnp7Nlh/YeAbcGo08Z6Zt/c7eYuVPG71bZ2Whb1UcyUayskhMlJfIvDBIGrS8VOCdQ3lnbUw5GiiHvM65ZqNlccmjXtelY8eBz9KZlXF9Na/0IZtFveJJXXwXk/HC7zt8rE98peemgif9z7Wk+10T6z6znvz6Bz0xgj915ZoynR8HgW/fvv3IV+bp69evf9JY7ygCReDxEfBOO+VemtF4X3O33Hpwb3AnYIP7Yd4jnD3eM2kbWp5LeR8l33s//9q1vLdHV9gnUacWgQWXSaLJyGSa/Ew669mw8J7r6MMPx3yHznratYmy+H1f+aJeebIZ0195jFG90nOeepSx6OGVJ/XMGPA1ZZDL2NWRtrWlXnBNbN3YidW0S8ziBJ/P2tGuOLGe+dIH+DoeEwFzZEPHO3VCs9dRBIrAfhBwLzOfOzzLL5E9x9a8I5Dlzsi7SX3Q8j7J+0ieR5j/6kgewZsrfLApOPXCJkEzcVMHSaOxyGGxSWN9ZdPGIpsdZOY7NO3a0GgjC1oeafJox/Xpy1aB6j9FrV1pxq3uVeFrXxl4Jp4Z68o/1pFjEBdYGt+W3kON3kpHxq/PxqUNdMLX8ZgIUCcfP378sU94/vLly2M6Wq+KQBE4iMDqjD4oEIurOyaWfzzCw3nOl3eLPKee8chN3lW/gF7oycvztKv995x/7mLe05Mrba8aiUMqZ8MgbyZulTSbheRH12xyXM9mR5qzRW9hwsvQRjYkxmcjNHl8V7fzFp31qXPKsL7FM+mrzTFjn5tlJaMPYjKx5V2c4J05mjonv/r1Xzu5WeXp/BgI0OSZpw8fPnz3k73H8K5eFIEicCoC3nneY6fKcT5zBnBubw3uhVxXxrMj17Z0QJ93CLR5dymf/QK0eR/J997z0zR6AElCswk4BO4WbyZulTQbpywaGxoLCjmHa74zy8eMPnSlPysb8rDGmDzaSd35nP7qizrnpkvdbszUlc/6s9oc+qS9ld60DfbqFkP0Qnewjl7HzFHaTHvyo08b6uFde/J1fgwE/P28P/74489Pfa25x/CwXhSBInAqAt4nee4fk+Vs5ow+R+aYzkPrq7sMH/IeUj77BWjzPpLvveenavQm6BNc1k3WbBjkzSSvkrZqHpRlttGwifBdnpVOGy5lVjbk8ZKbPNOO9g7NU6e8qfvUjZm4qWf6lPYmDmlTeWb0mjPeZ96mnvQ3843s9Ec7bfRE4vFmGjzy46d45JRP+A4NeKiLjiJQBB4LgTyf8cxznz3uV3rMXob+Vk0etrfuMuhzQPPeZm3eR5P/vd6fqtGziGgo5nCNwmLMJvK+tE0AABQwSURBVABaNiK8r5JmYa5s/FA8CkV+11Z29c2CUSZtTN+Ukcd35hxbzY08q6ImbjaXunnWN+WmvZWelW3jn/wrXmxhGxnHKRtL3dPvVT7FlbWOx0OAvGRjZ90d+ocYnz59aqP3eKm8u0eeIex7v/LsuLsDNXAUAffvvKdWguSOPHoPrXjuQfP+SN36nb54d2Qsqzsm9bzX81M1eoAI0BRHgm+SctNLywaGdZLsWCUtmzATnTrUCx9DfnV6GGXBeCipR5nk0ZZ6tZM8bgxtKaNe6TlrC30M9eYG02d54AOnxHO1OZRb2dvKkfEhYzzTTsazypF2Mwb0zViNAz70dDwWAnyKx+/kZf7xkMZv5ovGDxq8fGUdPVZU9eZeCOS+Z0/zNWvnXrar9zQEvF/yLllJmstjfCvZa2mruwydqztv1tfqPrrWn1vIP12jByhe6G525tXBbyMk3ylJU7cN1tSxsqV+GxTsSGOmmKFRSOm/NqBpJ+OAH/m89HhO3cn/Q/niP8aknO9pX5o8aROVq83hZp0m0WGsuSa/NniXpi++w8NYbSyxmvmUX/3MxCVm6Uuf3x+B3CfkieFFQe7817fkm4aQd9etl/ePoh4UgSIgAu5P5kMjz+j5zB1wz7G6y7TnnYtPW/fL6m5T/r3mp2z03gvM2i0CReDtEaBR9/DnU8D8Ue/be1OLRaAIbCFwaqO3Jf/o9NUHD4/gcxu9R8hCfSgCReBiBPjO2k8IOGj5Hb1+oncxnBUsAndDoI3e3aA9qLiN3kF4ulgEisCjI+B30XySxyd7/OiEZq+jCBSBx0LARo8ffT7ijzgvRevR42qjd2lmK1cEisDDIMBB6/+CheeOIlAEikAR+C8CbfRaCUWgCBSBIlAEikAReFIE2ug9aWIbVhEoAkWgCBSBIlAE2ui1BopAESgCRaAIFIEi8KQItNF70sQ2rCJQBIpAESgCRaAItNFrDRSBIlAEikARKAJF4EkRWDZ6nz9//t6vYtAaaA20BloDrYHWQGtgHzWw1acuG70t5tKLQBEoAkWgCBSBIlAE9oNAG7395KqeFoEiUASKQBEoAkXgLATa6J0FV5mLQBEoAkWgCBSBIrAfBF6+0eNvYvLnWFZf/GmlOfxzS5POO2vo8Q+sr3huScP3lY+3sMGfpzlXN3Hf4q8S8LdL+eooAkWgCBSB50SAO8Z7d3VvcP9s3UH//Oc/f1rj7lEXM+u3HvYK+Xe08U+7b3XvXxJXG73/NXqrwqAQT/17fBbBqmAvScwpMpc0Y6fovYSHuCn4t4z/Ej8rUwSKwP4Q8HyZlyrv535TOJuCnlnvUw+H7i9ztNXoQffOZs67x1px/VbRWXvZ6KmbtTZ6ovGAsw3aVlGcmsBV8u8d7qGNcm/bU7+bq4fmRKbvt0DA+vKwZab+H/lwvUXc1fFfBMw/TR0595yhDs5t9JBFB3LIq6tYvy0CW/eXeSE3W40est658E8+aHzdYlh7+MOXdlM39Ec+i/qJ3oFP9EgkyaOoHBRUvkPn3SKYCc/vNpKH4nFNujacse0aczaj0yYyHl5ulCz0Fb92VjP8bh79nAXvATnpyqGX54xBGdZssjNOaKtNesh/7aeeVUyl7RuBT58+/bn3vn379mM/fPjw4ftvv/2278Dq/VEEco8fZT6RwfMiz6QTRct2AwTyjlGd9wX3wGodPteU4b7IOwf66g6R/5zZOwr93oPQ5uCOo54edbTRO9LozeSScArQMYvRA8mmTPmUoQgpDGYH6/nuIWRRWXDqRW7aVmYW3LQln7r1IefUvYrBDamMceeheYzHmBIb9M1Nesx/bSd++tX5eRAgv9RUjlNqOfn7vE8E3OPzbLsmGmsnz6xr9FX2PATyjllJbq1zH2UdeD+ZR2sl78qV/nNp2lndm230zkXzjfltNraKwqIxudnobSWepHshyWMREp4HjDqlZcOzKhzkkmduhC296Jpjyh5aX8UgbsYlTr67PnEFFxsyeXLT4kc2esZ0yD9tT1tTpu/7RoBP72aOzb11t+8I6/0WAuZ5nhWcbZ4nyHp2fP369ccz63zxqW+et/B6trR2tlC/L/2cOyg9IcczZ9aH+Z65TvlLn70HV7qxO2vzUjv3kPu1A7iHlQfWabMxLxBdtoBMbjZ68jCrx0KbjZ7y8HrApHzSpk35Jn1ulNShjAef787wIr81UveqwI0Xnxj65rsyU3/S1TGxT5/zOXWl/9N28vX5ORDg4mZv5T4isub+OfJ7LArzzL7PQU1wRjh45uzyR/rwQ4NvnnesQffMUkfnt0Eg75iVxa11cpaDuzZp3ivewcl7zbN31zyD0In9WZvX2Lq17M+I3Vr7DvRZFLPZ0PWZ3NnoUYwkORPNs0U25dHrAaONSVNGvXP2YJobYaX3lEYp/fA5detPFvjEzYNY3/Rl+u478lOHttPnfHadGf34yJi2k6/Pz4HAly9f/sx3RmSd8Tt7Hc+LgHucfOfgPOGMcPAMjXrJwSd60PmGwWHteGZJ7/w2COQds7K4WidXme+tO2R1Z61snEM7pJPamrV5ju5787bRO/I7erOxy3cPipkkkn6LRo8iPjTmRlj5s9UoZRwrG6l7VeBzg3kQe2iufJl2pg7X0+d8dp05/Z+2k6/Pz4EAF7V7KiOiTvMfY3DBU68dz4WAe3xeppy1efHzDG0OzyPPJ9ZXtCnX9/shkHfMyspqnZxlDVgXmVd0SV/doa5RJ36t+KZPq3tQHvSkX9IfZf51RzyKZ2/kx1azofmZwGww8ll+9XkprYrDA0YZ5qSpY15YUxeHmnamDnWnXmnMq020tT7twjd99N0N52byXd3pjzIzzmzukl8dzOn/lq3k7/O+EVj9fh61z/7MT2l47qd7+871ynv3OOdBDvLfRi8R2c9znuErr1fr5Jp7w7F1h3hnyXeLWZ1pX72zT5D+KHMbvQOf6FFofOXI5s7EZzMDP0m3AZMni2PVvEyal1jKpV58OqXRg28ehtpK3Rkjz7nJVjEgi17WGL4nFvgHj0MeD2vf1SEfcnw5jvnvJZC2le28fwT8/TwbON75FG82f/zvV7Ju9h95IxAB97hnh/R5NswzRz7PvDwjVjT5O98fgbxjVtbmOvcFtDnmXem94h08+S99X92D6qIOZ2269gjzX7fwI3jzDj5YFCRqfq0KBVoWm0WmLMUgjXBWxeEBk+Eeoql7FpK6WSeOlQ5t4LN6mI+N3GTawYZD3FhzeMjmZSsW2k7+lQ50IZ86oB3y30sgD3F96rxvBGjurCtryNrMeiRKamvWzb6jr/ci4B6fZyA1kTm3VpRz9mzMM2JFk7/z/RFwH29Zmuvsb+6T1TCXnhGzTlYy59Kwj/557qAH+j1snuvjFv/xG39LsvQiUASKwAMhwEH8yIftA0G1O1fa6O0uZUcdno3cUYEHZmij98DJqWtFoAg8DwJ8t09DsPqO+3mifM1I2ug9X97b6L1dTvuJ3tthXUtFoAjcEQF+bMflwSd7Hc+FQBu958on0bBX/VEr+d3jyF9NeuSfJrTR22N11eciUAR+QYBP8vpp3i+wPAVhq9G7JjguZhqNvTYZ18Re2ddCoI3ea+W70RaBIlAEdodAG73dpawOPxACbfQeKBl1pQgUgSJQBH5FwEaPH8/zSdw1n8Ihiw7/he41un71tJQi8HgItNF7vJzUoyJQBIpAEQgEbPT8na5rfh/KH9mqq41eAN3Hp0Sgjd5TprVBFYEiUASKQBEoAkXg+/c2eq2CIlAEikARKAJFoAg8KQLLRu/z58/f+1UMWgOtgdZAa6A10BpoDeyjBrb61GWjt8VcehEoAkWgCBSBIlAEisB+EGijt59c1dMiUASKQBEoAkWgCJyFQBu9s+AqcxEoAkWgCBSBIlAE9oPAyzZ6/Jkk/3n9nFd/QunQ3+XzT7m81T/Tx7+Vj49Sdrfyz/8NwqPEVT+KQBEoAkXgOAL+Pwq5W/Ou8q6EzvNqcI8i70A+7+hr/tc66kRH2pDOfMg31vH7nL/As4VF2rz388s3ejNhvJNo/obdKcMiPIX3Fjz6l5vnFnpvpePR/btVnNVTBIrA2yGw9f/R46zeurC3vPMbSJuHt/oGfcufZ6STk5kXGqSkcceumj3yYzNn3r3vvF9cvwQ77+z0BT3Q8WfLL3hY05dzbOv3JbLn2NnibaP3n//8go3FdcoBQALfcrx3wRyL9dH9O+Z/1x8PgXkxc0F//Pjx+x9//PF4ztajuyDgmczlTD14Nl/S6CGLDnQhr667OP6iSsE2Gynzl/eld8XEHzlpNFapBzgPNWLH4EbWBn/qVXZLP00aa5cMY22jdwl6V8gAOAnPwkt1FEEm1U5fHhNn0cwDA1l0zEsKedaUWxUbNNeZ9XHaVHbawSZji98YtuYt+/Djz/wuTP5//etfP/mtf8iJt3Hpoz6gM7GC33d5mBM7dHkgsGa8yiV2qaPP+0OAxs79SJ7N8ZcvX/YXTD0+GwEbBfJ+q2EN5RlyK92vroezP8//FR6e1xN/zm2H96jvzNDmHZTrW8+Z70P+belPv7ZsbNGNtY3eFkJ3ott4kIDVmMnORm+VNItIfchTGMwO3vnysFKP7/BRgFnE009lsmCQQW9umNXBOHXrV86TZ8u+Pruu7ZV/kwd7iQPvxAxN/KCJqf4Zp+/GKBbaTvzk7bxvBKgN82wks1ald34+BNzrnju3iNDzxbPrFjqr478IsDf5OjRW+5dc5J1p3t37nvHX1sEh/+bdTwzwX1Mn+m0ch3C5x9pfrfM9tD+wTgCfjUW6SyFlw8CzBbgqhFmQ8KA/x6qwoalXHbOgkmdVMFt6oedYyeb6Kfbh94BUn/6zJi0LOrHTnvj7Ds/0VzvwbPmWudD2tYeAPnV+DAS+fv263KtZH4/hab24FwLu/7m3OWPz3OCZL2qGmXW+fvvtt5++icRP62eet/eK4ZX0modVzN6N5IUzOwdreXew5rluLm+Rr2P+5d1Pncy6S59PeTaGGdspsrfg+bkTuYXGneiw0ZiFpvskNpO9albgVY9FaCKzAVHnqriSNm0ql/RVwaQOZfBnVZzw4ttqpJ1cX9HRY8zJO/3zfW7OSV/hi11sMPI57XkBoE+d5iD5+rxfBPjxbO5FI9mqCdc7Pw8C7nNynoPzgbPIwTO18uHDhx/NHfyeVbOGrJ95Nqmr8+UIgHnmZaVpdV6TI+gOc5S0mXN5z5lP8Q991MaMQ5/OsbeK9Rz5a3nb6EVRJZizUaMAbZBMmo0OxeBBZJMx5dG9Kq6kIaPO1YwObWtnSy/yFOQc2DOOuXaKfWWwv7Ix/ROXVTzQjCPx1UZuqHx2nVn92J22k6/P+0WAT2NWNUst87t7Hc+PgPt8nmmcIdSBg2do83c3qSHofNLn8ExBd8dtESAPmZct7exrG3DOb5/lJ2cz59bCNXk71T/8wS+H9x5+nTPe+246z9tzIntwXhOWSUyXZ+OR76sisfhsXLKA1buSS9pKRlnnVcGkDvlWG4S1jENe51Psy4t+vxLD6Z+4HNuUK788iLGZz/rAnHmctpOvz/tFgE9n3FdGYa7nhe565+dCwHNkXvqcQZx/Dp6hzeH5kefQijbl+n4ZAqs7aaWJHHD2M9jj3EEO9/jW3s9cThnvJuYV3yn+4Uva1h/rRpunzMqmvlPkbsXz6464leYH1wPgFAEJmMNDJQskG5F8VlZ9JnLVNK2KK2nqmD5NXfitHeynDv1Z0Y4V26n28QcftO1G1fb0j3c2R46J8QrT3FCTX12JzbH4lOm8HwRWv5/37du3H5/kUTM8dzw/Au7/eY5wtnDWOXj2bJLG7FmSZ/qKljJ9vhyBef9s3S3Jx1me+cH6obtj3pPneJt2V3L4iz85OG+gG0uuHXt+77upjd5o9EzIKsnSmPMwUQYaRcCAZzZAq+KaNGRSzgNOvehOO7xPHdCUy4MRvtQN3xzH7KtXf4w97Uz/VgcqdvDHwbv4SlPOd/gT9y1f9E25zvtFgE/s8sez/L/zeKde8sdwREg98CM66oTnjudBwL2e5wzRcR7kOTLPCBHwLMm6WNHk73wdAuQh84K2mauJf57tWp88Kz3ynjOv/FOeO43zJYf3HD76NXmSfz4r/15308s3eiYt51UyZiPCe8pYHBb3pY0eBYKO1J2HE+s2mhbaVtFaXOrSt1mE833LvvqmHjejuE3/0M+afjDPpm7ii4x60z91qyux0T/9SLk+7w8BGrm5z2jyqIv5SZ4NIPOnT59+uWT2F309TgTa6CUaj/+8dSfN/cyZzSC/814xymN3h3znzFv+oYO1vFemXv2Z9EPv7303vWyjdygpXSsCRWBfCHCB0ARufdq3r2jq7USgjd5E5LHfDzVSj+35fbxro3cfXKu1CBSBF0KAT3hpBvgUkO+4/aTghSB46lDb6O0rvW30fs5XG72f8ehbESgCReBsBPw0zx/tnq2gAg+NQBu9h07PL87R6PnrNa/+qzSPgEV/dPtLiZZQBIrAHhGgGegneXvM3HGftxq945LbHP4OMLo7isAzI9BG75mz29iKQBEoAk+AQBu9J0hiQ3g3BNrovRv0NVwEikARKAKnIGCjx4/B+CTumk/hkEWHP1K7RtcpvpenCLw3Am303jsDtV8EikARKAIHEbDR8/e+aNQuHf7IVl1t9C5FsnJ7QaCN3l4yVT+LQBEoAkWgCBSBInAmAm30zgSs7EWgCBSBIlAEikAR2AsCy0bv8+fP3/tVDFoDrYHWQGugNdAaaA3sowa2Gs9lo7fFXHoRKAJFoAgUgSJQBIrAfhBoo7efXNXTIlAEikARKAJFoAichUAbvbPgKnMRKAJFoAgUgSJQBPaDQBu9/eSqnhaBIlAEikARKAJF4CwE/h/EjZwuXuADPwAAAABJRU5ErkJggg==[/img][/center]

Mediante la función de transferencia general, se reemplaza los valores según los rangos establecidos en las tablas de parámetros:[br][br][center][img]data:image/png;base64,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[/img][br][/center]Se definen las constantes del sistema:[br][center][img]data:image/png;base64,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[/img][br][/center]La función de transferencia tendrá la forma:[br][center][img]data:image/png;base64,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[/img][/center]Donde, el coeficiente global de transferencia de calor del intercambiador de calor, el área de transferencia de calor y la cantidad de agua dentro de los tubos respectivamente serán: [br][center][img]data:image/png;base64,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[/img][/center]Al reemplazar los valores correspondientes se obtiene:[br][center][img]data:image/png;base64,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[/img][/center]Finalmente la Función de transferencia será:[br][center][img]data:image/png;base64,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[/img][br][img]data:image/png;base64,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[/img][/center][br]

[b]Lazo abierto[br][br][center][img]data:image/png;base64,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[/img][br][br][img]data:image/png;base64,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[/img][/center]Lazo 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[/img][/center][br][center][img]data:image/png;base64,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[/img][/center]

Método de oscilación[br]Esta planta es estable en lazo abierto, y es de primer orden.[br]En este caso, la función de transferencia se aproxima mediante un sistema de primer orden y será controlador mediante:[br][center][img]data:image/png;base64,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[/img][/center]Por tanto, el controlador PID tiene un polo en el origen y un cero doble en s=1/L.[br][br][b]Control PID en Lazo Cerrado[/b][br][br][img]data:image/png;base64,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[/img]

[justify]Este sistema térmico cuenta con una fuente independiente, la cual se considerará de flujo constante,las variables que son más críticas en el proceso son los diámetros de los tubos, así como su espesor, por lo tanto, para analizar la respuesta del sistema ante estos parámetros, se considerarán como variables a los diámetros mencionados, con un espesor máximo de 1/8’’:[/justify][center][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAQAAAABjCAYAAAB0Zd4mAAARuUlEQVR4Ae2d7bHjRg5FJwXHMClMDg7BMTgFZ+AMnIEjcAROwAk4A+cwW8e1x3UXi6ZIiXwjS+iqV0114+PiAg2Sej/06euMYWAYeFsGPr1t5BP4MDAMfJ0GMEUwDLwxA9MA3jj5E/owMA1gamAYeGMGpgG8cfIn9GFgGsDUwDDwxgxMA3jj5E/ow8A0gKmBYeCNGZgG8MbJn9CHgWkAUwPDwBszMA3gjZM/oQ8D0wCmBoaBN2bgbRrAzz///PXTp0+bf99///3XX3755etff/3VlsTvv//+j34r8N9F9L/77ru/ZX/88cct0W++B1a4IbZ3GB8Z7956+Za8n9oAPn/+/M8BqYfty5cvX3/44Yevv/766zeJd08DEDOH948//vg/nHsTqi9ifvZB0yPud2kAHxnv3nr5ljVyagOgu3qImH/66ae/Y/vzzz//vnaPJCD7kcNDCYZugJHm5J2bmbWjg7jQ5fB/dIxHsSL/kQfiHnxn67xbvLf460/DLa3Ffm0A9W7PE0A2gYWZS5ZvNQCdeoDBSbG8+ni3A/Fu8d6q31MbQD7ycIDqY3Td/8jHzr0NAMISZ8aQ65VYn3K489vkbCK1EaKbhYjd1ONabmhIfI/gkwmvWcSyGuhlo0UP/YwD3Ywl8Wo78fEkpwy2c/z222+7/KXO1vVe/PDiKydY6yAfcsb3OrfiVX+vf+S1iX/4FQ8zvLgPd90AV+YdPbgmtjqsX+Z8UkX/nidV7ffI3D04C5KAIb8bFhKzxdbJba3dIrbTTWzdfl0zmYlx5ZfkW2zMFAR/rnWxss86h5NZPf2yRhFpA/ksFl+vEnceVOygk/ayEYE5MWKbz8pwDQZ9aiu/1BQ7cvoTL2vaSoxb10fwYyfzAVc5xG3DuhUvuvf6J3bilgNi51AmvsTGARefHMs3n7EF3hzWr3rM/OHzkXFqA8gguO4GAfq3kun0cm1FbMrUawnE957hXdQCQmfllyRgNw+HPjwkJDVHclX1co8kZ4fnroGvao8D4Ho9DOqwn7bAoy9iy+E6OmnPu5N8gqPqpr+6lz7y+l78HlpwdNhc05dxVVz3+McG/PCHXX05577+mcVQc4te1ot20JFvfBGzI2VcOzLvOw07LZIECQFwN9yXtE7mirUkcI995UmWo0soBwqZeiDVIUHGnIfPIug6OHfOTkeb7uVdwibE4euGhbVqNvVAiC/jT7vmenWX11820NSv1/fih191ORhwIj/ZuPRnXDVebRzhL+uh2sNf7us/8WU9uM/cYbEeie3McZq1DAyQHfkEbHKYV03izAC1dZRA5fMAdAnV/tZszFkkFmJ2c23oZ9VUqr3kfnVHWNkUR2IDh+tdjla2xM+cmHK9u07Zo/irL+6q8NPxiqxxZbz3+pcH/HWj27euthqjT1BgdaiXa+49MvfI77CYdy0I6bpbEoLMqtve4f6migSuklUNKJ+EJ/4q72fiRo7YKEILEr+sOyxE/NShn/SdMthKe8qzhk73lzjSljgSG/uud/i6Ak2bXlecrtf5EfzaMl/45A66aiTGlfHe6z/1xJFzt++rZcerup2e8YH/zHFaA6DYTfjqzpUyyNJ5P2pIIH73DAslO3WXGGxRbDzy+lgsD8y5hr5D+10h6GeVbO1rT3nXb81iYBaHttxzvcMnlyt82hBHte2+8yP4tZF38cyZ+87GlZju9Z962s+529d/x6u6nd5ezrWxd953GnZYyzvMKgG+21AYyH/kkEB87xke3HxK6RLD4Td2dIgdX7wC2eC6g7BVCPpZHbBqT/l7OBUHNnK43hXq0ScAeUj7ef0IfuxkDuQm85a+jCvjvde/equa6vapD+Q7XsWpHvXksH5XNaHc0XnfadhhVeJXwRmUcqsvj3a4uktEAvF/a+TrTL7KZAza8DBsPXYaM/oOC7ErBP2skl3t5d1v9eir3zqLI7Eh4/oWvizQajcx1b36OWWP4seWT5Y0wPw2P3OnT+PKeO/1b55WNdXtW4ermyQ4ranMv3q5ZkyPzLdPww7rGShkJLmqe5dkfyt45c+eJXCVLP1RgD6p1G/MM07ltbtKTDaT5MVCRL8O/axsEkPlWcydPeyLo3IvjsSGvOsrez4hrRr5vf8FWPlb4Zer5EPsHX/u1Xjv4S991xzyudvPZtM1KPTEkk8x8EKMXUyd771rpzQAwVmYtYtbDOzTCOp+goU0H5OQhwxIe3Qkxs4WyaDILGzmmqAuoXZr5CvOtEcs6DssxK7g9bNKtjynPXGwl4WDP+SMq/oTRz3Irld58csndhMH+4ml7qlf59TZiz+bNU8BDvJmvNWWcdV47/FPbOZC3zmv9sXAWcgaIx7PCvjznMg3umeOhxtAJgEyOLAOHscMlj2SlEEp50xSkJMYH+dq0CtitdPNEmjCtuZV0+n8Eo/Fhk2w8uca1z79EI+DdeS7A6YfZLohduRyWDzsEwP6zMqzX4ePz+BF3oOxhU8bnT/jxqe2lL81d/a28IsdmVpX5hs8ecjUqfGC7ah/80Ss3Vjtg9WaQJdr+eYz2OrNxHiQO3P0yA94yIQDvv4BGNIzCZ35JMvC/sgGYEFwJ6jFJN7E6BozsVE8yQVxewAsOmQcJvzMBoBtMPIEtcKif2dizScuXxG28KnLTIypj1/irAWcOlvXe/FnLrKxpm0PGbE4VvG6v9c/8olB/Zy39sFBrYmRc0Mjo1a6+nvaBpABP3Jt94UQCKCwLOJVgh/xN7rDwDDw9Xl+HNQ7jk8QNII9Tw6TxGFgGLifgYdfAe53/b+aNoC52/8vL/NpGLiSgadpAL4CcNdn8BrAe4/vpFeSMLaHgXdl4GkaAAfeJuAXIny+9eXhuyZu4h4GzmDgaRrAGcGMjWFgGDjGwDSAY3yN9DDwUgxMA3ipdE4ww8AxBqYBHONrpIeBl2JgGsBLpXOCGQaOMTAN4BhfIz0MvBQD0wBeKp0TzDBwjIFpAMf4Gulh4KUYmAbwUumcYIaBYwxMAzjG10gPAy/FwDSAl0rnBDMMHGNgGsAxvkZ6GHgpBqYBvFQ6J5hh4BgD0wCO8TXSw8BLMTAN4KXSOcEMA8cYmAZwjK+RHgZeioFpAC+VzglmGDjGwDSAY3yN9DDwUgxMA3ipdE4ww8AxBqYBHONrpIeBl2JgGsBLpXOCGQaOMTAN4BhfIz0MvBQD0wBeKp0TzDBwjIFpAMf4Gulh4KUYmAbwUumcYIaBYwy8XQPwZ5b9EdJu5ncKt34mXBv5s9Md7fnz0P5UeCf3DGv8AtMz/AybvxEJx48Of16OPFw9MtdX+zrT/qUNgN+I9ye+VweNn//6iARJmoe3w1PXwN79zr02bjUAi9nfOxTDM87G/q2xydkZDUBbH1Ff0wAWlcOv/VpczP76LwfLBLH+UYfEw4vPbnAn5G5t42K+5/cJLQga3L9hmKN/A9a9GK2vj2gAezE9m1x/Ck5EWRtAHiYe0T5//vxPgzij69+CfqsBqA82mwCF9OpjGsCrZ7iP7/IGkAeOA1VH3efgXTnS3y0/3sU5HPkqoI2uMaDDXT8bG3Hzft3difIuxf6XL1/+aYhcqwMv2LUpYR8cq4EePj3Y6KGfcaBrLMo56zfx8ZTmfv2+gEa/x98Kr+v6y9jEyMwNpPLA56wbsIsz57SJv2oLWWLwKVVMzNoEHxyaX2bk3cdGN47wk/Hm0yj1kDfQzs/RtR7tUSsb8iZUcqtoEocMn/cOicLH3qHOKlHVjonO4tFG9UuysMsfeuxn/F187lPE7HNQWdMvaxSPB5+9bBLdq1MeVHGkvfxCkmsx4Itr/mwU7umTz9gCr0Ps6OtPvKylP3VWs/46vjmc2kVOWXyAzyYAdvaUZY/PiYNr95nZN0bsZXxgtU6JD3njRJZD6T6f6zjKj/UlHmb+8Hn2+H+0J3uAEP8yqbpJ4pDrZJSts0SRvL1DnS5RnQ3vaswObaRfisA4s9DQoTBNZtphDxvq1aLLPfSz+/NfCvQoxhw0C9e5zqEO+2kLGTGkPNeJIe152OQCHLV5p7+6V/34WX/YdegDjJUHDju+2cNfDm1V38SuTvpBF1n3Mo+syxF2jd859xOD2I/wow7+ssHrK+0/en1pAyA5ksZcEyHhKVMT8miAVT/JrXvdZ+VJuqNb43BQnPWAq+PBrF3cIq3r6FGAclMPLPvuebdmDTus18MgDu9GtdloSzln8WX87jF3hyX39bfiJWW51l/WgXyDsePBJ54ak7Zq3d3CJO+Zkzzg1R64cz9juoefjDdtXXF9aQPIOwDJ6zqYZFuAHblnBn6UXOXzAHRrtzCuCsQizU6vLXUoom5UzrLhdlxjY2VTW9WP+Ii5jpWtlEtMub667vzJNw22G+5njpDTFjhzeCjziSb3uZYPm6uxst6Nbt+1Vf6w0/Gziqfz++haH82jVv+rb6eFtOymad5gK+Epc+Z1+ttjV/ksrm6t2iKxFACy8OCduRaQRYpcHRZQ+k4ZOUOOoTzr6HR/HCL1Olu5xvUWPhv8Cp+29CdO17u583eL79W+tqpf8cAFMt2fMuomtx3ubv9eflbxdH4fXbu0AWSxrR4BU2bVKU3k6rH2CAmSS4L3DH0nfm2wl4NDj5zFk7N3nepX+9isw6KqfpTTflek7m3N2mFWLte43sK34qHa0LY4635+7vzd8rPa11b1K549s7rMyider7v9FS51nLWrr7166j8y7zsFd3jgEdTAmLvDy/tcynSPwbj28Pg4dgecf1QkF797hr4TvzbyYIJNWe723PWRI6nE2RUI/i1SZOtQJ/2kjNxZOMrTVI8ObVW9LXxH73B78tf56/hOnKt9bcmPOsa6ek1SLme5XdVNt38vP6t4Es9Z1/tOwR3ekhBIq0nApIGakO4Lnjtcb6qkz03BjS/htJEH0zt/Pimk/eQj1y1SbNahTvpJGXmTWw6Ya0eKG5vqpX2u9+Cj8a1GYlrJ5Hrnr+M7dVb72pIfdWzUW98BKOtsLuCpG92+a0f5WcXT+X10rY/mUavN4a4mOewmAlLzDltlz/wsuatE6osD5Hs7d/Mc2siDabGx1438PiT3t/QsoPSTuh5a5BxiXuHwS9faqLSlHectfMiYQ+x2w7irv06Wtc5fx3fqr/a1lfygJ6YVrz6Z8iTlTclcrOpmtX8PP6t4Muazri9rAJIPYfWRlMOV7/71gBmcRHQ2lDk6p81Ol4RTzCaO2SJQXhtZQD4BEFfefblWvjtk8oRMHRZV+kkZ7WWB+9jJXm2qyBlX9aetGusWPrAYG3YTB3uJpe5lHHnd+dPHiofVvrZqc8qnEmov80X81mb6A78cJV6vV/tiO8KPOulfP2fPlzSAJBjSPOAQTTK8S0FKLdIaoMnovh+4hyh1TObWDE5iqUMbmaAsAOJijz/t+79qPmfBKYPNOrSZflJG28jl8A7HPjGgL+esmY/UkWfljXsLn/qdPzgQXz2A6nVz56/jO3VX+3JuPhIH1+JzXw5Y5zrzZC7Y68bW/lF+VvF0fh9d66N5wGo9/JLsLNkc/CR45RJ5dLv3tXuIUkc8dd6DTxv1YFIEPglgF1t89oBaYFmIXcHLhUVV/bgvdu27ziwW+UMWO+k75cmb+JC1MW/hS33s1tgpfBtJym5dd/5WfGtntU99JSauc3C3B2M2RzjAXq1NcwE33bi1f4SfVTyd30fX+mgetXqSfjaTmpCTXIyZYeCtGXjqBuA7JF15xjAwDJzPwFM3AB/feEybMQwMA+cz8NQNIN8HeYfi3WjGMDAMnMfAUzcAvwzhiyy+0Z3vAc5L/FgaBmDgqRvApGgYGAauZWAawLX8jvVh4KkZmAbw1OkZcMPAtQxMA7iW37E+DDw1A9MAnjo9A24YuJaBaQDX8jvWh4GnZmAawFOnZ8ANA9cyMA3gWn7H+jDw1AxMA3jq9Ay4YeBaBqYBXMvvWB8GnpqBaQBPnZ4BNwxcy8A0gGv5HevDwFMzMA3gqdMz4IaBaxmYBnAtv2N9GHhqBqYBPHV6BtwwcC0D0wCu5XesDwNPzcA0gKdOz4AbBq5l4D9GMwH88a8R1QAAAABJRU5ErkJggg==[/img][/center]Con entrada 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[/img][/center]La función de transferencia tiene la forma:[br][center][img]data:image/png;base64,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[/img][/center]Donde:[br][center][img]data:image/png;base64,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[/img][/center]La función de transferencia resultante será:[br][br][center][img]data:image/png;base64,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[/img][/center]