1634 lines
581 KiB
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1634 lines
581 KiB
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url: https://www.scielo.org.mx/scielo.php?script=sci_arttext&pid=S0188-62662019000100211
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<title>El karst de Yucatán: su origen, morfología y biología</title><link xmlns rel=canonical href="http://www.scielo.org.mx/scielo.php?script=sci_arttext&pid=S0188-62662019000100211">
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ZQUwCeHVsJmUHNbnqPGtTbn3c7Nv/9oYzC2g2t97nv9w+uBuuni39uXGYxp6UNfdltSXmsDo9NqIdk+j38t38+Fgb6ZrtDcR3TGAR4R0U8gWbw42Qx1UBVqcW0n9eXfdcXldlWOTdx2cDT/fBe9Dj5iNTcVyqVkBstYhRz+QQcgmM+lMZ2YYRsiEfnhLqbb9g41rGvkygI4PBw9nRsent0MOehqkKuJl57EQQGfofa0GaCAtHbbu6c5tu5/cvO+WUow7zs8tsl7yQ7NMWCd63AItok0yErdDXb9Vv8l6P9G+1uiqC7RBM1TGtmbrti87uvEDoJuAnkJPGaS38lG+EzLwiHFb4w4iierdO3c81vmEGMfVRdguW1IPpLapqc6cNKfR6xxeIusP+BpWVtTcs3VNjc1pNLY0241MBawdbJhmSK6/f7RMO9MoT4/q9GBJuro4CeOPBzGejMfT6Y4UGqA96LOVbbWsryxFhJpDElGBkYMIIz9AdHmA/uiJYuqTRV1ckwoJoTIQOZGRNj5pehw+hm6+l0/E6ddz9Ed7KZmlRc+8+8LT3VkAkEg0wNtKHZrV1atWbVz9M1l1q3xWjXyh407fSlgF8lcn5aJHlxHlBK88UYzMRJfQ7B3bv2/H/t98/BQ9a5RemHg4dBj2A/3qVlq07FHi0HjQ9pgGLBvAXOAERgjsuK3zDlgIeq6Vczjlki3yj1bLhKyTi24+5/pb9Ea8jABxS1yqtCT/9iNF1JM/rgO/4BcDAttjHTGRgzU31qiv3sqD18H4geG8YI672jHFgrwkEKDfeI0vbb5WbdvorASOOGLORGlQk4RYKBSKRoFNvhreHhxTEjDiHa/u1mdNAieihSUgHdDdIWQhzIUDEsc3p+szq0ZYXhBEoLpHBT4VjiQhSVKOpK00gMsKsAxXb6rWk2Wb1Nw++qN4GZd0Rex8AOsDC17W7ff73W7g7ZcT+/UbdqrLdwD4eRZY/McAej0YMZFo2/aiPDdZnJ+/QheGiCSGhODTtBPhgZfo9xCivwlhkISQGApBFKK+kA8N4QV5AcinImyCICUeowgvJOqJOUt9gHnsZxnnxpZzSZX8PbkU1PI38XMM62V8+FulioQRZ8NAFwCh34Zq+Ztq03W25QpSRVxxIBhRSgG6RwmqO6eL6Z1hBF3Wx/ocFaat9VUOm9HgcHt9AQbQBklTCCIwNtrRRaZ2jTyYepIP8QpU7jL3VuHvfRwDtZ66RoSMuqxluDMZ4UpL5L/RW54t+jWNFdM3qaSTLRqvl5e89QELqxSQgMAJrIg1i2qUa/QCWkRKzECIQDAgMCKZK8pFWJGL6aLTfzi/JP8WInyhtgT83uMH/ms5Ar1fcEuMGAgzWPEgLIlSMJw/8PflvEQK4MtDwhFx42INk/ljWC9OOkoPvlicX3zsfJ1Ds9lfbq5qqGzYsqppZfNdzZe1XeZazTbBZuHS/nufaM34Y1w3kCxE+WxwNjE7MrZj76Mjzw7Rr3Q+Hz0Is4SqNj69sFQ2Hn9CB0k+I7SHtiUOdr+5jV7Y8WDvWMdAbnQnejIOQW7E3VMP5QSqHMvr5a9sli803q6vMtY16RtczoCLdcEmqB6F/aQEZvPLd9PTjEWUzzt0j4V2DWNkL5ct6nvkan8bywT8/oCfczJ1bBW0YkooIeDD/wBPmIkB2QaTwqPwOOTYnZDEkBFFQQpmseIHAyIrkirNVt7Ku0WMTQGtxY/R7+6glz1Fk+ExhRV4MdwY5aAc4SCAJ6pat65ig9ngtjAG1oLAiokQ8OnR3a4Ql0Kb6n/jzFEuR6O5BS/NTM28tXtLjpa8ce2sdr+K1tLf6UTN06FtRzKPCxEM7Qh0enMWdLPFyjEswzOSl2j3OYMuwQ0uUFIp4ChvXrqWsQAbgQ7okDoTo8O/fuixhxIkIkT4MOyFwc1wL1hYc8DgvtNaVbupZlN55Yrq81bceHHDeYTxcAr0BCRGYEla04F1DNkOL4SFUKQ3nIzHiNZ6XTAYFqO42DAXYTOBlHeihWj3XrejscszxBJRMwYjqaGB0eHBve2HgmmW84VIq8YKwPkt1vXVW7c4/ZwfbNAERnFlnGjtzq2RWsmoWA0w1EAMBoM9I8PDo93t8Xg413V0ZtfwxASZyGXHIzulDiGDnPHdO569AGrA5GuytzjNNr1+y5b6Nea7iLsRy5KZeOZV9jaPlZboc6++Q7+6+9AUvTlX9M4H4szjU/tej7xYTIfo8zqvxMZKESb4OAxzIvK5AXfKANXQGLC6K6132htamtssZqfBQ6wBG2NDo9WO+mYIJ6lHpN4umGS6rViu1kPbFliNxnfxvtSy6Y0voJfwxWNgY9F4E7EQHmmequgjqZD6waHZA50PhbISOgbSTLu/3fzAmokb8Mj3GyswhSo3uNcStsClyMbe5vHdO2am2505O+Iny7k8TjfHhFwhF0aYm7SaWpstTDRTCu3BrmhHdtvU+M72jnBWysAe6GuCtXhJTtZju7TutiVm4uPc0MBVILHFwzPeFvBjWULcunY2NJv/LfLmha8V05B8uU6wJOydCEmpUCQSjQlS54sk/UwG1L18VhqOJyVRxJiXOMEddyWBdwRsfn3AjBfMYaIQQdhFl2DOZKzxNrCDw+fxOF0A+kWO+90VwHHgFexBsrazJYT80QY9vWpaTIvfpGUP0csS4x0PS10INyKy4w47eqIeHCZvywq57QL5F/K58reIzbbVCm3gTxtFNsQIfEd7NpXlp5CAdfpnzZ3eIJZMwrJb5HPQPiX6Xb/5gN6Qo6f+/jKqWfC33TTxhvY9uoo+qEtq0ni90djYzumBPTAF6RrYDM2BJtvdbTc66lvr9A21xjov8XI+rJaroG7cP0PC4rzhwaGxHku6eZVlwz2XHrzvhbIopIQQgms31dCvAS2Dhyy5hqHW7oYk0hOoMDYYSPdv1PHdsW2AIIp8mCXaj9NMJ9uJeBbnY/zD0WfGt22TpFAGIkT7nugPMqVKKfQy+MH15vUeZKuwPl7Xjr9UCpmSISxyAzZwqfwHrPuYpghJuNTp/Fdzz73Tu20B/dpRanxj/fvav9NIXqMDPrE92N734sj+6YmR/sHkBGyDWAtAk7ulDSPd2N7WCyQFmXA8nkoFUzAC+1q6NsT8vAXZPnFq1vrvbbl/y5Jlyy+oP9OxwbXKt4FzcUYww82p9UO13S1Dtp1ApmFnesfYY/u3Hep8i2iPS50CBjcMewdsQ/odNUMrgCxZfRtfRq/eogMra/I1+pvNN3hb2u6yNTbpDWaDtxHKwTACO2As85v0LBl4eee+3ZEQ1sYwXm62WWHQ+a6x3jeK8p58l44Hxud1LpYXXiRfslG+1G/GoPbwhnZrH7RDGlcSi0mR8BB5lDrfoPdhgF0ajokKYREDEisQi6YFI9hpXXNzbVM1Bi6yLcETDEQDQ94dgZ5NsA4q9NUthEuPScgDWSEg4VccWGlZBO6FcpvyBdEvIJohv8AzCijXeF4MSmEy9sQLv3odfxT2t+s7mxLubpSAcSGCNdiwM//BjgXvPTH7S/r9F5lHtR/lLz52gU4Rcn7uEts1NxiuDJg4JxiFNR1Nw00k6bR71bdW3XVf421uPWOCFjDy3pC5Y+XBLS/BALQLA9HXhp55Nvtbos0LMQjxGXimaXTzKDFmeF4t8r2pOMbTR09P5x6Ax8lLy6evKuU26vYN1Kwqgxq3xdlqqqutqTL6Aqh0eY43pfWd5ZMByZ8IxLAAxskTRw4/XSoHj0s6SIuZUEd6Nrd792gs3BEXgOzZqN6/QWQiVjx5yC44UQO4URf4rLfeuuxKuAs2bYcHleyjK3L5ku0LPj509/vr36Cmo9q/5n9GB5EdMS7Gbvi5cV1TZf3mysZKt4d1IzpZwCI6ka65IwgkkqDWvt0dynbDIMnaMi2bW+vWl2o/ds8Du+APOtvrJsx7YTfsye7b9tITD/1p6MPMg+3PwNPw58rnFwUJAh8WmFW+dc33rS7f0FpuXeZtCLQiiawOtySb01Wdxn4XSXm7mA4gz+59kit7mA7rEFgCjNl8duvP7lltMBhdDYgJrT0YlD3hifbHe/+UGOodJH2DQ6kx/FlHA6w7wazocvr1Qr+DfkN7hNro47ofzb9GflynfQO51qfksPApestsOX7qrROfkhfIaV191jyERSgmoGW1H6BoRNEDjKvObTZvaa6sqXE4A36lrifaQkqo8QJPguLwcDy1fc/AoeShYA+PlIBM2nurN1VXbyxFhvxtpRdSdCxD39cpDQhPkMjTGnkMnP/UPZDYYaBJZLXTmkgwHIQY+cfZ8j06cIX9Eb/yUzqGMCUJSLILFY0Je6QAuhsPpRzR4/cqbYYSNMHRqfyyqQW0gn7j8r2/nnluH8KsI3+Dbniof6KMC2MSSc5OgwB45Ql1586hbYM9A92die2wHXqMsRrexzuwVtU69ZZWu8nju2oZuWKpuqXZXI25uClbk0PKsmOka3soLiUwcz/JYnOBuHn0frfD6XTanCZELCaOlSsd7oqnurvp197o7iZD/T3b4lNSWkhhxX1+/YGfK7ZEyWGDtoDDbwu0Ouwecuem+67XX8F6sDT6iD5j7SntOX6DTvvxwvklh52593J5Df6riP5k9tWj1P+bh2eL8/+gS3WQGqPfUXe+0P4oBmzEyztKPZim/pjam3UnsX5lGxM1aCkinyZ/Vz73ov0/f/OJhw9xZehfVLUcKjRfonXAMopWmOgZnB6aHflL+Gk+XlDHzxgeqNlFNu1fPn4x5pYHg/lGzw1Vd9xtc9TVOux3XLPpQsf5nAsj1kJgeWRLV0XumiOr34E+GBf6pZdiv+p5djwRkoCJsSEWyyhpBldAfWfzreZl3lbGyLVBIxhEY/jqgfteBloE9DaqpYvpqQ9MtE9E0LtYnLg4+7blsctA/ga6xs15mUrX2raV5jvNVa1Wj9/FeLE6ABfkO8hq+oouac/UIZNmXRvs95LWC9TN1c0NjRazy+yzKMRI8Aab2m052Ae7kwd79ww9PD29PUpEHokEXnPcm7KRklGYpZfO5suRtC/NFdOLBN1OGMQITQEvSRkxxSPVZZGUusDAGzDkQeJDYhBVX3owM0JGH6TVEFyiFjbyChkx1QWqMN1Fv78NazgSHvCKXBJysI3fDmQHJvAIS5IaSYp2KcqioJPaNI2gF/ySX+SNRvoXF73JTc/ieF9IABOGC5Ze1K8My7GE4eTfHX8P6wHH+Bm/oa7etgHZoRKNHOdtxgDziCzKiD7oErA60ndpXOe/YN6qcuDLfk3PVb9AvxNLAyMF4vKE6CUlXlz5dI6mZxfkn/1w9V+1H9CGYz/R+Y08F/GRDs0o9LFSADhFCYNfLj2+n/H7HG5mDWcFG1KqAIuCxkpQDAYUdocf5ASfi/sQyF80tJJv40Yiv+9+6Ujvr6SU0I7c7IWVe2+NE6cQF9UvdT3/QNfTRPtWKI0J3qW0YtmI/cF1k7cmiEOQb+Pl20CNMpgP2Ej+AnmeDkHaz7ptN9+z4rY24mKv4dRLGBDKJOkB6g5GxRCCBS/BBBr5YSyDIW7Sg4rtPiKfKlfptB/s9A1uhLvhkpXX3ag3eDlYDJfwShcFhCN0hA/yfAccwfICO5FfkpKgYebYKTNF9Ny/5FfOFB+7O+9S2EMr0nsv50Gh7BZACqBCySK3EsK8mH6884UBejIKtSCKMF4RYWgMNJDZbDSQLRVqrHUCK7XkKnrvj3p4E1gBUeQ6z7VVt6y0ObdUOGxLr9t0oXMx58D8sECD1BDU95/53I0fWUkIYyeFkZrku4JUPfTH9yeoKpTlg5zEBhkMuEITpo3Un3ORPF+ehyVwc7ZuuHbctg2eKhC9SOiR7jd6H+ze1799fILMTj838zL8Dsauh5+SkmkUq7+dLTp25TvFtP4/9rubexfI2xp6OZ+CGL87siO9c/Dh3KGHpp6aeGzgl/AW0DOueVsuinv52wGvlMg3aE74d/L4MR0E6Q/yjwvBOUcGYYQfQUY4ygXhNdfelXAB2h9lI/FtMFxqXVdz4Zpf3FS1ttXA3gykRlNTx0tlJdUYy7nZN7DkzS6gF71DK16kp81WPKP9x6On03YNVTSjKCh/gkkx2vNQ32NkhmrUiOlB9A3v5ZUmsgelM8MCuJobbzVVtDY0VW423uMhrUwztwSunYsY6THKhwfItGY3pLkE0+WPeBB/7Eyb3xhoAwaFOkrJNGB4RKMB7zg9g4zRb6n9EUEwom8xVZW/HtbjWGPXGx3NDj23AYhRY7ZjjoL0KPUKkhCUhDhGZR8MoaB6hItyT7o6WuEOMHP6QBPR/hfrQmQJEO0/wIeaKEDaNdr/yiibGSH8GS8O0aq5lgFiixzRyC0oVxXqzjGKmOQ4pPN+gRuGAS7JhVkR3YeaDOzywuPTwCmOXs3Vg9JBYAN+I9Yl8EuMyJCS5fwM7Z1994SJ383/cAbt+/dned0kjPEPw6OwnduJyYdJIfFiqAevIeJF2zRBneDkiQuhDhNESD3c8UsySrV7QH0AZXzS3x6IuDGQHb7NfquClpKyoLnlCMHHaVgxutIUIFbEySDrN1pX2Ay1LosPFRJH1sAo1ak7nk0/wguCJIkxhIExfhyV2SQXgyOBQTMsAQPnDNSgQMAMKxju73gehHTFcMc/Mdzfv2i44wElPoWA1W8UIOwlg5oBLvWpuT5vrS9NC4JInCoteVw/GzBQ02z+9JkFiCf0nXdDM9r9+VK97nV4Ymznzog97EpbiNYe9oY9wQKjF0SAQ3QDBEOpDsx8LBahEHBSKphFfRYmbo2BrUBttgHuFTag0gWWYeb8dMJN3Zp+GGLjbIwTWOWHhos9ZqLd37rmzpo7QVbBbS8qhbdDyIpdoen2R9IzPU8M792+Yw4byO/Grv9p2f+PaEfkCz+Qi+gPSwtleNssTcwWPXp6TNMnzCosG3ayO5CVcGKw40QhDrJ8PTTwLSyKBZDCIwN/wwT7Lj0d1G/uUpr2zK1ymmX+exSfsM6/O3I938pAkkCYlub3SuFQPCrs4ckQFuxItlCwldhwaTwsXgSQ1Zq1cC9fxRP7CTD7Fxi6Si53VRD5dI18iherFs8nD2WexLjlmIgUlvrEccCvfMHN/69P8RlM/4vslV9W8B7L2sFjah0E5LLj+1n8vJPBJKpHAaJmGW/rp3aKawbRTnsV4sTuVHqNPIaBiJmdFhMgcCITYnkDEAO08G7BjQiqJA7abL8oKU00iQ8LHcIQP6rohiARFDgQQWSwaDECAy1cLVcJW+B+5NkbBYcSQhwJMJ8HKJHLAunRdHVxzrISeZkhd6xopuhlOr84f+cxpANG+ZTjrazftGrLxgqHn/UiejeCMWpP+kKeBI9QrXRzyKg0MAKTbJ8p3QTk/qbK1Tcf3PxSWQzFcZh/M/X0o31Hgmk6P18fjAVjYWEcERf1dJQPBVMQIhE/7yqtgTrufrzO++B+wa4kNoeXyQasjBVPwQheAfqBbN8FrrKSh9C+Qx/eP7tAe/CXvG4KpvhpmMHXJIs4EwpxTDB9wrkNmka+mcWriIS6008m9sZ3YN6HackHPJC98vfUO2R1tAVP1mZx1yEB5Di/nrEXzufnuQSSye38JJAcTGCik8QngdPFsr4IMWmqeEfQleHEDZRcSRsJE337V+oD09M5Hm0iiZKUG5pK7wgSbZfS5RALmxaCAoHdgD88CHEf1hkXV8/VIMZUCVWIMRyueK5Pjd/yhgPR0iQbDSiyDgtmwO+yOeRL5O9deO2SpRyQKXq+eoCqEjPo9E+yJ4gBJCU/RTAltOv/N6H9L6BWYhOlJZfC7vybs0X5F/cVY8l3aGgEkUdEbvdbKinb6YUOerXG78NSaN3yw5pbzm5s9fuxqt6hdBAlEGlZ/rBSfEPIQUhEyggzfK4QvsgZ+hSwC/B2BN513BpYDWuhUiC2/zAl6bI5CvYcr0Oygz6dRN8W9AG6lJHSJ1xq0dQJ9SEYBLHnjzvptQ9TR7gPApJzz/Gjkhd1A9eOVVfigyEi8K/S0vfolYTeTA+rAeTvHd/NBv675U5EL0ZTXImjHL8LdmGkTrAk9cVTN2gaeBvvFRie45X9mTlUDEYjQr8Q5dMQVYALxcxn2Cgv0yhbWCzKlSXyNxbL5y6Wz1sin6J01+/LzyhUkRU4BIEA/BTIef9HA/rkbx7v8bvsTXWuCrbAnfDqMQr9xCsxsULFUKyXP7wDPR7VdAmosvA1yY6hPTgp+Il2Q9CxQL1iwgEi0VPzwJf+TZ5WvyXHo3VRN8loOgoUAPhx+q1t9OLHKJeYRSIaS8RjwVSkQ+rlsfx9oQB4NAGuGZo4C5g4E1RDJd8oEOeJxSANZCX0MKB1JmFIoYcOd+V6eckaeaXfzImE4zfRk1fTM/DvRnoyGgMF87lALvrEGHoEAy8Z0wxxnZzAkZvlPvVKudWxhvHNmcKg7GeYWUWcM5+E0mH9zmPf3lZEz/kwf/P7xfncsbt0P55Pz5DrdAggNs7jX229zbSi8aotS9eurajY1Fru9mCFdyr7jODjyU3tG5+G96GD7+bjsVf6fjv0yMxbzz79YmdSTAoJ+CPsuRZ+TAocO7KD7kHRoPlr8WP/szIdIxAND/T8gQzTr/4G1H/iGW4o/Gr22cNjzyQHwv2In72+HmeXflf54MqYE4uDvIQn8o3/WWrl7cdO0e3w9JnC9bwyLWHnjKzTVWG/29FsMLS0VFrLA14EuC1AljKFgow6UMDKJYmKjBzmJ2AfKq8IisHD8j206PHt70/mI4p5339qiv7uveJ8pVeHsOhk7YEtmFmtwl1dNQ8oKIOR9GBk9oHhtyO9QhQkwgVR1yvjMwzj8ZucZpvNYDDatyrzN8DwDWFHj/8w4ULxoPrI6JHH9jy/97mhV0OvIjDHMNj2+kds44GkbcAbrzpwz/jSKPHyBh75lEOz0n+36e6t8rzr5JPln4J8I1zde+OeNTs2PqB/DPbDVBo4Ip9/sDBOU8qBM+qN1I5ap+EZmBL6Yrv66Sm7/vDoE3v3PTK0X9k5RMFMXnJM3wBng5k1sSbfGuvtbWtqL15744oNxOVl42r/iCdra7cm7aFmtNmG5feV0QtFnXtek7PWiSyl1RnvnhgaHduVal5fVtKhn7LM0uEcHZ5dkK+hJ131x46PtIbHTo9r+oUZUCJmF7sdcxQ+6698MV4iw33vokb45mOgfgyBJ8wOu7LNsBHsAYtjLdHudq4PuLHeX/tI1StYv9Ds/LbIxFTHQTHMhxDKIz7BAsSsgJ3bb3A2u51um8drwprjS8MY0RognKTfhS7Y3TxRmyWusPrl/qdmhx6Odwe78adPrXroZ50N4Sgn34CReNF/GIm78w/oUIB4vLVttxvrNunX6xvg58jsmhQ9KT5FE/yJuCMS9PODsBMxOcrtdo9Z4F5kbefodx87dVfRC28PvU6XvF5Mr6Zn6TBPU1InakTUtKiIoLBRMNeVZD0IFQoshBjFEpIyPsFHY7F4LJ5IBYMkGlMPbT7Q8jQqiy6pJ/ry6GMv9vwu2MknoY+k5kGKCwVSrl3Nw5UdTbGbOjYlG6ImVFLk1WdffvHo6KqrSqGNMzMmTmkMM8QVhI7SNIiiOhh8gBogAmEfeJVfKaNsnMNmtZCmenXL5Ia+5QrSoJ640nX1rdWXOut9jei/VT3rxlsyzgjztJHkXAMomQZsqVZkW0ZgWKft5ruX3W33sgpEXQqrdwZ+RUqCCPmvzS44tnWm5pfaI/Sm/K26UYVbQbS3+8n2iUy2f2w6/jj0QB8ncgLwyjwdWytrN8vnk5vkUbXFwrLXcuXKnB3yAH8zZqFP4lJIc/fzD8HD+NrJfkbF52rgJs1dfJvgD2LdUgboQnRh/oAgCiLPB4UgH4TtGM8h6PCREWV0biMYmAbfZqJ9g7FyDmWEhGcVvqw0BdqV+TsBKQXqPKI9wvM5Wo1Gw3oIPBtM8fIZQI4rfRFkfJa75cvsG9HIQkBgFYQf1c/mj80W0Xt+X5wv0esy0ClkguORqexYfzLW05tIDk50b0/tCne/SWkkM1e9yL8qXy52ObRABZTz9fyXFq4JGPaAHlovkD8M6NvurltTUU0qau43robboGInHIG0kBGzQrj3/SE670FqZJz/t5SM56zjZ7DIUBTCAj984RJ6EuDij52Khf60vKzrmuL7SxP/fAoLc4UymQZVfK1gApHzGVllmoAtbDKxiprIAHKbLGQ5wc6zCfnH7fL1XbIvfC3PivjbDugEkceDAv0w/5YUIt0jQ5170K0KN/68emGxQFk5E9eC4Uuw8COvQDT+nP0CYoBH8O5iO72ACMT5Wb/fJfce38gJBILl+VZOQuK3A9ezgA6/t+QPtOHtK36vPUjtx07VjXIRVvQS7RDP9P3jq3jtTpHtgo7ClfHCI/SkZ+k36VdofbJb4b2SrArJ3yRB+UzppzwX8rG4BoXJINkG+nz+N0IYrz0kSJn+4c7tQD7P8yHuR5JvRg7TiEbbAjXCp075bBFx6A/0+jEIlJmSQMAlu47fUWAvgb/5qY5oc27qUEcSvcFx/CgPmBGoD8VUMMPyBZbfxlwFtWihKr5pjhzxot/yWY+sHVAWdUCaU/Qfb+bNhK9qq1HLl8sPbbkZREWKTJjzWiwXIWUSKBztDI7w2cJQyOcdQhQ92crVcbV4sgpcS5XgKujJOZ12QiI4Jej7lDA+cXpY6EKcJ1OabbCbG+EKGkrRZ4XeowThgOgCM28Joz2RFmJgh+l1dD3PEZ57RTYr22QWjy3g59ycn7Mgq/YbT8jWgKLPyASM8/uRieYgwyEQ4TVLKL0K0pmfk86YDlt4p+CNsIJj9H76TbKSXiIF1cpZBKErNdAxHN0utCuLRafhYpXWEEYyE+ZQOxMbV81VoQSpFqsxRwQGT39CHopsFC2acSvbMz4sRB4mIH9HvojDS76d/gKRRuqMtEtYIfkgn+LxojIk2Fnwl0vjRxPWcEbQcwY0YyXf8BmlPUFJ+zU5Ls6GvWHvazIfMRHJcbZM1HffsXpFwF9TU2FcwRo54P2mE9TUGwpEgHxi9WOZY1fpNkK9WI+6DALoGm+hGecVmVg67beWgsvtYZQLvl8OKRf8M7pdaYgFg0E+KsX4DN+J6lySyGcjUYVWTBtzOXp+K16wkvoC5zecSH2XIpnwgpmQl/Bs57IJeR45IC9p/pHausKxlmO8Ng9z35f1iKKaiDCE3yV7NbOwnxvnPteD43hPiJg1St/DI3gU5I7wYnxf+4Ok/6/06/Q8NVXTH6QyqVR/32hyh5AqxCtGb59CS5Q9pGYwMhvRKufAvvyFBnovIvr6/fSBg8V0fX6VzhNjk6URPKbAi1gnQp2ZBzon+vsHhybSe8MxPgWP8OQ5cDvVLfXH1yPxQIbjNWJ9ZAq6is0CXQ20stDrDosv0wzWmU9wK6DMVfg0Viw17nr9zZYtrXWt9ZXGcle918hdCeQ2nvJ0v5qeQS+jJ9MzAEMv2KFQCAaPTOStGnkpogXLIqayyg7UrXKDMspz/GxZ3P73n2wven53Mf3LsXt0vPRrUGO5SUICvysiYGKC3g1kBXJgtccne/+rHFyAJQ1TgRXhEJAH56ybFDNcEHlbrWYLW+Dk1PT3H+ICPjsFfXJ38evyRh0XuBTUgYDHjkvCKFCmEOcOpFCRSIh6/16OECwwIsd/cvK5QLYzbbw/DWREkxOALeM42fRfP0R4KMn30iuKaJJ2Fef78gd0Z84vWZorenep7qz5Jc5c/pRc0Qev06o/F+fL81foTGCyB+zeqCfuilgS5lAjFrc2T6vzhspfXKlf7GsKtEArgWtyKw+ZE4EEm0AROJnJjSvT+wpyRNuCvrSh1zEGpBsysWRycDC5LbWPDyP0iCAp5QpfStfUr2nDpPcZbHe5mm1WD2aHW3QIqEvSuLqEEAlNPkMlyJK0OW4tXbJMJzmDJvAA460131AvzwsmzS1teoPR7LQjWDlQ7LlELwZvCi0woYyq9we7Uw/3/KF9Yngk29WdyGLIZ9pijUg6JedUviSHwRk3LqCqX9KNr2v/TBcfu1bnAdT2jhNw0KXp5hJsSNHXAYxBOOv4j3w1yPHMYIFFB5YegTEYiY90kvHuyVzv9pEDHY/CQfKbtc9dft/9m/hS4NOPZ48OUSJllcbTqyGf6EOpIpc5WSDZ48/qYEjK9vyRZJ4ORdW9k8OD/bGoGBYiKBgzbeFGQeGZZqhjDNZlbTc7a6xNxFzT2NLi9rIMxlc52HIwoyzFlcuXTBb99df0dpRti/NancuvNrjsBtCTlk5H10Tv4LZSZbyRDTp2ben+BSCkmEDvbfMuqvr5RcazAybOhTVw8e47X7BGWTQ3ksskn5XI4cSB4fHt8YQgsfgyZ30K7w14Pc11lU1b7S0uE9MCxII45BUqE5ZhFMkxiPKR8K7OF5Ij3QdzUztTyWCCx3LRzSQ9KScpRNokXaUYHcNt+ztLdmv/nL/w31l9lVyrDGe17fiFsl8OHnax6bJFjfJJZC4S/8+BSOYicS4QifaVuVgU20GZ7vrXUWgXIYm1MQoxPkReoofV2lefpInw6NwUqh/IJ35sll/UnT2/4AW6Kkd/nCv6+DVqPFRMy2mLLqn5CH6b3PZgPBPtRK9GuDD6YMfm/nuBMBqfshsHFq4ePfGz6juWmC7xtbBmRKAV2fuG6/qaB217gCTwMqL8U7GHRrbN/HdPVJXfV7/KTdwsRj7mBQYMX5kwo7SHkei28CChW+k3dbDFbKi3Ndq2+G5jDfhFhclE+qRo9sDY+HR7QkoI6KHRXkNdmYJDGybz+2apK1fU+hi97lePvFeMdPEjXUvG2p3rGZzatWVgXakPfMgKqr3VzeYac62r0nyOX4+KiSMYlxtK71eASAxYTnDfaU1vVtm1YO+TE75mxuxa79lCjOervdVIGx0eh9dpw7LUJoGYjqaSoSwvKRhBetva9RX6usr1E02zSrmAoNAf6ensGu0ey+zKPJvYLXWM0xvJAC07CId4daH9mjhRvFZptliVvUYh+0F4Mror2CNFQvFIoh2PEglEGLPTaIMGJXHk8hy9Opcvzi2YfdnwGq16R/sRPVOep+s2pQx1dc2Vdz3jfLL0FXh6avxAKBbNiHFepCR/FwZTe1vMzltA7/Q5CztDQEy9pvQmyYMSMABtrMFrchPtn6/cdO2PA/J8uGRy+eOWOCMgrm2HnkR/l6SIJACucSHjIdaKmqpqh83v4lrBxBsEP0qnj5BmQBmI3WkYxANto206vl/qST3Q9VpyrG8k09nd3hFU1K8EI9BhitWIbqmtMLW4Wr5XGYT2e/3e5somfaPbzSBTALLRMTpTVqJgxSew98qz8HLXHu0f/j3uyWcd/zW4+LaUvQPjMR6MRuMx1jdJf0wm6Q8ZZ3v/2INTIzOhIK+MAnZD3Boy8/5C580BdtZNfJtNSxuuwuyzbua80AarRmr3Qwq5T0R4qHP0cOfjQmjO70plICfS0lcYaw5Y7Pfb6s0mh8vts4AdAmFF5CG5CwkpMZbaRrofS0zFtxPti5ERqRcFwtP3526GTbDRWtNAPD41gvCT2V+N0K9JXUqHGyH4s9zFeHdNKoj01XcW0JJnB5+7891NezAG7Pl3dPp0W8/gSN9oqfavPW3p1tLaxvqGMqO8WGfW2FmL1+Gp1dettd7zTyPdMYwxXiE2vJRO7Er2ZzoTiXgoxRNtvl30WcvAxdoDNi5wkezhfIXRPDesG6488AVjEO1fz5mvzZ87/0Q+/jJH57+zoOa9yF6qe2HZu9q/0878n3Ut7ZbevvGesd62dHNpdWttc5m8FLEog0ivTiNdCrXH+hPdyUy6u7d3BIj2eCbkMJYh5rhYN2s95/i3A3ZXnanObLHZbR5lZD7AM3x7LIW6gXSbkoa6+uat5SjJS5U+XUR4Mvn4/u4nBannT4O0iOxFFtavhiQb8ifsow1dGxB7FFC4z33/xprbXUafVUEoCYV9odbmaM/byakTYTf24s2vjL5/117tX1X/u8jj2EF6Ekkeis9gCvG/s8CdmCFOsHibMbRW5MofwAuOCTFpINEz2Lkr2h2fgCiJBThz6Qmk1zvLbffWegKswuGJ3RvPlCFZ6IBgeIRo31FJyh08cXjsruEVSR9fGEcFUQqK8VhXtm9wPJdJdyZJeywZSotpIcxJvqAPkBQ0+Qx6qCGtnY7s9q6x6R2GwYpSPbR6Wq0Gm82+aUNDbVubw+3xmuwcT/bTcvU0vTHUX9hj/nxBKTm+BrnJx4qp3nzx6G7t0X9nJCKfdjyuLtwl6IWVU1sPwedZ1/+g0nGFSsd/UulO1DminVEu7FPCUvKxkiu5Ivq1l+gt+Pc5eLn4VTqiy2h6wM8FY+2PxAaT6VA0EoxABiQ7GJVY47yM8Rp5N1gJb044FfneEY+khWB8Z/dvx2kp60t29+4aGBpub49kg2nlXpaIO+KQXLwblH11H+tkLTfJnWD7/NfJ3Pcn6A8YV3v/+ENfjj1kDnwQe5Y1XEms5UhtmuD+0a37YQAykXRiuGdwpv3AlyOPpYA85puaNlYgq/SHMPaUew4lIS2lklM9CuTsIHOAQ0LzfE9UjP/8RPvvfveGpvrNTISN+SPm0eqO1bActrRWVxOnIxBTB5K+qCtuSRmjTYJbaZFzW93NNcalPpO3BT3oEwuNMPmcAkwrpg4999cCSn/B1PHpSH8kE+2Ix6MCETXpkL2Q2G4WD2m6znDJVvlMxgm+/25x8m9M9kW4/v8OrD+B6nW5W9E8FS21tcRuB0mNEi/ISTYElPXQAlaXzdrW5jQ4tvraXJWfAcqcXkG+y75RTOvyOt295Rtusd14gseed/jGd9BdST4hUt3A2/R7QOfDu784sgjIHbCmsaKO1Mmdus9T1b6Hp3fujio37YWQpMV8KRvSbyNUE1hrWenYZP5F06bNzQabEXXofdC6HSl+iXzPLC0tpEP+5te/JA3CmAbK2mNOvCIP6+DQ1chYq+XTyCb5UtMSNhBw+9k6ronjP+smzGnziKZTGEUiOwFT7NjciGZ7MMtyvghp1jTyZg5JqRgeSh0mXa8LAXW7Oe3sUrosyC2mYCA12P55MQKKGAFSBZtMldXE41G7xmt6Nor1YPdY2r7EtnShfKXuAN34bwWJ7W5vs7OZ6O/bvKkCq61pp29XgVGhXb73qZz8uJianLpJGGzv7SDRsPFKteEyjvEFfAE9U4eGAfAbPmsrxWAYhvhZZUpxiB3F5XBftvLu3+2lq5QJtRGlQ+IVlXv/6qwOjy/g9fl8xO1Wmwdau9adUKxXbb79p21nMxbOikF6yZ4lrwChF+dJgbHvzJ8zh2amR77gwY7nkiOZuCQq6ZEGyYpL/lxukS9NrsRM79tknJZF2tUDB4eHR0MKMQsiDqJrPMAxbIA1e2wGaC6Uh4m+4ckDqwdXldrAxtr9ei9SUgNxONTO8dredcqNhxDgKt1NtQVgaP4cMDyAsV8yteCl9/TPv/1C/QHt8/TX9BWdaIrau1Hzd/dPPnjf0IqyO6G8qWlrW5OtATYio3RFrFFj0pZ1x3whbtib80QCCQfRvhVzSk40S3Xr1lqLxWMIGKEGGmPWDH5KFJF+SkJQIB3R9k7oJb1IiTcbazeXQhvvCTtixqS919Hj6vaPwF7YlR4fGOobOwCHYMwyaO4gLd1uYV2sPuQTvGGifd4d8ScwkuNiIpRM9XdlpqALkoG4O6jMxbHE7GpzKIT8+Cl53WwRLT5a/CdM6hnNLqWDAUvkoaZ7pjYfLMtCVygb72sfGMiORlLx7lAqlALRL80hkDIn6rMS/YrqjTUud8DO+QSHwKU+1XAv0AN/Vro2UeUGrLnO2jrNBqUNIwhT9HyIchl7wgg2cHi9XpeLY/QXEdOVa0F9Lyg3xcxty2OKzvlhSYE3Lnhxb+/RwHMvvfDqrPY9JYTOm6/92F0baERRet2uDS/DDPS0D/SFQsEgD4Iv4gh5021ZTz9LeqErkmzv703vjM+KMaGwkaVMaZ5A0zYNywaUqTPGsd5vdzd4rE6XzxfgPGDn/XFcU4xPCjEidj5PESK4DkfchFFqdnosAdcSeUbpZ3tsboepudW0FUhNW+9MGbQLHVJnaCI+MfA80b73k4JkLSyCnnPU/xw943HtW/lv5k/XgUvyRN2dhqiRbwAz5/S16C+p+f4dZh/nxXJQDm3DMEugU+wO9YUH4+PdjxDt0fPna9/a/H1nFayDq2fWvQFjWGCzqXQi293ePTTb82DXa6mHg92QI5PWyZrSmqaa5rKStSfOfu5R33PPv0yXP679c37BLp2yUSQwIoJwxNdtHfEMYeCkhIQ0ER8a6t3XOdU+k32FpJ8KZmGqcDTlYKVfuGYsA+7K1kXmdS21FqPFZWBRa1e1DE6VJeZhQgaF1AD96iQ9Ddq/YDfPSlkfMHBuzsG5CFj8LrW10tRq9DKFIfe1YB6HPRDn40IiNB7PDR4l2ldx1X/evNC1BZPssr3lbwLZCwO92SEMDyiUqAUPvX/lLjr73tIZ7YP0N05dF2SDXXGE6IHO4US2fQpiJM6wptI28HnVwLibAy7Txtq6Wjc6Gs9ZB7ZOhMQonjMmdR+g66U4iQ+luzuiYVHZgBmAiA2DvjA7jz4weKxGzCIFXyZ7h6f2bBpeV9oITY5Wvdfj9/k8bePV3WugGloczabq1rq1jo1+i4CCiGQ03cByYiKCV5bJdnR3d47BIKSMUI+MEnGPabtX3hxwENvG1qYmTBBL0BdTHi6RjsRTwQ6i/d3nJXtr7ZY1O+p2l87AwFDnAMnWDTbtQe4o6+XyKXrhiaSpfn8Dpg09/yXthyey5vdzWUOUrNk90s+VAutv9dls6w1bm5uMeoN1KwI64lh7NJSQwqFQOJwQY0T7p8+derO+pqJUwU7eH1u/veEQ/B7+dHTyQ176KP+TL+YIYf321U0/IBXyT9T6yuaadaiOfv8lSfKhkiQPOF+hu39VlL94X/EjTl0aa7o6DhwfSiS7UulkNBaKilFlE8WbtE9sEZl2f4gNcxHlBv5sMBsf7xgZ7dwR7wx1oTCM+sAyN8/usG/ZuBVP2wr2oD7SFLFKVp44+UhM3dUzMrpr5xuvj01M7E53BaOJbDAqKG1TUSHxxIJsVO1QOLzNYbS0+vw+P8N5BLvgDpu6jd3OSJsU4H28T7ktxeJtczSYWuqclYyLwworMhKXnpteLtxVx4sk1DWYGsGrD3PDrjgz6Uah41+3+sabzv1J+Zrq5X6PIpDICXFbQisOBx5cQIEe1W6gnXSz7oL52q6fztduWITvF+L74vnKc2oecj5w9+TDh+jS2b++TYtyC357KB+d0TpoiL6hUzbe8FBPgOEStfFqb72yG2oMN8JNcM8mx1rUj1j4wCv4RG/M1OEaB5LEIh8VtkWmewYHSY9drT2wq3FMfwh+A08+132EV6qsoMxgt6FdefBbbetrKqvdJMAp45JGcIltkiFiDW/uJWaUSCBFg7HObVw4+yLJvv6W0kvn+eiQsvdUuPFpvabFWGgczdAbpXjm8I5HHgFyMHv/yjLw+jh1A9PcAtW8vt3eC2Rfas+DRysevrrMgGBh9pVbtzY0VxtbrPXOBtbnLHfeTwyXV3GVoGb87hYUIx45qtM6jI01hjqW2Lxisquve7CsE9L+9sCnjYi5LgS3R/sBrc4v/d+1GtpB9GENKTQayL/tNLx1znztB0qn4RR5Qy5/JFdUaDOc9uIcI/qsl9CeS/dnuzo7OqKFjWS7QmtR7/gYyznHz/DbibPGoTeb7Xa3pxWIFfy8Op1IZCH7aSsBiUPQkXCkLZ3ecbyGILr1idThfT1faCl0qOHBytF7RVfh5s1V9rqG2rUOo2mz8tSIOe7/jzV5ht5XJDfTs4uvz/foQLiV/sAf88U8YStW3WY96gYvcCKG0LvyqUFG4JSZBhLu7xHLPv3y9bSyWD47z+hEEPhIiLzxlPqJvcm4GAxHBGUuKWtLGTDRfAGPP8DIP5bPZZlCl48l7g5TuFQ5jrKbIku0qzgzt5mCPzqspIecUdJDZvMPfFl64Kd2zBTJg/kdOnqhhl6PJxFDPB/qUW7UUbY/2VCE/xmQSzXyN6BKeVAQyzKM/VN9UCAfeJDEfuUJDLJrG23aViyfkk/ofgNH38i+iEpLwANFfbx9bqrWar7n7jtvhtVQMwb7CSTFuDIZ7Ef/uZQGOeMP+BWL3bDr7mehcOQZ+vUi+XL6jWKZ5Gd0CwuXvJ/OU9Y6/1H6lWJZyr+rq+8x920bGZsqZfotHQ1ANtVurSmjhrW6oR1904OGjqYyvzIXwNV5mlphi1jfaembO/q2yQ9yRfKaXXTedPFVxzbolE5yABr9jTaT2WRyWLA82YEVvIn6vradSrsWQjzZFh3vy4yFU0IU42a6sm8tkKllOrArBcKht/krcQEmEXogEx0MhmOdndIw9EIHA4bCOUW6skjm6VPF8tePLdVdNJ+ef/pFhWVx9LtFspN2FMePnapzwtnL2nykfEzd2mFs53gS4NVuQ7O/DPxB3+71A429+rlQEpAW07PeRvice9pU0NnnxcVdCrP5iz69b+QrM1ue1n70aGEcbDfsx9c+dhZFqfIAF1GUsriwGANN/3TjSJCW5Q+KQQQpeAWe4qLQ6d/lxDp8N5hYPdNAtHkUkooG8524teOTGzs++qc7YpwaeSPSh/8bd8R8DL8+9jVjUf780+kDMK7cjg3KbI8gBrpuo6+uobzhL5wQCDK8CWsbHpMhTGEuwe87bvjHTXgOPOvzpflb6Nu6QXlhjzxPeYqAE+R6ecGPEL5oPh/hS0sO66do7tc0N1lEz/lzfvmfPx3vLJNbdVAZ2Oza0Ch/vfziO+5YvXpF470Y23bBLt3WtfVJ+BPkxP7oLtL98eRr+5/cue+pwy/BOzB9MZxJ5G/JG3TuINdR2q7cquTrfDZxUEwgXYh4eUupdW7D1EoY2w9AvXytAvy81KE8eMjPm0utymau118vn46L8IS5dGn73CZuOxFTH4H6od3KrgYXMAPCtwlmjy02Lsiv+eN172vfePb0mLATsjAKO5TRi/iJ0Qspo6gVRuQKAs/HB8AgOWIKFiKKh4kQpI78MgkIN49npYWSrCPaIxHZofY4WjHG2xTrtn42JJ9Eb4zxyu0LQ+wIkMI4cKcQKTzhIYrrwy+YBSylPDo7TrRvQMJ4bJ4/zEgs34blQXEVw+FflmXl546/xfibK4zGVUB8CqPEP14DeIgXFVppyVp4ldqO0oqjC154snrHwf30Dwf2Tmr/SAPHFukYzyb5OwqUKDNGQuHpZETSpAH4cG98MtIRFMNiGug1PF0M05BmiOTVgIe1+ZsDBp4JMsq+dhJt5efDYUgN0q8U6hMiIWGDCV4+Bcjx76AY8mPdI/mT5TZdTeERPb5W4jfK3+Lkb0OwQy3EBGWoRWmHSqRG43ZLIcMVxHSNOuhh2SyK+Lkpk+gYiMqjjL4NanpquLA7znpYd6CtYFOfMkGVnptmEKITsZ2pA8FeUBpcjMINjg8cv01HQxrKYfIqVbcw5SZN0/OU/bQvDCAgK2c9yoO6HH6HH9V/gFOecCLfAfIPUD+5eOWWIlygFg8lRMu07/MJIRYcwpPxPknZzbcjTxXB51M+wdTK5yq3Vc9lozJo8gZK5Ive3fl+8b+/ieiTW32k9ocP09Yp+tMxqpt7mtPpaIJTFBOg9793/JDf+R/fTpSkC/PTgLw4Ku7lh5TuQfALYyzyUxp5ADb/J6D0iRWC8GD+vALWHivbE91VcUT70Zun05RyP0ThFkjFN1J89Fl63xddY8D/xXxvvd1Y2diobzW6qt2bXY2cfCYQuYinP6Zl6jdfe/ihArBjDDKiTOg2RGYMrnfgMDwACe5BZszd0UYybZEW2IKADBbWxLSybcAWZpMKj1xEYi0hJguIybUQViY3lOWnNLIyR//JdMmJhyJxo1dvO588K1+jBu6W2y+7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)format("woff");font-style:italic}</style><link 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<font color=#0000A0><em>versión On-line</em> ISSN </font>2007-9621<font color=#0000A0><em>versión impresa</em> ISSN </font>0188-6266</h2>
|
||
<h3 xmlns>Acta univ vol.29 México 2019
|
||
Epub 11-Sep-2020</h3>
|
||
<h4 xmlns id=doi>
|
||
<a href=https://doi.org/10.15174/au.2019.2292>https://doi.org/10.15174/au.2019.2292</a> </h4>
|
||
<div xmlns class=index,es>
|
||
<div id=article-front class=front>
|
||
<p class=categoria>Artículos</p>
|
||
<div><p class=title>El karst de Yucatán: su origen, morfología y biología</p></div>
|
||
<div><p class=trans-title>The karst of Yucatan: its origin, morphology and
|
||
biology</p></div>
|
||
<div class=autores>
|
||
<p class=author><span class=author-name>Héctor Estrada Medina</span><sup><a href=#aff1>1</a>
|
||
</sup><sup><a href=#c1>*</a>
|
||
</sup></p>
|
||
<p class=author><span class=author-name>Juan José Jiménez Osornio</span><sup><a href=#aff1>1</a>
|
||
</sup></p>
|
||
<p class=author><span class=author-name>Oscar Álvarez Rivera</span><sup><a href=#aff1>1</a>
|
||
</sup></p>
|
||
<p class=author><span class=author-name>Roberto Carlos Barrientos Medina</span><sup><a href=#aff2>2</a>
|
||
</sup></p>
|
||
</div>
|
||
<div class=autores></div>
|
||
<p class=aff><a name=aff1></a><sup><sup>1</sup></sup>Departamento de manejo y conservación de
|
||
recursos naturales tropicales. Campus de Ciencias Biológicas y Agropecuarias,
|
||
Universidad Autónoma de Yucatán. Km 15.5 carretera Mérida-Xmatkuil s/n. C.P.
|
||
97315. Mérida, Yucatán, México. </p>
|
||
<p class=aff><a name=aff2></a><sup><sup>2</sup></sup>Departamento de Ecología. Campus de Ciencias
|
||
Biológicas y Agropecuarias, Universidad Autónoma de Yucatán.</p>
|
||
<p></p>
|
||
<p></p>
|
||
<hr>
|
||
<div class=trans-abstract>
|
||
<p class=sec><a name=Resumen>Resumen</a></p>
|
||
<p>El karst del estado de Yucatán, México, tiene su origen en los arrecifes
|
||
coralinos y sedimentos marinos que, al exponerse a la superficie, formaron la
|
||
roca caliza. Los procesos de solubilización-precipitación de esta roca han
|
||
promovido la ausencia de corrientes de agua superficiales, un relieve
|
||
ligeramente ondulado con planicies, depresiones y montículos, afloramientos y
|
||
presencia de cenotes. Los diferentes grados de porosidad y dureza de la roca han
|
||
permitido la formación desde pequeñas oquedades y acumulaciones de suelo, hasta
|
||
complejos sistemas de cuevas secas y húmedas. El manejo de este tipo de áreas
|
||
debe partir del conocimiento de su origen, morfología y biología para garantizar
|
||
el uso sustentable de los recursos naturales. Se requiere especial atención en
|
||
el manejo de la extracción de roca caliza, las actividades turísticas y
|
||
productivas relacionadas con el uso de agua del acuífero, así como el volumen y
|
||
calidad de las descargas de aguas residuales al suelo, cenotes y el mar.</p>
|
||
<p><b>Palabras clave: </b>Paisaje kárstico; roca calcárea; roca caliza; carbonato de calcio; cenotes</p>
|
||
</div>
|
||
<div class=trans-abstract>
|
||
<p class=sec><a name=Abstract>Abstract</a></p>
|
||
<p>The karstic environment of the state of Yucatán, México has its origin on the
|
||
coral reefs and marine sediments that, after being exposed to surface
|
||
conditions, formed limestone. Solubility and precipitation processes of this
|
||
rock have promoted the absence of surface water currents, a slightly undulated
|
||
relief with plains, depressions and mounds, fractured outcrops and presence of
|
||
sinkholes. The different levels of porosity and hardness of the rock have
|
||
allowed the formation of small hollows, soil pockets hollows, as well as complex
|
||
systems of dry and wet caves. The management of this kind of areas must consider
|
||
its origin, morphology and biology to guarantee the sustainable use of the
|
||
natural resources. Special attention needs to be paid on the management of the
|
||
extraction of limestone rocks, the touristic and productive activities related
|
||
to the use of water from the aquifer, as well as the volume and quality of the
|
||
water discharges to soil and sinkholes.</p>
|
||
<p><b>Keywords: </b>Karstic landscape; calcareous rock; limestone; calcium carbonate; sinkholes</p>
|
||
</div>
|
||
</div>
|
||
<div id=article-body class=body>
|
||
<div class=section>
|
||
<a name=idp6186192></a><p class=sub-subsec>Concepto de karst y su distribución</p>
|
||
<p>Karst o carst se refiere a un tipo especial de paisaje desarrollado en áreas
|
||
dominadas por rocas relativamente solubles tales como las evaporitas (halita [NaCl],
|
||
anihidrita [CaSO<sub>4</sub>] y yeso [CaSO<sub>4</sub>.2H<sub>2</sub>O]) y las
|
||
calizas (dominadas por CaCO<sub>3</sub>) (<sup><a href=#B68>Jennings,
|
||
1971</a></sup>; <sup><a href=#B69>1985</a></sup>). Existen otros
|
||
ambientes con paisajes similares al karst pero que no se desarrollan sobre los tipos
|
||
de roca mencionados, a estos se les denominan pseudokarst (<sup><a href=#B125>Wray, 1997</a></sup>). La palabra karst refiere al nombre del lugar en
|
||
Eslovenia (anteriormente Yugoslavia) en donde Jovan Cvijic describió este tipo de
|
||
paisaje por primera vez a finales del siglo XIX (<sup><a href=#B22>Ćalić, 2007</a></sup>; <sup><a href=#B48>Ford & Williams,
|
||
2007</a></sup>; <sup><a href=#B51>Gams, 1993</a></sup>). A nivel
|
||
mundial, las zonas de karst representan aproximadamente el 14.1% de la superficie
|
||
terrestre, de las cuales 12.2% relacionado con calizas, 0.18% con evaporitas y 1.40%
|
||
con pseudokarst (<sup><a href=#B59>Halliday, 2007</a></sup>; <sup><a href=#B61>Hollingsworth, 2009</a></sup>). En México existen 391 700
|
||
km<sup>2</sup> (2.21% del total mundial) de zonas kársticas (<sup><a href=#B56>Gunn, 2004</a></sup>), de los cuales 35 000
|
||
km<sup>2</sup> (8.93% del total del país) corresponden al karst del estado de
|
||
Yucatán (<sup><a href=#B74>Kueny & Day, 2002</a></sup>). El 95% del
|
||
estado de Yucatán es paisaje kárstico asociado a roca caliza (<sup><a href=#B121>Williams, 2008</a></sup>); otras áreas con karst en México se pueden
|
||
encontrar en las zonas montañosas de Chiapas, la Sierra Madre del Sur y la Sierra
|
||
Madre Oriental (<sup><a href=#B58>Gutiérrez, 2008</a></sup>) (<a href=#f1>Figura 1</a>).</p>
|
||
<p>
|
||
<div class=figure>
|
||
<a name=f1></a><a target=_blank href=https://www.scielo.org.mx/img/revistas/au/v29//2007-9621-au-29-e2292-gf1.jpg><img class=graphic 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"></a><p>Fuente: <em>Williams</em> & Fong, 2016</p>
|
||
<p class=label_caption><span class=label>Figura 1 </span><span class=caption>Zonas kársticas (de roca caliza) en México. </span></p>
|
||
</div>
|
||
<p></p>
|
||
</div>
|
||
<div class=section>
|
||
<a name=idp6208000></a><p class=sub-subsec>Origen del karst de Yucatán</p>
|
||
<div class=section>
|
||
<a name=idp6208720></a><p class=sub-subsec>Rocas carbonatadas: origen del paisaje kárstico de Yucatán</p>
|
||
<p>El desarrollo de las formas kársticas requiere la presencia de un tipo de roca
|
||
que pueda ser disuelta, al menos parcialmente, por el agua superficial o
|
||
subterránea (<sup><a href=#B109>Scheffers, May & Kelletat,
|
||
2015</a></sup>). Esta disolución depende de factores tales como la pureza, el
|
||
tiempo de exposición, el espesor de las capas, la inclinación y la composición
|
||
mineralógica, el grado de porosidad y la fracturación de la roca, además de
|
||
factores externos como las condiciones geohidrólogicas y climáticas (<sup><a href=#B13>Beddows, Blanchon, Escobar & Torres-Talamante,
|
||
2007</a></sup>; <sup><a href=#B67>Isphording, 1976</a></sup>; <sup><a href=#B83>Lugo-Hubp, Aceves-Quesada & Espinosa-Pereña,
|
||
1992</a></sup>; <sup><a href=#B120>Villasuso & Ramos,
|
||
2000</a></sup>). Para el desarrollo de un paisaje kárstico a partir de rocas
|
||
carbonatadas, es requisito que la roca tenga un contenido de CaCO<sub>3</sub>
|
||
mayor a 70% (<sup><a href=#B48>Ford & Williams, 2007</a></sup>).
|
||
Yucatán es una plataforma calcárea compuesta primordialmente de roca caliza
|
||
(<sup><a href=#B18>Bonet & Butterlin, 1977</a></sup>; <sup><a href=#B89>Marín, Steinich, Pacheco & Escolero,
|
||
2000</a></sup>), que contiene entre 89% y 99% de CaCO<sub>3</sub> (<sup><a href=#B21>Cabadas, Solleiro, Sedov, Pi & Alcalá,
|
||
2010</a></sup>; <sup><a href=#B75>Landa, 2007</a></sup>; <sup><a href=#B96>Pacheco & Alonzo, 2003</a></sup>). Los estratos
|
||
de roca caliza de Yucatán corresponden a la era Cenozoica (periodos terciario y
|
||
cuaternario) (<sup><a href=#B18>Bonet & Butterlin,
|
||
1977</a></sup>); estas rocas se formaron principalmente a partir de arrecifes
|
||
coralinos que, al ser expuestos a los agentes del intemperismo, se convirtieron
|
||
en sedimentos; posteriormente, estos sedimentos se convirtieron en caliza a
|
||
través de la diagénesis (<sup><a href=#B39>Espinosa, Cerón &
|
||
Sulub, 1998</a></sup>; <sup><a href=#B77>Lefticarui Perry, Ward,
|
||
& Lefticariu, 2006</a></sup>). Diversos estudios muestran la presencia de
|
||
tres estratos de roca: la roca consolidada, el sascab y la coquina (<sup><a href=#B36>Duch, 1988</a></sup>,<sup><a href=#B37>1991</a></sup>; <sup><a href=#B39>Espinosa <em>et
|
||
al.</em>, 1998</a></sup>; <sup><a href=#B41>Estrada-Medina, Graham, Allen, Jimenez-Osornio & Robles-Casolco,
|
||
2013</a></sup>; <sup><a href=#B42>Estrada-Medina, Tuttle, Graham,
|
||
Allen & Jimenez-Osornio, 2010</a></sup>; <sup><a href=#B43>Estrada-Medina, Zanatta, Valdez & Casolco, 2008</a></sup>), aunque algunos
|
||
depósitos de paligorskita-sepiolita también han sido encontrados (<sup><a href=#B66>Isphording, 1973</a></sup>; <sup><a href=#B107>Sánchez del Río, Suárez & García-Romero, 2009</a></sup>). La
|
||
roca consolidada, denominada localmente como laja, corresponde a afloramientos
|
||
rocosos de extrema dureza, con un espesor aproximado de 3 m, que se considera un
|
||
producto de la litificación (por ejemplo., recristalización de la aragonita y
|
||
calcita alta en magnesio) de los sedimentos originales (<sup><a href=#B37>Duch, 1991</a></sup>; <sup><a href=#B100>Perry
|
||
<em>et al.</em>, 1989</a></sup>; <sup><a href=#B104>Quiñones & Allende, 1974</a></sup>). El sascab (del maya “sahcab”, tierra
|
||
blanca) es una roca no consolidada de textura arenosa y bajo contenido de
|
||
magnesio (aunque algunas pueden contener dolomita) que probablemente se originó
|
||
del intemperismo del material calizo original (<sup><a href=#B67>Isphording, 1976</a></sup>; <sup><a href=#B81>Littmann,
|
||
1958</a></sup>; <sup><a href=#B96>Pacheco & Alonzo,
|
||
2003</a></sup>; <sup><a href=#B99>Perry, Velazquez-Oliman &
|
||
Socki, 2003</a></sup>). La coquina o conchuela es una roca fosilífera con
|
||
abundantes macroporos (<sup><a href=#B42>Estrada-Medina <em>et
|
||
al.</em>, 2010</a></sup>) en la cual se encuentran conchas de moluscos,
|
||
principalmente bivalvos y gasterópodos. La fuerza máxima de compresión uniaxial
|
||
encontrada por <sup><a href=#B41>Estrada-Medina <em>et
|
||
al.</em> (2013)</a></sup> para muestras de estas rocas procedentes del
|
||
norte de Yucatán fueron de 40 MPa para la roca consolidada, 1.5 MPa para el
|
||
sascab y 5 MPa para la coquina.</p>
|
||
</div>
|
||
</div>
|
||
<div class=section>
|
||
<a name=idp6267840></a><p class=sub-subsec>Karstificación</p>
|
||
<p>Existen tres grupos principales de rocas sedimentarias carbonatadas que dan lugar a
|
||
los paisajes kársticos, sus principales minerales son la aragonita, calcita y
|
||
dolomita (<sup><a href=#B17>Boggs, 2006</a></sup>). En la <a href=#t1>tabla 1</a> se presentan las principales
|
||
características de estos tres minerales. Las rocas calizas de Yucatán están
|
||
compuestas principalmente de calcita, aunque los sedimentos que las conformaron
|
||
originalmente también contenían dolomita y aragonita, los cuales sufrieron
|
||
alteraciones químicas al quedar expuestas a la superficie (<sup><a href=#B36>Duch, 1988</a></sup>).</p>
|
||
<p>
|
||
<div class=table-wrap>
|
||
<a name=t1></a><p class=label_caption><span class=label>Tabla 1 </span><span class=caption>Propiedades de los minerales más abundantes en las rocas carbonatadas
|
||
de Yucatán. </span></p>
|
||
<div class=table><table class=table>
|
||
<colgroup>
|
||
<col>
|
||
<col>
|
||
<col>
|
||
<col>
|
||
</colgroup>
|
||
<thead><tr>
|
||
<th align=left style="border-bottom:1 px solid black;border-top:1 px solid black">Fórmula <br>Sistema cristalino </th>
|
||
<th align=center style="border-bottom:1 px solid black;border-top:1 px solid black">Aragonita <br>CaCO<sub>3</sub><br>Ortorómbico</th>
|
||
<th align=center style="border-bottom:1 px solid black;border-top:1 px solid black">Calcita <br> CaCO<sub>3</sub> Trigonal </th>
|
||
<th align=center style="border-bottom:1 px solid black;border-top:1 px solid black">Dolomita <br> CaMg(CO<sub>3</sub>)<sub>2</sub>
|
||
<br>Hexagonal</th>
|
||
</thead>
|
||
<tbody>
|
||
<tr>
|
||
<td class=td align=left style=border-bottom:none>Color</td>
|
||
<td class=td align=left style=border-bottom:none>Incoloro, blanco o
|
||
amarillo</td>
|
||
<td class=td align=left style=border-bottom:none>Incoloro o blanco</td>
|
||
<td class=td align=left style=border-bottom:none>Incoloro o rosa, en
|
||
ocasiones <br>con tonalidades en amarillo o café.</td>
|
||
</tr>
|
||
<tr>
|
||
<td class=td align=left style=border-bottom:none>Dureza de Mohs</td>
|
||
<td class=td align=left style=border-bottom:none>3.5-4</td>
|
||
<td class=td align=left style=border-bottom:none>3</td>
|
||
<td class=td align=left style=border-bottom:none>3.5-4</td>
|
||
</tr>
|
||
<tr>
|
||
<td class=td align=left style=border-bottom:none>Gravedad específica
|
||
(g/cm<sup>3</sup>)</td>
|
||
<td class=td align=left style=border-bottom:none>2.94</td>
|
||
<td class=td align=left style=border-bottom:none>2.72</td>
|
||
<td class=td align=left style=border-bottom:none>2.86</td>
|
||
</tr>
|
||
<tr>
|
||
<td class=td align=left style=border-bottom:none>Constante del producto
|
||
de solubilidad (K) a 25 °C <br>en agua de mar</td>
|
||
<td class=td align=left style=border-bottom:none>6.3 × 10
|
||
<sup>-9</sup>
|
||
</td>
|
||
<td class=td align=left style=border-bottom:none>4.39 × 10
|
||
<sup>-9</sup>
|
||
</td>
|
||
<td class=td align=left style=border-bottom:none>1 × 10
|
||
<sup>-17</sup>
|
||
</td>
|
||
</tr>
|
||
<tr>
|
||
<td class=td align=left style="border-bottom:1 px solid black">Constante
|
||
del producto de solubilidad (K) a 25 °C <br>en agua</td>
|
||
<td class=td align=left style="border-bottom:1 px solid black">4.67 × 10
|
||
<sup>-9</sup>
|
||
</td>
|
||
<td class=td align=left style="border-bottom:1 px solid black">3.36 × 10
|
||
<sup>-9</sup>
|
||
</td>
|
||
<td class=td align=left style="border-bottom:1 px solid black">6.02 × 10
|
||
<sup>-19</sup>
|
||
</td>
|
||
</tr>
|
||
</tbody>
|
||
</table></div>
|
||
</div>
|
||
<p></p>
|
||
<p>Fuente: <sup><a href=#B15>Best, Fielding, Jarvis & Mozley
|
||
(2009)</a></sup>; <sup><a href=#B63>Hsu (1963)</a></sup>; <sup><a href=#B72>Kogel, Trivedi, Barker & Krukowski (2006)</a></sup>;
|
||
<sup><a href=#B76>Leeder (1982)</a></sup>; <sup><a href=#B90>Morse & Mackenzie (1990)</a></sup>; <sup><a href=#B111>Scoffin (1987)</a></sup>.</p>
|
||
<p>La disolución de la calcita es baja (Ksp = 8.30) con una tasa de disolución
|
||
directamente proporcional a la concentración de H<sup>+</sup> a pH < 4 y una tasa
|
||
de disolución independiente a la concentración de H<sup>+</sup> a pH > 5.5; entre
|
||
estos dos regímenes de disolución existe un tercero en el que la dependencia a la
|
||
concentración de H<sup>+</sup> varía (<sup><a href=#B90>Morse &
|
||
Mackenzie, 1990</a></sup>; <sup><a href=#B115>Sjoeberg & Rickard,
|
||
1984</a></sup>).</p>
|
||
<p>El bióxido de carbono (producto de la respiración de los organismos o la
|
||
descomposición aerobia) al combinarse con el agua produce ácido carbónico, precursor
|
||
de los iones bicarbonato y carbonato (<sup><a href=#B47>Ford, Palmer
|
||
& White, 1988</a></sup>) (ecuaciones 1-5). Por lo tanto, las aguas meteóricas y
|
||
la alta actividad biológica en el suelo promueven la disolución de las rocas
|
||
calizas, mientras condiciones de baja humedad, baja actividad biológica y alta
|
||
concentración de carbonatos promueven su precipitación (Ecuación 6). Asimismo, se ha
|
||
documentado la reducción de sulfatos como un mecanismo que también promueve la
|
||
disolución de la caliza en los cenotes (<sup><a href=#B119>Stoessell,
|
||
Moore & Coke, 1993</a></sup>). Los factores que controlan la disolución de la
|
||
calcita son la temperatura, salinidad, presión, estructura cristalina, composición
|
||
mineral, tamaño de partícula, adsorción y emparejamiento de iones y quelación (<sup><a href=#B103>Pytkowicz, 1969</a></sup>).</p>
|
||
<p>
|
||
<div class=disp-formula>
|
||
<span class=formula-labeled>
|
||
<span class=MathJax_Preview style=color:inherit;display:none></span><span class=MathJax id=MathJax-Element-1-Frame tabindex=0 style=position:relative data-mathml='<math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mrow><mi>C</mi><mi>O</mi></mrow><mrow><mn>2</mn><mo>(</mo><mi>g</mi><mo>)</mo></mrow></msub><mover accent="false"><mo>&#x2194;</mo><mrow><mi mathvariant="normal">&#xA0;</mi></mrow></mover><msub><mrow><mi>C</mi><mi>O</mi></mrow><mrow><mn>2</mn><mo>(</mo><mi>a</mi><mi>c</mi><mo>)</mo></mrow></msub></math>' role=presentation><nobr aria-hidden=true><span class=math id=MathJax-Span-1 style=width:9.573em;display:inline-block><span style=display:inline-block;position:relative;width:7.586em;height:0px;font-size:126%><span style=position:absolute;clip:rect(1.231em,1007.59em,2.755em,-1000em);top:-2.218em;left:0em><span class=mrow id=MathJax-Span-2><span class=msub id=MathJax-Span-3><span style=display:inline-block;position:relative;width:2.841em;height:0px><span style=position:absolute;clip:rect(3.147em,1001.5em,4.224em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-4><span class=mi id=MathJax-Span-5 style=font-family:MathJax_Math;font-style:italic>C<span style=display:inline-block;overflow:hidden;height:1px;width:0.045em></span></span><span class=mi id=MathJax-Span-6 style=font-family:MathJax_Math;font-style:italic>O</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;top:-3.841em;left:1.523em><span class=mrow id=MathJax-Span-7><span class=mn id=MathJax-Span-8 style=font-size:70.7%;font-family:MathJax_Main>2</span><span class=mo id=MathJax-Span-9 style=font-size:70.7%;font-family:MathJax_Main>(</span><span class=mi id=MathJax-Span-10 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>g<span style=display:inline-block;overflow:hidden;height:1px;width:0.002em></span></span><span class=mo id=MathJax-Span-11 style=font-size:70.7%;font-family:MathJax_Main>)</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=mover id=MathJax-Span-12 style=padding-left:0.278em><span style=display:inline-block;position:relative;width:1em;height:0px><span style=position:absolute;clip:rect(3.341em,1000.94em,4.213em,-1000em);top:-4.027em;left:0em><span class=mo id=MathJax-Span-13><span style=font-family:MathJax_Main>↔</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;clip:rect(3.752em,1000em,4.202em,-1000em);top:-4.738em;left:0.412em><span class=mrow id=MathJax-Span-14><span class=mi id=MathJax-Span-15 style=font-size:70.7%;font-family:MathJax_Main> </span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=msub id=MathJax-Span-16 style=padding-left:0.278em><span style=display:inline-block;position:relative;width:3.182em;height:0px><span style=position:absolute;clip:rect(3.147em,1001.5em,4.224em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-17><span class=mi id=MathJax-Span-18 style=font-family:MathJax_Math;font-style:italic>C<span style=display:inline-block;overflow:hidden;height:1px;width:0.045em></span></span><span class=mi id=MathJax-Span-19 style=font-family:MathJax_Math;font-style:italic>O</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;top:-3.841em;left:1.523em><span class=mrow id=MathJax-Span-20><span class=mn id=MathJax-Span-21 style=font-size:70.7%;font-family:MathJax_Main>2</span><span class=mo id=MathJax-Span-22 style=font-size:70.7%;font-family:MathJax_Main>(</span><span class=mi id=MathJax-Span-23 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>a</span><span class=mi id=MathJax-Span-24 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>c</span><span class=mo id=MathJax-Span-25 style=font-size:70.7%;font-family:MathJax_Main>)</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span></span><span style=display:inline-block;width:0px;height:2.218em></span></span></span><span style="display:inline-block;overflow:hidden;vertical-align:-0.53em;border-left:0px solid;width:0px;height:1.626em"></span></span></nobr><span class=MJX_Assistive_MathML role=presentation><math xmlns=http://www.w3.org/1998/Math/MathML><msub><mrow><mi>C</mi><mi>O</mi></mrow><mrow><mn>2</mn><mo>(</mo><mi>g</mi><mo>)</mo></mrow></msub><mover accent=false><mo>↔</mo><mrow><mi mathvariant=normal> </mi></mrow></mover><msub><mrow><mi>C</mi><mi>O</mi></mrow><mrow><mn>2</mn><mo>(</mo><mi>a</mi><mi>c</mi><mo>)</mo></mrow></msub></math></span></span>
|
||
|
||
</span><span class=label>(1)</span>
|
||
</div>
|
||
<p></p>
|
||
<p>
|
||
<div class=disp-formula>
|
||
<span class=formula-labeled>
|
||
<span class=MathJax_Preview style=color:inherit;display:none></span><span class=MathJax id=MathJax-Element-2-Frame tabindex=0 style=position:relative data-mathml='<math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mrow><mi>C</mi><mi>O</mi></mrow><mrow><mn>2</mn><mo>(</mo><mi>a</mi><mi>c</mi><mo>)</mo></mrow></msub><mo>+</mo><msub><mrow><mi>H</mi></mrow><mrow><mn>2</mn></mrow></msub><msub><mrow><mi>O</mi></mrow><mrow><mo>(</mo><mi>l</mi><mo>)</mo></mrow></msub><mi mathvariant="normal">&#xA0;</mi><mover accent="false"><mo>&#x2194;</mo><mrow><mi mathvariant="normal">&#xA0;</mi></mrow></mover><mi mathvariant="normal">&#xA0;</mi><msub><mrow><mi>H</mi></mrow><mrow><mn>2</mn></mrow></msub><msub><mrow><mi>C</mi><mi>O</mi></mrow><mrow><mn>3</mn></mrow></msub><msub><mrow><mi mathvariant="normal">*</mi></mrow><mrow><mo>(</mo><mi>a</mi><mi>c</mi><mo>)</mo></mrow></msub><mi>&#xA0;</mi><mi>&#xA0;</mi><mi>&#xA0;</mi><mfenced close="]" open="[" separators="|"><mrow><mi mathvariant="normal">p</mi><mi mathvariant="normal">k</mi><mo>=</mo><mn>1.47</mn></mrow></mfenced></math>' role=presentation><nobr aria-hidden=true><span class=math id=MathJax-Span-26 style=width:25.213em;display:inline-block><span style=display:inline-block;position:relative;width:20.016em;height:0px;font-size:126%><span style=position:absolute;clip:rect(1.407em,1019.9em,2.93em,-1000em);top:-2.393em;left:0em><span class=mrow id=MathJax-Span-27><span class=msub id=MathJax-Span-28><span style=display:inline-block;position:relative;width:3.182em;height:0px><span style=position:absolute;clip:rect(3.147em,1001.5em,4.224em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-29><span class=mi id=MathJax-Span-30 style=font-family:MathJax_Math;font-style:italic>C<span style=display:inline-block;overflow:hidden;height:1px;width:0.045em></span></span><span class=mi id=MathJax-Span-31 style=font-family:MathJax_Math;font-style:italic>O</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;top:-3.841em;left:1.523em><span class=mrow id=MathJax-Span-32><span class=mn id=MathJax-Span-33 style=font-size:70.7%;font-family:MathJax_Main>2</span><span class=mo id=MathJax-Span-34 style=font-size:70.7%;font-family:MathJax_Main>(</span><span class=mi id=MathJax-Span-35 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>a</span><span class=mi id=MathJax-Span-36 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>c</span><span class=mo id=MathJax-Span-37 style=font-size:70.7%;font-family:MathJax_Main>)</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=mo id=MathJax-Span-38 style=font-family:MathJax_Main;padding-left:0.222em>+</span><span class=msub id=MathJax-Span-39 style=padding-left:0.222em><span style=display:inline-block;position:relative;width:1.26em;height:0px><span style=position:absolute;clip:rect(3.169em,1000.89em,4.202em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-40><span class=mi id=MathJax-Span-41 style=font-family:MathJax_Math;font-style:italic>H<span style=display:inline-block;overflow:hidden;height:1px;width:0.057em></span></span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;top:-3.877em;left:0.831em><span class=mrow id=MathJax-Span-42><span class=mn id=MathJax-Span-43 style=font-size:70.7%;font-family:MathJax_Main>2</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=msub id=MathJax-Span-44><span style=display:inline-block;position:relative;width:1.599em;height:0px><span style=position:absolute;clip:rect(3.148em,1000.74em,4.224em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-45><span class=mi id=MathJax-Span-46 style=font-family:MathJax_Math;font-style:italic>O</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;top:-3.841em;left:0.763em><span class=mrow id=MathJax-Span-47><span class=mo id=MathJax-Span-48 style=font-size:70.7%;font-family:MathJax_Main>(</span><span class=mi id=MathJax-Span-49 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>l</span><span class=mo id=MathJax-Span-50 style=font-size:70.7%;font-family:MathJax_Main>)</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=mi id=MathJax-Span-51 style=font-family:MathJax_Main> </span><span class=mover id=MathJax-Span-52 style=padding-left:0.278em><span style=display:inline-block;position:relative;width:1em;height:0px><span style=position:absolute;clip:rect(3.341em,1000.94em,4.213em,-1000em);top:-4.027em;left:0em><span class=mo id=MathJax-Span-53><span style=font-family:MathJax_Main>↔</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;clip:rect(3.752em,1000em,4.202em,-1000em);top:-4.738em;left:0.412em><span class=mrow id=MathJax-Span-54><span class=mi id=MathJax-Span-55 style=font-size:70.7%;font-family:MathJax_Main> </span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=mi id=MathJax-Span-56 style=font-family:MathJax_Main;padding-left:0.278em> </span><span class=msub id=MathJax-Span-57><span style=display:inline-block;position:relative;width:1.26em;height:0px><span style=position:absolute;clip:rect(3.169em,1000.89em,4.202em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-58><span class=mi id=MathJax-Span-59 style=font-family:MathJax_Math;font-style:italic>H<span style=display:inline-block;overflow:hidden;height:1px;width:0.057em></span></span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;top:-3.877em;left:0.831em><span class=mrow id=MathJax-Span-60><span class=mn id=MathJax-Span-61 style=font-size:70.7%;font-family:MathJax_Main>2</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=msub id=MathJax-Span-62><span style=display:inline-block;position:relative;width:1.952em;height:0px><span style=position:absolute;clip:rect(3.147em,1001.5em,4.224em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-63><span class=mi id=MathJax-Span-64 style=font-family:MathJax_Math;font-style:italic>C<span style=display:inline-block;overflow:hidden;height:1px;width:0.045em></span></span><span class=mi id=MathJax-Span-65 style=font-family:MathJax_Math;font-style:italic>O</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;top:-3.877em;left:1.523em><span class=mrow id=MathJax-Span-66><span class=mn id=MathJax-Span-67 style=font-size:70.7%;font-family:MathJax_Main>3</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=msub id=MathJax-Span-68><span style=display:inline-block;position:relative;width:1.805em;height:0px><span style=position:absolute;clip:rect(3.102em,1000.44em,3.882em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-69><span class=mi id=MathJax-Span-70 style=font-family:MathJax_Main>*</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;top:-3.841em;left:0.5em><span class=mrow id=MathJax-Span-71><span class=mo id=MathJax-Span-72 style=font-size:70.7%;font-family:MathJax_Main>(</span><span class=mi id=MathJax-Span-73 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>a</span><span class=mi id=MathJax-Span-74 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>c</span><span class=mo id=MathJax-Span-75 style=font-size:70.7%;font-family:MathJax_Main>)</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=mi id=MathJax-Span-76 style=font-family:MathJax_Math;font-style:italic> </span><span class=mi id=MathJax-Span-77 style=font-family:MathJax_Math;font-style:italic> </span><span class=mi id=MathJax-Span-78 style=font-family:MathJax_Math;font-style:italic> </span><span class=mfenced id=MathJax-Span-79 style=padding-left:0.167em><span class=mo id=MathJax-Span-80><span style=font-family:MathJax_Main>[</span></span><span class=mrow id=MathJax-Span-81><span class=mi id=MathJax-Span-82 style=font-family:MathJax_Main>p</span><span class=mi id=MathJax-Span-83 style=font-family:MathJax_Main>k</span><span class=mo id=MathJax-Span-84 style=font-family:MathJax_Main;padding-left:0.278em>=</span><span class=mn id=MathJax-Span-85 style=font-family:MathJax_Main;padding-left:0.278em>1.47</span></span><span class=mo id=MathJax-Span-86><span style=font-family:MathJax_Main>]</span></span></span></span><span style=display:inline-block;width:0px;height:2.393em></span></span></span><span style="display:inline-block;overflow:hidden;vertical-align:-0.53em;border-left:0px solid;width:0px;height:1.626em"></span></span></nobr><span class=MJX_Assistive_MathML role=presentation><math xmlns=http://www.w3.org/1998/Math/MathML><msub><mrow><mi>C</mi><mi>O</mi></mrow><mrow><mn>2</mn><mo>(</mo><mi>a</mi><mi>c</mi><mo>)</mo></mrow></msub><mo>+</mo><msub><mrow><mi>H</mi></mrow><mrow><mn>2</mn></mrow></msub><msub><mrow><mi>O</mi></mrow><mrow><mo>(</mo><mi>l</mi><mo>)</mo></mrow></msub><mi mathvariant=normal> </mi><mover accent=false><mo>↔</mo><mrow><mi mathvariant=normal> </mi></mrow></mover><mi mathvariant=normal> </mi><msub><mrow><mi>H</mi></mrow><mrow><mn>2</mn></mrow></msub><msub><mrow><mi>C</mi><mi>O</mi></mrow><mrow><mn>3</mn></mrow></msub><msub><mrow><mi mathvariant=normal>*</mi></mrow><mrow><mo>(</mo><mi>a</mi><mi>c</mi><mo>)</mo></mrow></msub><mi> </mi><mi> </mi><mi> </mi><mfenced close=] open separators=|><mrow><mi mathvariant=normal>p</mi><mi mathvariant=normal>k</mi><mo>=</mo><mn>1.47</mn></mrow></mfenced></math></span></span>
|
||
|
||
</span><span class=label>(2)</span>
|
||
</div>
|
||
<p></p>
|
||
<p>
|
||
<div class=disp-formula><span class=formula>
|
||
<span class=MathJax_Preview style=color:inherit;display:none></span><span class=MathJax id=MathJax-Element-3-Frame tabindex=0 style=position:relative data-mathml='<math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mrow><mi>H</mi></mrow><mrow><mn>2</mn></mrow></msub><mi>C</mi><msub><mrow><mi>O</mi></mrow><mrow><mn>3</mn></mrow></msub><mi>*</mi><mi>&#xA0;</mi><mo>=</mo><mi>&#xA0;</mi><msub><mrow><mi>H</mi></mrow><mrow><mn>2</mn></mrow></msub><mi>C</mi><msub><mrow><mi>O</mi></mrow><mrow><mn>3</mn></mrow></msub><mi>&#xA0;</mi><mo>+</mo><mi>&#xA0;</mi><mi>C</mi><msub><mrow><mi>O</mi></mrow><mrow><mn>2</mn></mrow></msub><mi>&#xA0;</mi><mi>en</mi><mi>&#xA0;</mi><mi>soluci&#xF3;n</mi></math>' role=presentation><nobr aria-hidden=true><span class=math id=MathJax-Span-87 style=width:22.354em;display:inline-block><span style=display:inline-block;position:relative;width:17.74em;height:0px;font-size:126%><span style=position:absolute;clip:rect(1.242em,1017.73em,2.593em,-1000em);top:-2.218em;left:0em><span class=mrow id=MathJax-Span-88><span class=msub id=MathJax-Span-89><span style=display:inline-block;position:relative;width:1.26em;height:0px><span style=position:absolute;clip:rect(3.169em,1000.89em,4.202em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-90><span class=mi id=MathJax-Span-91 style=font-family:MathJax_Math;font-style:italic>H<span style=display:inline-block;overflow:hidden;height:1px;width:0.057em></span></span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;top:-3.877em;left:0.831em><span class=mrow id=MathJax-Span-92><span class=mn id=MathJax-Span-93 style=font-size:70.7%;font-family:MathJax_Main>2</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=mi id=MathJax-Span-94 style=font-family:MathJax_Math;font-style:italic>C<span style=display:inline-block;overflow:hidden;height:1px;width:0.045em></span></span><span class=msub id=MathJax-Span-95><span style=display:inline-block;position:relative;width:1.192em;height:0px><span style=position:absolute;clip:rect(3.148em,1000.74em,4.224em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-96><span class=mi id=MathJax-Span-97 style=font-family:MathJax_Math;font-style:italic>O</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;top:-3.877em;left:0.763em><span class=mrow id=MathJax-Span-98><span class=mn id=MathJax-Span-99 style=font-size:70.7%;font-family:MathJax_Main>3</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=mi id=MathJax-Span-100 style=font-family:MathJax_Main;font-style:italic>*<span style=display:inline-block;overflow:hidden;height:1px;width:0.073em></span></span><span class=mi id=MathJax-Span-101 style=font-family:MathJax_Math;font-style:italic> </span><span class=mo id=MathJax-Span-102 style=font-family:MathJax_Main;padding-left:0.278em>=</span><span class=mi id=MathJax-Span-103 style=font-family:MathJax_Math;font-style:italic;padding-left:0.278em> </span><span class=msub id=MathJax-Span-104><span style=display:inline-block;position:relative;width:1.26em;height:0px><span style=position:absolute;clip:rect(3.169em,1000.89em,4.202em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-105><span class=mi id=MathJax-Span-106 style=font-family:MathJax_Math;font-style:italic>H<span style=display:inline-block;overflow:hidden;height:1px;width:0.057em></span></span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;top:-3.877em;left:0.831em><span class=mrow id=MathJax-Span-107><span class=mn id=MathJax-Span-108 style=font-size:70.7%;font-family:MathJax_Main>2</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=mi id=MathJax-Span-109 style=font-family:MathJax_Math;font-style:italic>C<span style=display:inline-block;overflow:hidden;height:1px;width:0.045em></span></span><span class=msub id=MathJax-Span-110><span style=display:inline-block;position:relative;width:1.192em;height:0px><span style=position:absolute;clip:rect(3.148em,1000.74em,4.224em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-111><span class=mi id=MathJax-Span-112 style=font-family:MathJax_Math;font-style:italic>O</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;top:-3.877em;left:0.763em><span class=mrow id=MathJax-Span-113><span class=mn id=MathJax-Span-114 style=font-size:70.7%;font-family:MathJax_Main>3</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=mi id=MathJax-Span-115 style=font-family:MathJax_Math;font-style:italic> </span><span class=mo id=MathJax-Span-116 style=font-family:MathJax_Main;padding-left:0.222em>+</span><span class=mi id=MathJax-Span-117 style=font-family:MathJax_Math;font-style:italic;padding-left:0.222em> </span><span class=mi id=MathJax-Span-118 style=font-family:MathJax_Math;font-style:italic>C<span style=display:inline-block;overflow:hidden;height:1px;width:0.045em></span></span><span class=msub id=MathJax-Span-119><span style=display:inline-block;position:relative;width:1.192em;height:0px><span style=position:absolute;clip:rect(3.148em,1000.74em,4.224em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-120><span class=mi id=MathJax-Span-121 style=font-family:MathJax_Math;font-style:italic>O</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;top:-3.877em;left:0.763em><span class=mrow id=MathJax-Span-122><span class=mn id=MathJax-Span-123 style=font-size:70.7%;font-family:MathJax_Main>2</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=mi id=MathJax-Span-124 style=font-family:MathJax_Math;font-style:italic> </span><span class=mi id=MathJax-Span-125 style=font-family:MathJax_Main;padding-left:0.167em>en</span><span class=mi id=MathJax-Span-126 style=font-family:MathJax_Math;font-style:italic;padding-left:0.167em> </span><span class=mi id=MathJax-Span-127 style=font-family:MathJax_Main>soluci<span style='font-family:STIXGeneral,"Arial Unicode MS",serif;font-size:79%;font-style:normal;font-weight:normal'>ó</span>n</span></span><span style=display:inline-block;width:0px;height:2.218em></span></span></span><span style="display:inline-block;overflow:hidden;vertical-align:-0.326em;border-left:0px solid;width:0px;height:1.407em"></span></span></nobr><span class=MJX_Assistive_MathML role=presentation><math xmlns=http://www.w3.org/1998/Math/MathML><msub><mrow><mi>H</mi></mrow><mrow><mn>2</mn></mrow></msub><mi>C</mi><msub><mrow><mi>O</mi></mrow><mrow><mn>3</mn></mrow></msub><mi>*</mi><mi> </mi><mo>=</mo><mi> </mi><msub><mrow><mi>H</mi></mrow><mrow><mn>2</mn></mrow></msub><mi>C</mi><msub><mrow><mi>O</mi></mrow><mrow><mn>3</mn></mrow></msub><mi> </mi><mo>+</mo><mi> </mi><mi>C</mi><msub><mrow><mi>O</mi></mrow><mrow><mn>2</mn></mrow></msub><mi> </mi><mi>en</mi><mi> </mi><mi>solución</mi></math></span></span>
|
||
</span></div>
|
||
<p></p>
|
||
<p>
|
||
<div class=disp-formula>
|
||
<span class=formula-labeled>
|
||
<span class=MathJax_Preview style=color:inherit;display:none></span><span class=MathJax id=MathJax-Element-4-Frame tabindex=0 style=position:relative data-mathml='<math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mrow><mi>H</mi></mrow><mrow><mn>2</mn></mrow></msub><msub><mrow><mi>C</mi><mi>O</mi></mrow><mrow><mn>3</mn></mrow></msub><msub><mrow><mi mathvariant="normal">*</mi></mrow><mrow><mo>(</mo><mi>a</mi><mi>c</mi><mo>)</mo></mrow></msub><mover accent="false"><mo>&#x2194;</mo><mrow><mi mathvariant="normal">&#xA0;</mi></mrow></mover><mi mathvariant="normal">&#xA0;</mi><msubsup><mrow><mi>H</mi></mrow><mrow><mi mathvariant="normal">&#xA0;</mi><mi mathvariant="normal">&#xA0;</mi><mi mathvariant="normal">&#xA0;</mi><mi mathvariant="normal">&#xA0;</mi><mo>(</mo><mi>a</mi><mi>c</mi><mo>)</mo></mrow><mrow><mo>+</mo></mrow></msubsup><mi mathvariant="normal">&#xA0;</mi><mo>+</mo><mi mathvariant="normal">&#xA0;</mi><msubsup><mrow><mi>H</mi><mi>C</mi><mi>O</mi></mrow><mrow><mn>3</mn></mrow><mrow><mo>-</mo></mrow></msubsup><msub><mrow><mi mathvariant="normal">&#xA0;</mi></mrow><mrow><mo>(</mo><mi>a</mi><mi>c</mi><mo>)</mo></mrow></msub><mi>&#xA0;</mi><mi>&#xA0;</mi><mi>&#xA0;</mi><mfenced close="]" open="[" separators="|"><mrow><mi mathvariant="normal">p</mi><mi mathvariant="normal">k</mi><mo>=</mo><mn>6.35</mn></mrow></mfenced></math>' role=presentation><nobr aria-hidden=true><span class=math id=MathJax-Span-128 style=width:27.314em;display:inline-block><span style=display:inline-block;position:relative;width:21.65em;height:0px;font-size:126%><span style=position:absolute;clip:rect(1.373em,1021.53em,3.103em,-1000em);top:-2.393em;left:0em><span class=mrow id=MathJax-Span-129><span class=msub id=MathJax-Span-130><span style=display:inline-block;position:relative;width:1.26em;height:0px><span style=position:absolute;clip:rect(3.169em,1000.89em,4.202em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-131><span class=mi id=MathJax-Span-132 style=font-family:MathJax_Math;font-style:italic>H<span style=display:inline-block;overflow:hidden;height:1px;width:0.057em></span></span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;top:-3.877em;left:0.831em><span class=mrow id=MathJax-Span-133><span class=mn id=MathJax-Span-134 style=font-size:70.7%;font-family:MathJax_Main>2</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=msub id=MathJax-Span-135><span style=display:inline-block;position:relative;width:1.952em;height:0px><span style=position:absolute;clip:rect(3.147em,1001.5em,4.224em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-136><span class=mi id=MathJax-Span-137 style=font-family:MathJax_Math;font-style:italic>C<span style=display:inline-block;overflow:hidden;height:1px;width:0.045em></span></span><span class=mi id=MathJax-Span-138 style=font-family:MathJax_Math;font-style:italic>O</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;top:-3.877em;left:1.523em><span class=mrow id=MathJax-Span-139><span class=mn id=MathJax-Span-140 style=font-size:70.7%;font-family:MathJax_Main>3</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=msub id=MathJax-Span-141><span style=display:inline-block;position:relative;width:1.805em;height:0px><span style=position:absolute;clip:rect(3.102em,1000.44em,3.882em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-142><span class=mi id=MathJax-Span-143 style=font-family:MathJax_Main>*</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;top:-3.841em;left:0.5em><span class=mrow id=MathJax-Span-144><span class=mo id=MathJax-Span-145 style=font-size:70.7%;font-family:MathJax_Main>(</span><span class=mi id=MathJax-Span-146 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>a</span><span class=mi id=MathJax-Span-147 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>c</span><span class=mo id=MathJax-Span-148 style=font-size:70.7%;font-family:MathJax_Main>)</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=mover id=MathJax-Span-149 style=padding-left:0.278em><span style=display:inline-block;position:relative;width:1em;height:0px><span style=position:absolute;clip:rect(3.341em,1000.94em,4.213em,-1000em);top:-4.027em;left:0em><span class=mo id=MathJax-Span-150><span style=font-family:MathJax_Main>↔</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;clip:rect(3.752em,1000em,4.202em,-1000em);top:-4.738em;left:0.412em><span class=mrow id=MathJax-Span-151><span class=mi id=MathJax-Span-152 style=font-size:70.7%;font-family:MathJax_Main> </span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=mi id=MathJax-Span-153 style=font-family:MathJax_Main;padding-left:0.278em> </span><span class=msubsup id=MathJax-Span-154><span style=display:inline-block;position:relative;width:2.843em;height:0px><span style=position:absolute;clip:rect(3.169em,1000.89em,4.202em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-155><span class=mi id=MathJax-Span-156 style=font-family:MathJax_Math;font-style:italic>H<span style=display:inline-block;overflow:hidden;height:1px;width:0.057em></span></span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;clip:rect(3.439em,1000.63em,4.26em,-1000em);top:-4.437em;left:0.955em><span class=mrow id=MathJax-Span-157><span class=mo id=MathJax-Span-158 style=font-size:70.7%;font-family:MathJax_Main>+</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;clip:rect(3.321em,1002.01em,4.378em,-1000em);top:-3.668em;left:0.831em><span class=mrow id=MathJax-Span-159><span class=mi id=MathJax-Span-160 style=font-size:70.7%;font-family:MathJax_Main> </span><span class=mi id=MathJax-Span-161 style=font-size:70.7%;font-family:MathJax_Main> </span><span class=mi id=MathJax-Span-162 style=font-size:70.7%;font-family:MathJax_Main> </span><span class=mi id=MathJax-Span-163 style=font-size:70.7%;font-family:MathJax_Main> </span><span class=mo id=MathJax-Span-164 style=font-size:70.7%;font-family:MathJax_Main>(</span><span class=mi id=MathJax-Span-165 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>a</span><span class=mi id=MathJax-Span-166 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>c</span><span class=mo id=MathJax-Span-167 style=font-size:70.7%;font-family:MathJax_Main>)</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=mi id=MathJax-Span-168 style=font-family:MathJax_Main> </span><span class=mo id=MathJax-Span-169 style=font-family:MathJax_Main;padding-left:0.222em>+</span><span class=mi id=MathJax-Span-170 style=font-family:MathJax_Main;padding-left:0.222em> </span><span class=msubsup id=MathJax-Span-171><span style=display:inline-block;position:relative;width:3.036em;height:0px><span style=position:absolute;clip:rect(3.147em,1002.39em,4.224em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-172><span class=mi id=MathJax-Span-173 style=font-family:MathJax_Math;font-style:italic>H<span style=display:inline-block;overflow:hidden;height:1px;width:0.057em></span></span><span class=mi id=MathJax-Span-174 style=font-family:MathJax_Math;font-style:italic>C<span style=display:inline-block;overflow:hidden;height:1px;width:0.045em></span></span><span class=mi id=MathJax-Span-175 style=font-family:MathJax_Math;font-style:italic>O</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;clip:rect(3.439em,1000.63em,4.26em,-1000em);top:-4.459em;left:2.411em><span class=mrow id=MathJax-Span-176><span class=mo id=MathJax-Span-177 style=font-size:70.7%;font-family:MathJax_Main>−</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;clip:rect(3.381em,1000.43em,4.217em,-1000em);top:-3.75em;left:2.411em><span class=mrow id=MathJax-Span-178><span class=mn id=MathJax-Span-179 style=font-size:70.7%;font-family:MathJax_Main>3</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=msub id=MathJax-Span-180><span style=display:inline-block;position:relative;width:1.555em;height:0px><span style=position:absolute;clip:rect(3.852em,1000em,4.202em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-181><span class=mi id=MathJax-Span-182 style=font-family:MathJax_Main> </span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;top:-3.841em;left:0.25em><span class=mrow id=MathJax-Span-183><span class=mo id=MathJax-Span-184 style=font-size:70.7%;font-family:MathJax_Main>(</span><span class=mi id=MathJax-Span-185 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>a</span><span class=mi id=MathJax-Span-186 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>c</span><span class=mo id=MathJax-Span-187 style=font-size:70.7%;font-family:MathJax_Main>)</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=mi id=MathJax-Span-188 style=font-family:MathJax_Math;font-style:italic> </span><span class=mi id=MathJax-Span-189 style=font-family:MathJax_Math;font-style:italic> </span><span class=mi id=MathJax-Span-190 style=font-family:MathJax_Math;font-style:italic> </span><span class=mfenced id=MathJax-Span-191 style=padding-left:0.167em><span class=mo id=MathJax-Span-192><span style=font-family:MathJax_Main>[</span></span><span class=mrow id=MathJax-Span-193><span class=mi id=MathJax-Span-194 style=font-family:MathJax_Main>p</span><span class=mi id=MathJax-Span-195 style=font-family:MathJax_Main>k</span><span class=mo id=MathJax-Span-196 style=font-family:MathJax_Main;padding-left:0.278em>=</span><span class=mn id=MathJax-Span-197 style=font-family:MathJax_Main;padding-left:0.278em>6.35</span></span><span class=mo id=MathJax-Span-198><span style=font-family:MathJax_Main>]</span></span></span></span><span style=display:inline-block;width:0px;height:2.393em></span></span></span><span style="display:inline-block;overflow:hidden;vertical-align:-0.748em;border-left:0px solid;width:0px;height:1.885em"></span></span></nobr><span class=MJX_Assistive_MathML role=presentation><math xmlns=http://www.w3.org/1998/Math/MathML><msub><mrow><mi>H</mi></mrow><mrow><mn>2</mn></mrow></msub><msub><mrow><mi>C</mi><mi>O</mi></mrow><mrow><mn>3</mn></mrow></msub><msub><mrow><mi mathvariant=normal>*</mi></mrow><mrow><mo>(</mo><mi>a</mi><mi>c</mi><mo>)</mo></mrow></msub><mover accent=false><mo>↔</mo><mrow><mi mathvariant=normal> </mi></mrow></mover><mi mathvariant=normal> </mi><msubsup><mrow><mi>H</mi></mrow><mrow><mi mathvariant=normal> </mi><mi mathvariant=normal> </mi><mi mathvariant=normal> </mi><mi mathvariant=normal> </mi><mo>(</mo><mi>a</mi><mi>c</mi><mo>)</mo></mrow><mrow><mo>+</mo></mrow></msubsup><mi mathvariant=normal> </mi><mo>+</mo><mi mathvariant=normal> </mi><msubsup><mrow><mi>H</mi><mi>C</mi><mi>O</mi></mrow><mrow><mn>3</mn></mrow><mrow><mo>-</mo></mrow></msubsup><msub><mrow><mi mathvariant=normal> </mi></mrow><mrow><mo>(</mo><mi>a</mi><mi>c</mi><mo>)</mo></mrow></msub><mi> </mi><mi> </mi><mi> </mi><mfenced close=] open separators=|><mrow><mi mathvariant=normal>p</mi><mi mathvariant=normal>k</mi><mo>=</mo><mn>6.35</mn></mrow></mfenced></math></span></span>
|
||
|
||
</span><span class=label>(3)</span>
|
||
</div>
|
||
<p></p>
|
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<p>
|
||
<div class=disp-formula>
|
||
<span class=formula-labeled>
|
||
<span class=MathJax_Preview style=color:inherit;display:none></span><span class=MathJax id=MathJax-Element-5-Frame tabindex=0 style=position:relative data-mathml='<math xmlns="http://www.w3.org/1998/Math/MathML"><msubsup><mrow><mi>C</mi><mi>O</mi></mrow><mrow><mn>3</mn></mrow><mrow><mn>2</mn><mo>-</mo></mrow></msubsup><msub><mrow><mi mathvariant="normal">&#xA0;</mi></mrow><mrow><mo>(</mo><mi>a</mi><mi>c</mi><mo>)</mo></mrow></msub><mi mathvariant="normal">&#xA0;</mi><mo>+</mo><mi mathvariant="normal">&#xA0;</mi><msubsup><mrow><mi>H</mi></mrow><mrow><mi mathvariant="normal">&#xA0;</mi><mi mathvariant="normal">&#xA0;</mi><mi mathvariant="normal">&#xA0;</mi><mi mathvariant="normal">&#xA0;</mi><mo>(</mo><mi>a</mi><mi>c</mi><mo>)</mo></mrow><mrow><mo>+</mo></mrow></msubsup><mi mathvariant="normal">&#xA0;</mi><mover accent="false"><mo>&#x2194;</mo><mrow><mi mathvariant="normal">&#xA0;</mi></mrow></mover><mi mathvariant="normal">&#xA0;</mi><msubsup><mrow><mi>H</mi><mi>C</mi><mi>O</mi></mrow><mrow><mn>3</mn></mrow><mrow><mo>-</mo></mrow></msubsup><msub><mrow><mi mathvariant="normal">&#xA0;</mi></mrow><mrow><mfenced separators="|"><mrow><mi>a</mi><mi>c</mi></mrow></mfenced></mrow></msub><mi>&#xA0;</mi><mi>&#xA0;</mi><mi>&#xA0;</mi><mi>&#xA0;</mi><mi>&#xA0;</mi><mi>&#xA0;</mi><mi>&#xA0;</mi><mi>&#xA0;</mi><mi>&#xA0;</mi><mfenced close="]" open="[" separators="|"><mrow><mi mathvariant="normal">p</mi><mi mathvariant="normal">k</mi><mo>=</mo><mn>10.33</mn></mrow></mfenced></math>' role=presentation><nobr aria-hidden=true><span class=math id=MathJax-Span-199 style=width:28.889em;display:inline-block><span style=display:inline-block;position:relative;width:22.934em;height:0px;font-size:126%><span style=position:absolute;clip:rect(1.315em,1022.82em,3.103em,-1000em);top:-2.393em;left:0em><span class=mrow id=MathJax-Span-200><span class=msubsup id=MathJax-Span-201><span style=display:inline-block;position:relative;width:2.502em;height:0px><span style=position:absolute;clip:rect(3.147em,1001.5em,4.224em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-202><span class=mi id=MathJax-Span-203 style=font-family:MathJax_Math;font-style:italic>C<span style=display:inline-block;overflow:hidden;height:1px;width:0.045em></span></span><span class=mi id=MathJax-Span-204 style=font-family:MathJax_Math;font-style:italic>O</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;clip:rect(3.381em,1000.98em,4.26em,-1000em);top:-4.459em;left:1.523em><span class=mrow id=MathJax-Span-205><span class=mn id=MathJax-Span-206 style=font-size:70.7%;font-family:MathJax_Main>2</span><span class=mo id=MathJax-Span-207 style=font-size:70.7%;font-family:MathJax_Main>−</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;clip:rect(3.381em,1000.43em,4.217em,-1000em);top:-3.75em;left:1.523em><span class=mrow id=MathJax-Span-208><span class=mn id=MathJax-Span-209 style=font-size:70.7%;font-family:MathJax_Main>3</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=msub id=MathJax-Span-210><span style=display:inline-block;position:relative;width:1.555em;height:0px><span style=position:absolute;clip:rect(3.852em,1000em,4.202em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-211><span class=mi id=MathJax-Span-212 style=font-family:MathJax_Main> </span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;top:-3.841em;left:0.25em><span class=mrow id=MathJax-Span-213><span class=mo id=MathJax-Span-214 style=font-size:70.7%;font-family:MathJax_Main>(</span><span class=mi id=MathJax-Span-215 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>a</span><span class=mi id=MathJax-Span-216 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>c</span><span class=mo id=MathJax-Span-217 style=font-size:70.7%;font-family:MathJax_Main>)</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=mi id=MathJax-Span-218 style=font-family:MathJax_Main> </span><span class=mo id=MathJax-Span-219 style=font-family:MathJax_Main;padding-left:0.222em>+</span><span class=mi id=MathJax-Span-220 style=font-family:MathJax_Main;padding-left:0.222em> </span><span class=msubsup id=MathJax-Span-221><span style=display:inline-block;position:relative;width:2.843em;height:0px><span style=position:absolute;clip:rect(3.169em,1000.89em,4.202em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-222><span class=mi id=MathJax-Span-223 style=font-family:MathJax_Math;font-style:italic>H<span style=display:inline-block;overflow:hidden;height:1px;width:0.057em></span></span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;clip:rect(3.439em,1000.63em,4.26em,-1000em);top:-4.437em;left:0.955em><span class=mrow id=MathJax-Span-224><span class=mo id=MathJax-Span-225 style=font-size:70.7%;font-family:MathJax_Main>+</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;clip:rect(3.321em,1002.01em,4.378em,-1000em);top:-3.668em;left:0.831em><span class=mrow id=MathJax-Span-226><span class=mi id=MathJax-Span-227 style=font-size:70.7%;font-family:MathJax_Main> </span><span class=mi id=MathJax-Span-228 style=font-size:70.7%;font-family:MathJax_Main> </span><span class=mi id=MathJax-Span-229 style=font-size:70.7%;font-family:MathJax_Main> </span><span class=mi id=MathJax-Span-230 style=font-size:70.7%;font-family:MathJax_Main> </span><span class=mo id=MathJax-Span-231 style=font-size:70.7%;font-family:MathJax_Main>(</span><span class=mi id=MathJax-Span-232 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>a</span><span class=mi id=MathJax-Span-233 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>c</span><span class=mo id=MathJax-Span-234 style=font-size:70.7%;font-family:MathJax_Main>)</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=mi id=MathJax-Span-235 style=font-family:MathJax_Main> </span><span class=mover id=MathJax-Span-236 style=padding-left:0.278em><span style=display:inline-block;position:relative;width:1em;height:0px><span style=position:absolute;clip:rect(3.341em,1000.94em,4.213em,-1000em);top:-4.027em;left:0em><span class=mo id=MathJax-Span-237><span style=font-family:MathJax_Main>↔</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;clip:rect(3.752em,1000em,4.202em,-1000em);top:-4.738em;left:0.412em><span class=mrow id=MathJax-Span-238><span class=mi id=MathJax-Span-239 style=font-size:70.7%;font-family:MathJax_Main> </span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=mi id=MathJax-Span-240 style=font-family:MathJax_Main;padding-left:0.278em> </span><span class=msubsup id=MathJax-Span-241><span style=display:inline-block;position:relative;width:3.036em;height:0px><span style=position:absolute;clip:rect(3.147em,1002.39em,4.224em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-242><span class=mi id=MathJax-Span-243 style=font-family:MathJax_Math;font-style:italic>H<span style=display:inline-block;overflow:hidden;height:1px;width:0.057em></span></span><span class=mi id=MathJax-Span-244 style=font-family:MathJax_Math;font-style:italic>C<span style=display:inline-block;overflow:hidden;height:1px;width:0.045em></span></span><span class=mi id=MathJax-Span-245 style=font-family:MathJax_Math;font-style:italic>O</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;clip:rect(3.439em,1000.63em,4.26em,-1000em);top:-4.459em;left:2.411em><span class=mrow id=MathJax-Span-246><span class=mo id=MathJax-Span-247 style=font-size:70.7%;font-family:MathJax_Main>−</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;clip:rect(3.381em,1000.43em,4.217em,-1000em);top:-3.75em;left:2.411em><span class=mrow id=MathJax-Span-248><span class=mn id=MathJax-Span-249 style=font-size:70.7%;font-family:MathJax_Main>3</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=msub id=MathJax-Span-250><span style=display:inline-block;position:relative;width:1.555em;height:0px><span style=position:absolute;clip:rect(3.852em,1000em,4.202em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-251><span class=mi id=MathJax-Span-252 style=font-family:MathJax_Main> </span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;top:-3.841em;left:0.25em><span class=mrow id=MathJax-Span-253><span class=mfenced id=MathJax-Span-254><span class=mo id=MathJax-Span-255><span><span style=font-size:70.7%;font-family:MathJax_Main>(</span></span></span><span class=mrow id=MathJax-Span-256><span class=mi id=MathJax-Span-257 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>a</span><span class=mi id=MathJax-Span-258 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>c</span></span><span class=mo id=MathJax-Span-259><span><span style=font-size:70.7%;font-family:MathJax_Main>)</span></span></span></span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=mi id=MathJax-Span-260 style=font-family:MathJax_Math;font-style:italic> </span><span class=mi id=MathJax-Span-261 style=font-family:MathJax_Math;font-style:italic> </span><span class=mi id=MathJax-Span-262 style=font-family:MathJax_Math;font-style:italic> </span><span class=mi id=MathJax-Span-263 style=font-family:MathJax_Math;font-style:italic> </span><span class=mi id=MathJax-Span-264 style=font-family:MathJax_Math;font-style:italic> </span><span class=mi id=MathJax-Span-265 style=font-family:MathJax_Math;font-style:italic> </span><span class=mi id=MathJax-Span-266 style=font-family:MathJax_Math;font-style:italic> </span><span class=mi id=MathJax-Span-267 style=font-family:MathJax_Math;font-style:italic> </span><span class=mi id=MathJax-Span-268 style=font-family:MathJax_Math;font-style:italic> </span><span class=mfenced id=MathJax-Span-269 style=padding-left:0.167em><span class=mo id=MathJax-Span-270><span style=font-family:MathJax_Main>[</span></span><span class=mrow id=MathJax-Span-271><span class=mi id=MathJax-Span-272 style=font-family:MathJax_Main>p</span><span class=mi id=MathJax-Span-273 style=font-family:MathJax_Main>k</span><span class=mo id=MathJax-Span-274 style=font-family:MathJax_Main;padding-left:0.278em>=</span><span class=mn id=MathJax-Span-275 style=font-family:MathJax_Main;padding-left:0.278em>10.33</span></span><span class=mo id=MathJax-Span-276><span style=font-family:MathJax_Main>]</span></span></span></span><span style=display:inline-block;width:0px;height:2.393em></span></span></span><span style="display:inline-block;overflow:hidden;vertical-align:-0.748em;border-left:0px solid;width:0px;height:1.959em"></span></span></nobr><span class=MJX_Assistive_MathML role=presentation><math xmlns=http://www.w3.org/1998/Math/MathML><msubsup><mrow><mi>C</mi><mi>O</mi></mrow><mrow><mn>3</mn></mrow><mrow><mn>2</mn><mo>-</mo></mrow></msubsup><msub><mrow><mi mathvariant=normal> </mi></mrow><mrow><mo>(</mo><mi>a</mi><mi>c</mi><mo>)</mo></mrow></msub><mi mathvariant=normal> </mi><mo>+</mo><mi mathvariant=normal> </mi><msubsup><mrow><mi>H</mi></mrow><mrow><mi mathvariant=normal> </mi><mi mathvariant=normal> </mi><mi mathvariant=normal> </mi><mi mathvariant=normal> </mi><mo>(</mo><mi>a</mi><mi>c</mi><mo>)</mo></mrow><mrow><mo>+</mo></mrow></msubsup><mi mathvariant=normal> </mi><mover accent=false><mo>↔</mo><mrow><mi mathvariant=normal> </mi></mrow></mover><mi mathvariant=normal> </mi><msubsup><mrow><mi>H</mi><mi>C</mi><mi>O</mi></mrow><mrow><mn>3</mn></mrow><mrow><mo>-</mo></mrow></msubsup><msub><mrow><mi mathvariant=normal> </mi></mrow><mrow><mfenced separators=|><mrow><mi>a</mi><mi>c</mi></mrow></mfenced></mrow></msub><mi> </mi><mi> </mi><mi> </mi><mi> </mi><mi> </mi><mi> </mi><mi> </mi><mi> </mi><mi> </mi><mfenced close=] open separators=|><mrow><mi mathvariant=normal>p</mi><mi mathvariant=normal>k</mi><mo>=</mo><mn>10.33</mn></mrow></mfenced></math></span></span>
|
||
|
||
</span><span class=label>(4)</span>
|
||
</div>
|
||
<p></p>
|
||
<p>
|
||
<div class=disp-formula>
|
||
<span class=formula-labeled>
|
||
<span class=MathJax_Preview style=color:inherit;display:none></span><span class=MathJax id=MathJax-Element-6-Frame tabindex=0 style=position:relative data-mathml='<math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mrow><mi>C</mi><mi>a</mi><mi>C</mi><mi>O</mi></mrow><mrow><mn>3</mn></mrow></msub><msub><mrow><mi mathvariant="normal">&#xA0;</mi></mrow><mrow><mo>(</mo><mi>s</mi><mo>)</mo></mrow></msub><mi mathvariant="normal">&#xA0;</mi><mover accent="false"><mo>&#x2194;</mo><mrow><mi mathvariant="normal">&#xA0;</mi></mrow></mover><msubsup><mrow><mi>C</mi><mi>a</mi></mrow><mrow><mi mathvariant="normal">&#xA0;</mi><mi mathvariant="normal">&#xA0;</mi><mi mathvariant="normal">&#xA0;</mi><mi mathvariant="normal">&#xA0;</mi><mi mathvariant="normal">&#xA0;</mi><mi mathvariant="normal">&#xA0;</mi><mi mathvariant="normal">&#xA0;</mi><mo>(</mo><mi>a</mi><mi>c</mi><mo>)</mo></mrow><mrow><mn>2</mn><mo>+</mo></mrow></msubsup><mi mathvariant="normal">&#xA0;</mi><mo>+</mo><mi mathvariant="normal">&#xA0;</mi><msubsup><mrow><mi>C</mi><mi>O</mi></mrow><mrow><mn>3</mn></mrow><mrow><mn>2</mn><mo>-</mo></mrow></msubsup><msub><mrow><mi mathvariant="normal">&#xA0;</mi></mrow><mrow><mo>(</mo><mi>a</mi><mi>c</mi><mo>)</mo></mrow></msub></math>' role=presentation><nobr aria-hidden=true><span class=math id=MathJax-Span-277 style=width:20.019em;display:inline-block><span style=display:inline-block;position:relative;width:15.873em;height:0px;font-size:126%><span style=position:absolute;clip:rect(1.198em,1015.87em,2.964em,-1000em);top:-2.276em;left:0em><span class=mrow id=MathJax-Span-278><span class=msub id=MathJax-Span-279><span style=display:inline-block;position:relative;width:3.241em;height:0px><span style=position:absolute;clip:rect(3.147em,1002.79em,4.224em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-280><span class=mi id=MathJax-Span-281 style=font-family:MathJax_Math;font-style:italic>C<span style=display:inline-block;overflow:hidden;height:1px;width:0.045em></span></span><span class=mi id=MathJax-Span-282 style=font-family:MathJax_Math;font-style:italic>a</span><span class=mi id=MathJax-Span-283 style=font-family:MathJax_Math;font-style:italic>C<span style=display:inline-block;overflow:hidden;height:1px;width:0.045em></span></span><span class=mi id=MathJax-Span-284 style=font-family:MathJax_Math;font-style:italic>O</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;top:-3.877em;left:2.812em><span class=mrow id=MathJax-Span-285><span class=mn id=MathJax-Span-286 style=font-size:70.7%;font-family:MathJax_Main>3</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=msub id=MathJax-Span-287><span style=display:inline-block;position:relative;width:1.207em;height:0px><span style=position:absolute;clip:rect(3.852em,1000em,4.202em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-288><span class=mi id=MathJax-Span-289 style=font-family:MathJax_Main> </span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;top:-3.841em;left:0.25em><span class=mrow id=MathJax-Span-290><span class=mo id=MathJax-Span-291 style=font-size:70.7%;font-family:MathJax_Main>(</span><span class=mi id=MathJax-Span-292 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>s</span><span class=mo id=MathJax-Span-293 style=font-size:70.7%;font-family:MathJax_Main>)</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=mi id=MathJax-Span-294 style=font-family:MathJax_Main> </span><span class=mover id=MathJax-Span-295 style=padding-left:0.278em><span style=display:inline-block;position:relative;width:1em;height:0px><span style=position:absolute;clip:rect(3.341em,1000.94em,4.213em,-1000em);top:-4.027em;left:0em><span class=mo id=MathJax-Span-296><span style=font-family:MathJax_Main>↔</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;clip:rect(3.752em,1000em,4.202em,-1000em);top:-4.738em;left:0.412em><span class=mrow id=MathJax-Span-297><span class=mi id=MathJax-Span-298 style=font-size:70.7%;font-family:MathJax_Main> </span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=msubsup id=MathJax-Span-299 style=padding-left:0.278em><span style=display:inline-block;position:relative;width:3.832em;height:0px><span style=position:absolute;clip:rect(3.147em,1001.27em,4.224em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-300><span class=mi id=MathJax-Span-301 style=font-family:MathJax_Math;font-style:italic>C<span style=display:inline-block;overflow:hidden;height:1px;width:0.045em></span></span><span class=mi id=MathJax-Span-302 style=font-family:MathJax_Math;font-style:italic>a</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;clip:rect(3.381em,1000.98em,4.26em,-1000em);top:-4.459em;left:1.289em><span class=mrow id=MathJax-Span-303><span class=mn id=MathJax-Span-304 style=font-size:70.7%;font-family:MathJax_Main>2</span><span class=mo id=MathJax-Span-305 style=font-size:70.7%;font-family:MathJax_Main>+</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;clip:rect(3.321em,1002.54em,4.378em,-1000em);top:-3.69em;left:1.289em><span class=mrow id=MathJax-Span-306><span class=mi id=MathJax-Span-307 style=font-size:70.7%;font-family:MathJax_Main> </span><span class=mi id=MathJax-Span-308 style=font-size:70.7%;font-family:MathJax_Main> </span><span class=mi id=MathJax-Span-309 style=font-size:70.7%;font-family:MathJax_Main> </span><span class=mi id=MathJax-Span-310 style=font-size:70.7%;font-family:MathJax_Main> </span><span class=mi id=MathJax-Span-311 style=font-size:70.7%;font-family:MathJax_Main> </span><span class=mi id=MathJax-Span-312 style=font-size:70.7%;font-family:MathJax_Main> </span><span class=mi id=MathJax-Span-313 style=font-size:70.7%;font-family:MathJax_Main> </span><span class=mo id=MathJax-Span-314 style=font-size:70.7%;font-family:MathJax_Main>(</span><span class=mi id=MathJax-Span-315 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>a</span><span class=mi id=MathJax-Span-316 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>c</span><span class=mo id=MathJax-Span-317 style=font-size:70.7%;font-family:MathJax_Main>)</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=mi id=MathJax-Span-318 style=font-family:MathJax_Main> </span><span class=mo id=MathJax-Span-319 style=font-family:MathJax_Main;padding-left:0.222em>+</span><span class=mi id=MathJax-Span-320 style=font-family:MathJax_Main;padding-left:0.222em> </span><span class=msubsup id=MathJax-Span-321><span style=display:inline-block;position:relative;width:2.502em;height:0px><span style=position:absolute;clip:rect(3.147em,1001.5em,4.224em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-322><span class=mi id=MathJax-Span-323 style=font-family:MathJax_Math;font-style:italic>C<span style=display:inline-block;overflow:hidden;height:1px;width:0.045em></span></span><span class=mi id=MathJax-Span-324 style=font-family:MathJax_Math;font-style:italic>O</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;clip:rect(3.381em,1000.98em,4.26em,-1000em);top:-4.459em;left:1.523em><span class=mrow id=MathJax-Span-325><span class=mn id=MathJax-Span-326 style=font-size:70.7%;font-family:MathJax_Main>2</span><span class=mo id=MathJax-Span-327 style=font-size:70.7%;font-family:MathJax_Main>−</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;clip:rect(3.381em,1000.43em,4.217em,-1000em);top:-3.75em;left:1.523em><span class=mrow id=MathJax-Span-328><span class=mn id=MathJax-Span-329 style=font-size:70.7%;font-family:MathJax_Main>3</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=msub id=MathJax-Span-330><span style=display:inline-block;position:relative;width:1.555em;height:0px><span style=position:absolute;clip:rect(3.852em,1000em,4.202em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-331><span class=mi id=MathJax-Span-332 style=font-family:MathJax_Main> </span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;top:-3.841em;left:0.25em><span class=mrow id=MathJax-Span-333><span class=mo id=MathJax-Span-334 style=font-size:70.7%;font-family:MathJax_Main>(</span><span class=mi id=MathJax-Span-335 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>a</span><span class=mi id=MathJax-Span-336 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>c</span><span class=mo id=MathJax-Span-337 style=font-size:70.7%;font-family:MathJax_Main>)</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span></span><span style=display:inline-block;width:0px;height:2.276em></span></span></span><span style="display:inline-block;overflow:hidden;vertical-align:-0.72em;border-left:0px solid;width:0px;height:1.931em"></span></span></nobr><span class=MJX_Assistive_MathML role=presentation><math xmlns=http://www.w3.org/1998/Math/MathML><msub><mrow><mi>C</mi><mi>a</mi><mi>C</mi><mi>O</mi></mrow><mrow><mn>3</mn></mrow></msub><msub><mrow><mi mathvariant=normal> </mi></mrow><mrow><mo>(</mo><mi>s</mi><mo>)</mo></mrow></msub><mi mathvariant=normal> </mi><mover accent=false><mo>↔</mo><mrow><mi mathvariant=normal> </mi></mrow></mover><msubsup><mrow><mi>C</mi><mi>a</mi></mrow><mrow><mi mathvariant=normal> </mi><mi mathvariant=normal> </mi><mi mathvariant=normal> </mi><mi mathvariant=normal> </mi><mi mathvariant=normal> </mi><mi mathvariant=normal> </mi><mi mathvariant=normal> </mi><mo>(</mo><mi>a</mi><mi>c</mi><mo>)</mo></mrow><mrow><mn>2</mn><mo>+</mo></mrow></msubsup><mi mathvariant=normal> </mi><mo>+</mo><mi mathvariant=normal> </mi><msubsup><mrow><mi>C</mi><mi>O</mi></mrow><mrow><mn>3</mn></mrow><mrow><mn>2</mn><mo>-</mo></mrow></msubsup><msub><mrow><mi mathvariant=normal> </mi></mrow><mrow><mo>(</mo><mi>a</mi><mi>c</mi><mo>)</mo></mrow></msub></math></span></span>
|
||
|
||
</span><span class=label>(5)</span>
|
||
</div>
|
||
<p></p>
|
||
<p>
|
||
<div class=disp-formula>
|
||
<span class=formula-labeled>
|
||
<span class=MathJax_Preview style=color:inherit;display:none></span><span class=MathJax id=MathJax-Element-7-Frame tabindex=0 style=position:relative data-mathml='<math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mrow><mi>C</mi><mi>a</mi><mi>C</mi><mi>O</mi></mrow><mrow><mn>3</mn><mo>(</mo><mi>s</mi><mo>)</mo></mrow></msub><mo>+</mo><msub><mrow><mi>C</mi><mi>O</mi></mrow><mrow><mn>2</mn><mo>(</mo><mi>g</mi><mo>)</mo></mrow></msub><mo>+</mo><msub><mrow><mi>H</mi></mrow><mrow><mn>2</mn></mrow></msub><msub><mrow><mi>O</mi></mrow><mrow><mo>(</mo><mi>l</mi><mo>)</mo></mrow></msub><mi mathvariant="normal">&#xA0;</mi><mover accent="false"><mo>&#x2194;</mo><mrow><mi mathvariant="normal">&#xA0;</mi></mrow></mover><mi mathvariant="normal">&#xA0;</mi><msubsup><mrow><mi>C</mi><mi>a</mi></mrow><mrow><mi mathvariant="normal">&#xA0;</mi><mi mathvariant="normal">&#xA0;</mi><mi mathvariant="normal">&#xA0;</mi><mi mathvariant="normal">&#xA0;</mi><mi mathvariant="normal">&#xA0;</mi><mo>(</mo><mi>a</mi><mi>c</mi><mo>)</mo></mrow><mrow><mn>2</mn><mo>+</mo></mrow></msubsup><mo>+</mo><mi mathvariant="normal">&#xA0;</mi><msubsup><mrow><mn>2</mn><mi>H</mi><mi>C</mi><mi>O</mi></mrow><mrow><mn>3</mn></mrow><mrow><mo>-</mo></mrow></msubsup><msub><mrow><mi mathvariant="normal">&#xA0;</mi></mrow><mrow><mo>(</mo><mi>a</mi><mi>c</mi><mo>)</mo></mrow></msub></math>' role=presentation><nobr aria-hidden=true><span class=math id=MathJax-Span-338 style=width:30.699em;display:inline-block><span style=display:inline-block;position:relative;width:24.335em;height:0px;font-size:126%><span style=position:absolute;clip:rect(1.198em,1024.34em,2.964em,-1000em);top:-2.276em;left:0em><span class=mrow id=MathJax-Span-339><span class=msub id=MathJax-Span-340><span style=display:inline-block;position:relative;width:4.122em;height:0px><span style=position:absolute;clip:rect(3.147em,1002.79em,4.224em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-341><span class=mi id=MathJax-Span-342 style=font-family:MathJax_Math;font-style:italic>C<span style=display:inline-block;overflow:hidden;height:1px;width:0.045em></span></span><span class=mi id=MathJax-Span-343 style=font-family:MathJax_Math;font-style:italic>a</span><span class=mi id=MathJax-Span-344 style=font-family:MathJax_Math;font-style:italic>C<span style=display:inline-block;overflow:hidden;height:1px;width:0.045em></span></span><span class=mi id=MathJax-Span-345 style=font-family:MathJax_Math;font-style:italic>O</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;top:-3.841em;left:2.812em><span class=mrow id=MathJax-Span-346><span class=mn id=MathJax-Span-347 style=font-size:70.7%;font-family:MathJax_Main>3</span><span class=mo id=MathJax-Span-348 style=font-size:70.7%;font-family:MathJax_Main>(</span><span class=mi id=MathJax-Span-349 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>s</span><span class=mo id=MathJax-Span-350 style=font-size:70.7%;font-family:MathJax_Main>)</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=mo id=MathJax-Span-351 style=font-family:MathJax_Main;padding-left:0.222em>+</span><span class=msub id=MathJax-Span-352 style=padding-left:0.222em><span style=display:inline-block;position:relative;width:2.841em;height:0px><span style=position:absolute;clip:rect(3.147em,1001.5em,4.224em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-353><span class=mi id=MathJax-Span-354 style=font-family:MathJax_Math;font-style:italic>C<span style=display:inline-block;overflow:hidden;height:1px;width:0.045em></span></span><span class=mi id=MathJax-Span-355 style=font-family:MathJax_Math;font-style:italic>O</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;top:-3.841em;left:1.523em><span class=mrow id=MathJax-Span-356><span class=mn id=MathJax-Span-357 style=font-size:70.7%;font-family:MathJax_Main>2</span><span class=mo id=MathJax-Span-358 style=font-size:70.7%;font-family:MathJax_Main>(</span><span class=mi id=MathJax-Span-359 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>g<span style=display:inline-block;overflow:hidden;height:1px;width:0.002em></span></span><span class=mo id=MathJax-Span-360 style=font-size:70.7%;font-family:MathJax_Main>)</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=mo id=MathJax-Span-361 style=font-family:MathJax_Main;padding-left:0.222em>+</span><span class=msub id=MathJax-Span-362 style=padding-left:0.222em><span style=display:inline-block;position:relative;width:1.26em;height:0px><span style=position:absolute;clip:rect(3.169em,1000.89em,4.202em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-363><span class=mi id=MathJax-Span-364 style=font-family:MathJax_Math;font-style:italic>H<span style=display:inline-block;overflow:hidden;height:1px;width:0.057em></span></span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;top:-3.877em;left:0.831em><span class=mrow id=MathJax-Span-365><span class=mn id=MathJax-Span-366 style=font-size:70.7%;font-family:MathJax_Main>2</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=msub id=MathJax-Span-367><span style=display:inline-block;position:relative;width:1.599em;height:0px><span style=position:absolute;clip:rect(3.148em,1000.74em,4.224em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-368><span class=mi id=MathJax-Span-369 style=font-family:MathJax_Math;font-style:italic>O</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;top:-3.841em;left:0.763em><span class=mrow id=MathJax-Span-370><span class=mo id=MathJax-Span-371 style=font-size:70.7%;font-family:MathJax_Main>(</span><span class=mi id=MathJax-Span-372 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>l</span><span class=mo id=MathJax-Span-373 style=font-size:70.7%;font-family:MathJax_Main>)</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=mi id=MathJax-Span-374 style=font-family:MathJax_Main> </span><span class=mover id=MathJax-Span-375 style=padding-left:0.278em><span style=display:inline-block;position:relative;width:1em;height:0px><span style=position:absolute;clip:rect(3.341em,1000.94em,4.213em,-1000em);top:-4.027em;left:0em><span class=mo id=MathJax-Span-376><span style=font-family:MathJax_Main>↔</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;clip:rect(3.752em,1000em,4.202em,-1000em);top:-4.738em;left:0.412em><span class=mrow id=MathJax-Span-377><span class=mi id=MathJax-Span-378 style=font-size:70.7%;font-family:MathJax_Main> </span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=mi id=MathJax-Span-379 style=font-family:MathJax_Main;padding-left:0.278em> </span><span class=msubsup id=MathJax-Span-380><span style=display:inline-block;position:relative;width:3.478em;height:0px><span style=position:absolute;clip:rect(3.147em,1001.27em,4.224em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-381><span class=mi id=MathJax-Span-382 style=font-family:MathJax_Math;font-style:italic>C<span style=display:inline-block;overflow:hidden;height:1px;width:0.045em></span></span><span class=mi id=MathJax-Span-383 style=font-family:MathJax_Math;font-style:italic>a</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;clip:rect(3.381em,1000.98em,4.26em,-1000em);top:-4.459em;left:1.289em><span class=mrow id=MathJax-Span-384><span class=mn id=MathJax-Span-385 style=font-size:70.7%;font-family:MathJax_Main>2</span><span class=mo id=MathJax-Span-386 style=font-size:70.7%;font-family:MathJax_Main>+</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;clip:rect(3.321em,1002.19em,4.378em,-1000em);top:-3.69em;left:1.289em><span class=mrow id=MathJax-Span-387><span class=mi id=MathJax-Span-388 style=font-size:70.7%;font-family:MathJax_Main> </span><span class=mi id=MathJax-Span-389 style=font-size:70.7%;font-family:MathJax_Main> </span><span class=mi id=MathJax-Span-390 style=font-size:70.7%;font-family:MathJax_Main> </span><span class=mi id=MathJax-Span-391 style=font-size:70.7%;font-family:MathJax_Main> </span><span class=mi id=MathJax-Span-392 style=font-size:70.7%;font-family:MathJax_Main> </span><span class=mo id=MathJax-Span-393 style=font-size:70.7%;font-family:MathJax_Main>(</span><span class=mi id=MathJax-Span-394 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>a</span><span class=mi id=MathJax-Span-395 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>c</span><span class=mo id=MathJax-Span-396 style=font-size:70.7%;font-family:MathJax_Main>)</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=mo id=MathJax-Span-397 style=font-family:MathJax_Main;padding-left:0.222em>+</span><span class=mi id=MathJax-Span-398 style=font-family:MathJax_Main;padding-left:0.222em> </span><span class=msubsup id=MathJax-Span-399><span style=display:inline-block;position:relative;width:3.536em;height:0px><span style=position:absolute;clip:rect(3.147em,1002.89em,4.224em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-400><span class=mn id=MathJax-Span-401 style=font-family:MathJax_Main>2</span><span class=mi id=MathJax-Span-402 style=font-family:MathJax_Math;font-style:italic>H<span style=display:inline-block;overflow:hidden;height:1px;width:0.057em></span></span><span class=mi id=MathJax-Span-403 style=font-family:MathJax_Math;font-style:italic>C<span style=display:inline-block;overflow:hidden;height:1px;width:0.045em></span></span><span class=mi id=MathJax-Span-404 style=font-family:MathJax_Math;font-style:italic>O</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;clip:rect(3.439em,1000.63em,4.26em,-1000em);top:-4.459em;left:2.911em><span class=mrow id=MathJax-Span-405><span class=mo id=MathJax-Span-406 style=font-size:70.7%;font-family:MathJax_Main>−</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;clip:rect(3.381em,1000.43em,4.217em,-1000em);top:-3.75em;left:2.911em><span class=mrow id=MathJax-Span-407><span class=mn id=MathJax-Span-408 style=font-size:70.7%;font-family:MathJax_Main>3</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span><span class=msub id=MathJax-Span-409><span style=display:inline-block;position:relative;width:1.555em;height:0px><span style=position:absolute;clip:rect(3.852em,1000em,4.202em,-1000em);top:-4.027em;left:0em><span class=mrow id=MathJax-Span-410><span class=mi id=MathJax-Span-411 style=font-family:MathJax_Main> </span></span><span style=display:inline-block;width:0px;height:4.027em></span></span><span style=position:absolute;top:-3.841em;left:0.25em><span class=mrow id=MathJax-Span-412><span class=mo id=MathJax-Span-413 style=font-size:70.7%;font-family:MathJax_Main>(</span><span class=mi id=MathJax-Span-414 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>a</span><span class=mi id=MathJax-Span-415 style=font-size:70.7%;font-family:MathJax_Math;font-style:italic>c</span><span class=mo id=MathJax-Span-416 style=font-size:70.7%;font-family:MathJax_Main>)</span></span><span style=display:inline-block;width:0px;height:4.027em></span></span></span></span></span><span style=display:inline-block;width:0px;height:2.276em></span></span></span><span style="display:inline-block;overflow:hidden;vertical-align:-0.72em;border-left:0px solid;width:0px;height:1.931em"></span></span></nobr><span class=MJX_Assistive_MathML role=presentation><math xmlns=http://www.w3.org/1998/Math/MathML><msub><mrow><mi>C</mi><mi>a</mi><mi>C</mi><mi>O</mi></mrow><mrow><mn>3</mn><mo>(</mo><mi>s</mi><mo>)</mo></mrow></msub><mo>+</mo><msub><mrow><mi>C</mi><mi>O</mi></mrow><mrow><mn>2</mn><mo>(</mo><mi>g</mi><mo>)</mo></mrow></msub><mo>+</mo><msub><mrow><mi>H</mi></mrow><mrow><mn>2</mn></mrow></msub><msub><mrow><mi>O</mi></mrow><mrow><mo>(</mo><mi>l</mi><mo>)</mo></mrow></msub><mi mathvariant=normal> </mi><mover accent=false><mo>↔</mo><mrow><mi mathvariant=normal> </mi></mrow></mover><mi mathvariant=normal> </mi><msubsup><mrow><mi>C</mi><mi>a</mi></mrow><mrow><mi mathvariant=normal> </mi><mi mathvariant=normal> </mi><mi mathvariant=normal> </mi><mi mathvariant=normal> </mi><mi mathvariant=normal> </mi><mo>(</mo><mi>a</mi><mi>c</mi><mo>)</mo></mrow><mrow><mn>2</mn><mo>+</mo></mrow></msubsup><mo>+</mo><mi mathvariant=normal> </mi><msubsup><mrow><mn>2</mn><mi>H</mi><mi>C</mi><mi>O</mi></mrow><mrow><mn>3</mn></mrow><mrow><mo>-</mo></mrow></msubsup><msub><mrow><mi mathvariant=normal> </mi></mrow><mrow><mo>(</mo><mi>a</mi><mi>c</mi><mo>)</mo></mrow></msub></math></span></span>
|
||
|
||
</span><span class=label>(6) (ecuación general)</span>
|
||
</div>
|
||
<p></p>
|
||
<p>Ecuaciones: <sup><a href=#B48>Ford & Williams (2007)</a></sup>; <sup><a href=#B102>Plummer, Wigley & Parkhurst (1978)</a></sup>.
|
||
Valores de los logaritmos de las constantes de equilibrio (pK): <sup><a href=#B20>Butler, 1991</a></sup>.</p>
|
||
<p>La disolución de la calcita de las rocas subsuperficiales está asociada con la
|
||
proporción de las especies químicas carbonatadas (H<sub>2</sub>CO<sub>3</sub>,
|
||
HCO<sub>3</sub>
|
||
<sup>-</sup>, CO<sub>3</sub>
|
||
<sup>=</sup>) que se encuentran disueltas en el agua del acuífero (<sup><a href=#B20>Butler, 1991</a></sup>) (<a href=#f2>figura 2</a>); esta proporción determina en gran medida el pH del agua. El
|
||
pH del agua de los pozos y cenotes cerrados de Yucatán tiene valores de entre 6.53
|
||
(Samahil) y 7.56 (Homún) con un promedio de 6.88 (<sup><a href=#B101>Perry, Paytan, Pedersen & Velazquez-Oliman, 2009</a></sup>), lo que indica que
|
||
la especie química dominante es el ion bicarbonato (HCO<sub>3</sub>
|
||
<sup>-</sup>).</p>
|
||
<p>
|
||
<div class=figure>
|
||
<a name=f2></a><a target=_blank href=https://www.scielo.org.mx/img/revistas/au/v29//2007-9621-au-29-e2292-gf2.jpg><img class=graphic 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></a><p>Fuente: Elaboración propia calculada a partir de balance de masas y las
|
||
ecuaciones de equilibrio tomadas de <sup><a href=#B20>Butler
|
||
(1991)</a></sup>. Los valores para calcular el promedio y el intervalo de
|
||
pH se obtuvieron de <sup><a href=#B97>Perry, Velazquez-Oliman
|
||
& Marín (2002)</a></sup>.</p>
|
||
<p class=label_caption><span class=label>Figura 2 </span><span class=caption>Distribución de las especies carbonatadas en solución en función del
|
||
pH. </span></p>
|
||
</div>
|
||
<p></p>
|
||
</div>
|
||
<div class=section>
|
||
<a name=idp6526800></a><p class=sub-subsec>Morfología del karst de Yucatán</p>
|
||
<div class=section>
|
||
<a name=idp6527520></a><p class=sub-subsec>Formas kársticas</p>
|
||
<p>Además de la composición de la roca caliza y las condiciones ambientales, la
|
||
evolución del karst de Yucatán se encuentra relacionada también con la
|
||
neotectónica y las glaciaciones (<sup><a href=#B83>Lugo-Hubp
|
||
<em>et al.</em>, 1992</a></sup>). La evolución del karst se puede
|
||
observar a través de las diferentes formas del relieve que se van formando a
|
||
través del tiempo. Jovan Cvijic identificó en 1919 la existencia de cuatro
|
||
estados de evolución del Karst: juvenil, maduro, maduro tardío y viejo (<sup><a href=#B16>Bharatdwaj, 2006</a></sup>). El estado juvenil es
|
||
cuando la roca caliza queda expuesta, el drenaje superficial se pierde y se
|
||
desarrolla el subterráneo; el estado maduro es cuando se observa un drenaje
|
||
subterráneo bien desarrollado y una cantidad máxima de cenotes y cavernas; el
|
||
estado maduro tardío se caracteriza por la desaparición de los cenotes y la
|
||
aparición de los poljés y las uvalas; y el estado viejo es cuando los
|
||
escurrimientos superficiales vuelven a aparecer (<sup><a href=#B16>Bharatdwaj, 2006</a></sup>; <sup><a href=#B108>Sanders,
|
||
1921</a></sup>). Alexander Klimchouk realizó luego una definición más completa
|
||
basada en la evolución geológica del karst (<sup><a href=#B71>Klimchouk & Ford, 2000</a></sup>). En la península de Yucatán hubo dos
|
||
etapas de formación de karst, una antigua, paleogénica, en una superficie
|
||
elevada, con formaciones características de climas tropicales (conos cársticos);
|
||
y otra reciente, en la planicie, de hasta 20 cm-30 cm de altura (<sup><a href=#B53>Gerstenhauer [1972]</a></sup>, citado en <sup><a href=#B83>Lugo-Hubp <em>et al.</em> [1992]</a></sup>).
|
||
Las tres formas predominantes del terreno en el karst Yucateco son las
|
||
depresiones cerradas conocidas como dolinas, uvalas y poljés (<sup><a href=#B3>Aguilar, Bautista, Mendoza, Frausto & Ihl,
|
||
2016</a></sup>). En general, se acepta que las dolinas son de forma circular a
|
||
subcircular y varían en diámetro de unos cuantos metros hasta 1 km; las uvalas
|
||
son grandes depresiones (mayores de 1 km) de formas irregulares o alargadas; y
|
||
los poljés son depresiones largas, con el fondo cubierto con sedimentos y
|
||
situados muy cerca del nivel freático (<sup><a href=#B23>Ćalić,
|
||
2011</a></sup>). Recientemente, <sup><a href=#B3>Aguilar
|
||
<em>et al.</em> (2016)</a></sup> identificaron 6717 depresiones en
|
||
el estado de Yucatán, de las cuales 4620 fueron clasificadas como dolinas
|
||
(cenotes), 2021 como uvalas y 76 como poljés. El paisaje kárstico de Yucatán se
|
||
caracteriza por un relieve ondulado compuesto por planicies estructurales y
|
||
lomeríos (<sup><a href=#B83>Lugo-Hubp <em>et al.</em>,
|
||
1992</a></sup>), con depresiones y cavernas cuyas dimensiones se van ampliando
|
||
hacia el sur del estado (<sup><a href=#B36>Duch, 1988</a></sup>).
|
||
<sup><a href=#B37>Duch (1991)</a></sup> estudió los patrones de
|
||
asociación de las topoformas (forma, tamaño y predominancia), reconociendo 20
|
||
zonas fisiográficas. <sup><a href=#B44>Finch (1965)</a></sup>
|
||
identificó tres zonas kársticas en el estado: el karst de la costa, el karst
|
||
central y el karst de las colinas. Los cenotes, del Maya <em>dzonot</em>
|
||
(<sup><a href=#B27>De Ciudad & Acuña, 1984</a></sup>) están
|
||
localizados, principalmente, en la zona de karst central, alrededor del cráter
|
||
de Chicxulub formando el conocido anillo de cenotes, con un diámetro aproximado
|
||
de 160 km. Este cráter se formó por el impacto de un meteorito hace
|
||
aproximadamente 65 millones de años (<a href=#f3>figura
|
||
3</a>) (<sup><a href=#B28>Connors <em>et al.</em>,
|
||
1996</a></sup>; <sup><a href=#B98>Perry, Marín, McClain &
|
||
Velazquez, 1995</a></sup>). Al sur-oeste de la ciudad de Mérida se encuentra un
|
||
relieve de planicies y lomeríos de gran tamaño, destacando la sierrita de Ticul.
|
||
En esta zona no hay cenotes, las formas cársticas están limitadas a numerosas
|
||
cavernas de varios tamaños (<sup><a href=#B83>Lugo-Hubp <em>et
|
||
al.</em>, 1992</a></sup>).</p>
|
||
<p>
|
||
<div class=figure>
|
||
<a name=f3></a><a target=_blank href=https://www.scielo.org.mx/img/revistas/au/v29//2007-9621-au-29-e2292-gf3.jpg><img class=graphic src=data:,></a><p>Modificado: <sup><a href=#B93><em>National
|
||
Aeronautics and Space Administration</em> (NASA),
|
||
2003</a></sup>.</p>
|
||
<p class=label_caption><span class=label>Figura 3 </span><span class=caption>Representación esquemática del cráter de Chicxulub y anillo de
|
||
cenotes del estado de Yucatán. </span></p>
|
||
</div>
|
||
<p></p>
|
||
<p>En cuanto a su morfología, la Península de Yucatán presenta dos unidades
|
||
morfológicas principales, una en el norte donde predominan las planicies y rocas
|
||
sedimentarias neogénicas y la segunda al sur donde se alternan planicies con
|
||
lomeríos de hasta 400 msnm en rocas sedimentarias oligocénicas (<sup><a href=#B83>Lugo-Hubp <em>et al.</em>, 1992</a></sup>).
|
||
En el estado de Yucatán existen dos principales formas de relieve: planicies y
|
||
montículos; sin embargo, también existen otras formaciones como las planicies
|
||
inclinadas, planicies onduladas y planicies escalonadas de geometría diversa
|
||
(<sup><a href=#B82>Lugo & García, 1999</a></sup>). En Yucatán
|
||
el karst se considera, en general, maduro (<sup><a href=#B118>Steinich & Marín, 1997</a></sup>), pero con menor evolución en la zona
|
||
centro-norte cerca del anillo de cenotes (<sup><a href=#B88>Marín,
|
||
Perry, Essaid & Steinich, 2001</a></sup>) y un grado de madurez tardío
|
||
hacia el denominado cono sur. <sup><a href=#B19>Bosák
|
||
(2008)</a></sup> realizó una clasificación y caracterización de los tipos de
|
||
karst, considerando el tiempo de exposición de la roca, la geología y geografía,
|
||
identificando a las zonas de karst del caribe como cuencas de sedimentación, con
|
||
un tiempo corto de exposición de la roca, por lo que evolutivamente se
|
||
encuentran entre los más recientes del mundo. El karst del estado de Yucatán,
|
||
por sus características, puede incluirse dentro de esta clasificación.</p>
|
||
</div>
|
||
<div class=section>
|
||
<a name=idp6569072></a><p class=sub-subsec>Suelos</p>
|
||
<p>Aunque los suelos dominantes en el estado de Yucatán son los Leptosols, se pueden
|
||
encontrar también Arenosols, Regosols, Solonchaks, Gleysols e Histosols (cerca
|
||
de la línea de costa) y Luvisols, Vertisols y Stagnosols en el resto del estado
|
||
(<sup><a href=#B9>Bautista, Frausto, Ihl & Aguilar,
|
||
2015</a></sup>).</p>
|
||
<p>Aunque la roca caliza es el material que subyace a estos suelos, no es el
|
||
principal material parental; los principales materiales parentales son los
|
||
sedimentos marinos, residuos volcánicos ricos en ilita, caolinita, esmectita,
|
||
montmorillonita y clorita y, polvos transportados por el viento desde África que
|
||
aportan entre 33 g y 75 g de fósforo/ha/año (<sup><a href=#B21>Cabadas <em>et al.</em>, 2010</a></sup>; <sup><a href=#B29>Das, Evan & Lawrence, 2013</a></sup>); siendo los principales
|
||
factores formadores de suelos la edad superficial y el clima (principalmente la
|
||
precipitación),los cuales contribuyen en la disolución de la roca caliza y
|
||
disminución de los carbonatos del suelo (<sup><a href=#B10>Bautista, Palacio-Aponte, Quintana & Zinck, 2011</a></sup>).</p>
|
||
<p>Específicamente, los materiales parentales de los suelos rojos arcillosos
|
||
profundos (Luvisols) son una mezcla de materiales volcánicos y componentes
|
||
metamórficos y graníticos transportados por el viento (<sup><a href=#B21>Cabadas <em>et al.</em>, 2010</a></sup>; <sup><a href=#B117>Solleiro-Rebolledo & Cabadas, 2011</a></sup>),
|
||
combinados con los residuos de la roca caliza (<sup><a href=#B99>Perry <em>et al.</em>, 2003</a></sup>). Los suelos que se desarrollan
|
||
en la parte superior del microrelieve no presentan carbonatos pedogénicos
|
||
secundarios, mientras que los suelos desarrollados en las partes bajas sí lo
|
||
hacen (<sup><a href=#B73>Krasilnikov <em>et al.,</em>
|
||
2013</a></sup>). Los suelos someros del norte de Yucatán presentan
|
||
principalmente caolinita y los profundos del sur presentan montmorillonita,
|
||
sobre todo aquellos que no tienen buen drenaje (<sup><a href=#B67>Isphording, 1976</a></sup>). En general, los suelos de Yucatán tienen valores
|
||
altos de carbono orgánico (entre 3.8% y 31.7%) (<sup><a href=#B32>Delgado-Carranza, Bautista-Zúñiga, Calvo-Irabien, Aguilar-Duarte &
|
||
Martínez-Tellez, 2017</a></sup>), siendo los suelos de los humedales (<sup><a href=#B60>Herrera <em>et al.</em>, 2016</a></sup>) y de
|
||
las partes altas del microrelieve (<sup><a href=#B12>Bautista-Zúñiga, Jiménez-Osorio, Navarro-Alberto, Manu & Lozano,
|
||
2003</a></sup>) los que presentan los valores más altos; sin embargo, estos
|
||
últimos poseen menor cantidad de tierra fina y altos porcentajes de pedregosidad
|
||
y rocosidad (<sup><a href=#B32>Delgado-Carranza <em>et
|
||
al</em>., 2017</a></sup>). Las condiciones kársticas de Yucatán han
|
||
dado lugar a cuatro tipos generales de suelo, los suelos arenosos (presentes en
|
||
la costa), los suelos orgánicos (asociados a humedales) y dos tipos más en el
|
||
interior del estado, los de planicie (rojos) y los de montículo (negros). Una
|
||
diferencia muy marcada entre estos dos últimos tipos de suelos es que el
|
||
contenido de carbonatos promedio de carbonatos es de 45% en suelos negros y 5%
|
||
en suelos rojos (<sup><a href=#B40>Estrada-Medina, Canto-Caché, De
|
||
los Santos-Briones & O’Connor-Sánchez, 2016</a></sup>). En general, la
|
||
fertilidad química de suelos negros es mejor que la de los suelos rojos (<sup><a href=#B1>Aguila, 2007</a></sup>), aunque los suelos rojos
|
||
presentan mejores propiedades físicas que permiten una mayor facilidad para
|
||
realizar actividades agrícolas.</p>
|
||
</div>
|
||
<div class=section>
|
||
<a name=idp6593728></a><p class=sub-subsec>Hidrología del karst</p>
|
||
<p>Debido a sus características, el karst del estado de Yucatán es del tipo
|
||
holokarst, ya que este hace referencia al paisaje kárstico donde toda el agua es
|
||
drenada al subsuelo (<sup><a href=#B47>Ford <em>et
|
||
al.</em>, 1988</a></sup>); esto es debido al alto nivel de fracturación
|
||
de la roca superficial y la porosidad de las rocas subsuperficiales (<sup><a href=#B80>Lesser & Weidie, 1988</a></sup>). Este holokarst
|
||
ha permitido la formación de un gran acuífero, el cual es la única fuente de
|
||
agua potable en el estado y está conformado por un lente de agua dulce flotando
|
||
sobre agua salada (<sup><a href=#B87>Marín, Pacheco & Méndez,
|
||
2004</a></sup>), con intrusión salina reportada en la zona sur del anillo de
|
||
cenotes y hacia el nororiente de la sierrita de Ticul (<sup><a href=#B101>Perry <em>et al.</em>, 2009</a></sup>). El flujo hidrológico
|
||
es completamente subterráneo y fundamentalmente radial que va de sur a norte,
|
||
hacia las zonas de costa (<sup><a href=#B8>Bauer-Gottwein
|
||
<em>et al.</em>, 2011</a></sup>). Una de las principales
|
||
características de la hidrología de Yucatán es la presencia de cenotes, cuerpos
|
||
de agua formados por disolución y colapso de la roca caliza (<sup><a href=#B52>Gaona-Vyzcaino, Gordillo-de Anda &
|
||
Villasuso-Pino, 1980</a></sup>). Se estima que en el estado de Yucatán existan
|
||
aproximadamente entre 7000 y 8000 cenotes (<sup><a href=#B13>Beddows <em>et al</em>., 2007</a></sup>). El proceso de disolución
|
||
también promueve la formación de depresiones circulares en la roca caliza dura,
|
||
denominadas sartenejas o haltunes (del Maya <em>ha</em>, que significa
|
||
agua, y <em>tun</em>, que significa piedra) las cuales acumulan agua de
|
||
lluvia, variando su tamaño de unos cuantos centímetros hasta varios metros
|
||
(<sup><a href=#B27>De Ciudad & Acuña, 1984</a></sup>; <sup><a href=#B44>Finch, 1965</a></sup>; <sup><a href=#B46>Flores, 2010</a></sup>; <sup><a href=#B123>Wilson,
|
||
1980</a></sup>). En el sur del estado donde los afloramientos son escasos y los
|
||
suelos son más profundos, se forman las aguadas, también conocidas como ollas de
|
||
agua, jagüeyes o aljibes, las cuales son depresiones sobre suelos no permeables,
|
||
donde se acumula el agua de escurrimientos superficiales (<sup><a href=#B112>Secretaría de Agricultura, Ganadería, Desarrollo Rural, Pesca y
|
||
Alimentación [Sagarpa, s.f.</a></sup>). Estas pueden ser naturales o
|
||
construidas por el hombre. También existen otras depresiones llamadas
|
||
rejolladas, cenotes colapsados cuya base se encuentra sobre el nivel del manto
|
||
freático, en las que el agua arrastra materiales superficiales que se depositan
|
||
en el fondo, pero el agua no se acumula; generando microambientes con suelos más
|
||
profundos y húmedos, mayor humedad relativa y temperaturas más moderadas con
|
||
respecto a las áreas circundantes (<sup><a href=#B37>Duch,
|
||
1991</a></sup>; <sup><a href=#B91>Munro-Stasiuk, Manahan,
|
||
Stockton & Arden, 2014</a></sup>).</p>
|
||
</div>
|
||
</div>
|
||
<div class=section>
|
||
<a name=idp6616032></a><p class=sub-subsec>Biología del karst en Yucatán</p>
|
||
<div class=section>
|
||
<a name=idp6616752></a><p class=sub-subsec>Bacterias y hongos inferiores</p>
|
||
<p>Existen pocos estudios acerca de la biodiversidad de estos grupos de
|
||
microorganismos en el estado de Yucatán, su estudio puede ayudar a entender
|
||
procesos ecológicos y humanos y proveer soluciones biotecnológicas para la
|
||
salud, la industria y otros sectores (<sup><a href=#B106>Rojas-Herrera, Zamudio-Maya, Arena-Ortíz, Pless & O’Connor-Sánchez,
|
||
2011</a></sup>). <sup><a href=#B50>Gamboa, Heredia, Reyes &
|
||
de la Rosa (2010)</a></sup> realizaron un estudio de la diversidad de bacterias
|
||
y hongos en cenotes y la selva de Yucatán, encontrando 278 especies de bacterias
|
||
y 133 de hongos microscópicos, la mayor parte de ellos no pudieron ser
|
||
identificados a nivel de especie. <sup><a href=#B40>Estrada-Medina
|
||
<em>et al.</em> (2016)</a></sup> encontraron que en los suelos
|
||
rojos dominan las acidobacterias, mientras que en los suelos negros dominan las
|
||
actinobacterias, acidobacterias y proteobacterias. <sup><a href=#B5>Bala, Murphy & Giller (2003)</a></sup> encontraron que las
|
||
leguminosas <em>Calliandra calothyrsus</em>, <em>Gliricidia
|
||
sepium</em> y <em>Leucaena leucocephala</em> de Yucatán
|
||
estuvieron asociadas a un mayor número de bacterias que los individuos de las
|
||
mismas especies en otras seis localidades de cinco países tropicales.</p>
|
||
</div>
|
||
<div class=section>
|
||
<a name=idp6625856></a><p class=sub-subsec>Flora</p>
|
||
<p>La vegetación en condiciones kársticas está restringida por la profundidad del
|
||
suelo, su contenido de agua, disponibilidad de nutrientes, déficit hídrico,
|
||
fracturas y porosidad de las rocas y volumen de fragmentos rocosos (<sup><a href=#B42>Estrada-Medina <em>et al</em>.,
|
||
2010</a></sup>; <sup><a href=#B70>Kang <em>et al.</em>,
|
||
2014</a></sup>; <sup><a href=#B84>Luna-Flores, Estrada-Medina,
|
||
Jiménez-Osornio & Pinzón-López, 2012</a></sup>). Las leguminosas
|
||
representan la familia de plantas más diversa en el estado con 174 especies,
|
||
estas plantas están bien adaptadas a las diferentes condiciones kársticas, pues
|
||
se encuentran distribuidas desde la duna costera hasta las selvas bajas y
|
||
medianas y en la vegetación secundaria (<sup><a href=#B46>Flores,
|
||
2010</a></sup>). Los mecanismos de adaptación aún se mantienen desconocidos,
|
||
pero es posible que uno de ellos sea la capacidad de las leguminosas de fijar
|
||
nitrógeno, lo que les da una ventaja competitiva (<sup><a href=#B79>Leirana-Alcocer, Hernández-Betancourt, Salinas-Peba &
|
||
Guerrero-González, 2009</a></sup>). El huaxín (<em>Leucaena
|
||
leucocephala</em>) es una de las especies de leguminosas más común en el
|
||
estado de Yucatán, por su uso como especie forrajera y porque suele dominar en
|
||
los primeros estados de sucesión de la vegetación. Las raíces de algunas
|
||
especies han evolucionado para poder crecer a través de las fisuras de la roca e
|
||
incluso solubilizándolas en búsqueda de humedad. Este es, al parecer, el caso
|
||
del álamo (<em>Ficus cotilefonia</em>), una especie arbórea rupícola que
|
||
se considera indicadora de cenotes, ya que se encuentra frecuentemente asociada
|
||
a los cenotes y sus raíces suelen colgar de los techos de las bóvedas de estos
|
||
(<sup><a href=#B46>Flores, 2010</a></sup>). También es muy común
|
||
encontrarla sobre las paredes y techos de casas abandonadas, construidas de
|
||
piedra caliza. Del mismo modo, en las rejolladas existen especies de árboles que
|
||
normalmente no se encuentran en la vegetación circundante, pero se encuentran en
|
||
otras latitudes donde la humedad es más alta, tales como el cacao
|
||
(<em>Theobroma cacao</em>), la huaya (<em>Melicoccus
|
||
bijugatus</em>), el mamey (<em>Pouteria sapota</em>), el mango
|
||
(<em>Manguifera indica</em>); además, se pueden encontrar también
|
||
helechos, musgos y selaginelas (<sup><a href=#B46>Flores,
|
||
2010</a></sup>). En los cenotes se pueden encontrar especies lacustres como el
|
||
carrizo (<em>Phragmites australis</em>), flotantes como la lenteja de
|
||
agua (<em>Lemna minor</em>) y la flor de agua (<em>Nymphaea
|
||
ampla</em>), y sumergidas como la elodea (<em>Egeria densa</em>)
|
||
y la <em>Vallisneria americana</em> (<sup><a href=#B45>Flores & Espejel, 1994</a></sup>).</p>
|
||
</div>
|
||
<div class=section>
|
||
<a name=idp6644624></a><p class=sub-subsec>Fauna</p>
|
||
<p>En cuanto a la fauna, existen organismos pertenecientes a varios grupos: peces,
|
||
crustáceos, gasterópodos, anfibios y reptiles y murciélagos que se han
|
||
especializado para sacar provecho de las condiciones específicas del karst. El
|
||
grupo de los peces de Yucatán cuenta con componentes endémicos con
|
||
características morfológicas únicas (<sup><a href=#B110>Schmitter-Soto <em>et al.</em>, 2002</a></sup>), como es el caso de
|
||
los peces ciegos (<em>Typhlias pearsei</em> y <em>Ophisternon
|
||
infernale</em>), que son animales que han evolucionado perdiendo los
|
||
ojos para adaptarse a las condiciones de poca luz de las cavernas subacuáticas
|
||
(<sup><a href=#B94>Niven, 2008</a></sup>). En cuanto a los
|
||
crustáceos (decápodos, copépodos y cladóceros), estos se relacionan a sitios
|
||
donde existe mezcla de agua dulce y salada (ambientes anquihalinos), como los
|
||
que se presentan en los cenotes (<sup><a href=#B4>Álvarez, Iliffe,
|
||
Benitez, Brankovits & Villalobos, 2015</a></sup>). Los gasterópodos (por
|
||
ejemplo., caracoles y babosas) suelen ser abundantes cerca de los cuerpos de
|
||
agua intermitentes y de los suelos pedregosos (principalmente en la época de
|
||
lluvias). La humedad promueve la liberación de calcio de la roca y del suelo,
|
||
materia prima para construir las conchas de los caracoles (<sup><a href=#B49>Fournié & Chétail, 1984</a></sup>), lo que ha sido positivamente
|
||
correlacionado con su abundancia y diversidad (<sup><a href=#B62>Hotopp, 2002</a></sup>; <sup><a href=#B116>Skeldon,
|
||
Vadeboncoeur, Hamburg & Blum, 2007</a></sup>). <sup><a href=#B11>Bautista-Zúñiga, Delgado-Carranza & Estrada-Medina
|
||
(2008)</a></sup> demostraron que en Yucatán la densidad de caracoles es mayor
|
||
que la de lombrices de tierra. Se han contabilizado 60 especies de gasterópodos
|
||
asociadas a cenotes y aguadas (<sup><a href=#B14>Bequaert &
|
||
Clench, 1936</a></sup>) y 46 especies terrestres (<sup><a href=#B92>Naranjo-García, 2014</a></sup>). Existen 18 especies de anfibios en
|
||
Yucatán, esto representa solo el 5% del total nacional (<sup><a href=#B25>Chablé, 2010</a></sup>). Estas especies han evolucionado para
|
||
aprovechar las aguadas y sartenejas para depositar sus huevos, como la rana
|
||
nativa, <em>Craugastor yucatanensis</em> (rana ladradora yucateca)
|
||
(<sup><a href=#B26>Charruau, Cadeño-Vázquez & Köhler,
|
||
2015</a></sup>). Finalmente, para los murciélagos las cuevas y cenotes resultan
|
||
ambientes sumamente importantes para su conservación, especialmente para
|
||
especies como <em>Chrotopterus auritus</em>, <em>Eptesicus
|
||
furinalis</em> y <em>Micronycteris microtis</em> (<sup><a href=#B86>MacSwiney, Vilchis, Clarke & Racey,
|
||
2007</a></sup>); así mismo, <sup><a href=#B85>MacSwiney, Clarke
|
||
& Racey (2004)</a></sup> encontraron que la diversidad de los quirópteros
|
||
se incrementa en los lugares donde hay cenotes.</p>
|
||
</div>
|
||
</div>
|
||
<div class=section>
|
||
<a name=idp6666048></a><p class=sub-subsec>Riesgos y problemas ambientales en condiciones de karst</p>
|
||
<div class=section>
|
||
<a name=idp6666752></a><p class=sub-subsec>Contaminación del acuífero</p>
|
||
<p>Es bien conocido que los sistemas kársticos son muy frágiles y vulnerables por
|
||
sus características hidrológicas (<sup><a href=#B30>Day,
|
||
2010</a></sup>; <sup><a href=#B78>LeGrand, 1973</a></sup>). Incluso
|
||
el entendimiento de cómo debe definirse un acuífero kárstico aún está siendo
|
||
discutido (<sup><a href=#B124>Worthington, Jeannin, Alexander,
|
||
Davis & Schindel, 2017</a></sup>). El acuífero kárstico de Yucatán tiene un
|
||
balance positivo, pues la cantidad de agua que se extrae no sobrepasa la recarga
|
||
natural (Diario Oficial de la Federación [DOF], 2015); el único balance
|
||
hidrológico realizado a nivel estatal reporta 44 877 Mm<sup>3</sup> de
|
||
precipitación total anual, 35 902 Mm<sup>3</sup> de evapotranspiración, recarga
|
||
neta de 8975 Mm<sup>3</sup>, extracción de 547.01 Mm<sup>3</sup> y una
|
||
disponibilidad de 8427.99 Mm<sup>3</sup> anuales (<sup><a href=#B64>Instituto Nacional de Estadística y Geografía [INEGI],
|
||
2002</a></sup>). Sin embargo, este volumen no considera la descarga natural
|
||
comprometida, para la cual no se cuenta con un registro oficial. Tomando en
|
||
cuenta esta información, se considera que el acuífero del estado de Yucatán está
|
||
subexplotado (<sup><a href=#B24>Cervantes-Martínez, 2007</a></sup>;
|
||
<sup><a href=#B64>INEGI; 2002</a></sup>). Los efectos de la
|
||
extracción de agua son rápidamente dispersados, gracias a la rápida
|
||
conductividad hidráulica del acuífero (<sup><a href=#B55>González-Herrera, Sánchez-y-Pinto & Gamboa-Vargas, 2002</a></sup>); no
|
||
obstante, la vulnerabilidad a la contaminación del acuífero es muy elevada,
|
||
sobre todo en aquellas áreas donde el acuífero es muy superficial o los suelos
|
||
son muy someros (<sup><a href=#B38>Escolero <em>et
|
||
al.</em>, 2002</a></sup>; <sup><a href=#B54>González-Herrera, Martínez-Santibañez, Pacheco-Ávila &
|
||
Cabrera-Sansores, 2014</a></sup>; <sup><a href=#B89>Marín
|
||
<em>et al.</em>, 2000</a></sup>). En un trabajo más reciente,
|
||
Aguilar <em>et al.</em> (2014; <sup><a href=#B3>2016)</a></sup> identifican las zonas de extrema vulnerabilidad de acuerdo con
|
||
atributos de relieve, suelo y clima, destacando el anillo de cenotes y otras
|
||
áreas al oriente del estado como campos de dolinas. Los suelos son un primer
|
||
filtro para los contaminantes que se infiltran con la lluvia, teniendo cada tipo
|
||
de suelo (dependiendo de sus características) diferentes capacidades de
|
||
retención de contaminantes (<sup><a href=#B2>Aguilar <em>et
|
||
al</em>., 2011</a></sup>). En áreas donde existe sascab, este podría
|
||
estar también actuando como un filtro; no obstante, aún no existen estudios al
|
||
respecto. Los principales contaminantes del acuífero de Yucatán provienen de la
|
||
porcicultura, la avicultura, así como la nixtamalización del maíz, los residuos
|
||
de fertilizantes y los pesticidas, los tiraderos a cielo abierto y las fosas
|
||
sépticas (<sup><a href=#B6>Batllori, 2016</a></sup>). <sup><a href=#B105>Rendón (2016)</a></sup> encontró ocho diferentes
|
||
plaguicidas organoclorados en el agua de cenotes de Yucatán, incluyendo Dicloro
|
||
Difenil Tricloroetano (DDT), un plaguicida que se supone no se usa desde los
|
||
años setentas, por lo que se presume que puede ser residual. Debido a que el
|
||
estado de Yucatán cuenta con un acuífero libre, cuyo flujo va hacia la costa y
|
||
Golfo de México (<sup><a href=#B120>Villasuso & Ramos,
|
||
2000</a></sup>). Es importante realizar un manejo adecuado de fertilizantes y
|
||
plaguicidas en el interior del estado para evitar la contaminación de los
|
||
ecosistemas costeros y el Golfo de México (<sup><a href=#B31>Delgado <em>et al</em>., 2010</a></sup>).</p>
|
||
</div>
|
||
<div class=section>
|
||
<a name=idp6693248></a><p class=sub-subsec>Inundaciones</p>
|
||
<p>Los riegos de inundaciones prolongadas en el estado de Yucatán son mínimas, pues
|
||
por un lado la fracturación de la roca superficial y la alta porosidad de la
|
||
roca subsuperficial permiten una rápida filtración del agua (<sup><a href=#B41>Estrada-Medina <em>et al.</em>,
|
||
2013</a></sup>) y, por el otro, las altas temperaturas promedio evaporan
|
||
rápidamente el agua superficial (<sup><a href=#B95>Orellana,
|
||
1999</a></sup>). Las inundaciones más persistentes se presentan en las partes
|
||
cercanas a la costa donde la roca caliza expuesta está poco fracturada o en el
|
||
sur del estado donde existen suelos arcillosos poco permeables (<sup><a href=#B36>Duch, 1988</a></sup>, <sup><a href=#B37>1991</a></sup>).</p>
|
||
</div>
|
||
<div class=section>
|
||
<a name=idp6699760></a><p class=sub-subsec>Hundimientos y colapsos</p>
|
||
<p>La karstificación de las rocas solubles puede ocasionar hundimientos en la
|
||
superficie del terreno, manifestándose en la aparición de depresiones cerradas
|
||
denominadas dolinas de subsidencia (<sup><a href=#B57>Gutiérrez,
|
||
2004</a></sup>). La dureza de la roca dura superficial o coraza calcárea
|
||
disminuye el riesgo de hundimientos, pero los colapsos podrían ocurrir en
|
||
lugares donde esta capa de roca sea muy delgada, el acuífero este muy cercano a
|
||
la superficie y la disolución exceda la neoformación de los carbonatos o, bien,
|
||
el peso de los asentamientos humanos sea demasiado. Es en las zonas cercanas a
|
||
la playa donde se tiene el menor espesor de la roca y la mayor cercanía al
|
||
acuífero (<sup><a href=#B7>Batllori-Sampedro, González-Piedra,
|
||
Díaz-Sosa & Febles-Patrón, 2006</a></sup>), mientras que es en el sur del
|
||
estado, con la mayor cantidad de lluvia (<sup><a href=#B95>Orellana, 1999</a></sup>), donde el agua tiene mayor potencial de disolver la
|
||
caliza.</p>
|
||
</div>
|
||
<div class=section>
|
||
<a name=idp6705312></a><p class=sub-subsec>Extracción de roca caliza</p>
|
||
<p>El uso de la caliza como material de construcción ha permitido el desarrollo de
|
||
minas de extracción o bancos de materiales denominados localmente sascaberas.
|
||
Las piedras se utilizan para cimientos, bardas y albarradas (muros sin mezcla),
|
||
y para producir grava y arena la caliza es materia prima para la producción de
|
||
cal, carbonato de calcio y cemento (<sup><a href=#B114>Secretaría
|
||
de Economía [SE], 2016</a></sup>). El número de bancos de materiales
|
||
registrados en Yucatán es de aproximadamente 150 (<sup><a href=#B113>Secretaría de Comunicaciones y Transportes [SCT], 2015</a></sup>).
|
||
La producción de arena y grava producida en Yucatán representa el 9.4% del total
|
||
nacional (<sup><a href=#B65>INEGI, 2011</a></sup>). El problema con
|
||
las sascaberas es que eliminan toda la vegetación y el sustrato rocoso hasta
|
||
casi llegar al manto acuífero, lo que permite una entrada de contaminantes de
|
||
una manera más directa al acuífero.</p>
|
||
</div>
|
||
<div class=section>
|
||
<a name=idp6711344></a><p class=sub-subsec>Conservación del karst</p>
|
||
<p>El karst de Yucatán es un paisaje único cuyas características lo hacen ser un
|
||
ambiente de gran interés geológico, hidrológico, biológico y económico. Hasta el
|
||
2002 existían en el estado 4407 km<sup>2</sup> de áreas de karst dentro de algún
|
||
esquema de protección (<sup><a href=#B74>Kueny & Day,
|
||
2002</a></sup>). En 2011 se decretó la reserva estatal biocultural del Puuc, lo
|
||
cual añadió 1358.48 km<sup>2</sup> de áreas en conservación (<sup><a href=#B34>Diario Oficial del Estado de Yucatán [DOGEY],
|
||
2011</a></sup>), y en 2013 se decretó la reserva estatal geohidrológica del
|
||
anillo de cenotes con una superficie de 2192.08 km<sup>2</sup> (<sup><a href=#B35>DOGEY, 2013</a></sup>). El total de la superficie
|
||
bajo algún esquema de protección asciende a 7957.56 km<sup>2</sup>, lo que
|
||
representa el 20.13% de la superficie estatal.</p>
|
||
<p>Aunado a esta política, las estrategias de conservación deben considerar como
|
||
aspectos centrales la conservación de la biodiversidad y demás recursos
|
||
naturales, con énfasis en el suelo y agua, a través de estrategias concretas
|
||
como 1) regular la extracción de los recursos bióticos y abióticos del karst, 2)
|
||
frenar el crecimiento desordenado de los asentamientos humanos y actividades
|
||
productivas, 3) regular el uso de agroquímicos y el vertido de aguas residuales
|
||
al suelo, cuerpos de agua y acuífero y 4) eficientizar el uso del agua en todos
|
||
los sectores de la sociedad (público en general, turístico, agropecuario e
|
||
industrial).</p>
|
||
</div>
|
||
</div>
|
||
<div class=section>
|
||
<a name=idp6720512></a><p class=sec>Conclusiones</p>
|
||
<p>El karst de Yucatán requiere estudios más profundos sobre las propiedades de la roca
|
||
y la dinámica de los procesos que dieron lugar a su origen y evolución, para poder
|
||
entender mejor las condiciones de este ambiente que han dado lugar a sus rasgos
|
||
morfológicos característicos. El entendimiento de estos procesos permitirá realizar
|
||
un manejo más sustentable de los recursos naturales, así como mejores evaluaciones
|
||
de la vulnerabilidad del territorio ante eventos naturales o antropogénicos
|
||
(huracanes, incendios, sequías, intrusión salina, contaminación del suelo y agua,
|
||
etc.) que promuevan la conservación de este ambiente y su biodiversidad
|
||
asociada.</p>
|
||
<p>Entre los estudios que deben ser prioritarios están la variabilidad espacial y
|
||
temporal de la calidad del agua, el monitoreo de los niveles del acuífero, la
|
||
identificación detallada de las rutas de las corrientes subterráneas y sus
|
||
desembocaduras, las tasas de infiltración de los contaminantes normados (regulados
|
||
por las normas oficiales mexicanas) y emergentes (microplásticos, hormonas,
|
||
medicamentos, etc.) en el suelo y subsuelo (especialmente aquellos contenidos en las
|
||
aguas residuales), los efectos de la extracción de material calcáreo, los efectos
|
||
del cambio climático sobre las formas kársticas, etc.</p>
|
||
</div>
|
||
</div>
|
||
<div id=article-back class=back>
|
||
<div>
|
||
<a name=references></a><p class=sec><p class=sec>Referencias<p></p>
|
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|
||
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||
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</div>
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<div class=foot-notes>
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||
<a name=fn1></a><div class=fn>
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||
<a name=fn1></a><p><sup>1</sup>Como citar: Estrada-Medina, H., Jiménez-Osornio, J. J., Álvarez-Rivera, O., &
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Barrientos-Medina, R. C. (2019). El karst de Yucatán: su origen, morfología y
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biología. <em>Acta Universitaria 29</em>, e2292. doi. <a href=http://doi.org/10.15174.au.2019.2292 target=_blank>http://doi.org/10.15174.au.2019.2292</a>
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||
</p>
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||
</div>
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||
</div>
|
||
</div>
|
||
<div class=foot-notes>
|
||
<div class=history><p>Recibido:
|
||
24 de Mayo de 2018; Aprobado:
|
||
13 de Septiembre de 2019; Publicado:
|
||
23 de Octubre de 2019</p></div>
|
||
<div class=author-notes><p class=corresp><a name=c1></a>
|
||
<sup>*</sup>Autor de correspondencia. Correo electrónico:
|
||
<a href=mailto:hector.estrada@correo.uady.mx>hector.estrada@correo.uady.mx</a>
|
||
</p></div>
|
||
</div>
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