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<p><span style="font-family: arial,helvetica,sans-serif; font-size: medium;">Dado el siguiente número complejo «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«mi»z«/mi»«mn»1«/mn»«/msub»«mo»=«/mo»«mo»#«/mo»«mi»z«/mi»«mn»1«/mn»«/math» transfórmalo a su forma #p</span></p> <p> <span style="color: #ff0000; font-family: arial,helvetica,sans-serif; font-size: medium;"> <br /></span></p> <p> </p> <p><strong><span style="font-family: arial,helvetica,sans-serif; font-size: medium; color: #ff0000;">Observaciones:</span></strong></p> <p style="margin-left: 30px;"> </p> <p style="text-align: left; margin-left: 30px;"><span style="font-family: arial,helvetica,sans-serif; font-size: medium; color: #ff0000;">- Para ingresar la respuesta, tienes que escribirla en la forma </span><span style="font-family: arial,helvetica,sans-serif; font-size: medium;">«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mtext mathcolor=¨#FF0000¨»#t1«/mtext»«/math» </span></p> <p style="text-align: left;"><span style="color: #ff0000; font-family: arial,helvetica,sans-serif; font-size: medium;"><span style="font-family: arial,helvetica,sans-serif; font-size: medium; color: #ff0000;"> - Por ejemplo si tu respuesta es «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mtext mathcolor=¨#FF0000¨»#t3«/mtext»«/math» y «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mtext mathcolor=¨#FF0000¨»#t4«/mtext»«/math», debes ingresar «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mtext mathcolor=¨#FF0000¨»#t2«/mtext»«/math»</span></span></p> <p style="text-align: left;"> <span style="color: #ff0000; font-family: arial,helvetica,sans-serif; font-size: medium;">- Recuerda que la unidad imaginaria es "j"</span></p> <p style="text-align: left;"><span style="color: #ff0000; font-family: arial,helvetica,sans-serif; font-size: medium;"> - #obs</span></p>
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<p> </p> <p><span style="font-family: arial, helvetica, sans-serif; font-size: medium;">Veamos una solución para el problema, si aún te quedan dudas consulta con tu profesor de asignatura.</span></p> <p><span style="font-family: arial, helvetica, sans-serif; font-size: medium;"> </span></p> <p><span style="font-family: arial, helvetica, sans-serif; font-size: medium;">Para convertir «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«msub»«mi»z«/mi»«mn»1«/mn»«/msub»«/math» a su forma #p «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»t«/mi»«mn»1«/mn»«/math», debemos determinar «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo mathcolor=¨#7F0000¨»#«/mo»«mi mathcolor=¨#7F0000¨»t«/mi»«mn mathcolor=¨#7F0000¨»5«/mn»«/math» y «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»t«/mi»«mn»6«/mn»«/math», #t7</span></p> <p><span style="font-family: arial, helvetica, sans-serif; font-size: medium;"> </span></p> <p><span style="font-family: arial, helvetica, sans-serif; font-size: medium;">#t8 </span></p> <p style="text-align: center;"><span style="font-family: arial, helvetica, sans-serif; font-size: medium;">«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»r«/mi»«mi»e«/mi»«mi»t«/mi»«mi»r«/mi»«mn»21«/mn»«/math» y «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»r«/mi»«mi»e«/mi»«mi»t«/mi»«mi»r«/mi»«mn»22«/mn»«/math» </span></p> <p style="text-align: center;"><span style="font-family: arial, helvetica, sans-serif; font-size: medium;"> </span></p> <p style="text-align: left;"><span style="font-family: arial, helvetica, sans-serif; font-size: medium;">#t39 </span></p> <p style="text-align: center;"><span style="font-family: arial, helvetica, sans-serif; font-size: medium;">«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»r«/mi»«mi»e«/mi»«mi»t«/mi»«mi»r«/mi»«mn»31«/mn»«/math» #retr33 «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»r«/mi»«mi»e«/mi»«mi»t«/mi»«mi»r«/mi»«mn»32«/mn»«/math»</span></p> <p style="text-align: center;"><span style="font-family: arial, helvetica, sans-serif; font-size: medium;"> </span></p> <p style="text-align: center;"><span style="font-family: arial, helvetica, sans-serif; font-size: medium;"> </span></p> <p style="text-align: center;"><span style="font-family: arial, helvetica, sans-serif; font-size: medium;">«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»r«/mi»«mi»e«/mi»«mi»t«/mi»«mi»r«/mi»«mn»41«/mn»«/math» #retr43 «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»r«/mi»«mi»e«/mi»«mi»t«/mi»«mi»r«/mi»«mn»42«/mn»«/math»</span></p> <p style="text-align: center;"><span style="font-family: arial, helvetica, sans-serif; font-size: medium;"> </span></p> <p style="text-align: center;"><span style="font-family: arial, helvetica, sans-serif; font-size: medium;"> </span></p> <p style="text-align: center;"><span style="font-family: arial, helvetica, sans-serif; font-size: medium;">«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»r«/mi»«mi»e«/mi»«mi»t«/mi»«mi»r«/mi»«mn»51«/mn»«/math» #retr53 «math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»r«/mi»«mi»e«/mi»«mi»t«/mi»«mi»r«/mi»«mn»52«/mn»«/math»</span></p> <p style="text-align: center;"><span style="font-family: arial, helvetica, sans-serif; font-size: medium;"> </span></p> <p style="text-align: center;"><span style="font-family: arial, helvetica, sans-serif; font-size: medium;"> </span></p> <p style="text-align: center;"><span style="font-family: arial, helvetica, sans-serif; font-size: medium;">«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»r«/mi»«mi»e«/mi»«mi»t«/mi»«mi»r«/mi»«mn»6«/mn»«/math»</span></p> <p style="text-align: center;"> </p> <p style="text-align: center;"> </p> <p> </p> <p> </p>
No, case is unimportant
Yes, case must match
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Answer 1
Answer
Grade
None
100%
90%
83.33333%
80%
75%
70%
66.66667%
60%
50%
40%
33.33333%
30%
25%
20%
16.66667%
14.28571%
12.5%
11.11111%
10%
5%
Feedback
<p><span style="font-family: arial, helvetica, sans-serif; font-size: medium;">«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mo»#«/mo»«mi»m«/mi»«/math»</span></p>
Answer 2
Answer
Grade
None
100%
90%
83.33333%
80%
75%
70%
66.66667%
60%
50%
40%
33.33333%
30%
25%
20%
16.66667%
14.28571%
12.5%
11.11111%
10%
5%
Feedback
<p>Realizado por N. Yukich - Curicó - 26 de junio de 2016</p> <p>Estimado Luis: sugiero revisar alineación en las observaciones de la pregunta. Respecto a la retroalimentación no tengo nuevas sugerencias. <span style="color: #ff0000; background-color: #ffffff;">Corregido (LOH) 28/06/2016</span></p> <p>Realizado por Nenad Yukich - Curicó - 6 de junio de 2016.</p> <p>Estimado Luis:</p> <p>Sugiero revisar los siguientes aspectos:</p> <p>Observación 1: La palabra transfórmalo lleva acento - PENDIENTE <span style="color: #ff0000; background-color: #ffffff;">Corregido (LOH) 22/06/2016</span></p> <p>Observación 2: Separar "yargumento" en observaciones - PENDIENTE <span style="color: #ff0000; background-color: #ffffff;">Corregido (LOH) 22/06/2016</span></p> <p>Observación 2: Utilizar negrita, además del color rojo - PENDIENTE <span style="color: #ff0000; background-color: #ffffff;">Corregido (LOH) 22/06/2016</span></p> <p>Observación 3: Separar más la pregunta colocando la fórmula en linea aparte - PENDIENTE <span style="color: #ff0000; background-color: #ffffff;">Corregido (LOH) 22/06/2016</span></p> <p>Observación 4: Colorear las fórmulas de wiris - PENDIENTE <span style="color: #ff0000; background-color: #ffffff;">Corregido (LOH) 22/06/2016</span></p> <p>Observación 5: Indicar cantidad de decimales a utilizar para el ángulo - PENDIENTE <span style="color: #ff0000; background-color: #ffffff;">Corregido (LOH) 22/06/2016</span></p> <p>Observación 6: Especificar criterio de aproximación - PENDIENTE <span style="color: #ff0000; background-color: #ffffff;">Corregido (LOH) 22/06/2016</span></p> <p>Observación 7: Señalar uso de punto y no de coma para separar cifras decimales - PENDIENTE <span style="color: #ff0000; background-color: #ffffff;">Corregido (LOH) 22/06/2016</span></p> <p> </p> <p> </p> <p><span style="color: #ff0000;">OBSERVACIONES : <span style="color: #000000;">26 - 06 - 2016 ... N:G:R:</span> </span></p> <p> </p> <p><span style="color: #ff0000;"><span style="color: #000000;"><span style="color: #ff0000;">PENDIENTE :</span> Se sugiere separar un poco mas las coordenadas del complejo <span style="color: #ff0000;"><span style="color: #000000;"><img alt="" src="data:image/png;base64,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" /></span></span> para que se distingan bién la parte real de la imaginaria.</span></span></p> <p><span style="color: #ff0000;">PENDIENTE : <span style="color: #000000;">Se sugiere especificar que el ángulo esta expresado en grados sexagesimales, ya que el alumno de EEA acostumbra usar el ángulo en radianes.</span></span></p> <p><span style="color: #ff0000;"><span style="color: #ff0000;"> </span>PENDIENTE: </span> Sugiero cambiar la forma de presentar</p> <p><img alt="" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAuQAAABeCAIAAADkCJYIAAAgAElEQVR4nOy9d1gUyfb4zd27+RoBQUyra0ZBQcGMgiAo5oRZzDknzHnXdXXNYc0JECUoSpzp7slDEpBgABUBSRJmpifPdNd5/5gZQNYN33v39y53bz3P5/HBnq7qqlOnTp8+VX3aCpQUBoPBYDAYTKPF6i9vAQaDwWAwGMxvgJ0VDAaDwWAwjRrsrGAwGAwGg2nUYGcFg8FgMBhMowY7KxgMBoPBYBo12FnBYDAYDAbTqMHOCgaDwWAwmEYNdlYwGAwGg8E0arCzgsFgMBgMplGDnRUMBoPBYDCNGuysYDAYDAaDadRgZwWDwWAwGEyjBjsrGAwGg8FgGjXYWcFgMBgMBtOowc4KBoPBYDCYRg12VjAYDAaDwTRqsLOCwWAwGAymUYOdFQwGg8FgMI0a7KxgMBgMBoNp1GBnBYPBYDAYTKMGOysYDAaDwWAaNf99zgqiSdO/tX/85U3CmKgdFFZB6qsTjTIu/Mp41TuT0Ndw9NWJjJxb+5OhhmOo4TQ4809s5C/b8/fG1FlEU4yc0FebpE38v5At5i/hf1ClMf+D/Hc5K5Y7nIzD0hSoeEATxmoOQ5t++sub9yvQJFJSQBOGmkRdVaJBTqB6ffnrJEmBkmRlXGMNgUyN/JMEiGgSVDyALICUj/ax9iBSkKDhA2QA5IBRwipIoElQUQAZAOmsgvj3pa3g6qu57C9st8WaE4yMg1R8+A+GoLaqRq6Btd1nFQToRQBPAbJAL0L/nnj/X2GWHqIJQzWHVVKsnGuo4f45mlk7Aas5RgVZd+TX2qDgGqq57H966Xq11fzB2v69IqSpCCPngor/K137I8IxWac/192x2Bk51/hnjSbmfxWr/zrVYRUEwBOmJt5YFQsqCcAT0JDQiHthnqIqIUAmQDaA8D+5R/55kKCgACUDSOBPum8hmmQVJKh41UXRi+aPuXtjN1LzTTESVkGwCqL+wx8j44JWUJJ/f9e2uYGzRgkSToGKh5SUrirxwM4FB3ctBDUPaNJU6v/WEpoErRQgGZTULxUDKQhQCQFStO8iQcX7j+wyTYJSBPAE1I1RA+ucQppk5QTohJmSyxtXT1sc6J8uugQ6YaOLrNAkqMUAKaAgAVIBpH+WZgJNgEoEkAp6Pih+s8sKEnQSgGSg//NLk6AgwZAEkPKHa/s3ilBIQYBeCgaxtvQBqPn/pzG1WCeTF5sNSPBnqwQJCgrYP9POYP43sapnZElk9spr/6DAFF2sLUBbfqp316lvExFtKU5/UOSDPyyX+KBC5UcqrPdfU50kIyMQI86/MWP+ulXPSqSgPrt/0NjIfB4oSfbDdjb8owEfD5zWPt59tA1Ug75/IB+6Xq/Nf1vOUXB1SjGUnt89z61vr44zT/5sVArQL/r7caEpP3gWMV3rgzOV9UbkozK0SLhB/cYaHjCc9PPLDm87WMakIjmH/fDqv+jp79/YTB6JQcZdvmj8hZMbXuaEIhXFmu4Naj5o+LVtYxUE0gnLXkcc3LXw0ulNiZwryxeNz5RcAY1AX52YnHx989qAkz+sAoOQkRO/F2L5sNcKLquRoJQtY70Xi6vrZFInQBUfVdw4s2DgngcPwEAa5ESDPn58CtANTjCNBZ+tPr1/8PjoAgEoCabBaQ3UoKEy/0Kqpl/pX16ahF/ohmXEf2d6m2eNnAtGiZhz5uDuhQkPjiZGH5s5zaskPxwpeSbZfkwVyfrTpPbgBzrw+3e1jxmEBkKulYOCRFq+uuDogVHz0lnRs3MLgpbuKGKeILkpcFWrjX+stnrCBAVXr5JC+amNE6efIcOBESJzdLPh7GYVFDBUuXj3/ukrnmpSkZxjbHihj41O7Vh8MHYkK6cQQxUlbNo2fmmW/gmSJzL0BwVRnVTNHTQX4WzeNnbJU90HReqpygdXQQoSGUXqnO93zh15WcK1qHSDUr/SbCUFCq5eKYbCE6snOTv36rjo0m2kqXN3ftc61T+OGgrBZLF5iOFkXFpxaPP+Eia1bjQbDOhH26ZsjM8AmL8KK1DzQEGwCgJUfNCaoog80PBBRbEKAtEUaIWgIlkFwdIkaASm591aew00D7QCoAmk5IFWYJ4bagGoeUhBsDQFGgGoKURToOaDVgCmh2917UEeqCwar+GDkkRKCjQCUJKsgmBNLVFaflWThioOi6Rpu537+E1LKUlBmkdFycHV1RRSUvXa3NCdYmmSVZCsggAVDz5qduswtd8kCoJVEMgkFqXFNNfKp7aFOj6YFj7UPFCSQJOg5IGGZy5Ck6wsgWVzZHfHtB7geube5edFcaxKAGrK0kEBqCzy0fCQgmAVJKj45kuYBKjhsQrTdXlgGoX6Z2rrx35JMIuabxE1HzQ8c6c0vLqDcj6CRM7GUdN9V7+GTFCR5h5Z6gfa0gyaZBV1btxvKBOrIEFJykseDx3kVPX2IUCy5n185dsHQJPZSVczJZd1VQmgNI8RaAWPwr87emgZokmArAd3Dx7es8gg4xplXIBnd2/snj/bD+mErOL3nKTahql4oOGDPNGoTgJy1pf/GBFVSSAVD9T1BktNgUbIvju9utfns4NjkIEwKExStYy1SVbmKUCap4CGD2qKVZAWZbDIUMVDipjilJCaGgpMQ6mmLPXwzZqgE5grN08Qyly5mjJXYq6QMjtzJv03XVppVgNTw8A04hrzOP4RTwWUFCMnkJpf9S56xeLxVNxJgDTQC1cunUA8Og46ASO3LALWV1qlWWhQ774Cpimm5tefPr/rv9YZBE1DO1MrMaQgWFPlegH9fNu0L90jq1M0r+8WZD/QqQWgNg0EWWdJ6vT/I7XVyb/WmCgS1coUKN03rKXz8rBgADEoeeYJSJsmoKk7BCOnAHhvHy2a6OBH6TJBSSC1ZaKZulCnDARL80AnsNgEy78WtWGVPNDyQU3pSiMLM+6rVfy6CW6ymeYp9qHdUPPMRdLvq1V88690rU2w6LlWYLJ1oOKBigIkVYjXTXB02McTIQNXT/OhfrPNQqvXMF2dQWNqElg2p/TK4KYDPYKjr+QVJdRTv3rm19J4pKhnFizm/QPrpOab7hFAU6CiQC4ASCS2+U3zWp4PT0Fl3qlWz85QvzSn9Xy4Rhb8w/x1WP0008nWzsa+rU2LJp8vuxFpRJJi3sHTEwfMXDTIwcF29bVriud7JnewaW1nbWfbrE0ft7CcNKROMMjNyoT0ROnD2f1atWpt++28I6c0BpGximQ0d0+Na9Omta2DXZvhq/fV6JMAhV+b6BO0YUbA0K4ODjatOwwKr8iBJ0Fj/Bz3xiUAS7B6CWe9Q8dVhwEk5dT6yR1a2Ntb27UfcjoxgkFiQ8XNn/3dNmz0bu1g066dbasWX3391detJm8sLj29t5dneImogtx/ctKAgIUDHRxarb9+VW2QIgWXURBIJ0wXX/b0cOn6bdtBA3q1bNF087qABk+K9YwviRSEkeYb6JB7Gwa2trNp3cHeuukX03+6qlaJTdOGlXMYfbKWWOvn3NzOztreutd3CdEGJHp5Z/IE55Gc8izQCiFtjaPDqODX8aDjsbJExKTTwi0B3T775Kuv23ccG1tK6MtOr+/TzKFNq9ateiw/e1HHisEYHTJz+KGto+xa2w4Z5b9v18yFA4ZNnTfQwa7p1+NXZ4cG9m5vbW/b1vfoZcRKdKVnvhvfw9bOxr51y+ZNvtocEcdoeayCQErCWM0HFHzMfeieA3PH9Gjt0Nq634iVzzQiKOeCITZqnWsXOxsHB5tOY1bky0QACeSOcQsmrX+DslVZW6d1tbe3t7azbW7fo/f1lBSEuJzdM46v8HRy6+jg4Hozh0Tq33dWEE2qK+K8hru8zgpmDaKclOsuzl2OHlo2xmfAtEnDS/LuIxWPkXNBSRll3J+OrLpzZQegVPX7ODCIZgd4K0tjjDIOy6Zcv7Bt2cKxoBf97jIQUpJAE8YaPrCPubtHOtraOjj03rVmZCu78THvCUDCkviVY9u2sLe3tuvocYn/kIWoC+NaNf3in/9q03PZrXtgJIgDI5xsWtrZt2w1eE5yCQUgePV45+mpAyfP6e/g0OHgpZUBjoN3bPFv39q6lUP31ScO3l7b18GhRXPPuSmvKaB/2tDVO0bOf3lr8eoRPhvW+XRzaGXXvP228FCjXoLU0alnxnxra9P6m9a2Lb4atnZXMZ0BOZsmteu3dfsYh9YtrbsNOXN1z75pXR1aN282eUP5ex4g4fuk7TM6tXBo08q+rdvRR6EMiECeID7Q38bO2t6ueb8xgeJyCVJwGMXv+Ct1YRWDmHh0/OxP6+iyWANNat7HH9qz6O7NPcggYuRcVpaIUObzH5zsZ6yuqOaDIRm9Pbd9xZAVdx8ixNfJCESToOblZdxet3LKsYPLx/oNnDRuaNHzMNALTRt1fx0SKQiDQqCvuXZhfp9Wdjb2bW1bNPl88ZUIIxK8il6zZoDX1iD/ng6tHFq6fB8bagSJ6sWOebaeJCvNOjZj1Yz1+SiHKdgX2MvBwb5FxzErC2ieQSbQVV06OaO3rZ2NfRubFk0+X3krmkG83NDla4Z5b9rk292hlV3zdpvu3tZrJQBkCbnMu6W1g0OnVYEjnTqP2BF5ByDJ8PbUJtdmDg6tHGy7LTp5XseKWRmHNUVWEFUUt2JOt3F8Tbau5Pgu366t7Gzs7Vo2b95kx8ME1ig15Bzf4mtnZ2dtb9N22YXLCo0I0QRSkKycw+iStKKtU/u3sLOztm/Zbc/DCD3LL3i0eqXH3BTVU6S5eX6cU3t72zbt+25dOapdz8WlKCn9O4+xHgGpsizQ8YET2L71RBHLK4lbu2Lo7GR1Bhgfx25172bb0s6uRXufpTnvhQAJgh9mbZjgv2rB0I4OrWybdT4iiGErLu/o3+TrLz5t1mvEWSIW9I+CF/ToYGtt18rGcdrGIhUf6STapJ2zB7a0s7O2t+6yIzJMq+EjmmRliYjNqIpb4tfhn5/8q2nHb6cL1QL1i8OLujd3aNOqtb3z9js3DEgMmvAbkwfv3TbK3sHGL2DK9rVTl3sOHzPFxaFV069mbM69PaODg7Vdm28DzoQgxAmd2W3ywl3vNBmg4xb9PM6+2+IKJBTvHDdv3JpXKFuVExTQvbXZznRzvJoqRYxYRazz79Pczs7avoXj4YRIPUo3pB/asXTglWQJGAnTNhoMxmqq/8JcQx7Ai1c/dP3yUy8+pOiTNw2zbjLj3G0ACWKDTwz5Zu2FuwAFwNw/4PJljyn7lJAElYmsggCtwJC/bcxn9mffZGsTl8yZ5HP/qQTg8XW/1vbzt2n1aVB2PWjk1wOWHNcBETa942dfOV99zgEm8drUr2wnHmQhZL+Hk+fq77WQjjSnFzdrtjEmQZu6fUp/pyvPMwDy4eVO3xGet1LiWN2tTT0/6Tz/oB4JAZIyDw8YPGlWeukT0PywsInLzaJkY9K6gS2azfk5BEDE1HAbPPaxcgK0AllF7PZNs5Kp86Dh1y5GmO6vtfFVRkYBy8+7GzBr8Dih/DnAm6pbg1pYudx5ywUdj5VztKpUeH9kYifXJSH3AfIgdm737nNykST/2hivTkNiy7JBJ4KU5e3+5XE9Pw70fFZBMjXxAM9qbo9qN8qbeCFC2mubHJu5Hj4PbLYuZatfL9vl54ONQN70b/aV+4I3KglAfMpBF6tPe/4oFUPJ/kGtrD4btwMYYfHdqf3sfVINT6TbB0yfsb4Q8gGyn2xr82WLCSlIBDIuo+QaqngAd4+5Nvusycg4mRg0kVemduw0eC0NmSmrnW1GTM8oEYGRc2dRi7aeG1RISG31m+2/sQqIayPaLzt+E+ANwKOfhnzV3nObBjKz9rg0sR9wP4cLDB/9gb0jpgcmVUXs5PHDCp/dBYPoTU7oN+3tdm6Zra9OBIs3Uyv2PUHzRgzre+y75Tu2zN6/Y35vx46q8lijjACUevfGno2rp+t1QoYmf2cZiCYYGQkgevnzBA8Pz+gXaYBCTgywt/qHJ8VIFNT6CQNc77x6CpAP2Zs9h/vcz+Yg2aUt7s0D78QCCEQHRnjNWPhK/xIgu+beREefwGJjOk0sc2lus/RmKEAKFB+aYG311bwjwHCfHOj16T86BD0mAK6s7vbt4tPXdZqTS/7VL6xaXB49tb3VVzOPnWch7/Uxpyad/cQ1Qk3u1oU9XO7kZQK8BcncHv9w2MF5DIWbnaysuu29DuyD2/Pt/tnc/XaaCLRHp7TstDcx1vj6yNROtlOvhwKTWxk9rVfHLqf4HCZu6mdNpqTDS4Co64Ge/puPGdkkqOKyvxckZxUEIyfAIDq8Z/HwoX12bJ61cc20DaumegxxFiaeBq2AkROg4BhUSfB0ZecvB954lshCUnnMskXDBzwszgVVgtESBkuiznft3O7IoWU1xY9AxWMVBPxqeLIWkqmhgKWenPSbOXp+lj4P4OWbY92/+MSTD+Jq/vxuVv/033lSjXKBmNvtk54n0+N0RXvnthxBgeTJ3tFTRqypQQlHuzeb/t0VvfreiYmd14Q8ApYSHvKaOXHpSyYf4PmLg50+/9wvGcRlsTM7WX055fAZI+QXnnJp2nkkWSZgXxyc6dhmWywFKJHaN+SrT9rvISOBDdnZq5nz/jPAZhnSd47vbbP43G0DErMyrimyUhS3POCbCVkoTbjONSAwqAzyATLEa20/s59bCffP+vZxXnwM4B08D/LoPvpmTiwY+CDjaFUpUHMi0LHv9LO3AV4Dtdixa0Ay4heEB07qNDUfiSKndnL0XfGafgKvd4z42qpJu/nvIDl1r9sI10lJNdmgF0D8rOZfj+YBvyhq4eROE3MgW7rBZfjiDZWQB5D+5oqvo/9qFSvNvuBj84n16ts3AXIydnX8stf0F0yKJmXrTLeOB0kRoMSQuT1GbTtkhHwAadIPw/oEHtAbrq3s7TT26DWAAhAvd+42hVNFmkLaxup4gGfvzrvb+k/NKZGgitMLu7TwPHMdmFyaXDqoa7td9yJZiD059IsWPmsr9FJgH8Wv62rV1P1WdhLkb+76tdXn844A8DJO+/XvPDkPUqMnO4ycsa1Imwl6ztszo750mFcGIvF2/5m+694DddO7w5Kj1wDeAMScGfalnfdBgLPT2/WZfzsMIB/i5vd0nJWsEYCCZJUUXgbC1McKIBeln3kYfCByz4imzcYKUYqSv2bW0F4/Z6YiPUdXxQN4BSDMizgUFrx5s49Tn2m7aJSCqjgMTSItv/SC97+6LcgHISiFgMSgkqKyvWO+GRv+Ig50fATikqgAn7b9OYbUR+NbjV95pNqQiXQJr076NesYWIme5u4fMNTDX1DzFhInfNl+UposNnWH2xftRt+I+j7swo57D37YMeAfQ7YcU1SFHhzWYkVEAqg4CEkzDrkPmjjzSUkaUv+4tGX/O+9S1NSKAA+nK1lpSM/Ry+sFTpSUsYYLan516eNtG2YmPvwR9ELT/RI0fNAJawWBaPPEQHICDOkALyD/0qPgQ+HHR9v9yyv0bQJoeUjB1SkkSHFp02Anj3mLo2LPFdNPAbIB8Z7fGufb1SPeFFlJXdmxuefNV/Gg47EKgpUlIJRbfcunrc9IIk+Knizv325OLohQBRdALN7aZ7jn/DxjasSU5v4/XGJUUoTiiJ39XNwnJVe9QHDniGPrleeCEUqpEi+Z0KrL1WdZABkAWVrpycjg/SGbBze3n5bKipCcYM2RlbAjjq2WXwhltVIEopLHs3w7DeKXhO0b6rX3TjCAFGn5hoI9M5vZnSmRZu4dPWfC+jcoE+A5gLjgwXdhwVt3j3PqMnKzDmWlbuntFbgyrzIVqQnmD4T99TWJAE/2bp+/b0egQcYBvTBTctnPx9300qyuKqF2h4RpbW73trkD+jsGbZm3ZtmkNaun9uzeQVURh2gStPz3BVHzZvnG3v8eINUo4/zGRZGCa1BLkeLa4dF9B687CSBhZBLIWNHJeqyg5hFvvcvXncfejvou7MKOew++3+JqNXzPeXX5tSD3pnPDKKQ6u8qlc59pi6PCvwu7uif8zprpbaxWcJN1nAUTh/cPzk1FOj4qOTzZrtn6uzEISQoezJ7ceVhM6QuEws8NaTlpyxmZ4uxKa/cIubTgxhi/bl6U7DnSCiBjTaemI67nxYExFSAfZCGc0MP3r810tu23NzEKCrZ4NLX7QShFiJJ85zXJY+YT+gWCazu/+Xrl1bCCu/MGu6ypgiT2HQeAuDfWbtTKI5Xirb2bOe4KOcjhBwO8BRBbdl38ZszJ7JGToBWsXTHZ33fAke9W7t42d3fQvK6d273ODjbtKEJKgqkhASKOOv7T7/Rd0MfH7x/nNXEvDUlMJYelCVBSSMMPubZr0bwxAE/11Ym14a4/tEInJwA9BciFzLMPgw9G7vNq1mSsEAnfPZg1vtPQRMULqEpA8PCsW5NpR67WvD4432Y4iaRP9o6ePn67qni/u8PgY5KHgMTApoCeh+QEQBZADpN2+kHwgfAdHk2bT0hDkoLgiaM7D+VUPwetELI3dGk2/Fb+o5fHPJr2WV0FIn1VEtDHp3UetDnyPrzaMLDNzKesEFUSAOLkXf29PGel12SBmmOQUQC8otgVs7tPEGjSATIBMlXC4xHBe2+uHdC0/bxSFBuxeHBX94lh0adzXgsB8kBHIgWJFFwdLUaqG/u9+w6YEhgZc7agOh3gGQCZd2/BNJcFpaWnp4/3O5wQDSBEGkHO4f5N280rRUlp+wd6u09JNkVWEubYNPMXIF5R5MKpTvOKai4t7tJx8OKVkeGHwm7tD7uyaKzDp3tzkvOPD/R2n5aueoa0fKAW2v5rVLxOok3eEuDaYZ8kA5VsH9yq8/htG8LvHwgLORx8fMrwTvbX0x5dneTs7D83Iubs6/epAM9AZd7XwtQkIJRbfM7NZsyUZ6UiAyewf5fFhSBlSzkA/PjAb72mbiw1Uld9m067EApqEUKPwpf1cPNd8FzxDMGVXe1bbQ55hJD07cOpo+z6cVFm4sy2o2ZtL9ZkgI5beM6vafvAchCKto+dO37NK/QU4BmApPDhd2HB2/aN7/2N904jCg1y6zV4zuLI2HNFiqcA2UATiK7dq4eXgTBmrO6cmjPWzXHI0AHDnWw+/2qMGKXIyVXLfV3vFzwDOp4xJuQHBx3b79nfrqe3d+/udraDZu+VoSSoSjQqSNAIJAf6OEzerDCKUE2CpiJGqU6FlFWd/GY8yo1DGgpYaVXisnGD+9wuSYyf5jBqwd5SbTroE58d9W7Zff5reAXSNf3d+v6QnJC01rrLyoNIxole36n5t11Hebp6e/XzGeHi7eex7spVTcW170bYHBQkIUUigDSjLrLy49KW/YNLUhXcZUv93CILn4M63qioW+Jh5Fyk5qlqOD8eWhYRfAC0Asay+Y4ujw27uffK2c26qgRkeslISbJyEnSU6uXViNMLpnk5uQ8YOGKg/WefDLtXlAhaHqJJtoYLjPhd9MoV44Y5NbFq7RVw/Oy5KpDm3Rrn02VYbGkW6IRM0rJvmo24+SoedKZYa4I5suLtTbxKgsdTm4xbXSwnmRouYqS5pz0HjZ2YUsN7MK3lsmthBnUSoMeJQV4jRi59acgCdH1fd7f9YWGAkioFi8Zad79Tnq2W/nj15IxRTo4eHu4jelo3s5uWyopATjA0YawWANw+7DjoQPAdvV4ISFJDrBrr5R4V+f2iOaODHtxjWCGohbq8Y6sGOwRJHuYcHDtzzLpiSCsMDTr+nY+7Qw9vL+dera2dx2xVQ5Z0o+PsTUFv6UxQclgF9bubJIwyLtInhd/ZH7RxJl36GPTip9Irvt5umvfxtREsQw1H8z4eKSl9dcKubXNv/rwd4AXoRQAZ3p795O8eswoS9KLc1Btrlk96knQN6SWmZaNfg5UTrC4ZCs6un+Q45eRVIyM0yPj6/B2T7SYSpVH3VnZo2bmbj1e/kZ79vIe7ePsN33T7lr704la3pgsi+fDm6GLPlh2dent79x/p2W+kh4vv+DGXUwlZXOAi/2Ex73JBTUHpwcl2zkeIGECCl3cXzXaaLtVkAoSfHmwzJeisnD6zoqV7uEzy9pa/d+dhsaVPkU6Ekpd903zE7bcJQN/nnlu+fLqLq7O7p3eHJp/2/J56gF5v8WzhfuO5CFAitXdS4Ng1+SgL0NWgjk3XXg59dnGs3fw9RoNA/57DGgXU5u7uC9eXKLjU/pGjB3Vr9S+r0Rt2PRaEanUikBN/JLICap6yPHbnljm8uJMA2WAQGWXc9SunluSFm56tgaZYOQfp0vJ+dnPw3vq+4vLheV3mhCcCQ2plBDLtGVLxzh1fd2D3AkYn1Lw3bzz6A/aFRHIS9JQ843zwqbnjBvQaPGTA8D62n30xRoL4b6OWz+4dkGxIQVUJyMCNCGw7bPv371/uD7QeQYE0bY/f7Mm78yRr+g7yCstIQEa+/n2sqpIAPVWTcubWydljXB2HDBswvLfNF03GP0GSt6GTRnUcGP3uKdKJ0ZNVnVt43nrxMHG387fz9ugNfG2VwGi8EOQ88kjUPRDMbTFmxWsZydYQiJG+OO8zbNxY4pUU6QljjTmyMvPb8VImQ0H+cPnE9JE9e44Y7jase8sWbWdkozRN2uGDs0cM6mBl3Xvwzh9/elnORSoe0CRTwwWjuDxx47pJHi4trewGT/zh5NlyEL66FzjTbUlWxsExM70vCRJYhgcazruLY5u0nVsCyWn7B3q5TZJWZ4Gez8TOtG46RgD8wqhFM10C03JPLBjUrEsfJ2+ffiM9XUcOd/WdPOXey4Tc40M9XSaIq7NAJ0QJc2ya+XH0Um3K1uku7b9LyYKUVUOdW/bq18fbp5+3Z7+RI/qPmT0rOk+gFW1ZP8mjn61Vq4H+3584VSTjmTYLMzUJtZGVFyViZfC4ZtO2KPQ8QyUHGcWpB/oNmB74ojrupn/zDeFxSCUGFHV38RDfadZu7KYAACAASURBVJuK2KeALmxp1/9HziMA8ZvIKd727hTK5Mxq6z1jW5EmA/ScN6dHNW0fWAYi8Q7/2aPXFEJa8d0dPx3xHeDQw9urj1Mb696+m2tQZnnEiuXjhjk3tbIfMf34+bPlSiFSkL+r25j/Nay69Bq49vZFBsqgdH2rluNEkKwgVy8d5RL2KhvUPCg/MrFnV4+xvhefJgM8ebrbp8vYHVpIhUpzZOX18WFNB6x5h7i6SgogBdgUeLN1qON0bkGCXsHRGcVVnMXjOjk9VEljJ9n7LdpfrssAfeKLY97WPRa8hCes9sbOfr0WHl68uIfb/nvhyJgYu9ql45zzAEUAaQD5AKUAqfD+0n4Pm308CdCJCCU9/W7g4AkBSYUptZEVmli+2Ld/eMEz0CQY5OZ9kayCYGhSVh53+ujqCyc2qN/Ha2u4JiNrqOGkC3+eNd171Mj+JfnhoOYbZQTQhFHOB/1j6pR/p079lp09Uo4qgNnX3drnzhuz5wFKAmgRwHOAAoNk09bFw3s3t92TmlAUPHZ0N0+i4qlOTsGzTV1ajryRHwf6D50Vn5FkvhREgT17Ly8FgbY4Rg/JWYcGeowIyNElRU1pvvhKqEElBYjhbB/h4bnouS4b4MaBHi57Q+8CJFcJFvpZ944t5QSvdP+279DNEbcASiB3qbX9tDQQgoxrjqxA6Hc9O2wLiWAVPJ1RKKOWj+vmGp9zbau335Go+8DwdXKCKTm2rI31d/n8rH2+08ZtUymuLezTZaCvz+knQoDsoqOj2wzZyKIc6cZeMzZsLVBkgMqcs+S3YRUkK+eCXjB6lPvrrGBgJJmSyz5e/bXmfbUk0CRoBcBITOsIZ46tvXlpO6MTVL6JrHwTuXCun7o8zijjAKRdO79l09rpAGmsnPM7e1YUXKMmCVVe3OHbx2/fFQCBukwIb7b0bTVBWBkZucyl27LLFnV6ZVInVHJuq3uz2XdJQ+WR6f0HrIsmAV4DpAO8BSgCSCmOXrDYf+ijohzQ8KDk0GQ7x8OcGABh3r2Fs3pPEauy6jkr5sjK21v+Pl084suzQSeC1BUdmnmGFce/JwM72/ZctGt9quwdwOVJnYZujYmAwm0jmrteyxUDcPj7J8wbs/Ilkw1wNeibJquv3s2/GeDqtcMAYvWbx0YQc+a2H75ge5nuOcBbQGTatXmBI1q7+EzilaQgNcf4e8v5jJwALb+q8MG+7fN5sSdU5TGMnHv57OYTR1YxliU5UJJAEyzNg8qzG3o4HwnZuqT3MKI6C+SJRpoyjbu+mrN/R2BkyAGkExpquOaYjSxRLyN+6/GXJgxyIegiwnZ5dXYcuObmOT2UQ8VG+xbjhCAoipozrZuv2PBcX/KQATJ0ZHO/veeqXh2cbzOCAumTvaMDJu6szgty6eJ1IfWhTkuCIQ0gGdT3bm4e3tVp0PqQywDlULjG1npSGogLQib5dhz0uDQbdGLIWNO5xYg7edHpB91tRuxgQUCXCMF4bnHP4UER9yB7Re+eS4tAoH0Xq4fkZ0c9vEZMlpRngrY2srJsWuepedrH5+f269Z/WFB0KMA7SFvYsu2MTJACPAV4By9+PLVjoqfDl5NOXjaqTS+BE0ALAZ4BFKKU7btWeLs0a7GJii6NWjDFZVFRwQ/+E/xP8eKRgaur4RWcG960/fwyJE3eO2DsoIDUmkydggTxErsWY/nAK4pcOK3vgsLSExN6Dz6UJAZ4BZABUAhQBMCXfD/Ut/8kqSwbdELgzLNt5peok+hSts3s136PKMOYt6pn51GhxekAL8xNhdeg5QM8AyiCJ7v2r/F1a9F0UWg4aHmMgqjvrDwvFemiZ/Ry20CDSFPw2ABS6fqeHhNXFmqJ66ObrrkXA2oxwIOwJQN9pmwoNGYBXNzaru8PCY8AJAVRU7zt3CmUHhvQduK8XYXKNB3Nqbw9qVm7+WUgEm8fE+C/RUnfWOra1W2Uz8lUAUBO2Un/th4bqyEdIAegwCjZvG3pCGdr6/WPY5GG0FYlMopfVy3M/x5WU67EArwH9uZRDwerL4bFq1Np3poVo/vff50FRimSBLbsOCMdigGes083DLJp1mv29nImBaoTGQUJOoEuZbmzVZcIQwWwd69cWHmdigMUftjRvv+hswCFAIlX59o4jtxUBeJQ/zbjlx8s16aDLvHFT752TovfIAkYxEVXJ43rZd+i1+L0wngEwspHi7t/3WFnQixAHqiv75079lhcBFLc/N6z1UG+BBQcAGnqXtehs5aWGV6A9sdltu4hJSk0uWK5/4DIt89AnWCKrLAKEilI0Amfp92MiTgCKAkgHTQCMOdITZRVJT66913gHL83OaGgFTJyLigIg0oMdPCFmW79doQA1ACEX5vZ9ZPP+lx5nghaHqvgGlRSqPr5+KplN8QxANUAd1a0a70njad8MK1Hmx6XXj0DyH1xbFCzLwYEF3JAxzM7Kyi35o5fx9G+5EsxyE7OtbYLePQYoAQU55b3bz456IwaRMETrVdcDzOqpIBiuDtHevkseaHLAnTjUK/+B8LCACVVCRaNbucuzrqxasiAZQ/5AGWguxjkbP0P29GkQgQKU2SFBxB2vF8zu96BhfAGgLqzyLb7iLXVkPRocrfOARuU8AogK+2HLq07TXljlIqC/GbN3I8Kt3XqMIFABQB58DLIy67ZN2PW1aCc1G1OszcFvaUzQPn72yPAdGtUUpWFDzyH9S3ICQWjJCvp6nj/wbrqRESTBhkHqXlZSVdv/BykrogDvYgTfWzDqqlVRdEAb77ft/jcT+sYJWWo4QBKvX15x8J5oxkVD/2BPStGOQ+ASN7vae8yWlD9AoD/aEb3z77wERgFlRHzvm3S+TCVAPAS6MtBM8eeoaJR5YV1ri3XJKQAcB6s6Gffcwy/PA0gF3J3TR8fIJA/qYpZsHjC8JjiHFBTUHp4WhunI0QsIEHe/cXz+k6Xqp4CijjnYTd9x1k5fXa13cBIueTt7XF+PUYkWNYBO9v4PHgbnXNoaFP/YwAKAA55cGiTz9oExUex+UE+tm43nokAcQQHJy8cvzqPyQJ0bVfnZqtuRanTd/rYdNqVJgIog1dbvdu3CgqO0Gfunjt/Vxm8ACihb00bPmisqCodVL/vrLAKEikpo4pavmjctQtbAQoyxJdnTR+Zm3od1Py61RwliRQkq0kk19q2atdzYOAPahAaqris6VahoqoKH25eF5CTeh3UPFNiYlbOAcgAEP/WxgIFV69OAtnFIN8B4y88BqgEdOu4Vxurz4fGqkTV1LxeX7RYeSMS4D2kznW26XhWGK8r3Bdo58VDkoyD42b6bVIb7q1u2WLR7YcALyviFi+9EQGa88s9Bs66lQDwHozXDg+yt/rKi6eXFN2bMqbrkJjSLNCKIGNtdxvP228StdL1TtYddyRJAbJf3Zzo8PW3u4ko0P682KbVlMiHAO9AdWnNwBYTt55UoBRWzmHkFCCqKHZ5gNO8ctmF2S6DNxFigFJQn13freUn7aY+Uz9OPLRwx883ASoAhGcHtZ36089GrQgUXL1SArJrFzYsOZ/4AKAaIGJTp9Zb+dGl0Uum95rxlhGGzu3tHXSAgSKA+3s6ftGszewCSH9z3OObHkPj3ucBpKds6vnlF74iJCh+uCTAMeAVEj8M6NbKPSBTmQGQBUmbJk4MzGKlT48O8x0wJUmWBVoBcOe3th5D6CVayYYp/budyX0OEH50RIf2o1cUoiyAJ6q4FePnra+Uhd/evPCnRxEAVQCPdna3W3Y3AtU6Kyj33YWBrcdPzy2VoIJDE1q2XcEnAEqh7PC07tZLfrqug4Sf/VpsjIgFlQjQg3vLhowO2FRkfAro4vZO/Y5xHgMSFzyY7tfWnQsvMpe3s/VeVAYFAESIf6um3y4qR0LJ9jEzp+1hi7d3/WZcvP41QD7k7/Cxb9Z27DadOuTUskVXBI8BqgFC13RsvTk2BowSgEzQkaD46++RmEaC1cD2LXv16enac/DGn6YOt/pypzhZSS6ZNbD77VfPQBUPdNy1aW0dOndwduk+avTkDZv79O8wLK4qF1TxBjmBlDxW91B6cGiPTs6uPdq5TFwkLOaDjFeVe2Bef/u+Lo6uPb919p8pfCsAeHRxWLPhs3eX6jJBn5B7aIiVw5zXIGEqxaC6MK+N1Tfz9ilUyaCiwBgvOTWmT4tWrgP79OtmN2DGUuoND6oube/72TZuEijjDYY0+tE897Zfd529p+L9D4s+dbxanKqIXzBzsGPImxegiTfIKfMdziBKF17q1bPjksCxO4LmLg70F3HOIDUPTHdESBEmnJo5zasgNxS0AkbOMaUgA6PoXeSaUd807d6np2vv/uuOz/Zv8c9FVyNBJ0AKwiAnwcCJWtOvY7s2Li49erf9fNz2izJNEshDrqxx6+zQ0bX/oE0bR/T8dNidvFjQ81kFwdTEAzyvujL064FD4nL5AGR+/HKfTraubs59vvnWd+2WfJkQ2JgLnp/OuRBqUCcBPI5ZN6Bv/7m5+hyAq0Gtu2+9FQqQ/J6aM8zK4fa7vNcnfHu1tXXq09O1u8fmY+MHWzU7IJKCmmtQmCMrP/azH9bZsb27o2uvTr18A0SFJFTzNEXnd07o4tSjm6trlw6uI8MyEgES4taOnOi1ssyYFjmrQ5tO7Z1cunt5Tdi4061vS1cOKsjc0H7Msg2vFU9BxWH+gNVg5CQoKXlJjLena0FOKDKIU/kX+vbpoq1MACWlqogDVho4x++zTz+tKnyANAJVRdzB3Qv9fQfOmOEXMMXzXd490Ap0VYkIpdy+smPZwrFIK/j1l8zNICWJFFyGFoLi3q0NA/p808W1v9syvx5WVp4PanhgjKN+8HFqae860LlfF7vBc1eJCnlAPwyZ/vUXbd12RD5kq4OPT+7ybbuOrm49+9q3n3TgaKH+SWnEzIDh/SILn4GGByV7vT/7ZldcDIDw+Z3Z49v789XZAPeP9v7MZ+3JGsXJeVa9QmTS15e93G37R5flgE4E0oXNrAZce8vVZB+f3/3zb5y7u/RxWrI3cLbz52O3npFlbXX/R/cL2WKARG6Q72SPxc/ZHIDL65pZTT99Hxgi6frUQe3auLr3cWzXdf7Ro+8NEnhzcYnjP9q69OjTp02XPm5n4wmGoYyy+uk0fkU4NMHIuaAXxkQcGTnCdZTv4IDJXrER34OaV/cSnOm1PppAWpEsZnqHf36xgcMHLUcvJ4GmEE2ChvfsyY1RI/vrqjlGGRfRJCvjICY972e/jRdOKBWiX4+skIycAEb04urswe1bOPbp6eo4aOOJaZ6ffLFTQJWTiyZ8/VWvIYP69Hft0c5x/bWflSBRP98y0co9EaQp273HD1r0AnIr4ub6dfnW1aVb17YDv09/DEiUeW6qe3vrXn16uvYcuumnKcOs/nUwU1Ic4jeghXNkSQ7oxJC21MbK7UxuHACZcXP6kPbt+rm5LJvg3OzL3hsj7gCICzkrfTvbuLo59f2mk/fKTS9lQqC5rIJg5RQAryB6gb+NdzLKzTro2bNdK6c+PV27eW75Yay7lfXpnPRXl6b1tmvh3M/FqWtTt1nb8yokoCbNlsFIJgQN7dzW3sW1V+8OX/qsPVMDkry7c8e3Gc3X5jFvD2wY2LlHL8d+7v3m+bm2HbWh0pjMvr/8fUDvzh2+de0/ZNP64V2tfHnAKwifP661H0/3DMov7h/VvlOnzq5uPZwdOs388VwFCKV7Xdy7+glqckAnhNjpn1h5PFRK2MKLe4datew97k4SV1d0Zr1bq2+7d3V16+rUoceSK1c1RiG127NLGztXVyenjl95rT72nhabclMZq+MBnhf+1OsTD//0AiEg7tPweR4d7F3dnJ3ad56ya1+RSgT68B8H/mNJiCmyEnlrlvMA39UFTDbAudVNuu2PeQQgeRU2bnCTHqHFrwxF3y1y/aZrj26uQzzWLBzco8WsQhDx13uNH7b0nfHJw3kd23Rs7+TS3XP4+E27B/Zp6ZJYk83f0KddGwcX1569233hv/V8DfvU8PToka2+IeliMOC3gTBmrIpSzgniTwoSb2tZqjrzRmk5j618WJIbKpcJgeaCNgnKb6dzTwviTz9JjwbNo6LUYLlcCEpLNlKVAFQxudwTAs6l4rcEGAUgIwCSjC+uCONPChIvvCriAcNn1VzZ89uF+Y+NSj6oSF3hvedPo/RqHlKQrJpTlXurpDCBUfFBQSC1EHTcEuk5QcJJAefSe7kIGCGSx1fk3Kp4zwMlwSr5II8tTL0olobpZLHl6aEyOZ+peFDyLFQhMzWMMr9vohG8zg7ZHTT38J7Fh3Yt3L55dgr/Aqh4iKb0NYmsXkw8/ilgimdBTijSCBg5F9WmN1VzKjLOC+NPChKvK/Q8Re7N4kIOKCmgKVBwQSMF5YNX4rOC+JMC7sVKpQRoEumF8D7qGXVaEH/hXenj0qeRimquJYUMAWoBU3LvRe49ZQ0FKh4wQnn6OUH8CSF5o7JKCHoKqQjZ81sl7zhIyQM1oXwT9iY3SqcSgDqhIjO0opQDap6xMqow7XY1nQx09GvJOUH8SQEnxABkZfqNsgoeKElkiqygsCO9my86dFLCuyhIPPeygAKWz8i4wCRDcXAq55Qg/nTGcw6wAlZFqArC3z2L0mlS4H1wBnFaEH8qNeUh6GOKU+4oVCJdQXDR62g9bcm18HvKZHpS11UmjBszODf1BjBSWfEjftwpRk4gmmTkBEOTz1Jv9O3T5dXTO6CiQM1TlMVEhhz8+eSGoudhoOGzpldtIfXy2c2b1gSAQWxKNPdb17Xs4kQ6CVQ/fEGdEsRfrix98DIjgpYRSCMCTWKx+Jwg4aSAe7maFoNRgJSU/u3tJ9TF56/iQJ8E7yNyyNOC+JNC3h0jSgENT18WVfIsjJYLQEmBPKbwScj7CgLUlK40qvhphFopADWnKudW0Zs4ho4reRKqoHn6kvsFmWFKhQCUFFQ9eJkWViOjQCdQPr8ojj8pSPi5tJrUvQl5+zLGWP244EloTQ0P1KSqIPzdswemgS7PuPGuiIPUItARZdKzgrgTImGoRiUCDYm0Uii+mhR/UhB/Jv3pfaM+CRRc0/rLb49I7V5mUPGykq5GhRx4lnoD1DzLJq26dIgsTYJRqBWv9rIfl6RLRjIuQ1O1p9FlMZmSK+aXgJQUUnAYTYpKumD+3h+r35sTePxKAwhQi0AZV5xqtjMalqxKv1FGC95Gz5zcrs+V5Fhhwg88cQSrE4GaYqofFT8JU6l5moLw4ucPtCohMOS7lAuChFNpKY8ABKAUgTKmMNmk/3d0iKrKuFH2njKUhRdk3KXlAlDyoOphXlpYTTUXqYWgIyuSzgjiz7/Nj3ibHVFWkgAqPjAiOuO8IP6EkLheUSUEPY+VmxK+UaCmDOUPijPuKdXJIH+Qb57md41AvE+7XlolAV1iRfoFYfxpQeL5wgrK8mqhxTKoHhVIzwniTwm4F8rlYlBTurKo4qwIFc0HSGZfhaQSZyT8Wy/vTG41MUiDREjLR+/uPyVOC+J/Lq+IfZcZqVaThrIHxU/D1TSFjFIoC8vknhbEnxKL7gKkgppUFYa9zQpX0wJQUlAR+TztHk3zQEnSL6+m8K6+e5cITDIqvJPKOSWIP5WcHAGQDGoRqGOKks8J4k8JOBfKZCJQU7VOKqgFhuLQ588itDIKqflg4FWlnBPEnRDy7ijkQtBRSMmpfnaztIwAJQ/UXHn+3YIX0QaVANTx5RmhlRUEqHn6soi3GaHyagEwAv2L20mcU4LEq1WVccUZUXo1pX5zvzg3SqdJhfchmeRpQfyplOQHoI99l3Krik6zmNNTAu7F97QENAK2IurVk8vvynmgJv/IAjTmfwErQMkAKQASoHnASEFNgloARjEoCVBSQBOgkQCkAKQAIwClAFgxKInawC+iSaQUAKQAJIGehxQkmF4VNiYBpAAkg45i5CTQFBgkoOebkwVpRcCYss6TQFNglIKOZ0mXSbA0DyDZXKcpd5aSB0apOak5TSIVH9hkYEWg5AMrBiUJaqG5zfVT0Jq0vN5DZO1juimykkSdmzPDu/x1BBjEpldOWJo0J7hjTA2Qmi+trZcwlCaQSmhpYTKoCJYmkYIEjdDcZq0AGCGo6ifSJUAjAqMIVCSY0jmwlvrVJKswyUcKWksyJZ0IjEIw5dxjxJZsS0JgJaDksiqhZdTEoOABa5GMkmuo4gOEHe76xZTDtwCyAJJAyzMFPJCcAJ1lKI18Vk6YL2QQAs1FtaPMCkEpAFYCNAE6CegFf/wFQlNACymp7OSrviPdLp7aBDohWKIjJlfm/ZuoyeOHFT0PAzWPVRCg5oNOaDrNdILmffya5VMWzRtTXRSNajPI/dZ1LQnrTJ6ueQiEwIpMB1klv546keatMzoJQBLoeEhBgEZk7jtIgDalqxKCwaROpFnH1BSYjjMi8xgZpaDj12mgRgSM2JzdSyU0HUQ0CcbaS/NALwE9H1QCYMWgsgy0QWAZaJMCmPQ/xTy+pgR0NAG6JMs0FIGCi+p1/I+MCygpMIiAlYJeVDtBUG2eQ5pCikRV2SP+oYFTTgSzBsooJ5HS8r6PKRGZXlSXoEjORUxyzb2Vl8hQtfK3Iivm+aLkWxReAjQFeimA8G3UVM9WzlGVbwBEJqmaH35YEdCkRTMJVsEzazsSgtw0PQUfWC2T/n8gf5OEKbMwUQpAMhhEwIjq8iLWTkANaU6ybEkjC2rTKHPZumlumWgqgq3rSzJoKMut1NLTurlptgyg4gGbBlXn13v0HHv4pI5NRfLrhz1bTbtwFxl4xhoCtCKzhmgEwAiBpsxqpiSRnACtuE4ZTCkKdWIwisw9VZv0nEQ0BYYkACloKCQnQG+ZzkgECgLRBFIJ6hpW5wGYmw1aMRjMdbLmr3CkAEjM6fhM2q6hzJqvF9cp7QdTQwwqAslJMEgsshWY7bzZoHGRxtIdJARaAMhk0EQfmFMFAWqB+WaEt9liLFiZnlzNL2soCERTiCaROWNpbRbqunMsyUzrskTXnWDJ5GhKBvXBQdORemmYTavp5qo+KFv/inXHTW0zZ6WsnyJFQTZoc12uVfMLQYRp/0rtt2kQTRll3Mr38VfPb/Hzdk98+KO8Io6x3FBNZVFDsXzwxYD6LbS881ybQYSwSKlhCvP6eWBR/eIW+aBfyMecTvvDGhqMSJ1kTJEVNvy8Z6fVp2/q1CJWwWXMcv7FUDYciF+MsiX5b32p/jbI/KxGgoZfVfiQLoup723oqxPBKD723fILJ9aDmmdaYqj1Y1hTckwlxSqIqsKHdGkMaATog6f/36DhuDQYgvqDZem4Wbt+qeGWAbJ0uWFVH+pzPQ1kGxYx623dpS1F6k+i+hV+ZJhq1YMm6h38P43IR1Ig1j8BaK6RFqHyY0ucHTr4ri01CEFhSmv7kXrqSpncXxVlmRe/2oBf9IhgagjECt4lLJrbzzPm3VNWGa+TNZRwnWQaKu3H9f9j8v9VlYBfTEBEWyIrDdtQf1KYX6ltaJ2UFrX/pWVQUogmGRnHqE8xijZN7G/TxsG2jYNNwLlboBewCgL90m40ULMP2lCveR/XNEtyy4ba0tCowkea/UvrVE/96luq37ROpoMfsSS/ZmfojwsN1VkeHFnBUPDf9tXlP0oD/Tarft0XWyigqcunN/fq2WnkcJee3Ts8vv89MOI/8BDf+DE97iTVRqr+Mvmr6n1Iod5NC/RC0AtNETL4wCrVGzgV7z/9xCCmwXD84isTH4rXFEBKMkU1zD7BL8rWL1VXvP4z+h+HJkEjAiSpH6b9O2OKPaAkQEkASeYYcz05YzCY3+bv6azALwx0Q0utJAGZ3kJMB3gKRjH67W+x/ndA1n6Qnal7Mvv/Vea/lHaD+5z5+elXxuiD//7OV5wwfxKWeBgj5xprPxX025ua64+Ukvo/qlmt/0owcuKPR4n+W6mnzIyca5RzjfK6eCfWbQzmD/K3dVZ+jdrICiPn6qsTTTD1Mqv+5S3EYDAYDAZTn/85ZwWDwWAwGMx/F9hZwWAwGAwG06jBzgoGg8FgMJhGDXZWMBgMBoPBNGqws4LBYDAYDKZRg50VDAaDwWAwjRrsrGAwGAwGg2nUYGcFg8FgMBhMowY7KxgMBoPBYBo12FnBYDAYDAbTqMHOCgaDwWAwmEYNdlYwGAwGg8E0arCzgsFgMBgMplGDnRUMBoPBYDCNGuysYDAYDAaDadRgZwWDwWAwGEyjBjsrGAwGg8FgGjXYWcFgMBgMBtOowc4KBoPBYDCYRg12VjAYDAaDwTRqsLOCwWAwGAymUYOdFQwGg8E0BNGk6d8G1P70b9fZoNo/WGH9M1kFwSqI+jXU/sTICVZB1F7iLxcj5s8COysYDAaD+Y9ANIloCpQNPZuPeiS/5kPUP+23CtIEGMXAShoUNP8ESWCUAHZT/nZgZwWDwWAwH1DrKDByQl/DMdRw9NUcg4xTG7T4s6plFR+PrHzgrFiOmAoijSAv83Z28jVjDcdQw2Hk5iYxci7SiFL4F15m3AINH0dW/mZgZwWDwWAwDUE0CTQJaj4YxGAQgUEEaj6oePCxxZda30Jfw9FUxmsrE2rRVCYYZRzTOSZfxyjjsgoCDCLQCkxXaRiG+djfpnUfTVU8QOa+HfM3rJ4GOiEYxYgmTf6KtjIB4OmyheNO/7gGGKlpqegvFyPmzwI7KxgMBoP5ALOjoKLevbwvIc6KuWcFiadfZQXL3j1CKl59B6Xe+RQoSTCKAZIBkgCS69ALQVHnc4CGr3kfL+aezU29bqjhoHo7UUBJMXICdMJXWcEHdy/My7gNOiEj54LF12EVhF7JO3tsXWTwgfycEBHnTE1xNKh5LE2wNGlQUS/Sb5W/jgQVD0dW/mZgZwWDwWAwH8AqCEbORVrBg7uHZk0fOWOq1/zZvs69v310/zswQNfzLAAABv5JREFUiIwyToOtsqzC7IjERhw59ePqn09vPH9i/YUT6y+c3HDm2NpU/gXQi40yLqJJUPFeZtwK2jRr3gwfPx/3iOD9YBSZfjKhKo9llJSUOOvt2Y+fcIpR8ZTlsZY1IC4oqeq3UVvWBSwJHLtxzbSpEz2WBPpXFEQxcgI0gryM20cPLS/IDQWdEEdW/mZgZwWDwWAwH1Ablqgpjn6THVL88l5E8IHtm2ZWFT1kVVTtmzi1DoHpiFHG/fn0pmWLxm1YPXXtisnrVk5Zv2rqyiUT4qKOACPRVycimlCVx82bNery2c1vC6JvXNy2b8d8ZHm7x7TiA3oRQNrrrODVyya+SL8J8AT0ItPWXaOMi7SCFxm3pk4cvm/7/FdZd14/u7t90+xtG2YgjQDphDHhR5YvGl+Sfx/phIycwJGVvxPYWcFgMBhMQ+p2jUASJ/rHQ3sW6aoTQSswhyvUPFCZzvzgFR51RZy85LGi9LGi5LGi5LGi9LG85LG2Mh6UlL46EfTCS6c37Q2aj5QUGCUh13ad+2k9YpKNMi6rIEHDry58OGyI0yhvt4HuPR3srQf07+Hr4zZsiFPFm0jQ8PXViYiVxkQcWTh3dNmrCDBKQC8iHv/k7zsQ9ELEiC+c2LBl3QzTApZp6y7mbwN2VjAYDAZTR62bYpRxGRWP++h40MZZZa8iQMUzhStYBfkmO2TpwnGnjq5mFQQrN2c9MdRwNq6e1tux0+ABvfq7dnfr12OAWw9np28vnd4EbIr83WOEkqZPHvH4/vcmp2f3tnk/HFwG8ERbmQBKEikpQw1HzD2bKb0acn23r7fbrcvbn0qviLlnddWJpl8BpUSGHNy2caaiJIZREKCkbl3avn3TLGQQASM5c2zt0YPLQM1vkIIF8zcAOysYDAaDaQgr5wKSvsy4/cPBpSWvwoGV1L7OoyyPjQ7/fvoUz6ULxuqqEli5eSUIlJShhqOtStBVJ1pI0P5/7d3dT1t1GMDx/8HEaKLXXmtMvNPshpjpRkZiQDOnOFhxQ0PIUCeJBsmysbmZbeJkIwZUyIwoU1ag7z1AaVlZMtRtUZkvYUM2aEtLW/p6zuPFgb44YCQaPGm+yeeup6cnvek3p8/vdwLWdMihRd3L8xZN81VWbLMPnBDxh24N1Jt2fXfhsKZOpIK23Bkkpoj4r/m7dleWXR3vFPGvXE/EpUZcWtTd1fH25+cOSWJEUp5s2Flv2uV1tEtyLLFgOdqy76vu97TVgRVipZQQKwCAvNyanekfeg6/X3NjsvvuzPd/TX+TCtpW1icH7SJXvjj/bt3eHcsLlvU2gtMKVh1L1J0KWiXjaWvd19JcHZi3eOwfb3vmcdfgR5L2pIL2/GEhu5b0XPWcr9j5tF/5VFt9VV+fHL87VG+qaKx/YeaXr+f+uHjuzMF3Gl+S5KjEld9+7D34ZuVl5ayW9WbDDkqlxBArAIA8NeJMh+yadrml+dUnn3is5pXnqnc/+3rNzj+vX5CYokaciQWrmh7rONVoem1HImDNzdvKWtvzF1XLkjs8a25rNZ1qO2AfONHUUHWs1SSqLx1yFAztuiSuhG5dGne0B2cGJD6SW9KsxUfmbn5bX1ex58WyA7Xl+2vK2z4whWfNy/OWVFTxOtprq5///adeLeXJLK6sdv7fv0z8V4gVAEDeajGMTE/12Ac+NPcdNfcdGe4/Fr5t1nsisWBNL49+crJh757t4Vmzvufbxpvb5kMkqiQC1itjHdE7g4u3L92Y7JK4oq98zh0mSy6JKZLyrO5Bt3rmmBK7MzT7a9/S3OCo9bTl4vFs2CFxRVSfyM/D/W37a8ujc0P6bE3uklAaiBUAQJGVYkiMSsYr6oSoPlF9Ele0iEui7mTAJnKtv7f1rYYqEb++Ee0GtzEKQyQbdmoRp6THJeqWqCJJjxQ/Ayi3QVw6VLS7fz5iYoosuSXj1cdokgFbz2fNdbXlTQ1VY7Yz+r0fBmxLD7ECAMjL/cxnFh3JoC2lj8oGbGrEpUac6pIrGbAdanr50UcefPihB7aXPXVzqkeLKfe9syIFIaKvVc6Gnbn/awoP2PgMmUWH/mihZMCq14/DfPL08TcmXGdleUT914+GhjERKwCATcndsZie+nLK23l9snvK2xmfH5biHFnvvRsf8I/DNl8wkhiVzLikxrTiT6FXSgmxAgAosta0bPFvf2ZctAlRfaL5JK5sMgvWHMKVzVXF+u916/vbamv9nYSSQawAAO7j3lbQNz4pnI2VrU2Eey9piy8AW4lYAQAAhkasAAAAQyNWAACAoRErAADA0IgVAABgaMQKAAAwNGIFAAAYGrECAAAMjVgBAACGRqwAAABDI1YAAIChESsAAMDQiBUAAGBoxAoAADA0YgUAABja32RX1BXWlnAZAAAAAElFTkSuQmCC" /> y no hablar de " formulas "</p> <p>identificando que es <img alt="" src="data:image/png;base64,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" /> respectivamente.</p> <p> </p> <p> </p> <p> </p> <p> </p>
Answer 3
Answer
Grade
None
100%
90%
83.33333%
80%
75%
70%
66.66667%
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33.33333%
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16.66667%
14.28571%
12.5%
11.11111%
10%
5%
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100%
50%
33.33333%
25%
20%
10%
0%
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