Cho hàm số \(f(x)\) có đồ thị của \(f\left( x \rig...
Câu hỏi: Cho hàm số \(f(x)\) có đồ thị của \(f\left( x \right);\,f'\left( x \right)\) như hình vẽ. Mệnh đề nào sau đây đúng?![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAbkAAAFMCAYAAABWC8KCAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAgAElEQVR4nO3de3SUZZ4v+i/uqkqbS5eSTLQykuKSpImUEYO7CWhgZIg2l1mbOA4yjQ3swegoZw7aR6U9K41LhjW2l92a00vdGtkHbJkBtmM4a7g0HQaHIBJ6TJqOBaFTJVDASmk6iV2di52qajl/1Pu8FDGXqtR7r+9nLf9QseqRFO+vnuf5XSZduXLlCsbkR91da4Edx7GxaOxfSTrx1yH2I9qI5H5E5vzZTpo0CQAw7kdXA+c+78OXfWHMKc7VeylENILrxvsF/rqXcabWXA/BtFO0Ecd3AC8/ejCp/8ysP9srV64YIsABwPbDfrz9iw6Eo1/rvRQiGsGYQc5/sA77l72Ft5ZotRyasKKNeOvpDtQd9Cf0y/mzTd2J9i60+HpwuXsAB/7zst7LIaIRTBr/uJKIhgtHv8bf/+wEvvj9VwAAh+06/K8n78aN2Q6dV0ZE8cY9riSib/r/TlyUAxwQC3rbDye2iyYi7TDIESXpy/4w/vk/zl3zzxy263D4150493mfTqsiopEwyBElqV5KNJlXmi//swfungoAeLXhjE6rIqKRMMgRJeHs5RCOfvo5HLbrUPO9Yvmf/03lVNyY7cC5z/uYhEJkIAxylAb8qLtrEiZNiv11V510d3bwUemfPYpEiy9e/7ezAID/Nq8QN91wvfzPHbbrsGH5TADAP//HOQz8Mark/wARTRCDHKWBImw8fgCPAMAjB3BcFAYueQsHHpmP13xvIZFKigP/eRnnPu/DjdkOfP8vpn/j388rzUfZtBtHvLMjIn0wyFGaWIKnX5sPvL03btd2EHu9K7EsgWL4cPRrOXDVfK8EDtvIf3RqvlcC4GpAJCJ9MchR2ijaWItH8Db2iih3cC9Qm1grtB2H/fiyP4zpN+dg4W03j/rrpt+cg6X/9RaWFBAZBIMcpZHYbu7trXXww4+6rcCKBDu+nGj/HQDgyepbx/213/+L6cj6lg0tvp5raumISHs2vRdApKWijbV45ImleLkO8HpW4HiC/53IpJx+c864v/bGbAe2/OAOnAv2XZOcQkTaY5CjNLMEKx4Blj6xB6/5Eg1xuKYmLhEzb3Fi5i3OZBdHRApjkKO0s+Tp1zDfi4QSTojI3HgnR2nJs3JZkrP3iMiMGOQo7fj3AyvMNkSPiCaEQY7SzEG8fKYkoeJvIjI/BjlKC/66u6QWXnuxgpNiidIGE08oLRRtPI4rG/VeBRFpjTs5IiKyLAY5IiKyLAY5IiKyLAY5IiKyLAY5IiKyLAY5IiKyLAY5IiKyLAY5IiKyLAY5IiKyLAY5IiKyLAY5IiKyLAY5IiKyLAY5IiKyLAY5IiKyLAY5IiKyLAY5IiKyLAY5IiKyLAY5IiKyLAY5IiKyLAY5IiIF3Pv3/w82vLBb72XQMAxyREQpCgR70Tc4hJ7f9+u9FBqGQY6IKEWBzh4AQIn7Jp1XQsMxyBERpej0Z0EAQFHhn+m8EhqOQY6IKEWBYC8AYKprss4roeEY5IiIUnRBOq50F+TqvBIazhJBLtgdQsORU+gJDei9FCJKM+FIFIFgLxx2G9zcyRmOTe8FKGFr/S/Q2n4RDrsNyyo9ei+HiNJIoFM6qixggDMiS+zkFpTPAACc/PSCvgshorRzISgdVbp4VGlE1ghyc4oBAM1t5xCORHVeDRGlE//F3wEAZs24WeeV0EgsEeRceU64XZPRNzgErz+o93KIKI10XOwCwJ2cUVkiyAHAQmk3d6zVr/NKiCid+AKxIFfsztd5JTQSywS5ubdNAwAcbfHpvBIiShf9g0PoCQ0gJzMDuc4svZdDI7BMkPMUuZCTmYFgd0guzCQiUpOojytmOy/DskyQc9htqCibDiCWgEJEpLbTn3UCAEoKeVRpVJYJcgAw97apAICm1s/0XQgRpYVA8EsAQKHrRp1XQqOxVJATySdefyf6B4d0Xg0RWZ1Pyqws5k7OsCwV5LIzM1BeWohwJIoTPLIkIpWJETtT2bPSsCwV5ICrR5bsfkJEahKDUt2uycjOzNB7OTQKywW5eVIpQRNLCYhIRdzFmYPlglyxOx+uPKfU/aRT7+UQkUVdkEqVOCjV2CwX5ACgoiy2m2v+9LzOKyEiqzojTQM3QvnA/mNeNBw5pfcyDMmSQW5BeREAtvgi9f1p6Ct89fug3NqJ0odRBqX6Al3YWn8QL21v1HUdRmXJIFdeOgUOuw0dgS4Eu0N6L4csqLX9Eu7/4dsIdZ7FV19+jjU/3oH7f/g2Wtsv6b000oCRBqU2fPgbAEAJe2eOyJJBzmG3YZ44smzjkSUpq7ntPJ585X0Eu0O47r/YYc/8ttxS7slX3udnLg10SDt3vQNLOBLF4eZ2AECldIJF17JkkANYSkDq8AW6sKluL8KRKJZVenBDoQc5N83AL//n/4lllR6EI1FsqtvLHZ3FGaUIvLH5LPqkxhcVUmY5XcuyQU4kn5xoO89BqqSYN/53E8KRKKoqSlFbs+Saf1dbs0QOdJvf+Dd+7izsotTOy61zO689v2wBEJup6Skq0HUtRmXZIOfKc6LEnY9wJMpv1aSIphYfmtvOI9eZhWfWVY34a2prlsBTVICe0ABe2/mhxiskrXilxsyzZugXWOK/RFVVzNRtHUZn2SAHXD2jbmKWJaUoHInKQWt99fwxO1w8s7YKDrsNDUdOMevSooxSCB78XSyxjvdxo7N0kBNn1EwEoFQ1HDmFYHcIJe58VC+aPeavLXbn4wfLvwsA2Lb3Yy2WRxoKdofQNzgEV55T13ZeR1t8clsxHlWOztJBzlNUIGe98Rs1paLhSCxNe/2K+Qn9+jXL5yLXmYWjLT5+9izGZ5DMymPSSLHFPKock6WDHAAskMbvnGD3E5qgphYfAsFe5Dqz5M/TeBx2G1beNwcAd3NWI9p56VkfF45EcVTqz1tVUarbOszA8kGOpQSUKhGkxBFkopZVeuCw27ibsxjRzmvWDJduazja4kM4EoXbNVn3YnSjs3yQm1c2HQ67Da3tFzlIlZLm9XeiI9AFh92GZZW3JfXf5jqzcL90f/fz/b9SY3mkAyO08zrw0WkAwNJKj25rMAvLB7nszAz5UvYox+9QkkT/06qKmRNKMnhI2v0dbfHxS5YF9A8OIRDsRU5mhm47qJ7QgFwWxdKB8Vk+yAHAgvIZAHhkSclrbD4LAFg8d2IPk1xnljytvlFqv0TmZYRdXJN0VFleWghXnlO3dZhFWgS5irLpAIDmtnPsQkEJ8/o7EewOISczA+WlUyb8OkvvngUAOHzyt0otjXRyWioC9+hYBC4+R4vnfke3NZhJWgQ5t2ty3CDVoN7LIZMQR5WLK0rhsNsm/DpVFTPle2FOxTC3gNTOq1Cndl6xo8qLAJBwpm+6S4sgBwALpQ/ESZYSUIJSPaoUHHabfHey/5g35XWRfvTeyTVJeQXlpYXIdWbpsgazSZsgJ9reMPmEEhEI9ipyVCmIQHlYCpxkThc6pRq5An2STnhUmby0CXKeIhdyMjPkhxfRWMSXIaWOhMpLp8ifP9bMmVMg2ItwJIoSd35Kx9cTJY4qYycDLABPVNoEOYfdJiegNHE3R+MQmbiimUCqHHabHDAPn+Ruzow6Al8AANwufTIrrx5VTtG1Z6bZpE2QA64+sJqknm9EI+kfHILX3ylNmJ+u2OuKI8tGHlmakv/i7wAARYV/psv7Xz2qZG1cMtIqyIlBql5/J0sJaFSt7RcRjkThKSpQ9BuzOLIMdofg9Xcq9rqkjQ5pGniJDtPAxRcv4GoSHSUmrYJcrjMLnqIChCNRjt+hUYn5g0odVQrxR5bHOOPQdMRdarEO0wdOSDW+5aWFPKpMUloFOSD+yJIPGRqZaJk0T5pHqCQeWZpTT2gAPaEB5DqzdEndV/qOOJ2kXZBbWB77Js2dHI0k2B2SSwfU+MZeXjoFDrtNfh8yBz13ccDVpBMeVSYv7YJcsTsfrjwnekIDvBehbxC7uPLSQlVe32G3yXV3/KJlHoFgrGflVB0yK1vbL8mTyDlWJ3lpF+QAXH3IsPsJDfPrs7Egd8fMW1R7jwrOODSd0599DgC4dcbNmr+36NLEXdzEpGWQWyB1P+FDhoaTd3Iz1dnJAXHT6tvOM8vXJESNnB47OdGYgPdxE5OWQa6ibBocdhu8/k70hAb0Xg4ZhNr3cYIrzwlXnhPhSJQNw00gHIkiEOyFw27T/E4u2B2S31uJ9nLpKC2DHO9FaCRq38fFY8Nw8+iQkk6m6tCvUjyf5klfzCl5aRnkgKtHlqxXIkGL+zhBHD3xXtj4xOSBWTpMHhBXKqLBPCUvbYOc6H7CexESfFJHCzXv4wRRStAR6EL/4JDq70cTJ2bIFWvcziscicqz43hUOXFpG+RceU6UuPOlD9IlvZdDOusfHEJHoAsOu02TMSoOuw2eotjOQDzIyJjETq5Y43ZeXn8QfYND8tBnmpi0DXLA1SMAdj8hUTPpKSrQ7O5DHIs2M8vXsMKRqDxDrkTjpJPWs7EvP0o2CU9HaR3kKqS2TUw+Ia888dml2XuKY1F+/owr0KnfDDmRL6DFHbGVpXWQ8xQVINeZhWB3iIMs09zpz2Kp/LM0DHKeIhdbfBmcmDyg9Qy5+ONzkT9AE5PWQQ64moBytJWDVNPZaem4UovyASE2ry72+eO9sDGJGXKzNO50IgrAtTw+t6q0D3LsfkK+QJfcG1DrMSbiKEqUL5CxeOWkk5s0fV/xeWCXk9SlfZBj9xMSR1Ii21FL4l6OOzljCnTGGjNrnnSi4rindJP2QY7dT0ivIykgNhVDTAvnvZyxBIK9uuzwfYEuTdrLpYu0D3IAu5+kO5GqrUdHC+DqPSB3c8YimjLrVTqwgFMHFMEgB3Y/SWd61kEJvJczpjPyeB3tMm4BoKn1MwDAHTPZ5UQJDHJg95N0pmcdlCDu5TjE11guSINSSzTsdBKbTBH7HLB0QBkMchJ2P0lPXh2b7wriXi4Q7GUfSwM5HdcFRytef1D+0pXrzNLsfa2MQU7C7ifpySclnWjdfHe4YncsRZ19LI0h2B1C3+AQcp1ZmiadiLwALZqEpwsGOQm7n6Sn03I7L/12ckD8vdxlXddBMeIZoHVZiUg64Wgd5TDIxWH3k/QSjkQ1nTwwFrle7ix3ckYg2rwVabjDD3aH5M+jp0jbZBcrY5CLw+4n6SUgZVVOLZise+sk0ceyI9DFDF8DCASljFsNk05E0htbeSmLQS4Ou5+kF9HpRM+kE8Fht8klDF5/UOfVkMhw1LIYW5SQLCifodl7pgMGuTjsfpJeRKcTt+tGnVcSI+4FeWSpr/7BIfSEBpCTmaHpsFKxk2PSibIY5IZh95P0IXZyWjffHY1IPhHBl/QhdnGzNEw6EW3d2MpLeQxyw7D7Sfrw6dS2aTTiocoyAn2JLz9TNZwh1ySN1tFy1FO6YJAbht1P0oOog9JjvM5ocp1ZcOU50Tc4xDIWHYmd9K0aNuwWpSMsHVAeg9wI2P3E+kQQMcouThB1WWI3QdoTjZm13MmJ3bvICSDlMMiNgN1PrE8EES3roBIhxv2wWbM+wpEoAsFeOOw2ze7G4of2apnoki4Y5EYQ3/2ETXOtSRxJaVkHlQiRWefjTk4XHdIOf6qGzQFE8wnu4tTBIDcKMcup+VPu5qzogjTx2WiZbMXSNISOQBebNevgtA4Nu8V93Nzbpmr2numEQW4ULCWwrv7BIQSCvZrXQSVK3MvxFEF7Wjfsjh+tM69suibvmW4Y5EZRXjpF/kYd7A7pvRxSkNjFuQu0SyxIhkca0inGAJF2xDGxVg27m6VSpRJ3vmGyfK2GQW4UDrsNC6UjS1HDQtag9YMsWbOkICeaBJM29GjYzdIB9THIjUGckYtx9GQN4kiq0CDtvIYTBcGneVypqfikE60aJB8VReBs5aUaBrkxiJ2c19/JJAAL8cntvIyVdCJkS3eFLArXltZJJ/GtvDhaRz0McmPIzsxAeWkhwpGo/I2LzK/DoIXg8UQ6OYvCtaN10onckLm0kKN1VMQgNw4x9oIz5qwhEOxFOBKF26X/DLmxiActi8K1o/VdrcjcZumAuhjkxiHXy7WdY8NmCwhImZVTDZpZKbAoXFt6JJ2IVl6iKTypg0FuHK48J9yuyegbHGLDZgsQGYu3zjD2HQiLwrWlddJJa/sltvLSCINcAhZXzATAhs1WEAj2AgCmurRr2zRR4s6wg8knqtM66UQMxuUuTn0Mcglgw2brMHoheDxxN+S7+IXOK7E+rZNOxB1/Be/jVMcglwA2bLaG+A7zbhPs5G6VJxJc1nkl1qdl0kn/4BC8/k447Dbu5DTAIJcgNmw2v0CndFSpYYf5VJS4bwLA40q1aZ10IsqRPEUFhs7wtQoGuQSxYbP5XQhKR5UaDsNMhds1GTmZGQh2h5h8oiKtk05EWYgoTyJ1McgliA2bzU/MkDPaoNSxFEu7OR6Tq0frpBPRC7eCUwc0wSCXIDZsNj8zZVYKYqgrJxKo5/RnnwO42hhbTV5/p1w6YIZ7YStgkEsCGzabm5kyK4U7Zt4C4OoulJTXEYhlr2oxJV7c6TPhRDsMcklgw2bzMltmpSAml/O4Uh1igK7DbtNkSjxLB7THIJcENmw2L7NlVgquPCdyMjPQExpAT2hA7+VYjpbNulk6oA8GuSSxYbM5mS2zMt6solhCBOfLKU8U2mtRH8fSAX0wyCVJ1MsdbfGxYbOJmDGzUhB3RRy7ozyRdKLF54KlA/pgkEuSK8+JEnc+wpEoGzabiBkzKwWR9cfkE+VpmXTC0gF9MMhNQKVUGH745FmdV0KJMmNmpcDkE3VomXTC0gH9MMhNwMJyMWOOLb7MwKyZlQKTT9ShZdIJSwdG98Xvv8Kz21vw+r6zGPij8ldADHITUOzOhyvPiZ7QAI8sTcCsmZXxmHyiPFFgr0XSCUsHRvdlfxhnL4Vw4D8v47+/+hH2nrio6OszyE2QqJk7yYbNhmfmzEqBySfKOyMP0L1Z1fdh6cDYZt7ixM8em4uyaTdi4I9R1P+iA4/+7AQ+vfClIq/PIDdB4l6usZn3ckYnkk7MmFkpMPlEeVePK29S9X1YOjC+W/Ky8MK6OahdVYabbrgel7sH8KP/twVbd7Xhy/5wSq/NIDdBniKX3CFePETJmC4GY98IzZhZKTD5RFk9oQEEu0PIycxQ/Z6WpQOJm1eaj//5D/Pw/b+YDoftOpxo78LfvfoRdn54DuHo1xN6TQa5CXLYbXLNXGNzu86robEEgubNrBSYfKIscbcp7jrVxNKB5Dhs12H1PdPxv568G/NK8xGOfo1//o9z+LtXP8KJ9uSP6ydduXLligrrHNGy5w5r9VaaGBroxUBXALZvZeHbrhK9l0Oj6L3wGwDA5Km367yS1PR98Rkig39ATv402LNu0Hs5pvbV74P46svPcb3zJlw/Wb1AF/3jAP4Q7MB1NgdumDJLtfdJJ2XTbkTN90ow/eachH49d3IpyMi8AZh0HaJ/HMDXf4rovRwawZ8iQ8CVr2FzZOi9lJTZ7NcDAKKRr3ReiflFhwYBALaMTFXfJ/LHPwAA7Nd/W9X3SSefBfvQdj7xpBRNb0H3P79Yy7fTxJOv/AHNbefxyCIXqhfN1ns5NExTiw+b6s7gLs8t+MlG5T9/4nRCi8927P9lL747PUeV/5d0cu/fn0EEwL/8eAlynVmqvc/aH+9Ax5fAlr+7W77eoMQd/fRz1P+iQ04+Wfpfb8G6xUXI+lbioYupPilaPHcmmtvOo6nVzyBnQBekpCAzFoEPx+QTZQS7Q+gbHEKuM0vVABfsDqEj0MXSgQk493kfXv+3szh7OQQgVmaw4a9mJnxEGY9BLkXiw9vafgn9g0PIzjT/sZiVmLkx83DDk0/UfEBbmfiS4FE56UR0RCovncLSgQQN/DGK7Yf9OPCflwEAN2Y7UPO9Eiy8beK1jLyTS1GuM0ueMXei7Zzey6FhRGblVBMXgsdj55PUnZEmD9wq1R6qpanVDwBYINXU0tj2nriI//7qR3KA+5vKqXjrH+anFOAABjlFzJVa9Rxr/UzfhdA3XJBaerlN3NIrHjufpE783qk5eSB+Sgnv4sb2ZX8Yj/7sBOp/0YGBP0YxpzgXb/3DvKTv3kbDIKeAqoqZAIDmtnOcMWcggWAvwpEo3K7JljkuYueT1GlxXNncdh7hSBSeogIeK4/jXLAPl7sHcNMN16N2VRm2PHQHbslT7vfMGn/ydSbGZwSCvWhtv8RLZoMISON1ppq4CHw4Jp+kxhfokr/4qHl/Lo4q57Ih87jmFOfiZ4/NxS15WXDYlN93cSenkMXSbk58uEl/VsqsFNj5JDXyUaXK/SpF0okYy0Vjm35zjioBDmCQU0zFbbHdm2jhQ/qzUmZlPCafTNxpafLALBUnD3j9negJDcCV51R9GCuNj0FOIZ6iAs6YM5hgd6zGxiqZlQKTTybutDRDbpaKM+Q4INVYGOQUJBJQDp/k+B0jEHdyVsmsFMTOlMknyQlHonK2rZrTwA9L47dYOmAMDHIKEjPmeGSpv57QgNzVwiqZlYK4TxLz0CgxHVLSSYk7X7XPRCDYi0CwFzmZGSgvnaLKe1ByGOQUFH9kyew3ffmkAGDFOxG3a7I8y7B/cEjv5ZiGFkeVYuxWRdl0y325MisGOYWJc/hjzLLUldU6nQxXLO3m+GUqcT7peLdYxUSkk59eAABUckBqCvyou2sSJk2S/nr0IHDwUenvH8XBJF+NQU5hi+fG7uUam3kvp6eANA280HWjzitRh0g+EcGcxicXgau0kwt2h+D1d8Jht2Ehu5ykoAgbj1/BgUcAYD5ee3oJsORpvDb/ERy48haWJPlq3E8rrLx0CnKdWfIHXu0msDQykVlZrGLrJj2J5JPTUh9GGlv/4BACwV447DbVjrDFF9t5ZdN4VKmAJW/58Jq3GE+srQM8e4Adx5MOcAB3cqoQvep4ZKkfcSdnpW4n8eQygsAXOq/EHLRo5SX+vFcyq1IhRdh4/AAe+fgJ7Ll1BzZO8LeVQU4F4sjyKLMsddE/OISe0AByMjMsO/qoWMoQDAR7mXySAK+UdKJWU2YeVarE3wHMn4+PnyjGo8lexkkY5FTgKXIhJzNDTicmbV2Q6+OsuYsTpkr1f+L/l0YnOp3cMfMWVV4/fnacVb9Yae8gHl0LPH38OA48Ary9NPmkE4BBThUOu00+shQpxaQdn9QJxKr3cYJIhRep8TQ60QJtlkrHlYdP/hYAC8CV40fdXXux4vhGFEG6n5v/NpbeVYdkL4EY5FQijiwPM8tScxelzEq3RTMrBZEK72PnkzEFgr3oGxyCK8+pytibWCu/iwA4O04pBx8txhMfv42l0hmlv24tnvgYwMdPoDjJQMcUIJWUl0655sjSSp3wjU5kVrotWiMniFR4H3tYjkkknajVykt0OCovLeTsOIUseesKrrx19e+LNh7HlY0Tey3u5FQSf2TJBBRtXbBoz8rh3PKdXC+H9Y5B7fs4cVS59O5Zqrw+pYZBTkViYCJLCbQTjkTleihXnlPv5ajKYbehxJ0f+3/uZILTaNRs5yWOKplVaVwMcipaOKcYDrsNXn+nfIRG6hIP+6kW38UJIrnGy+STEYUjUXQEuuQvBErbf8wLIFYAzqxKY2KQU1H8tzu2+dLGBanNldXv4wQmn4zN648dVU4tmKxKFxJxSvOXc7+j+GuTMhjkVCYatfLIUhuiLtFq08BHU1wYa9TM5JORiR1u+cxCxV9bFIDnZGbwqNLAGORUxiNLbYnygalpks0qjuA4W25kZ6Skk1tn3Kz4a4vTmQXSn3EyJv5kVCaOLBub29HYfBZrls/Ve0mWJrryWz3pRMjOzIDbNRmBYC98ga4xmw8Hu0NobjuPntAA/Bd/h764dmC5zizMmnEzigtvstSwTzV7VorTGVETS8bEIKeByvIZaGxux7FWP4Ocyi5IiSdWLx+IV+K+CYFgLy4Ee74R5Lz+Thxr9aP50/Pj7vbiu/N4igqw4p7bUVUx07S7lGB3SO5hqvSXHnFUmevMkmdIkjGZ89NrMsOPLNNll6G1QDBWL+Z2qZNkYFRFhX+GxuZ2nPnsc1RVlAKIZf1ta/j4miNyh92GeWXTUFT4ZygpzEd25rfkfxfsDuH0Z0Gc/qwTHYEueP2d8Po78eaeJqxYdDtW3Xen6bIHxS6uvFT5+ziRVSl+v8m40udJoCMeWWojIBWBW3W8zmjksTsXu74R3Fx5TlSUTUPFbVPHaTk1BcsqPfLfNTa3Y88vW+H1d2Jbw8f4+b5fYdV9c7C+er5pvkCckWbt3TrDpfhrHzh2GgALwM3AHJ9WC+CRpfouSJmV6dZCTdw3nTp7Se6h6MpzYn31/GsCVzKqKkpRVVGK1vZL2PPLFhxt8eHdfSdxtMWH2polphgGLDIrlZ4E3tx2HsHuEErc+aoNYCXlMMhphEeW6vNLtWLpUj4AxI5ot9bHmth+feUKpv55Lh57oFKxRsHlpVNQXjoFvkAXXtrRCK+/EzVbdmJZpQdPrF5k2CNMUQQOKN+z8sBH3MWZCUsINMLCcPWJzMqpaVAIHo5E8eaeJqyp3QGvvxMZ0hGikgEuXrE7H/WbV+OxlQvgsNuw/5gXqzZtk++9jKYj0IVwJIoSd76igbh/cAhHW3xw2G1YzPs4U2CQ0xALw9WVLpmVzW3nsaZ2B97ddxLhSBRrls/FyvvmALjajFgta5bPxbtb18JTVICe0AA2vLAbDUdOqfqeE6FWv8rG5naEI1HMK5vGiQMmwSCnIRaGqycdMivDkSjqdn6IJ195H4FgLzxFBfLuyiMlV3Ro0PnE7ZqM+s2rseq+OxGORPHS9ka8tL3RUJMQTktJJ7MUTjrZ++FvAPCo0kwY5DTEI0v1WD2zMtgdwoYXdmPXoU/gsNvw2MoFqN+8Wk4AEf+MMsAAAB+TSURBVBOvT2t4fLhx9T3Y8vhyOOw2NBw5hQ0v7EZ/XIG5nuQZcgpOh/cFutAR6GJtnMkwyGmMR5bqsHJmZWNzO9ZKd29u12S8s3n1NzJ0c51ZyHVmoW9wCD2hAc3WVlVRinc2r0auMwtefyfW1O7Q/ZSiJzSAYHcIOZkZimY/ioSTqopSy54WWBGDnMZ4ZKkOK2ZWiqPAzW/sQ9/gEBbOKcY7zz006oNb/HMtd3PifXdsXYsSd35sx/lPu3X9bJ9WoQg8HInKHWF4VGkuDHIaiz+yFF0TKHVWy6zsCQ2gZstONBw5BYfdhidW34OfbFwxZqZgfFG41nKdWXj92VXwFBUg2B3C2tod8OnUNPrXZy8DUPYLT8ORU+gJDcBTVMDaOJNhkNOBOLI8zHs5xVgps9IX6MLa2h3oCHTBlefE688+iAfvu3Pc/04kWfh1mi2XnZmB1599EBVl09A3OIQNL+zSJdC1no0VxCs5XkccVf5g2XcVe03SBoOcDsSRZSDYK88/o4mzUmZlU4sPD2/ZKe8a6p9bnXB3EbHD0LN2zWG34cWNK3QLdOFIFBc6e+Gw2+ApUiazsqnFx4QTE2OQ08G1WZbt4/xqGo9VMivf3XcSm+r2IhyJonrRbLz+7INJ1WK58pzIycxAT2hA1yxHPQOd1x9EOBJVdBK4vItb/l3Tf4lKRwxyOuGRpXLMnlkZjkSxtf4g3tzTBAB4YvU9eGZd1YQeqMXu2KRwvTuR6BXolD6q9AW62OHE5BjkdMIjS+WYObOyf3AIT77yr9h/zIuczAy8/uyqhO7fRqNn8slwegQ68Vm4Y+Ytirye2MUtq/Sww4lJMcjphEeWyjFrZmWswHsXWtsvwpXnxI6ta1Oeyn3rjJsBAGdUbu+VKK0DnZjCMEuBKQk9oQF8ILUsq77n9pRfj/TBIKcjHlkqw4yZlb5AFzb80250BLpQ4s5H/XOrFZlMIQL9Beme0ghGCnRq1NH5Al3oGxyCK8+pyK7rvX2/QjgSRXlpIcsGTIxBTkcL5xQjJzMDgWCv7ncoZmXGzMrmtvPyg76ibBpef3aVYkdhxe58+RjcKC22gBECnQoF42J+XKq7YeDaXdyD95an/HqkHwY5HTnsNnksyr+f/K3OqzEns2VW7j/mxaa6vegbHMKySg9eHKfAeyLE/LQOnYqxR+Ow2/CPj/+Vap1RxAQGJZoyi11ciTtfldFFpB0GOZ0tvTs2uZn3chNjpszK/ce82Fp/UB6PU1uzRJXdp5iE7bv4heKvnapsKblGjUDX2n4JQOqTwON3cetXzE95XaQvBjmdlZdOQa4zCz2hAfkPKSXOLJmV7zQclyd4P7OuCo+tXKDae4nfC59OnU/GM1KgS7WptJJNmePv4riLMz8GOQOokupvDnzEXpbJMkNm5TsNx7Gt4WMAQG3NElQvmq3q+4kyAiPf8w4PdD985f2U7hCVasocv4t74vv3pPRaZAwMcjoIR6Jobb8k/3X7d/4cQKx9kJEGT5qB0TMrX9reiG0NH8uJF8sqPaq/p1GTT4bLzszAT596AK48JzoCXdjwwq4Jr1eppsxiF7dwTjEzKi3CHOloFtDU4sOvz15G69mLoyYE9A0O4f/6H/+Kv6kq5zFJAoyeWbm1/iD2H/Nek1molRJ3Prz+TnQEuhTJNlRLrjMLr//fD8rlFBte2IXXn12VdDKOEp1OeBdnTcZ7MlhMU4sP2/Z+/I3A5ikquObB/JuOy/jTn77GJ2cu4ZMzF+Vi8R8s+y6/UY7CqJmVYg6c6GLyk43Vmgcaz4wCeP2d8F38wtBBDoj13Ewl0CnVlPnl7Y0IR6KoqijlnzkLYZBTSWv7JdT98xE5uOU6s7Bi0e0on1k44kMnEOzFqk3b8F+um4Rpf54H/6XfobG5HY3N7VhW6cH66vmKFAtbiREzK8ORKDbV7UVz23m5TZceD0xxbHf6s881f++JSCXQiabMJdIx7UQ0tfhwtMWHnMwMbFzNuzgr4Z2cCt7c04QNL+ySx3M8sfoefPDTR/Bw9V2jfqt2uybDU1SAP339NVZ970588NNH5Pub/ce8uP+Hb+Ol7Y0pZ6FZidEyK+MDnBgiqteOQO5hGTBeGcFoRKBL9o4u1aPK/sEhvLS9EQDw2MoF7FFpMQxyCgp2h1CzZSfe3XcSALBm+Vx88NNH8OB9dyb0DbOyvAgAcPjkWbjynKitWYIPfvqInH3ZcOQU/nbTNk4Ul4jMyhKp876e+geHsOGF3WhuOw9XnhP1z63W9cjLLMknww0PdA8//964dXSpNmV+becR9IQGUF5aqHrmK2mPQU4hzW3nsbZ2B7z+TuQ6s1C/eTUeW7kgqeMTsXNrbjsv79hceU5seXw53v3HtfAUFaBvcAhb6w/iyVfeT/tdnbiH0fu48srXf8KGF3bB6++85iGtN6N2PhmP+D10uyYjEOxFzfM7x2zqnEpT5qYWn5wcVFvzvQmvmYyLQU4Bjc3t17Rq2vXi+oSnOcfLdWbJdT5NLb5r/l2xOx/1m1fjidX3ICczA81t5/G3m7albacUX6BLHo6pp6+jYfR97pMbLb+7da0hAhxg7M4n43HlOfHOcw+hvLQQPaEBPLxl5zf+TACpNWUOBHvx4zf2AYjN8DPKz42UxSCXot2HPsHmN/YhHIliffV81NYsSakX4eK53wFwdY7VcA/edyf+5cX1cqPbzW/sQ93ODyf8fmZ1QTqqdOtYBB7sDuEPQR+iQ1+hxJ0/odR3NZkt+WS47MwMvPrUX6OqolS+7xRXAcJEmzL3Dw7hyZffRzgSxbJKD48pLYxBLgXvNBzHa1KAqa1Zgoer70r5NasqSuGw2+D1d456F5HrzMKrTz0gT4/edegT1GzZmVbHl3onnfgCXah5fie+joZhz/w26jevNlSAA8yZfDKcw27DlseXY83yuQBiSV01W3bKg4ZFU+Y7ZiYe5Prjxv2UuPPxzLoq5RdOhsEgN0G7D32iSieL7MwMzJOKhsdLMKleNBvvbI7NIfP6O+U7wXQgHnJTdbiP8/o7seGFXegJDcCRdQNy8qcZshjdrMknI3ls5QK8uHEFcp1Z8Po7saZ2B97dd1Lu95roTi4Q7MXDz78nHy+//uwqQ/7sSDkMchPQ1OKTd3D/+PhyxbuT/KV0ZJnIMNVi6R6oomwaekID2PDCbjRIXRusTAwFdWtcCB6bBbdbvn/Nzp8GTDLuHyOzJp+MZMGcYux6cT2WVXoQjkTx5p4mBLtDcGZfP+59XDgSxe5Dn6Dm+fcQCPYa8niZ1GHcP50G5fV3XnNZrUb7rWSHqcbuLh7A+ur5crcNK9/ThSNRBILaZ1aKWXDhSBTVi2ajtmaJZu89UWZOPhlJdmYGamuW4NWnHsAN2dcDAP7Q/xWW/8MbeGl7I5pafNf8mfH6O/FOw3Hc/8O38drOD9E3OITqRbMNebxM6uA+PQmiW3o4EsWq++7Eg/fdqcr7iGGq+4958e8nf5twpubD1XfB7ZqMrfW/wK5Dn+BCsAf/+PhfWe4Pc0BqyqxlZmXDkVNywfD66vmK3L9qwezJJ6OpKJuGu+6Ygf3HvPjzm27A5S9+j4Yjp8Y8xXDlOfHYykq57pTSA4NcgsKRKDa/sQ99g0OoqihVvfXP0rs92H/Mi8bmdjy2sjLhe4OqilJMdeXiyVfel47WduEnG1dYKj1aZFYWF2pTbB0/KueJ1feo9uVGDVZIPhmNuI/7p//jvwEAjrb6cDH4pTSbUeqCUloIV963saC8iE3P0xSDXILe3HNMLvbVIhurvHQKXHlOBLtDaG2/lFQH+2J3PuqfW40f1e1FR6ALa2t34KdPPTCh2j0jEpmVxRpkVr60vVHeHdTWLNFkVI6ShiefWGVXH+wOfWNIKpsq00h4J5eAphYfdh36RE5n1upBsbRyFoDRa+bG4spz4vVnV8n1dBte2G2ZdmAdF2NJFGrWyIUjUWytP4iGI6c0nQWnBislnwhXsypTG5JK1scgN45gdwhb6w8CAB5fWanpbkg8VI+2+CaUAi4SUqoXzZYf2m/uaVJ6mZoTLZ7U+uYuCo/jZ8GZ+ajLasknAPDrs7EgN9F+lZQ+GOTG8dL2RvQNDmHhnGLN72JceU6UlxYiHIni6AgtjRL1zLoq+Yj13X0n8SMpQ9CM+geH0BMaQE5mhird4uMbLedkZuCdzas1HXaqBismn8g7uRSGpFJ6YJAbw/5jXnlsytM6dUVYevfEjyzjVS+ajVefegA5mRk42uIzbYcUUR9XrMLkgWB3CA8//x68/k5dZ8EpzWrJJyPdxxGNhkFuFD2hAdTtPAIA2Lj6Ht1mTC2cUwyH3YbW9ovjjhwZT0XZNLz+7Cp5jMna2h1jdnc3otNSr8IShTMrRceYQLAXbtdk7Ni61jIPUCt1PgF4H0fJYZAbxdb6g3K5gJ51NdmZGaiqmAkA2HvkNym/nsi8LHHnj9nd3ah8KvSsbGrxyV1MyksL8c5zD1mq5AKAfJdshbZvvI+jZDDIjSD+mFLterhErLjndgDj97JMlJh3F9/dffehTxR5bbX5pMxKpXZyuw99IncxqaooxatP/bVl0uzjyUeWF821cx8J7+MoGQxyw/QPDskZiHoeU8bzFBXIO6/mtvOKvObw7u6v7fwQL21vNHRCSjgSvTooVYFuJy9tb5R7kK5ZPhdbHl9u2Wa9t864GQBwRurab1aBYC/v4ygpDHLDbGv4GD2hAVSUTTNU+x+RgLL3w9SPLOM9tnIBamuWwGG3oeHIKTz5yr8a9t4m0NkrD0pNJRiJDMr4Iu/HVi5QapmGZJXjyua2cwCAirLpOq+EzIJBLo4v0IUPpAff439jrIfessrb4LDbcKLtvOJZkcsqPXLmZWv7RTz8/HspJ7moQRy1pdLOyxfowpraHWhtvyhnUJq1yDsZrjwncjIz0BMaMGVWrfDrs5cBAHNvm6rvQsg0GOTibNv7sdx82WhHIdmZGVg4pxjhSBSHm9sVf/3y0inYsXUt3K7JCAR7DTmbLtV2Xo3N7Xh4y055WOaOrWuTnihtZrOk3dxpg/1ck3G1J2X6/NwoNQxykqYWH462+OCw2/DQ8u/qvZwRiQSUBgWyLEfiynPineceQnlpodwKzEgJKV6pfKC4MPkauXcajmPzG/vkBJN6adhsOpk1wwXAvMknvkAX+gaH4Mpzpt3PjiaOQU6ybW+sy/zjKysNkWwykvLSKfJOS61dVqwV2F/LrcBe2/khNr+xzxD3dAGpELwkiV22GCQbP0XAygkmYxEZlqdNmnzSepa7OEoegxxiqfkdgS7kOrNQvWi23ssZU/Wi2G5O6QSUeA67Dc+sq8KWx5cjJzMjdswnTVTWSyDYK3+LTzTFv7ntPP5207Zr7t/MNCZHaWY/rhT3cXfMZJCjxKV9kAtHonLJwPrq+Yb/hr+4ohQOuw2NzWdV311VVZSi/rmHUOLORyDYizW1O3SbZCBaUiWyiwtHoqjb+SGefOV99A0OoaJsGv7lxfVpvwPIdWbBledE3+CQ6TrdhCNRnJDKZ9L950jJSfsg13DkFHpCAyhx5xt+FwfEHlQiAWX/sU9Vfz+3azLqN6++ZpLBk6+8r3mG3hmpufCt0r3SaALBXtRs2SmPRnps5QK8+tQDhj2C1poIEGa7l/P6gwhHonC7JvM+jpKS1kEuHIni5/t+BQBYv2K+zqtJnEhASbVpc6LE8aUIFuIY8N19JzV5f+DqQ3m0TifhSBTvNBzHmtod6Ah0we2ajNeffVAudqcYkZkqWmOZhbiPm8f6OEpSWge5+F2cmeaFiQSUjkCXpmn+FWXTsOvF9VhW6UGf1BmmZstOTe7qfNJx5Ujz/JpafLj/h29jW0OsBGRZpQfvPPeQZSahK0m0wvKZbCd38tMLANivkpKXtkEufhf3mMEKvxOhRQLKSLIzM1Bbs0Te1Xn9nVi1aRu21h9UrYA82B1C3+AQcp1Z1ySdBIK9ePKV97Gpbi96QgPwFBWgfvNq1NYssWT/SSWIiQQdgS5DZMwmon9wCF5/Jxx2GycPUNLSNsjF7+LMOBRTywSUkYhd3ar77oTDbsP+Y17c/8O38dL2RsXv60SShNiZBYK92Fp/EKs2bZMbaT+zrgr1m1dz95YA8XskCquNTqzTU1TALy+UtLQNcrsPtQIw111cvFxnFuaVTdMsAWUk2ZkZ2Lj6Hux68e/k1lgNR07JwU6pDD5R15WVmYEf1e3Fqk3b5CzPVffdiV0vrjdF0pBRiCM/sySfNLX6AfCokibG2PnyKmlq8cmtncx0Fzfcynvn4GiLD7sPtepa/+XKc6K2ZgkevHcOtu39GEdbfGg4cgoNR07B7ZqMpZUeLKv0TCjDMdgdwrFfxx5yB6TA5rDbcP+i2Vh5Xzkz7SZAJO+IujOj42gdSkVaBjnR3URkKZpVeekUlLjz0RHoQlOLT/eAXezOx082rkAg2Ivdh1rQ1OJDINiLN/c04c09TfAUFaB85hQUSmngw+udRNumnlA/fn32MprbziPYHcIk6d/f+O1M3P+Xs7Hqvjt5bJUCca8lknmMLNgdkkfrsD6OJiLtglxTi0/ubmKF7vNL756FjkAXDnx0WvcgJ7hdk/HMuio8s64Kjc3tONb6GRqb2+H1dyadDZp1vQMDX4VxQ/b12Pvqo4Yv1jeD7MwMuT2cL9BluGbk8ZrlAnDu4mhi0u6JIWrLfrD8u5Z4YFYvmo039hzDUWnX5HalPkxUSVUVpaiqKMUz66piJQ+fdeLz7j8gEOz9RuJDiTsf2ZnfAhAbpVI+c4qcZHL7d26xxM/LKDxFBbGfwdmLhg5yonSgsrxI34WQaaXVU8MX6MLRFh9yMjMsk6gg7qd2HfoEe4/8BhtX36P3kkaULR03JXvk9O8nfwuASQdKu2PmFOw/5sVpqZOMEbGVFykhrbIrxV2cGEBqFWJq+P5jnyIcieq8GmWJThezZrA0QElmmBTe2n4J4UgUJe58JhjRhKVNkAsEew0/L26iit358gy4BmmyuRWEI1Fc6OyFw25LarwOjc/tmoyczAw5scOIxFFlxW3mq2Ml40ibILdXGjR6/6LZlmzW++C95QDUG6iqB9GUd2rBZEvtvI3iapalMevljrb4AABzGeQoBWkR5HpCA/hA2uGsWGTusoHRLJhTDFeeE4FgL5qkh4PZ+S7GUtxZH6UOMdHBiPVy8aUDnqKxJ08QjSUtgtyeQy0IR6JYOKfYcNmHSnrwPmk3p3E/S7WIh2+R1DmflOWR7jnFvaeRiC9qFWXTuYunlFg+yMXaXsU6ZTy0zFp3ccNVL5qNnMwMNLedN+wRVDI6pP8HZtapw1Pkkps1Gy1hqVm6j5t721Rd10HmZ/kg19x2Xm7EbPXmvQ67DcsqbwMA7P5li86rSY04rhLTrEl5DrstLssyqPNqrgpHonIrLzM2TydjsXyQ2/3LWCNms7fwSpTIHG1sPqv59G4liYec1b+Y6E3UHxrpyLK57TzCkSg8RQWWTBIjbVk6yImuGjmZGZZo4ZWIXGcWFs4pRjgSxXvSvDwzEpOrWQSuLpHUY6TkEzF1gEeVpARLBzlRNmC14u/xiPFBjc3thrtrSRQ7z2tD3Mt5/Z2G+ayIpJOF5cboxUrmZtkgFz9nzaplA6MplgbB9oQGTFkcHp8+buS+ilYg7uXCkagh7uVa2y+hb3AIrjwnf/akCMsGucbms+gbHEJF2TRLlw2Mplq6g/z5vl8Z5ht6okSrKXae14aR7uVOfhrrVbnQIBM1yPwsG+T2SNmF1WmScDLcgjnFKHHnoyc0IHeOMIszUtNgUaxM6jLSvVxj81kAnDpAyrFkkPMFuuSZcemcgizu5t7bb64EFLGj8LApsyaMci8XCPayywkpzpJBTtSIrVh0e1olnAxXUTYNuc4seXK4GfSEBtAR6JLuivig00L8vZxI+NHDUXY5IRVYLsj1Dw6hsfksHHabZWbGTZTDbsMPpLo5MWbI6Jrj5ofxQacdcS8nOv/r4ZhUOlBZPkO3NZD1WC7IiZlq86RdTLqrlqYumGU3J+rjKlgjpSkxzkav+9tgdwhefyccdhuTTkhRlgtyYtTMynvn6LwSYzDbbo71cfrwFBXoOl9OJJwsnFPMHTwpylJBrrX9EgLBXrhdk9nUN45ZdnOsj9NXRdl0AFePjLXEo0pSi6WC3IGPYtMGlqZJC69EmWU3J+/iWB+nC9FGS+t7uZ7QAI8qSTWWCXLhSFROOEmXPpXJMMNujv0q9SVOP05IDZK1Irfx4lElqcAyQW7/MS8TTsYQv5t7aXujIbugxA/KJO258pxwuyZr3uLr8MnfAuBRJanDMkHuwEenAQBL756l80qMq3rRbLjynIbsaRnfszAd27AZhTguFHdkausJDaC1/SKPKkk1lghygWAvvP7OtO9wMh6H3YYnVt8DINbTsn9wSOcVXcWehcYwV+NSgsPN7QB4VEnqsUSQEyN1qipK+QdlHPE9Lbc1GCcJRTxUOUNMX+WlU+RSgkCwV/X3Eycwi+d+R/X3ovRk+iAXSziJfRvkUWViNn5/EQDggyOnDDE9PBDsRSDYC4fdxtIPA1gg7abV3s0Fgr3oCHQhJzODJzCkGtMHuea28+gJDaDEnc/aqgSVl06Rp4e/vL1R7+XID9N5ZdO4EzcArUoJDhyLlfws5gkMqcj0QU4cd6xI05E6E/X0uio47DYcbfHJ89v0Ih6mHK9iDPOkBsmt7RdVvbfdLwU5nsCQmkwd5MSsNIfdhqqKUr2XYyq5ziy5pODlHfrt5kR2HQAeWRlEdmYGPEWxMUdqHVmKExi3a7L8XkRqMHWQE98EF84pRnZmhs6rMZ81y+fKBeLi91JrIruugvWNhiISQQ6fPKvK64vXZXciUpupg9wBHnekxGG34Zl1VQCAN/c06ZKEIgqBF8+dqfl70+hE8onYcSmpJzQgN2RmdyJSm2mDnGjGzNq41CyYU4yKsmnoCQ3gzT1Nmr53/HiVqgoGOSPJdWbJPUSVbgN3uLkd4UgUC+cUc/dOqjNtkBPNmPlNMHW1NUvgsNuw/5hX0w704oi0qmIms+sMSJyQiOQupew+1HrN6xOpyZRBLhyJyt8ueaafulxnltwJZWv9Qc06oRyWjqx4VGlMoguJ19+p2Iy55rbzCHaHkOvMko9EidRkyiB3tMWHvsEheIoK2OdQIdWLZsNTVICe0ABe23lE9fdrbjvP42aDy87MkIvzlUpM2vuhNNT4Pg41Jm2YMsixGbM64o8tRRcZtYiHnShjIGOqlupPReu8VMSX/PCagbRiuiDXExpAc9t51sapwO2aLB9bvry9UbEjquECwV75YbeYP0NDWyAlh/SEBlJOQHlv368AgOOwSFOmC3Li2GRe2TTWxqmgetFsLJxTjL7BIWyt/4Uq7yF2BfdLg1zJ2MTRYioJKD2hAXwgjXdav2K+IusiSoTpgty/iyJSHlWq5ul1Vch1ZqG1/SLqdn6o6GvHP+z4MzSHZZUeuQXcRGvm3tv3K7lsgD1mSUumCnK+QBc6Al1MVlBZrjMLWx7/KzjsNuw69Al2H/pEsdfmw858cp1Zch2jOHJMBndxpCdTBTlxXMK5ceorL50id0N5beeHihQE82FnXg/eGzuynMh4pm0NH/OLDenGVEFOZPz9JQcsamJZpQfrq2PB6Mdv7Eu5UPzl7Y0IR6KoXjSbDzuTKXbno6qiNOnxTF5/JxqOnILDbsNjKxeouEKikZkmyLFruT4err4Lyyo9CEei2FS3d8KlBV5/p5xRKQInmcvG1ffId3O+QNe4vz4cicoTLn6w/LusaSVdmCbIybVxrK/RXG3NElQvmo1wJIrNb+xDg3TkmKie0AB+VLcXQOxhx4xKc8p1ZuH+RbMBAC/tiO3Kx7LrUAs6Al1wuyZjzfK5WiyR6BtMEeT6B4fkuVYsItXHM+uq5B3YS9sbsbX+4LgPOSD2bf5HdXvRExpAeWkhH3Ymt756Plx5Tnj9nXh338lRf53X34ltDR8DAJ5Zdy/v0Ek3pghyjVLX8vLSQu4CdPRw9V3XdEVZU7tjzISU/sEhbH5jH7z+TrjynNjy+HI+7EwuOzMDtTVLAMQSSka6pw0Ee/HDV95HOBLF+ur5cmswIj2YIsg1tfoBsK7KCJZVevDu1rUocecjEOzFprq9WPvjHWhsbr8m666xuR2rNm2T7+Fe3LiCX1Asorx0irwjf/KV9/FOw3EAsV377kOfYMM/7ULf4BCWVXrwcPVdei6VCJOuXLlyRe9FJKKxuV3uik76C0eiaDhyCj/f96trgltOZgb64qYYuF2T8eIT1ZZNOlj23GEAwP7nF+u8Eu3tPvQJXhulWUBF2TS8+tQDGq+I6JtME+TImMKRKPYf8+LkpxfQ2n5RDnDlpYW4Y+YtWLN8rqW/mKRzkANiw4vf/N9N8Po7AQCuPCfWV8/n3TkZBoMcUQrSPcgRGZ0p7uSIiIgmgkGOiIgsi0GOiIgsi0GOiIgsi0GOiIgsi0GOiIgsi0GOiIgsi0GOiIgsi0GOiIgsi0GOiIgsi0GOiIgsi0GOiIgsi0GOiIgsi0GOiIgsi0GOiIgsi0GOiIgsi0GOiIgsi0GOiIgsi0GOiIgsi0GOiIgsi0GOiIgsi0GOiIgsi0GOiIgsi0GOiIgsi0GOiIgsi0GOiIgsa9KVK1eu6L0IIiIiNXAnR0RElsUgR0RElsUgR0RElsUgR0RElsUgR0RElsUgR0RElsUgR0RElsUgR0RElsUgR0RElsUgR0RElvX/AzlwsxCuvSBsAAAAAElFTkSuQmCC)
A. \(f'\left( { - 1} \right) \ge f''\left( { - 1} \right)\)
B. \(f'\left( { - 1} \right) > f''\left( { - 1} \right)\)
C. \(f'\left( { - 1} \right) < f''\left( { - 1} \right)\)
D. \(f'\left( { - 1} \right) = f''\left( { - 1} \right)\)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi thử THPT QG năm 2019 môn Toán Trường THPT Chuyên Thoại Ngọc Hầu lần 1