Skip to main content
Editing a multiple choice - math & science question by WIRIS
You have permission to :
Edit this question
General
Category
Default for System (16649)
Test-Lidia
Question name
Question text
<div align="justify"><i><font size="4" face="times new roman,times,serif">Si <span class="nolink"><span class="nolink"><span class="nolink">«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mi»f«/mi»«/math»</span></span></span> es una función cuyo gráfico viene dado por:</font></i><br /><br /><i><font size="4" face="times new roman,times,serif">#graf</font></i><br /><br /><i><font size="4" face="times new roman,times,serif">Entonces, la gráfica de <span class="nolink"><span class="nolink"><span class="nolink">«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mfrac»«mrow»«mi»d«/mi»«mi»f«/mi»«/mrow»«mrow»«mi»d«/mi»«mi»x«/mi»«/mrow»«/mfrac»«/math»</span></span></span> es:</font></i><br /></div>
Default mark
General feedback
<font size="4"><i><font face="times new roman,times,serif">Solución:<br /><br />Debemos recordar que la derivada de una función evaluada en un punto se puede interpretar, por ejemplo, como la pendiente de la recta tangente a la curva; es decir, si <span class="nolink"><span class="nolink"><span class="nolink">«math xmlns="http://www.w3.org/1998/Math/MathML"»«mi»f«/mi»«mo»(«/mo»«mi»x«/mi»«mo»)«/mo»«/math»</span></span></span> es una función derivable en un punto <span class="nolink"><span class="nolink"><span class="nolink">«math xmlns="http://www.w3.org/1998/Math/MathML"»«mi»a«/mi»«/math»</span></span></span>, entonces <span class="nolink"><span class="nolink"><span class="nolink">«math xmlns="http://www.w3.org/1998/Math/MathML"»«mi»m«/mi»«mo»=«/mo»«mi»f«/mi»«mo»§apos;«/mo»«mo»(«/mo»«mi»a«/mi»«mo»)«/mo»«/math»</span></span></span>. Gráficamente: </font></i></font><div><font size="4"><i><font face="times new roman,times,serif"><img src="data:image/png;base64,/9j/4AAQSkZJRgABAQEAYABgAAD/2wBDAAIBAQIBAQICAgICAgICAwUDAwMDAwYEBAMFBwYHBwcGBwcICQsJCAgKCAcHCg0KCgsMDAwMBwkODw0MDgsMDAz/2wBDAQICAgMDAwYDAwYMCAcIDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAz/wAARCAEwAdgDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9/KKKKACiiigArP8ACfizSvHvhXTNd0LU9P1rRNatIr/T9QsLhLm1v7eVA8U0UqEpJG6MrK6khgQQSDWhXgH/AASd/wCUWX7NP/ZKvC//AKaLWgD3+iiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKyNQ+IOgaT4z07w3d65pFt4i1iCa6sNLlvI0vb6GHb5skUJO90Tem5lBC7lzjIrR1LUrfRtOuLy7nhtbS1jaaaaVwkcSKCWZmPAAAJJPQCvlH/gnTYTftM/ELxp+0/rMMgX4hj+wfAUEyFX07wpaTN5MgU8q99OHunH90wD+GveyzKIVsFicwxEnGnSSSt9qpO/JBfJTm3/LBrdoynUakoLd/l/X5n1pRRRXgmoVleCvHmh/Enw9Hq/hzWdK1/SpZJYUvdNu47q3d4pGikQSRkqWSRHRhnKsrA4IIrwX9oHxfrP7VfxOv/gn4G1O90nRNMEf/AAsrxRYSmKbS7eVA66NZyryt/cxMrSOpDWtvIHBWSaAj3zwX4M0n4c+ENL8P6Dptno+h6JaRWOn2NpEIrezgjQJHFGg4VVUAADoBQBp0UUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAV4B/wSd/5RZfs0/8AZKvC/wD6aLWvf68A/wCCTv8Ayiy/Zp/7JV4X/wDTRa0Ae/0UUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFZ3i7xbpvgHwpqeu6ze2+m6PotpLfX13O22K1giQvJIx7KqqST6CqhCU5KEFdvRJbtg2fMX/BSrxFffHC+8Jfs0eGbqeDWfjG0kvii7tmIk0Pwpbsp1Gckfda43JZx5GC1y5/gNfT/hXwtp3gfwvpui6PZW+naTpFrFZWVpAmyK1gjQJHGg7KqqAB6CvmP/AIJo+E9U+LB8YftG+LbK4tPEXxpnjk0CzulxNoXha3LDS7Xb/A8qs93KAeXuRkZTj6rr7HiypHBxpcP0XeOHv7RraVeVvaPzULRpRto1BzXxs56C5r1X129On+fzCvDP2sfj/r+leJdG+FPwy8if4q+NYTOl3LD59r4N0oNsn1m7XoQpylvC2PtFxtX/AFaTPH0f7VP7SUf7O3gqy/s/S5PE/jnxVd/2R4S8NwSiObXdQZWYIWORFBGitLPMRtiijdjk7VaD9lD9m6b4E+HNU1XxFqcfib4l+Np01Lxf4g8soL+6CbUggQkmKyt0/dQQ5+VAWYtJJI7/ABh0HS/AL4E6B+zf8L7Dwp4ciuPsdo0k9xd3cpnvdUu5XMlxeXMp5luJpWeSRz95mPQYA7Kvk39pD9rnx18IvFnxuj0mTSb1fA/gqyudHs5oMxyeINUu7m00i1Dja7BngiM4ORm7hWP7jlvob4p+INT8E/Cu6vba9Caraxwr9pTw5ea2C5dFZhY2jCeQHJ4RvkzuJKqaAOsor5s0z9orxvPqVukviAvE8qq6j4C+LoSwJGRva4Kp/vEEDqa+hvEt5Fp/hzULie9fTIILaSSS8XbutVCkmQblZcqOfmUjjkEcUAed+Mf2zPhz4O/4SKFvEdtqepeFp7K1v9N04G5vFlvL7+z7aNIx98veBrf5cgSo6EhlYDvtS8YafpXifTNGln/4merpNLbW6KXdooQpklOPuxqXjUscDdLGucuoPzl/wTi+BltrP7Efws1zxM99qWr+I/L+ItzHexwI8V/qMtxqpjkEUab/AC7nUJpQH3bZvmDcCuw8HeKI9O/aq+N2u6oZjH4X0PRLOGNcOyWccN5eM6KDnc8s8qnpu8hB/CKAPaNX1OPRdJuryVLiSK0iaZ1gheaVlUEkKiAs7YHCqCSeACaoy+O9Fg8Dt4mbVbD/AIR5bH+0zqQmU2v2Xy/M8/zM7THs+bdnGOa+Yv2ff2t/G3xL+IfwT/tm+0bTIPij4KvfH2t6M0CN/YFrJJYRaVYxTAhjOzagFkd96yvaTGMRLhKydJ1m7vfgZpXhuYPFoZ+PV1oquCFT7Db+Irm7hgGePKEsMdqEUY2LsxjNAH2FpeoLq2mW10kc8SXMSyqk8TRSoGAIDIwDKwzypAIPBqevBf2wPjd4h+Hd94c0/wAIeItGg8Qa34o0Dw7baa8cdy5F7eMb2W5jPzhY9Ngu54QjJukgbcWQEV6d8MJdc034YpJresWnjPV4Hu2+16ZZpZLfIJ5TDGqNIUEix+XGzF1R3VnwittUA6yivNf+F6eKP+iMfEr/AMDvD/8A8s6p/tdfHbV/gb8HrC/0DTIbrxP4n13SfC+kRXg3W1ldajew2i3FwEYFooBK0zojAuIiisCwYAHoni/xdp/gPw5c6vqs/wBk02yAe5uCpZLZCwBkcgHbGudzuflRQzMQqkjSrwz9nH4qaj8Wvib8YvCuuarpviLw54T1qPw1pv2i1iW61Hy9Os59ReYJiOSNZ78W+BGm0wurBj8xs/sLeMNV1X9gn4aaveW2oa1qcXhO0IjWRTd6oYoAqMHmdVMkyorbndVJkyWAOQAe1UV4JpXx08U/8NA69/xaH4kMP+Ee039x9u0HKf6Tf/P/AMhLb83Tg5+TkAYz7rp1099p8E0ttNZyTRq7wTFDJASMlGKMylh0O1iMjgkc0Acdrv7SXgLwx47vvDGo+LNEste0zTrjVbqzmuQjwW0CRSTyNngeXHcQO653Kk8TEBXUnsNL1BdW0y2ukjniS5iWVUniaKVAwBAZGAZWGeVIBB4NfB/wu8O3GsfD278V32r6jqsXxY+Pzpc3F3HaIxs9N1VdPtm3RxISlzHoGnqVyVeNkG0ZIr0/9rL9snxH8Ntd+M0eiGLStM+CngCHxPLPLAk0viLV737Z9h09FfgQg2YEmNryPeQqkkfluWAPpY+LtPXxgNBafy9VezN/HA6lfPhDhHeMkYfYzIHCklPNi3Y8xM6VeAfGnXdU0/WP2dtRlurHUvEX/CaLpGp3GnoVgui+janHeooyWEQli83YSQGtoyclK9/oAKKKKACiiigAooooAK8A/wCCTv8Ayiy/Zp/7JV4X/wDTRa17/XgH/BJ3/lFl+zT/ANkq8L/+mi1oA9/ooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK+Pv29NWl/a6/aG8Gfsv6QZJtE1JYvF3xSniJC2ugQS5t9OZh0e/uUVCoIbyIpjja2a+jP2jPj34e/Zc+Bnin4g+KrhrbQfCdhJf3RQZkm28JFGP4pJHKxov8Tuo715V/wAE5vgHr/w9+HevfEL4hWyQ/Fr4zagvibxSmMnSlMYSy0pT18uztgkWCT8/mtk7q+24YtluHqcQ1V71N8lDzrNX51/15i/aX6VHSTVpM5q3vtUl139P+Dt6XPoe2to7K2jhhjSKGJQiIihVRQMAADgADtXJfHn45+Hv2b/hVqvjDxPcTw6XpaooitoTPdX08jrHBa28S/NLPNK6Rxxry7uoHWuj8SeI9P8AB3h2/wBX1a9tdN0rSraS8vLu5lEUFrDGpeSR3OAqqoJJPAAJr5x+BHhjUv20vixpnxq8X2FzY+BtAZpfhf4cvoGhlAdWjbxDeROAVuZ42K20bDdb27liFlndY/iW76s6Tp/2Xfgv4h1jxbd/GD4oWaW3xH8S2f2Sw0YSrPB4E0lmV10yF1+V53ZVkup1z5sqqqkxQwge6UUUAeGeOP2JrT4p/GWLxN4o1m11uws/Elh4ls7STRLaK8tmsI42sbL7YgDvaQXiyXqq6mTzpSPNEe6N/c6KKACvOv2mvgvrXx++HUvhjTPF8/hHTdWjurHXGg06O6m1GxuLO4tnhjdyPIkVpkmSVc4eBQVZGZT6LRQBW0XRrXw5o1pp1jBHa2NhClvbwxjCQxooVVA7AAAD6VzEvwyfT/jgPGWnTRRvqulR6LrcEmf9Jht3mmtJUPOHikuLlSvAdbkknMSKewooA4iz+APhDwY8OpeGPBng3TNf0izlt9IuE0uKD7Huj2CMPGu9IsKqkJ0UYAxxWRJ+zFpw/Z8j8DxX80dzBdLrSauYgZTrK3w1L+0WjBCszX4+0NHkI25k+6cV6dRQBxd38B/CHi/UBrXiHwX4QvPEl5Fbm+u206K4keSIfJiZ0DsIzkIxwQMcDpXX2FhBpVjDa2sMVtbW0axRRRIESJFGFVVHAAAAAHTFS0UAFZ/ifwppfjbRn07WNOstVsJHjla3u4FmiLxyLJG+1gRuSREdT1VlUjBANaFFAHD3/wAFdO8L+E/EFt4D07QfBmseI0SKfUbDT4oJEOBH55CKBJJHGWMYfK7gAeCa6PwH4I0v4Z+B9G8N6HaJYaL4fsYNN0+2Qkrb28MaxxxjPOFRVHPpWrRQBQg8M2dv4outZSMjULy1hspZN5w0UTyugx0GGmk56nPsKzPil4e8Q+KPCX2Xwt4ji8K6ut3azrfy6amoRtFHcRyTQNEzLlZoleIsGVkEhZSGANdFRQB5Vpv7KGj+H/2WdC+F+nX11DB4YtbD+zdUlRZLhL6ymiube+kUbVkk+1QpM68K53AjaxFdPr3wX8MfEmBbrxb4S8Lavqt3YR2d81xYx3aui7z5IeRNzxq0s23cBjzHOAWbPXUUAcTqXwdt9W+I3hPUXSzt9C8CQSSaJp1vFsWC9khe187AACiK0kliRV4xdS5HypXbUUUAFFFFABRRRQAUUUUAFeAf8Enf+UWX7NP/AGSrwv8A+mi1r3+vAP8Agk7/AMosv2af+yVeF/8A00WtAHv9FFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFeM/t5/tPT/ALKv7PF/rGjWf9seOdfni8PeDNHVdz6xrd0THaQ4yMoGzJIcjEUUhzxXdlmW18wxdPBYVXnUaiuiu+76JbtvRK7ehM5qEXKWyPIvjBDH/wAFAf27tK+HMa/bPhZ8ALy28SeMXBzb614jKb9N0s9nS2RjdzLkje1srDOa+w68g/YX/ZbX9kD9m3RfCNzqLa94klebV/E2tycy67rF05mvLtyRk7pWIXPIjWNf4a5D4++PNX/ak+KWofBDwHqd7pWmaakZ+JHirT5jHNoltKgdNIs5Ryuo3UbBmdfmtbd/M+WSW3Ne3xTmVCrWhgMBK+Gw6cIPbn1vOq13qSvLXWMOSF2oIyoQaXPLd7/5fL/glLXrP/h4h8UJNLOZfgL4H1HbfsP9V8QtZtpebYdpNLtJU/edrm5Ty+YoJBN9NgYFZfgfwRo/w08G6X4e8P6bZ6NoeiWsdjYWNpEIoLSCNQqRoo4CqoAA9q1K+WNwooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACvAP8Agk7/AMosv2af+yVeF/8A00Wte/14B/wSd/5RZfs0/wDZKvC//potaAPf6KKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK+Ov2Znm/b2/bP1n44XsQl+GXwrkvPCfwxUtuh1W83GHVdcXHDBmQ2kDgkeWkxABfNb/APwUU+KmtePNV8Ofs5/D/UZ9P8e/F6GVtV1O1Yeb4S8MxsE1DUs/wyOG+zQZxmaXII8s12vxT+Ifhv8AYH+AXhLwZ4I8OpqGszxxeFvAHg+0k2SatcpF8kZfkxwRRoZbi4YERxpI53NhW+3wv/CNk7xT0xGLi4w7wo3cak/J1WnSj/cVW6tKLOaX7ypy9I7+vRfLf1sL+1Z8fNf0nxHpHwr+Ghtp/ir40t3niuZovOtfB+mK3lzazdr0ZUY7IISQbichBhEmePvP2f8A4D6F+zf8MLLwtoC3UsEDyXN5fXsvn32sXkrmS4vbqU8y3E0jM7uerNwAAAOZ/ZO/Znk+Anh/VdW8RanF4p+JvjedNS8X+IhCYxqFyE2pBAhJMNlbp+6ghydiAli0jyO/rVfEHSFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFeAf8ABJ3/AJRZfs0/9kq8L/8Apota9/rwD/gk7/yiy/Zp/wCyVeF//TRa0Ae/0UUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABXJfHj43+HP2bfg54j8d+Lr5dO8OeFrF7+9m4LbVHCIuRukdiqIo5Z3VRyRXW18W/FXxRZft2ftdXej3l/bWnwD/Zqv11nxhqFxMsVjr/iW3Xz4rKSQnabbTlxcT7jt87ylYfuzX0XDWUUsbiJVcW3HD0Vz1ZLflTS5Y/35yahDpzSTfuptY1qjirR3ei/ry3Lf7NCv+zX8JfHf7Tvx1in034gfEoQ3lxpixG5vPD+mBtmleHLSMfNJcEyKDGgDTXVwwwTtNel/sofA3xHqvi+++MvxUtIofiZ4ptfsmn6OJVng8B6OXEkelwsMq07EJJdzr/rZlCgmKGEDE+DPg6//bO+LWj/ABm8XWl5ZeB/DjvN8M/Dd3G0Zk3oUPiK8iYAi5mjZltonGbeBy7BZp3SL6XrizvN6uZ4yeMqpRvZKK+GEYpRhCP92EUorrZatvUqnTUI8qCiiivKNAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigArwD/gk7/yiy/Zp/wCyVeF//TRa17/XgH/BJ3/lFl+zT/2Srwv/AOmi1oA9/ooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKK5v4wfFzw78BPhbr/jTxZqdvo3hvwzZSahqF5McLDFGuTgdWY9FUZLMQACSBWtChUrVI0aMXKUmkkldtvRJLq29kJtJXZ4v/AMFEv2mNf+Fng/Q/h38NjFcfGj4u3D6J4UiYbk0lAubvV5xg4gs4iZDkHc5jQA7jjyf9mb9nbw78afDWjfDHwpFJcfs1/Cm6MOpX9wS7/FnxDDN5lxJI/Sewhug7zvyt1dAx/wCpgdZvKP2e/DnjT9vP4+eM9e1FNW8M+I/iDZ29v4ov4bkx3fwx8GsBPYeG7VxzHq+oo32m6ZCGtoplY7JDb5/SbwJ4F0f4YeCtJ8OeHtNs9G0HQbOKw06wtIxHBZ28SBI4kUcBVUAAe1fYcS1qeX4ePD2Fkn7N81aSd1Ota1k1o4UU3CD1Tk6k0+WaS56Kc37WXXbyX/B3+7saoGBRRRXxR0hRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAV4B/wSd/5RZfs0/9kq8L/wDpota9/rwD/gk7/wAosv2af+yVeF//AE0WtAHv9FFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABX5eftyfH7Xf+Ckf7belfAb4VyWep6D8PdS+1atcTxC60ubVoGXdeXqDiSx0wn5YWYC8v3ihwY4J5I/a/8AgsJ+3br3wZ8O6B8EPhGtxqnx++NO7TfD9rZyBZtGtG3CbUHbBEW1VkCO2FUq8hO2F69N/wCCZ3/BPPw//wAE7f2fLXw1Zvb6r4q1JI5/EetLEUN/OoO2OMMSy28W5ljQkk7nkcvLLLI/22WVFkeC/tNv/aqqaorrTg9JVn2k9YUuq96p7rjTcuaa9pLk+yt/Py/z+7uep/s7fs/6D+zL8KbDwn4f+2TwWzyXN5f30xuL/WLyZzJcXt1KeZbiaRmd3PdsABQAO4oor4k6QooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACvAP+CTv/ACiy/Zp/7JV4X/8ATRa17/XgH/BJ3/lFl+zT/wBkq8L/APpotaAPf6KKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK8a/by/bY8L/sC/s56r498SLcX86Omn6HotopkvvEeqTZW2sLZFBZ5JX44BwoZsYU16b8QviDonwn8Cax4n8S6pZ6J4f8P2cuoajf3cgjgs7eJC8kjseiqoJr4m/Y6+GWs/8FKf2j9K/ar+JekXml+A/DiSR/BHwfqCFWtbWTh/Et5Ew/4+7pApgQ8QwlWG52WQerluHpa4rFK9OHTbml0iuuu8mto31u1eJt/DHc3v+CVP7Avib4Xar4i+P3xzaHV/2jfi2on1ZiRLF4O09iGh0a0OSFWNRGJCpIZkVQWWNXb7Toorlx+OrYyvLE13eUvkl0SSWiSVlFLRJJJJIcYqK5UFFFFchQUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUdKK8Z/wCCifi248DfsK/FnU7F7pNWg8MXqaSLe6ktpZNQeIx2cYkjIZd9w0S8HkMQQQSCAWvhR+2p4O+OFnpc/hiPXb9NdvIYdLaXTpLePVLWWzhvl1CB3ASS0+yzxSGQHhpEiIErLGfXK+cvhD8JdP8AgX+1T4F8GWLXTaP4S+Fc2m6Abm5mncol9ZR3YUyMxwBFp/G47QUAAGK8h0X9qvxN4o8XfDa91fxZfaBr3jH4qa5YajodrIHj0bw/pX9qQ2+ntblTuubuays9zFRO0l3MsbeXGsdAH2Jpnxc0W6g8Tve3Uejf8IbPJHrB1CVIUso1jEy3DOTsELQssgfOACwba6Oq+B/8EX/jH4Q+K3/BMD4D2vhbxV4b8S3Phb4d+HNI1qHStThvJNIvYtKtlktbhY2YwzIwIaN8MpBBAry//gqH+yT4p/btb9oD4TeDtUtdJ1XxX8LvC7Ca5cpA89tr+p3VvbyMvzKk6Q3ULMAQFckhgAK+KP8Ag3N/4JE/GfwhoB+Md74/8bfBLw/8RPCtrPpieHZtCv7rxDbXJgurWd4rq2v4I4khyQXRLjdcMu2JUfzvqMFk+V1sjxOY18aoYmnKChQ5JN1Iy+KSmtI8mrd99tG1fCVSaqqCjdPd9j9yqKx/AHhm98G+DdO0vUfEOseLL6yiEc2r6rHax3t+2T+8lW1hggDdv3cSLx0ry/x/+y5448Y+MtR1TTv2kPjR4Tsb2UyQ6RpWmeEpLKwXA/dxNdaJPOV/66Su3PWvlzc9oorl/hD4A1b4a+DU0vWvG/ij4g3ySvIdX1+DToL11Y8RlbC1tYNq9sRBueSa4/4vfs6+L/iV4yfVNF+PXxY+H1i8SRjSNA0/wzPZIyjmQNf6RdT7m6nMpX0AoA9Yorh/gh8J9e+FGlX1vr3xN8cfE2a7lWSK68S2uj28tkoGDHGNNsLNCpPJ8xXbPQgcVn/G/wCB3if4r6rY3Gg/GT4kfDKG0iaOW18NWWgXEV6xORJIdS0y8cMBwPLZFx1BPNAHpFFeb/BD4HeJ/hRqt9ca98ZPiR8TYbuJY4rXxLZaBbxWTA5MkZ03TLNyxHB8xnXHQA81ofG/4T698V9KsbfQfib44+GU1pK0kt14atdHuJb1SMCOQalYXiBQeR5ao2epI4oA7iivJ/hD+zr4v+GvjJNU1r49fFj4g2KRPGdI1/T/AAzBZOzDiQtYaRaz7l6jEoX1BrsPi94A1b4leDX0vRfG/ij4fXzypINX0CDTp71FU8xhb+1uoNrd8xFuOCKAOoorxfwB+y5448HeMtO1TUf2kPjR4ssbKUSTaRqumeEo7K/XB/dyta6JBOF/65yo3HWvUPH/AIZvfGXg3UdL07xDrHhO+vYjHDq+lR2sl7YNkfvIluoZ4C3b95E689KANiivB9J/ZD+IOnarbXE37U3x4v4YJUke1n0nwWsVyoIJjcx6ArhWAwdrK2DwQea9w1ayk1HSrm3hu7iwmnieNLqAI0tsxBAkQSKyFlJyNysuRyCOKALFFeAf8Mb/ABF/6Ox/aA/8FHgf/wCZ6vd9JspNO0q2t5ru4v5oIkje6nCLLcsAAZHEaqgZiMnaqrk8ADigCxXNfFj4z+DvgL4Qk8Q+OfFnhrwXoEUixPqeu6nBp1mjtnaplmZUBODgZycV5Zq37IfxB1HVbm4h/am+PFhDPK8iWsGk+C2itlJJEaGTQGcqoOBuZmwOSTzX5+f8FVvGGufGL9pj4c+BfAOn+Mf2gNQ/Z9gay8c6o502GS21bXr7TbHS1/dpbWbaguJS4VII4LeeV2ZcOB6eUZfDGYmNKtPkp/ana6iu7RFSfKrrVnsvxT+IGmf8FdfiVq091qEMP7FPwQu5NU8TawT5ll8V9VsMzNbxFcibRrJo98sgBjuZkCqHVN4+/vh/ql7rngvTbzUNKOhXV1CJTpzOGeyVuUifHyiRU2hwuVDBgrMAGPwp8Hv2UPFv7Kn/AASq+L1l4stI9JfXNVuvGE/h6OeO7XQdMCWZu7UmNvKZ5Utbq4kWJmQSXkihpcb398/abufEM/7S3g4X+ja5r3wx0jwtrOsS6XplhLdpr2upLZRWVtcBFZdiwS3bpHLiNpCshObYFTNMRCVT2FB3p07qLXXX4tdby3120XQILS73Z9D1xvx3+M9l8CPAcWtXltPfS32q6boVhaQkB7q9v72GytkJ52p506F3wdkau+CFIryL9iL4i3vww/Zu+BnhDxdpvj658WeLNN+zXeoX+m3k6JqUdkb29N1LLl7aMyi5jh88gv5ShdwKkv8A21PBGlfGL9oX9njwhqWj6dq8P/CU33iW/jurRJwtjYaXcj+IEAfb7nTCex2jvgjzCz0f4IfHe7+M95NE/hnUPDc+kWFo2uWmozxNc6RqVxBFcjTmETOjSRW8sUkjBtoFxCF3EuE73V5LuLSbp7CK3nvliY28U8piikkwdqs4Viqk4BYKxA5welfK2oah458F/s0/tTD4eW5k+J2l+IdYk0ry7QXEi3MunWk9lIkIJ85o7WW22x87zGEx/DV/9mzw3L4b/bR8RW+maT46t/B2keCtH0jS7vUobuO21e68++l1DUZ3mCrPcvt0+IyMDO5EjHdH8wAPWr39pHTYfgnZfECO0mHh6GXGuidhHc6DHHK0F20qjK7rSZXE67gEWGdgWKBX9Ir5CeNrb/gm3+0bc3QafTdSvfiHLYwAFjLE97qSbUXHPmzCRlC53+apGd1fVXgqxvtL8G6RbanN9o1K3soYruXcW82VUUO2TycsCc0AadFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAVwHxe/Z30v42eKfD9/rOreI10/QJEnbRba9Eel6pLHeWl7BJcxbSXeGeyhZCGXCtKh3JK6nv6KAOb8Y/Da38UeLPD2vxTNY614bmkEFyiBvNtpgoubVxwTHIEjbGeJYIHw3l7T0PkJv3bE3bt2cc5xjP1xxT6KAOc8F/Dm38I+IPEOsNM97q3iS7E91cyKAVijXZBboP4Y40zgZwXklfAMjV5H/wSd/5RZfs0/8AZKvC/wD6aLWvf68A/wCCTv8Ayiy/Zp/7JV4X/wDTRa0Ae/0UUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFfKv/BSX/gonL+yuPDvw2+HOlR+N/2g/ii5sfBnhlSWjgJyG1G+I/1VnCA7sxxuETgEKsjp24DAVsZW9jRWtm23sktXJvoktWyZzUVdmZ/wUI/bN8XxfEfR/wBnT4CNbXnx38e2jXN1qskQuLH4baNkJLrV4vQyDO23hb/WSlc5ACyev/sifso+Bv8Agn/+z/p/gzw7K8Votz9q1XWtVuQ+oeI9VuZFEt9eTtzLdXEzKMk9SiKAqqo5j/gnd+wda/sTfDXVZ9Z1iTxt8WPH92Na8feM7pP9K8RagQcKueY7WEMY4IRhY0yQAzuTN/wU2+T9k/ze9r408HXQH94x+KNKkx+O3H410Y7F0lD6phP4a3fWb7vsv5Y9Fvd3YoxfxS3PfLi3jvLeSKWNJYpVKOjqGV1IwQQeoIrM8DeDbT4e+ErDRNPa4On6XF9ntEmk8xoIQT5cQbqVRdqKWy21RuLHJOtRXlFlW+0W11K/srmeISTae7S25LHETsjIWAzjOxmXJ5AZsdTXMeGfgB4Q8H/FTXPG2n6NHD4o8RFmvr9p5ZWctFaxPsV2Kxb0srMOIwu/7NEWyUBHY0UAY1t4FsLLx5deI4Flg1G/so7G82N+7u0jdmiZ1x9+PfKAwxkSsG3YTboaxpx1jSLq0Fxc2huoXh8+3fZNDuUjejYOGGcg44IFWaKAOZuPhBoE3hLQNASyFvoXhua1ms7CJtsH+i4NujDqyxuscgGfvxITnBB6aiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAK8A/4JO/8AKLL9mn/slXhf/wBNFrXv9eAf8Enf+UWX7NP/AGSrwv8A+mi1oA9/ooooAKKKKACiiigAooooAKKKKACiiigAoor5r/bh/b8T9n6+/wCEE8CWOneLPi7qenS6jFYXd0LbSvC1gikyaxrFz0tbGIAsckPKRsQZJZfTyjJ8VmeJWFwkbys222lGMVq5Sk7KMYrWUm0ktyKlSMFzSKH/AAUu/wCCl+jfsIeCYdM0qzj8VfFTxHblvD/h2Pe4UGRYVu7oRgutuJXSNVUGS4ldIYlZ245P/glR/wAE6dZ/Z/u9f+NPxgv7nxR+0N8U4xLruo3rpI2hWhKsmmwBCY41XanmLESgKIilkiRm4n/gmB+wZJ4t8fN+0F8RrvVPFOvavIL7Q7/XLcw3uszFGQa3NA3/AB7RmN2jsLMAC1tnLsPPuHEX6C17WcZjhMLh3lGUS5qentKlrOtJaqyesaUXrCLs5P8AeVEpckKedOEpP2lTfou3/B/4ZeZVfVNJtdbszb3ttb3luXSQxTxiRCyMHRsHjKsqsD2IB6irFeD/APBSzVrrQ/2OfEFzZXNxZ3KapoirLBIY3UNrFkrAEYPKkg+oJFfJG57xRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFeAf8ABJ3/AJRZfs0/9kq8L/8Apota9/rwD/gk7/yiy/Zp/wCyVeF//TRa0Ae/0UUUAFFFFABRRRQAUUUUAFFFFABRUGp6nbaJptxeXlxBaWdpE00880gjihjUEs7MeFUAEkngAV8aa7+0Z49/4KX6xd+FvgNqWo+B/hDbzNa698WPI2XOsBW2y2vh9XHzN95TfsPLQg+WHYK1e/knD1fMXOrzKnRp256s7qEE9r2Tbk7PlhFOcrOydnbKpVUNN29l/X5nZftL/tj+JvF/xOufgx8ALfT9f+J6BR4h8QXURn0L4cW7/wDLa8IIEt4y5MNmp3MRufbGPm8Z/ZV/Y38M/GbxJquh6TPeeJ/hRoutm78d+MNV/e6j8bfE1vId0csv8ek2UykGNf3UsyeSoMUM3n9tF8LtEW6k/Za+BEFz4S8JaGFufif4ssLlze2KXCiQ6fHdkmSTWL5CGknZi9tbv5mRJJb19deA/AmjfC/wVpPhvw7plloug6FaRWGn2FnEIoLOCNQiRoo4CqoAA9q7c1z6hHDPKcnThh7pyk7KpWa2lUs2lFPWFJNxhu3Od5uYUnfnqav8F6f5msBgUUUV8mbhWP488AaN8T/C8+i+INOt9V0q5killtpwSjvFKk0ZOP7siIw91FbFeL/8FDPH+s/Cz9jjxr4h8P6jcaTqukw208d3AQJIUF3CJCM+sZcfjQB7RRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFeAf8Enf+UWX7NP8A2Srwv/6aLWvf68A/4JO/8osv2af+yVeF/wD00WtAHv8ARRRQAUUUUAFFFFABRRVTXddsfC+jXWo6neWmnafYxNPc3V1MsMNvGoyzu7EKqgckk4FVGLk1GKu2Bbry/wDal/bF8A/sd+ELfVPGurtDdanL9m0fRrGFrzWNfuSQFt7O0jzJPISVGFGF3AsVHNeK6z+3z4u/a21a68NfsvaBbeILOKZrW/8Aihr0Dx+ENLIyH+xgFZdUnUggCHEAO0tLtOK7/wDZi/4J9+GPgF40u/Hmv6pqvxO+Lurx7NR8b+Iwkl/sOcwWkSgRWNsMnEMCqMYDF8A19rDhzC5WvbcRycZbqhFpVX/jbTVFf4k6m1qfK+ZczrSnpR+/p8u/5eZ5Zpv7NHxI/wCCj+r2uvftAWMngb4SQuLnSfhNa3Za51bDBop/EFxG22ToGFlEfLUlRIzlWU+q/tN/FrV/BEeg/B/4QW+mWnxH8UWmzTiLNX07wRpMZEcurXES4URxAeXbw8efPsQYjWZ4+q/am/aTh/Z08GWJsdKm8U+NvFN2NI8J+GraVY7jXr9lLBN54igjRWlmnYbYoo3Y5O1Wj/Za/Z3n+CWg6rq3iPU4/EvxI8aTpqPivXRH5a3dwF2x21uh5isrdSY4IsnauWYtLJLI/jZ1xDiMx5KTSp0ad+SlC6hC+9k225Oy5pycpysuaTsraU6Khru3u+v9eRtfs5/s+eH/ANmH4T6f4S8OrdS29s0lzeX97L599rN7M5kuL26lPMtxNKzSO56lsABQAO5oorwTUKKKKACuX+NHwh0b49/C7WfB/iFLiTRdegFvdrBKYpCu4Nww6HKiuoryf9ur4vaz8Af2O/iP418Ovbx654Z0K41CxeeISxrKi5Usp+8PagD1iiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACivGf2gf+CgHwo/ZT+Iun+G/iR4lk8GTarZpeWep6np11Fo0waSSPyzfiM2ySqY8mN5FYK6HGGFej/Dv4q+F/i/oCat4S8SaB4o0uUApeaRqEN7buDyMSRMyn869PEZLmFDDQxlehONKfwzcWoy9JWs/kyFUg24p6o36KKK8wsK8A/4JO/8AKLL9mn/slXhf/wBNFrXv9eAf8Enf+UWX7NP/AGSrwv8A+mi1oA9/ooooAKKr6tq9poOnTXl9dW9laW6l5Z55BHHEo6lmJAA9zXzl8Tf+CuvwD+H3iCTQdN8ar8Q/Fi/LH4f8CWU3ibUZnzjy9lmsiI2f+ejoPevWyrIcyzObhl2HnVa35IuVvN2Wi7t2SM6lWENZtI+laq63rdl4a0i41DUby10+ws4zLPc3MqxQwIOSzOxAUD1JxXyvP8ef2n/2krby/h78J9E+C+i3IBTxB8TL5bvVAhxkx6PYu4VxzgT3Ke69i/w9/wAEpdD+IOtQa58fPHHiz9oPXIWWWOy8QMln4Ys5Ac5g0e3222OB/r/OPA5r3Vwxg8GubOcZCD/kpWrVH/4DJUo+alVUl/I9jP20pfw4383ov8/wJda/4KdW3xf8QXPhz9nXwbqfxx1m3le3uddtpf7O8G6TIpwfO1aRTHMVyDstFnYjPSorT/gnNq/7R+t2mv8A7TPjJfiY9rItxaeB9Iik03wRpkgO5d1qWMmoOp6SXjMvpEvSvqTQPD9h4V0W203S7K003TrKMRW9rawrDDAg6KiKAqgegGKt0nxXDA+5w/R+r9PaN89d/wDcS0VT/wC4UYOztKUg9g5fxXfy6fd1+dyto+j2nh7SbawsLW2sbGyiWC3t7eJYooI1GFRFUAKoAAAAwAK5r46/G/w7+zj8KdX8ZeKruS00bRo1ZxDE01xdSu6xw28ES/NLPLKyRxxqCzu6qBkiuh8SeI9P8HeHb/V9WvbXTdK0q2kvLy7uZRFBawxqXkkdzgKqqCSTwACa+b/gLo+pftw/E3SfjP4q0+903wB4fleb4ZeHL6BoZbgsrRnxFeROAyzTRswtYnGYIJDIwEs5WL46UnJ3e50HSfssfBPxHrfjK9+MfxTsorb4j+I7VrPS9GEqzxeBNGZldNMjcfK9w7Ikt1Mv+slCopMUEOPeaKKQBRRRQAUUUUAFcP8AtK/BC1/aU+Afi3wDfX1xpln4t0yXTZrqBA8lusgwWUHgke9dxXm/7Ynxvuv2Z/2UPiR8RLGxt9TvPA/hq/12G0ncpFcvbW7yhGYchSVwSOgoA9IooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigDyn49658YINcSw8CfDn4U+M/DdzZD7XN4p8d3uhz+eXcPELaHRr5Hi2CMhzKpJZlMYChm+RfiP/wAE0db+JOutq7fslfsyeGddOSNV8J/GjXfDd8GJzvMth4bhLNnnLZyQM5r9EKK9XK89zLLJueXYidFvdwnKN/XlauROlCek0n6n5rWv7Ef7angGQy+BPHr6EwGEt9d+O1x4qtU9Bt1DwdJKR/21z6Eda0fDXgP/AIKl+GrhvM8X/sha9ABhBq9xq5lx6s1rptupP0VR7V+jFFexPjfNKiareym31nh6E5f+BSpOX4maw0FtdfN/5nxDpmpf8FIoo8Xui/sQ3D4HMOteKIRnvwbVv515B/wTw1P9vdf+CePwJTwTon7ITeFh8PPD40OXXNb8RLqD2P8AZtv9nNykNqY1nMWzeEcqG3YJGDX6e14B/wAEnf8AlFl+zT/2Srwv/wCmi1rypZ7iXPncad/+vNK33clvw/Nl+yXn97/zPnfxXoX/AAVG8QIy2Wq/sT6Fk8NZ3HiGRgPT99aSD9K5pv2Uf+ChfjohPG/xS8H3Frj5rfwh8RR4Zye4Eq+EJ5gP+2mR696/SyivTo8aZlSjy0o0V5rDYfmXpL2XMvkyHh4Pe/3v/M/NnS/+CWfjO/1O21Hxv8BfhT8XtXtWDLe/EH9ozxP4iyR0zBceHTb45PAiHU9q+i/AMX7Qfwo8PppPhb9nv9mTw1pURylnpXxW1Kzt0+kcfhZVH5V9N0V5+acS5tmUVDMMTUqxWylOTivSLdl6JIqFGnDWEUjwD/hY37U//RG/2f8A/wAPJq//AMzFH/Cxv2p/+iN/s/8A/h5NX/8AmYr3+ivENTwD/hY37U//AERv9n//AMPJq/8A8zFH/Cxv2p/+iN/s/wD/AIeTV/8A5mK9/r5p/aM8f63+1L8Vb74E/D3VbzSNPsoo3+JXi3T5tk3h60lUMmk2kg5TUruM5Lj5rW3bzeJJbfIB8++J/Gv7RX/BS7xFJpUPwt+C0/we8A+IXttctf8AhaeqLpnxD1C1KMLeO6/4R4tLYWlwrLPH5AjnniWPzWSKaN/pgfEX9qZQAPg1+z+AOg/4XJq//wAzFe1eAvAei/C3wTpPhvw7plnoug6FaR2On2FpEI4LSCNQqRoo4AAAFa1AHgH/AAsb9qf/AKI3+z//AOHk1f8A+Zij/hY37U//AERv9n//AMPJq/8A8zFe/wBFAHgH/Cxv2p/+iN/s/wD/AIeTV/8A5mKP+FjftT/9Eb/Z/wD/AA8mr/8AzMV7/RQB4B/wsb9qf/ojf7P/AP4eTV//AJmKP+FjftT/APRG/wBn/wD8PJq//wAzFe/0UAeAf8LG/an/AOiN/s//APh5NX/+ZivzQ/4OaPjL+1xpn7L/AIYsdS8N6H8PPhdrM1/Y+MLrwF42vtbF+kkMccNrqEsmmWD29pIj3KlQZI5iQsm3CLJ+11Fe3w3nEcqzShmM6EK6pyUnTqK8JrrGS6p/0nsZ1qftIOCdr9Vufmb/AMEWPj1+2Z45/YX0e78R+DvAHxEhivpodH8SeNPiHqOi6tqtiEiKO6xaNei5RZGmjW5abMojyAyhZpfrP/hY37U//RG/2f8A/wAPJq//AMzFe/0Vw5ljFi8XVxUacaaqSlLlgrRjzNvlitbRV7JXdkkVCPLFRvex4B/wsb9qf/ojf7P/AP4eTV//AJmKP+FjftT/APRG/wBn/wD8PJq//wAzFe/0VxFHgH/Cxv2p/wDojf7P/wD4eTV//mYo/wCFjftT/wDRG/2f/wDw8mr/APzMV7/RQB4B/wALG/an/wCiN/s//wDh5NX/APmYo/4WN+1P/wBEb/Z//wDDyav/APMxXv8ARQB4B/wsb9qf/ojf7P8A/wCHk1f/AOZij/hY37U//RG/2f8A/wAPJq//AMzFe/0UAeAf8LG/an/6I3+z/wD+Hk1f/wCZij/hY37U/wD0Rv8AZ/8A/Dyav/8AMxXv9FAHgH/Cxv2p/wDojf7P/wD4eTV//mYo/wCFjftT/wDRG/2f/wDw8mr/APzMV7/RQB4B/wALG/an/wCiN/s//wDh5NX/APmYo/4WN+1P/wBEb/Z//wDDyav/APMxXv8ARQB4B/wsb9qf/ojf7P8A/wCHk1f/AOZij/hY37U//RG/2f8A/wAPJq//AMzFe/0UAeAf8LG/an/6I3+z/wD+Hk1f/wCZij/hY37U/wD0Rv8AZ/8A/Dyav/8AMxXv9FAHgH/Cxv2p/wDojf7P/wD4eTV//mYo/wCFjftT/wDRG/2f/wDw8mr/APzMV7/RQB4B/wALG/an/wCiN/s//wDh5NX/APmYo/4WN+1P/wBEb/Z//wDDyav/APMxXv8ARQB4B/wsb9qf/ojf7P8A/wCHk1f/AOZij/hY37U//RG/2f8A/wAPJq//AMzFe/0UAeAf8LG/an/6I3+z/wD+Hk1f/wCZij/hY37U/wD0Rv8AZ/8A/Dyav/8AMxXv9FAHgH/Cxv2p/wDojf7P/wD4eTV//mYo/wCFjftT/wDRG/2f/wDw8mr/APzMV7/RQB4B/wALG/an/wCiN/s//wDh5NX/APmYo/4WN+1P/wBEb/Z//wDDyav/APMxXv8ARQB4B/wsb9qf/ojf7P8A/wCHk1f/AOZij/hY37U//RG/2f8A/wAPJq//AMzFe/0UAeAf8LG/an/6I3+z/wD+Hk1f/wCZiivf6KACiiigAooooAK8A/4JO/8AKLL9mn/slXhf/wBNFrXv9eAf8Enf+UWX7NP/AGSrwv8A+mi1oA9/ooooAKKKKACiivM/2ov2j7f9nbwXaPaaXceKPGfia5/srwr4atJFS51+/ZSwjDHiOGNVaWaZvlhijdznAUgGB+1T8c9f0nWtJ+GPw2NvN8UvGsEksF1LEJrbwjpynZNrN0h4ZI2ISGE4NxOVQYRZnj7P9nb9n3w/+zL8LbPwr4eF5NDHLLeX2oX0xuL/AFq9mcyXF7dTHmW4mkLO7nucABQFHM/skfszXHwJ0LV9b8UapD4o+KPjqePUfF/iBYvLS8nVdsVrbKeYrK2QmOCLPC7nYtJJI7evUAFFFFABRRRQAUUUUAFFFFABXzx+05P4hm/aX8HrqGi65rvwy0fwtrOrzaXpthLdpr2vJLZxWVtcBFZdiwS3bpHLiNpCshObYFfoeigDxj/gnlput6L+xf8ADqz8Sr4hPiK30S2Orza154u7i+eNZbtiJz5wQXDzIgk52ouMqVY+z0UUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABXgH/BJ3/lFl+zT/2Srwv/AOmi1r3+vAP+CTv/ACiy/Zp/7JV4X/8ATRa0Ae/0UUUAFFFU/EPiGw8I6Bfarqt7a6bpemW8l3eXd1KsUFrDGpd5JHYgKiqCSxOAASaAOf8Ajh8a/D37O/wt1bxh4pvHtNH0iNWcRRma4upXYJFbwRL80s8sjJHHEgLO7qqgkgV5x+zD8F9f1rxlefGD4m2aW/xE8R2ps9M0cyLNF4F0hnEiabEy5VrhyEku5lJEsqqikxQQ45z4M+Fr39tb4p6J8ZPFNpd2fgLw673Hw18OXsLRPOzrs/4SK7ibBE8sZYWsTgGCGQuwEsxWH6WoAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigArwD/AIJO/wDKLL9mn/slXhf/ANNFrXv9ef8A7J3wL/4Zf/ZY+Gnwz/tT+3P+Fd+FNL8Mf2l9m+zf2h9is4rbz/K3v5e/yt2ze23djc2MkA9AooooAK+VvEMMn/BSD4v3GiKBJ+z34B1Hy9Vk6xfEfWbeQE2ano+l2cq/vjytzcJ5XMcMqy+2/tH/AAm1r44/DGbwvo/i698FQatcRRatf2EBe/l0/d/pFvbSh1+zTSp8guAHaNWYoofa6dN4E8C6N8MPBWk+HPDumWejaDoVpFYafYWkQjgs4I1CRxoo4CqoAA9qANYAKAAAAOgooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigAooooA/9k=" align="middle" border="0" hspace="0" vspace="0" /><br /></font></i></font><font size="4"><i><font face="times new roman,times,serif"><br />Además, el criterio de la primera derivada, gráficamente nos indica lo siguiente:<br /><br /></font></i></font><img src="data:image/png;base64,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" alt="máx y mín" title="máx y mín" align="baseline" border="0" hspace="0" vspace="0" /><br /><font size="4"><i><font face="times new roman,times,serif"><br /><br />Analizando el criterio mediante el gráfico, observamos que la pendiente de la recta tangente a la curva en el máximo o mínimo es igual a <span class="nolink"><span class="nolink">«math xmlns="http://www.w3.org/1998/Math/MathML"»«mn»0«/mn»«/math»</span></span>, es decir, <br /><br /></font></i></font> <div align="center"><font size="4"><i><font face="times new roman,times,serif"><span class="nolink"><span class="nolink"><span class="nolink">«math xmlns="http://www.w3.org/1998/Math/MathML"»«mi»f«/mi»«mo»§apos;«/mo»«mo»(«/mo»«mi»a«/mi»«mo»)«/mo»«mo»=«/mo»«mn»0«/mn»«mo»§#8660;«/mo»«mi»e«/mi»«mi»n«/mi»«mo»§nbsp;«/mo»«mi»a«/mi»«mo»§nbsp;«/mo»«mi»s«/mi»«mi»e«/mi»«mo»§nbsp;«/mo»«mi»a«/mi»«mi»l«/mi»«mi»c«/mi»«mi»a«/mi»«mi»n«/mi»«mi»z«/mi»«mi»a«/mi»«mo»§nbsp;«/mo»«mi»u«/mi»«mi»n«/mi»«mo»§nbsp;«/mo»«mi»m«/mi»«mi»á«/mi»«mi»x«/mi»«mi»i«/mi»«mi»m«/mi»«mi»o«/mi»«mo»§nbsp;«/mo»«mi»o«/mi»«mo»§nbsp;«/mo»«mi»m«/mi»«mi»í«/mi»«mi»n«/mi»«mi»i«/mi»«mi»m«/mi»«mi»o«/mi»«/math»</span></span></span><br /><br /></font></i></font> <div align="left"><font size="4"><i><font face="times new roman,times,serif">Con esta información y graficando los puntos máximo o mínimos de <span class="nolink"><span class="nolink"><span class="nolink">«math xmlns="http://www.w3.org/1998/Math/MathML"»«mi»f«/mi»«/math»</span></span></span>, queda el siguiente gráfico:<br /><br />#grafp<br /><br />Analizando el gráfico anterior, tenemos que la derivada en esos puntos debe ser </font></i></font><font size="4"><i><font face="times new roman,times,serif"><font size="4"><i><font face="times new roman,times,serif"><span class="nolink"><span class="nolink">«math xmlns="http://www.w3.org/1998/Math/MathML"»«mn»0«/mn»«/math»</span></span></font></i></font> y por las observaciones anteriores, la gráfica de la derivada de la función debe cortar dos veces al eje X. <br />Por lo tanto, la opción correcta es el gráfico:<br /><br />#grafd<br /></font></i></font></div></div></div>
One or multiple answers?
Multiple answers allowed
One answer only
Shuffle the choices?
Number the choices?
a., b., c., ...
A., B., C., ...
1., 2., 3., ...
i., ii., iii., ...
I., II., III., ...
No numbering
WIRIS variables
Algorithm
Choice 1
Answer
#grafd
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%
-5%
-10%
-11.11111%
-12.5%
-14.28571%
-16.66667%
-20%
-25%
-30%
-33.33333%
-40%
-50%
-60%
-66.66667%
-70%
-75%
-80%
-83.33333%
-90%
-100%
Feedback
<i><font size="4" face="times new roman,times,serif">¡Excelente! </font></i>
Choice 2
Answer
#grafr1
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%
-5%
-10%
-11.11111%
-12.5%
-14.28571%
-16.66667%
-20%
-25%
-30%
-33.33333%
-40%
-50%
-60%
-66.66667%
-70%
-75%
-80%
-83.33333%
-90%
-100%
Feedback
<div align="justify"><i><font size="4" face="times new roman,times,serif">Revisa el desarrollo para identificar tus errores. ¡Tú puedes! </font></i></div>
Choice 3
Answer
#grafr2
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%
-5%
-10%
-11.11111%
-12.5%
-14.28571%
-16.66667%
-20%
-25%
-30%
-33.33333%
-40%
-50%
-60%
-66.66667%
-70%
-75%
-80%
-83.33333%
-90%
-100%
Feedback
<i><font size="4" face="times new roman,times,serif"> <div align="justify"><i><font size="4" face="times new roman,times,serif">Revisa el desarrollo para identificar tus errores. ¡Tú puedes! </font></i></div></font></i>
Choice 4
Answer
#grafr3
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%
-5%
-10%
-11.11111%
-12.5%
-14.28571%
-16.66667%
-20%
-25%
-30%
-33.33333%
-40%
-50%
-60%
-66.66667%
-70%
-75%
-80%
-83.33333%
-90%
-100%
Feedback
<i><font size="4" face="times new roman,times,serif"> <div align="justify"><i><font size="4" face="times new roman,times,serif">Revisa el desarrollo para identificar tus errores. ¡Tú puedes! </font></i></div></font></i>
Choice 5
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%
-5%
-10%
-11.11111%
-12.5%
-14.28571%
-16.66667%
-20%
-25%
-30%
-33.33333%
-40%
-50%
-60%
-66.66667%
-70%
-75%
-80%
-83.33333%
-90%
-100%
Feedback
Choice 6
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%
-5%
-10%
-11.11111%
-12.5%
-14.28571%
-16.66667%
-20%
-25%
-30%
-33.33333%
-40%
-50%
-60%
-66.66667%
-70%
-75%
-80%
-83.33333%
-90%
-100%
Feedback
Choice 7
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%
-5%
-10%
-11.11111%
-12.5%
-14.28571%
-16.66667%
-20%
-25%
-30%
-33.33333%
-40%
-50%
-60%
-66.66667%
-70%
-75%
-80%
-83.33333%
-90%
-100%
Feedback
Combined feedback
For any correct response
For any partially correct response
Options
Show the number of correct responses once the question has finished
For any incorrect response
Settings for multiple tries
Penalty for each incorrect try
100%
50%
33.33333%
25%
20%
10%
0%
Hint 1
Hint text
Options
Clear incorrect responses
Show the number of correct responses
Hint 2
Hint text
Options
Clear incorrect responses
Show the number of correct responses
Created / last saved
Created
by
Admin User
on
Wednesday, 15 February 2017, 3:41 PM
Last saved
by
Admin User
on
Wednesday, 15 February 2017, 3:41 PM
There are required fields in this form marked
.