Representación de fracciones Representacion de fracciones 01 Que fracción representa:

 

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1.0000000 0.3333333 0 0 14]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>4</mn></mfrac></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Representacion de fracciones 02 Que fracción representa:

 

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GsknnRBF2hE3cL/D2r6w8hP7i/lQA6iiigAooooAKKKKACiiigAooooAKKKKACiiigAps0YmiZGG5WG0j1BoooAia3JmzsjxnJPHOOnb+tTbfr+dFFAH/9k= 1.0000000 0.3333333 0 0 12]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>2</mn></mfrac></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Representacion de fracciones 03 Que fracción representa:

 

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 1.0000000 0.3333333 0 0 12]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>2</mn></mfrac></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Representacion de fracciones 04 Que fracción representa:

 

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1.0000000 0.3333333 0 0 12]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>2</mn></mfrac></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Representacion de fracciones 05 Que fracción representa:

 

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 1.0000000 0.3333333 0 0 12]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>2</mn></mfrac></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Representacion de fracciones 06 Que fracción representa:

 

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 1.0000000 0.3333333 0 0 13]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>3</mn></mfrac></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Representacion de fracciones 07 Que fracción representa:

 

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 1.0000000 0.3333333 0 0 34]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>3</mn><mn>4</mn></mfrac></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Representacion de fracciones 08 Que fracción representa:

 

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 1.0000000 0.3333333 0 0 15]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>5</mn></mfrac></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Representacion de fracciones 09 Que fracción representa:

 

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 1.0000000 0.3333333 0 0 16]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>6</mn></mfrac></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Representacion de fracciones 10 Que fracción representa:

 

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 1.0000000 0.3333333 0 0 712]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>7</mn><mn>12</mn></mfrac></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Representacion de fracciones 11 Que fracción representa:

 

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GsknnRBF2hE3cL/D2r6w8hP7i/lQA6iiigAooooAKKKKACiiigAooooAKKKKACiiigAps0YmiZGG5WG0j1BoooAia3JmzsjxnJPHOOnb+tTbfr+dFFAH/9k= 1.0000000 0.3333333 0 0 25]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>2</mn><mn>5</mn></mfrac></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Representacion de fracciones 12 Que fracción representa:

 

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Yhmc4XJUfY+aTvS4r8xo0Y0qapx2R3N3dwxRikIxSitAAV+VP/BCH/lY5/a2/wCvfxN/6fNLr9Vsc1+VP/BCH/lY4/a2/wCvbxN/6fNLr4fj7/kWM6MN8Z+6OT6UUZ9xRX8/nqH5Uf8AB4n/AMomtL/7H/S//SW+r+dnw1/yLmn/APXtH/6CK/ol/wCDxL/lE1pf/Y/6Z/6S31fzteGv+Rc0/wD69o//AEEV/pJ+z7/33M/+vcf/AEs+P4q+GHqXqKKK/wBPD4sKKKqaJ4b8S/GT4j6J4K8D2cuqeINeu4rKOOFd3ltLKsKF26RrvdQXbAXIJIr4vj7jzK+EMoqZzmrfJGyUY2c5ttJKKbV3d666K7OjC4WeIqKnA+ov+CUX/BI7xF/wVA+JUl94xtfE/hP4T2NnJdw6xaWqL/aUpLxRxxSS4z86OSVR8BCDjIav1D/4LBf8E3PEepa54X/aS+Dt9rc/xc+Cek2Nno2jLaQXtrqFnaS3MrBo32s0hFy2SpJKrhV3EMPtX9lb9l7wj+xz8C/Dvw98E2c1vofhu0FrFLcuJbq6+ZnaSaQAbnZ3djgBQXIVVXCj0G4gS7gkiljSSKRSjo67lcHggjuDX+SOd47HZ3iquZZzVdXEVXeUm+q2UeijHaKSSS6H31KEaUVCmrJHyX/wSD/4KI337e/wL1S38XabD4f+K3w7uk0bxjo4WSOSCfDBLgxsiiMTGKUiNS4Uow3HFfWxXFfk5+3l+zf8Qf8Agl3+3XaftI/B/UNQ0n4O+LNXsNT+LWlx3qzQn/TBbzyfZWVcxGG8kkU728qTzX/dKqV+pPw8+Jfh/wCLfhO317wvrOm69o10zrDe2M6zQyFGKsAy8cMCD9K8zB1pu9Gr8UfxXR/5+ZpLujaxilxSjpSV2kiba/Kv/ghCP+Ojj9rb/r28Tf8Ap80uv1WFflT/AMEIuf8Ag45/a2/69vE3/p80uvh+Pv8AkWM6MN8Z+5+P85opdp9qK/n89Q/Kj/g8T/5RN6X/ANj/AKZ/6TX1fzteGv8AkXNP/wCvaP8A9BFf0S/8HiX/ACia0v8A7KBpn/pNfV/O14a/5FzT/wDr2j/9BFf6Sfs+/wDfcz/69x/9LPj+Kvhh6l6iiob++j02zkuJm2xwqWYgZ4Ff6bYjEUsPSlXryUYRTbbdkkldtt7JLVs+MjFt2Rk+PtfuNA0iNrXb51xKIhuGcZB5HvkDrX78f8ETf+CMvg/9lL4T6d8QfGWk6T4o+Iviq1stTt7+ec3qaTA8MFwscStGixyCfcxYBj8qYcjNfFf/AAbGfsb2f7R/xv8AHfxU8aeG/D/iXwX4d01NC0m11rT7a/RNUea3uTcRJJuMUkMcOA+wEi5O1xtYH97AK/yt8YvEV8acRTxuHnL6nS92jCT93TSVRR2XO1dbuyWp9zl2D+rUeV/E9/8AL5DRkGlzzSijPNfl53HI/Hj4IeHf2kPg/wCJPA/izT49S0DxRp82m3kJ4by5F2lkbqjqcMrDlWVSOQK/Hz9jP9p/4kf8Eev+CmGh/sq+PPF1n4g+Fvia8t5La7vBPql3p013aSGJIJVSNlEt88SuHiZVHzDbl3P7Y96+e/8Agov/AME/vB/7fP7PfiXw9qmh+Hf+EuuNLe20HxJc6ZHPqGhzq6zRtDNlJUXzEXcqyKrAkNlSQeHGYeU7VaWk4/iuz9Sovoz6DzijvXwt/wAEQv2/v+GlfhHqnwv8VXes/wDC1Pg2lroXiGHUESRnMEMds8guIt0cubmG4BYsXP3iSCDX3VXTQrRqwVSOzJegma/Kr/ghB/ysc/tbf9e3ib/0+aXX6rCvyp/4IQ8/8HHP7W3/AF7eJv8A0+aXXxvH3/IsZ0Yb4z90MtRTqK/n49Q/Kb/g8S/5RNaX/wBj/pn/AKS31fzteGv+Rc0//r2j/wDQRX9E3/B4n/yib0v/ALH/AEz/ANJr6v52fDX/ACLmn/8AXtH/AOgiv9JP2ff++5n/ANe4/wDpZ8fxV8MPUvV6d/wT6/Yo8Rft+/to+F/Ddrompal4F0jVLVfFN6lpcy2FlbsJJmE8kIxGZFhdEDum5xgEckeT2Gi6l8U/H2j+BPDtvJd+IfFN5BptoiBm2PM4UFggZ8DOThSQuTg1/S5/wRv/AGPb79h7/gnt4G8E61HpX/CTSrcavrM9jC0YuLi6neZPMLokjSRwNDCS4yPJA+6qgfqn0ofFShjl/qTlc7qMlKvOLdk4uS9g1bVt8spNN2tytas4skwLj/tM/l/mfRXgXwHo/wAM/Ctroeg2MOm6TY7/ACLaInZHvdnbGSTyzMfxrXFLRnFfx+tNEfQiA80dWoIzRigA70E5FGKAKAPyK/4OH/2MPGHw117wj+0J8DLLXtJ8U6HJdHxNe+Ho7x7pII2bUBdTeVujECyJIzmQKgJTORwv6LfsSftqeDv27fgLoXjjwneWqtqllHc3ukfboLi80aRmdDFOsTHad0cgUsFLBc4ByB6+V4/zzX5A+J/gzYf8EAP+CiniL483y2198FfjMb7w7a6Po+22n8P3Mghv498bLFa7N9rcxxqHDKj8bjury6kXhqzrR+CVuby8/wDMrdWP1+/Gvyq/4IQ/8rHP7W3/AF7eJv8A0+aXX6jeF/E9h418NafrGlXlrqGl6tbR3lpdW8qyw3EMih0kR1JVlZSCCCQQcg1+XP8AwQhOP+Djj9rb/r28Tf8Ap80uvm+Pv+RYzbDfGfuliijFFfz+eoflN/weJf8AKJrS/wDsf9M/9Jb6v50LLWrfQvCFhNcSLGv2eIDPc7RX9F3/AAeJf8omtL/7H/TP/Sa+r8Ef+Cc/wq+Ev7Ufxzi8P/HXx43w4+Hul6XJMdQttQtrK4luFVUiRXnjkByckhYycdx1r+wPoz+KlLgfL8zxUFzYmtCMKKabjz8125u6tGK13u3ZLrb5/OMC8TOEX8Kep+vn/BvB/wAEnJPgH4I0P4+eMx5fjLxppd6YNC1HQkhudAjmuUEUqTs7Pukgg3fcQhLxlPQ7v1PI5r5oj/4LGfssxRqq/HT4dhVGB/xMxTv+HyH7LX/Rdfh3/wCDNf8ACvOjiqV3OdRSlJuUm2ruT1bfm3qa8r2SPpUjNJ196+aj/wAFj/2Wj/zXX4d/+DNf8KUf8FkP2Wh/zXX4d/8AgzH+FV9ao/zr70HKz6VAoxivmkf8Fj/2W8/8l1+Hf/gzX/Cj/h8h+y3n/kunw7/8Ga/4UfWqP86+9Bys+liOaSvmk/8ABY/9lsn/AJLr8O//AAZr/hS/8Pj/ANloD/kuvw7/APBmv+FH1qj/ADr70HKz6X615D+3L+yBon7c37N2sfDrXJLO1t9UmtrmC9n06O+axlhnSTeiOQNzIrx7gQQsrdQSDwx/4LIfst/9F0+Hf/gzX/Cj/h8f+y1/0XX4d/8AgzH+FTPEYecXGUlZ+aHZnxt/wSY/bcu/2Df2gI/2HvihY22mHwrq+pWHhDxNeLNZSeJIJrsy2REB8yMfaDLKyFZgB8seC4Ja1/wQh/5WOf2tv+vbxN/6fNLqf/gqx+1r+y58ePhzb/Evwr8a/C2ofFj4Q3Np4u8IWFpq0TW+qahpzyz29vNE65kjdpGyqMjsQoDDo3kX/Bpz8aNX/aN/4K3fGbx74gSyj1zxf4Q1fVr9bSMxwCabVdId9ilmKruJwCTivz7jCoo5dLD8ykltbttZ+h0UPjuf0UUUUV+InpHlH7Yn7Efww/b8+E0XgX4t+GP+Es8Kw6hFqiWX9o3dhi5iV0R/MtpYpOFkcY3bTnkHAx8uf8QwX7DP/RD/APy8vEH/AMnV98IcilAropYyvTjy05tLsm0Typ7nwN/xDBfsM5/5If8A+Xl4g/8Ak6j/AIhgf2Gf+iH/APl5eIP/AJOr76NID8xrT+0sX/z9l/4E/wDMOWPY+B/+IYH9hn/oh/8A5eXiD/5OpD/wbA/sM/8ARD//AC8vEH/ydX31SKf50f2li/8An7L/AMCf+Ycsex8D/wDEMD+wz/0Q/wD8vLxB/wDJ1J/xDA/sM4/5If8A+Xl4g/8Ak6vvodKDR/aWL/5+y/8AAn/mHLHsfAv/ABDA/sM/9EP/APLy8Qf/ACdQP+DYH9hn/oh//l5eIP8A5Or76oo/tLF/8/Zf+BP/ADDlj2PgX/iGC/YZ/wCiH/8Al5eIP/k6gf8ABsD+wz/0Q/8A8vLxB/8AJ1ffWKKP7Sxf/P2X/gT/AMw5Y9j4F/4hgf2Gf+iH/wDl5eIP/k6vZP2L/wDgkB+zr/wT0+IN/wCKvg/8O/8AhENe1TT5NKubr+3tT1DzLaSSGV49l1cyoMvbxHcAGGzAOCQfpVT8tKelTLHYmcXGdSTXZthyrsFFFFcpR//Z 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 1.0000000 0.3333333 0 0 14]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>4</mn></mfrac></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Representacion de fracciones 13 Que fracción representa:

 

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1.0000000 0.3333333 0 0 23]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>2</mn><mn>3</mn></mfrac></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Representacion de fracciones 14 Que fracción representa:

 

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 /9j/4AAQSkZJRgABAQEAYABgAAD/2wBDAAIBAQIBAQICAgICAgICAwUDAwMDAwYEBAMFBwYHBwcGBwcICQsJCAgKCAcHCg0KCgsMDAwMBwkODw0MDgsMDAz/2wBDAQICAgMDAwYDAwYMCAcIDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAwMDAz/wAARCADlAPIDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9/KKKKACiiigAooooAKKKKACiiigAopsjspG0Z9eKRpVP8YX8RQA+iqtxL5E0eVmm3ZwUUEL9frUk0zA/LJEo77jQBKzbaTzKhlYyN8qjB+9u/SmvErx4mZWGeBnFBXKWPMo8yqkEzF2heNlVc7WAO3b0HPrUscqyblVkYKMYU5IoDlLCnIoqtayeZu/1kKqxXDADdjuPaphKuOGDH60Ej6KbGzMPmGOadQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABTfNXft3Lu9M81DfxNLs/eeTHzvYNtYemDUOyYtG1r9nkXndJLks3pgj8RQBezQrBhwc/Ss661RdOuJGkby4I8b2lOA2emw9Dg9a+ffjb/wUi8D/D29XTfC8l18SPES5xp/g1rfWJIeEb99FHMHXMbMy8ciNz0U0AfR0s6qm7zI1RerFuBXHeM/j/4F+H0TSat4q8O2e3qJ9St4yOn95x/eH518j2niL9qb9qqVrV9P8N/D3RIf9a/kavpN8+eRtOXU4eLnP8Mnq3HWeBP+CRfhewm+3+JPH/xM8aXjf6y21jXItRs/4lGFkt89Np5P3kU9hQB0XxB/4KsfDPw7b+XoMmpePbr+ODwk1rqk1v8AdI8xUuAV3AsR6hH9K4H/AIe1X3jGzNl4b+CvxmtdV/hOueD2SI87j/q7gt90N+JXtmvoP4c/sWfCn4WXs11ongnwnbXT7fOeDR7NHfAYLuKRAnAZsZ9a76y8AaDDeLdRaPp0Ei9CLSNT0x6UAfEsf7Tv7X803mL8PfBa2b/6tDoWteeuODvG/HXpjtXjXw9/4LGftHfE7x1rXh+0+G/hEz6BcT21y48P6ptglhkWN1ci5JUgsMggEd8V+qp3LOPu7T02/wBa/KT9ia8kX9pb48df+Rs8Qf8ApVDQe1keBjja/sZOx11j/wAFOP2otN1VpNW+Gvg+TR4Jtki2fh7VjdvGDyy7p9pBUHBPG7Hau/s/+C2+i6Da29rrPwo+Lras21LqTTfDEf2aNsYc5e6DBQwJyegxnmujNxJJGpKxOrR7MOM5rLPhDR7eWWa60XTrhrjOSbRGzu57j60z7x8DUEr87PSvhr/wVc+D/jaxt/7Q8RWfhO+mZU/s/wARX9lYXgJC8+U1wTjcxX/eVh2r2/wl8ZvCHjixhutJ8R6Fex3AUxtb6hDIHyARjaxzncOnqK+GPEH7Jfw38dX811feE/DaX0isyTHTLUXSZJIKMYyRhmJHvXnt1+wzc6X4gk1Dwr8UviZ4durNjLZ6b/wkhs9LLK25FMUcWdmQq4B+4uB0FI8XGcHSg3yO5+qMNwrxq29CrcqwPDA9Ke0iqOSPzr8z/B/7a/7RX7N0q6L4m8O6P4u0m1uBLHqlrYanfs9muECGaSVFNyVjZ8Y2/OD0Jx9U/s2/8FCPh78cY47O61hfDniRyEl0rXLu2s7h5T5YYQwmZnKGRyi55yrDqKZ8pi8rxNF25bn0MJ1P8Q/OlEysOGDdjg9KzbK8W8c+WySIw3xyIcxkdgT69+O1SwpNErCfyUVmJUxZBx2znvTZ5UefmtNWLomU96cGyKrQx5Htn8/ep8bVxSsaysth2c0U1OBTqQkFFFFABRRRQAUUUUAFFFFACFwrKvdulIJVKg54NV9XgS+tvsrSeW1x907c9CCaq/23DD5zTSeTJZ7ftA2ltm77vQc59qAJ7u7jlmkVW8xrXHmxEcHd056e9fPn7Xf/AAUP8M/ssTW2mWNj/wAJH4mu93k6UJpbJTt8pm/emF4x+7lL8/3cdTx5X40/bd8RfH/4ht8Pfghb7bG5x9i8R74vk2xC4k/0W8iUnLRzR/M3+0P4RXrv7G/7BXhn9ki8vLqxm/tfxJfbP7T1HZLb+dsEwi/dNK6LiOUr8vXGTyeADzz4a/s5fGb9ovWf+Eh+IHxC8SeG/D7fd8K2NwIt/wArRn/TLOeJxh445en8RTpuz7x8Nf2NPhd8HZmvPDfgHQNO1RvvXgi82+k+8BuuZC0rYV2UZY4U7RxxXpGjw29tYJHartt1zs5J7nPXnrmrVAFeOyxMWPC/wovyhfrjr+PSnxWqxAgYUHso2/yqWigCH7GomZgqru67Rjd9cU5o9x27W2+obFSUUAQn5ZAu3Cjoc5zX5QfsWSf8ZLfHn/sbPEH/AKVQ1+sM3+sT8a/Jv9iv/k5b49f9jZ4g/wDSqGg+o4P/AN9fyPpCN1ZE3Kx+UHhyKcrLOdsm5VX7uXJ+lRx/cT/cFOoP22S0RHLuebqF28K2Bu2/Xrj2ouHeUoAqNtxlioLH8TzUmM0U7j5oNWaC7b7bZrEy5jAw0U379G4wTtbIGenHT8a4vxJ+z54H8Q3bajJ4VtbbXusOqadcSabdW75LLIHgZGO1zvxnBIB6gEdpRSPPrYKnU+yeRj4p/Gf9i7UW1yDxbrPxQ8ExuZ5NJvporVtNjB3mP7RMZppPLhh2bgMt5pb7wOfrz9kL9ubwr+1v4T+1aefsesQri70w+dN9mkCRF181okVtrShcrwcZHHTyC3LG7UbNqqN6yZzvYHhMds9c1498Zf2UdM+IfxCt/Gnhe+/4R74gaCy3cS+S939t8mR5gMySCFN87L1U4291JFM+JzrhhTvOmtT9KrEsYmYyb8sSBjGz/Z/D1qe3uFlZlDZZc546V8Sfsm/8FNX1Dx3D8M/iNa/2H4j07bBFeeZ9q/tIpJFbD93BBsj8yTzG5c7duOhBr7Msr1tes/PC/uGG6Fc/65cZVs8Fcg9D0p9D83xGXVcPO1Q1EbNOqGyUrAAf++f7nt749amqTnCiiigAooooAKKKKAGvKEYL3bpTEvY5IRIrbkbvikvIRMm1gxVvSs+9v/7NSOS8Eau2d0o/1MPplj0zkD3NMmo2l7u5euLmJW+988ffB4zX5q/tef8ABRiH49a3F4b8O3nk/DuHP9p+J/KLbsrFJF/okkKzf69Gi+U/7R+Xinft/wDxT1P9snx/b/C/4ceIby68O+H939sajaX7yW2p+dHBcwbZYGkSXy5IZFO9BtIIGTkj06Lw5oXh3S7PSodJs7jS4d/2nSRaxsjZO5cw4C/eO/ke/Wg+yyfhn61R9pUvc+pPg18O/Cfhf4dW+m+E7X7P4bG7y4/Nmfzf3rseZGLjEhY8nn6YrsTYJNFHu+WFM5j69ffr15r82fCuteKf2B/HKaroD3mr/DO4z/aVspmuH0/bGVi8pEMcEe+4nYtuPzYyPmHP2r+zX+134N/ap0JtV8LXscsRxut55oGuF+aRRlY5HxnymPXp+OA8fMcnrYWq49EetJcb1ztx+NOEmar2EizwCTbJHu/gkGGX8KmBWg8iVk7EgOaKFOaKQgooooAjm/1ifjX5N/sV/wDJy3x6/wCxs8Qf+lUNfrJN/rE/Gvyb/Yr/AOTlvj1/2NniD/0qhoPqOD/99fyPo6P7if7gp1Nj+4n+4KdQft0tkFFFFAKwjZphRqkooLjKRXnDOPLk/wBIh/54fd2N/wA9N3U4HG2g7XtVhmg+27WzHNv8v7LxgDaPvbevPXNSyKLndH/q2hU3Ac8Bsfw5/pVDxL4x0vwP4OuvEWu3UOnixV1t4pJUhN2yIZFChyN5bawABGcfjVXObFV6VOLdQzfiv8HdN+Pvhk6LqVr9q1Wxh+16beeYyfY3RGSJ/LVlV9jSFsMcHODxVH9iL9vuT4XePbj4M+NtQ+0XGnztp2lav5AXy9kkNnDb+RDCQcFXfe8hz0J6GuJ8FfDP4m/t8a+ZrFbzwt8M5bn7DeRyC7sZdQjLAvNGFWSCRXt5wA7cMV5G0c/Y1l+xh4T079nC6+H2m2dqtnHYPbNcrDCLlroWv2cyllixvxg7tu7PPtUn5JxNmFKs3Gmke0aLqwk0q3lmbIuCqxS4/wCPjIBD4H3d3XB6VoecvneXn5sbse1fGf7GHxM1z9mPxfqHwm+JGoCFbjVZD4PvtRnkWOe2Lw2ljZrJcMm6U+XIwihTaRkp3A+vrcL/AGdcf6P5TNu80Km3zXxyy+uexPWg+JV7amhRUVioWzi2qVGwcEYI471LQMKKM0UagFFFFAEV1OINpYhU7sTgCvkD/gqd+2BN8Afh7Y+GfD323VvE3i3zPIg0/M91D9mktZWwsciuuY5GPAbIB6AZr6k+JXivTfBXhibUtavbbTdHt9v2m5nmWFYtzqqfO5CjLEDk85wOa/Mn9m651D9rD4gat8YvFUcslvceT/wi9heqzJbbY5LO7/dybwu4xK37qTngt2AD28gyx4vE8vQ9B/Zn/Z0sP2Yvh/Bocd1JqWpru+1arJIs17P+8kdN02xGbCybBkcKMDjr2/mvb27SRrG19JjdNIMk46fN1+7xUj3X9oX810AyLPtwh42YGOnbNDJuqtj9xwODp4amoMrvp8Wq20emNHHfWrZzb36iW1ucHd/pC9G2kZTjhgDXjvjT4V6z8F/FH/Ce/B2S40OPS/8Aj+8PW5e20658xBBHstrVV3bd80h3MMM24dSK9naOSONjCu6YY2gDk+vTnpUtrcqYt9qsPl/8vFvIPvf3cqOuOTzQzlzXLqdeDSWrPbv2P/2vfD/7VPgsX1rOtlrQ/wCPvTJ3jjuLb95KqZiEjsu5Ii3J5ByOOnrkV6sk0y7XVYcfvWGI3z/dPfHQ+9fmn43+Gev/AAW8Y2/j74PTXCakm77XohaQQX+UWBP9HtVVpNivM/LfKfmHcV9ofsr/ALXHh39qLwkmoaTNHFdR5+36TcNEt5Z5eVY8wrI5TcIi/wAx5XBHsJn4vnGRVcNNytoexabfLfw7gskbd45BtdOvUds9asVS0dY4xIsZklVcfvn+Yy9f4u+OntV2pPEjorBRRRQMjm/1ifjX5N/sV/8AJy3x6/7GzxB/6VQ1+sk3+sT8a/Jv9iv/AJOW+PX/AGNniD/0qhoPqOD/APfX8j6Oj+4n+4KdTY/uJ/uCnUH7dLZBQTiiigmmncAMqWZlRV/vHFJuzD5igsucZHOaRQLmfyWVtoHmKQP9Y3QJ7k+lc18WPi1p3wN0Fry8ZbrUrwG3sdHQq9xI7K5jYQFlY5ZCmV5JOBQc2Mx0aK1F+L3xe0H4J+E/7U8QSSeW3zRWdq0f2+4+R2G1HZdyNsZRg8tgVyvwK+BniP8A4KA+MbXXtet9Q0H4X6bIlxaWt1HLa3N3sdHQujpLA6NbzsDgjJUgfKOeu/ZC/Yw1D44+LJPiX8VFuNQt7oF9I8NXgaW1is2eK5gdrS5iYBwHliJR9oBKjua+3PD/AIZ0nwRo0Nrpem2+n2KxBI7C0t0hijXaAAI1AAwqhfYACg/LuIOJJVW6VNlP4ceArH4ceFLXSNJt7WzsdOjS3tkt0WNZY0RUR3CgAsVUZIABwMV0EduYlby47ePzMs21cbnPUn/OaLeImFTt2rjKrjG0dhipl+UVVj4GM5uV5Hzz/wAFAv2Z4/jf8NLPXLL7Ra+LPh5dp4s0i5tMJNc3VlFO8FqzhGkaJpXBMaFWJAIZTVn9hD9qaT9oz4NT/wBtRy6b4o8J3zaFqNpcKYZ7m4t4IPNkVHkeRkaSQgM2GJBBAPX3W+jW4Vo5FhaGRdoEgyHY8YPYgjtXwr+1xo2rfsS/tZeEfiJoazW3gHxNqNnYeILW1DpBFdT3ktxc3TogjhAEMKgySMWAADAryJNL31PvGzlaa3VmG0sAdv8Ad9j70932Vl+CfFFj4z8JabrWnTLcWOs20V/buHVgySorqQVJHQjoSPc1pEb6AAyKf71FHkUUAEszJEWVdzDoucZqOW7ZRII182SPGUzt6+9OS327jnrjHtVUFjaib/lr/PnFUVTV1qfBH/Ba34lzeNdX8D/CPT5vMs/Fn2/+3U2geT9nFnd2/LKC2Sp/1brj+LPSuqsNDh0CytbFIfIhh35+ctuyd3qSME+tfP8Aba6v7VP/AAUI+IXiG3/eQ+H/AOzdp6f67TfLPUIesXofw7/R2omTV75t3SPH6j/61SfrnCOBhSwsayXvO+pRtomiXbI3myD70uNvmenHbHSpC9O81XjVV/hzURGKD7nlU9ZBKztHuhk8mYfckxu2evB4ORxTvIik2yOm6f8AikyRu/Dp04ptPT7tBfs4rVEWqxPd6fP/AMtpl2/Z0+7s5G7nocj1rzf4/wDwe1XxDr2n/EDwC/2fx/pvmeecI3n71jt1/wBcwhXEIk6Kc/72DXqCBif3Z23H/LNuu3146dPWmRKGuf8ASJPJ1DtLt3Z49Bx93ig8XMMHTrrlqLQ6v9kj/gqP4T+P3jBvBd+P7K8cW/8ArNN/fT5yksw/erAsX+pjDcN3x1GK+qpruO3++23PTjrX56/Hv9n63+Onhgw6tD/ZN1Y/8e+pbzcbt7oW/dK6jogXn1z2rtP2Df26dU1LxOvwu+JjfY/HFn/x7T4ST7fuSe6f5beLyo9kPljl/mzxzkUH5VneQyo1ZTor3D7Utbv7QzKy7JI8b1znbnpzU1QWkXkWipndtzk496lVsmnY+Tbs7DJmxIv41+Tn7Ff/ACct8ev+xs8Qf+lUNfrJMP3i/jX5N/sV/wDJy3x6/wCxs8Qf+lUNB9PwepPHO3kfR8Y/dJ/uilJwKjV8RoP9kUUj90UdFcjlumE6xom4tjvjFW0t5EfMy+VDtyZM7sfgOenNVv8ARYGkluv3aiM7ZuW8o9c7R1xycd68M8fftP3HjT4jj4Z/Cy3/ALU8YahL9nvNS8wQfZoXla2f91cxiNtspib5XBOcDjJqtDys0zSlh4NRep0fxo+MV1qXiaDwB4Ti+3eJNQCzWsu4RfZGd3gSbEi7H2yFTsLDOeeMmvbP2K/+Cdl58Pdbh8cfEbWP+Ep8YTBZbd/sosf7OUtDOseIJjHJ5cqyfMV+bd6ACu4/Yk/Yv0L9nXw6by6j+1eN9aP9paxdbpE/0qVYTOuwStF/roycphecAAV9BBJbaGRs+cxJK9F2j0/Clsfj2bZ/iK8nFS0FW2ym3d8uMEYpI7R13K0u6M8BduMD0zUlv/qVOMMwyw96kpXPmeVX5iGC1W2BCLtBOTz3qR0306igp67kJUiTbnKsvIx+tcF+038Nofih8E/FGiyQ+YmoaPd2rfOVwrwSIf4h/e9RXfT4QPJ/EqGoPI3WLBju+0KRj/eFAbHyL/wSP+J4ufA3jP4f3jeXqXgfxNfaXZwYzmwtI7W3jfcF2/eyMMzP6k9a+wFuAjmPrME3hfUdOtfn23/GJP8AwVdjt1/d/wDCytPCeuDfaxjP8f8Azy/2P+A9/wBAIbaNbgTZ3TJH5JbkZxz9OtAEguEx83yt3HoaKa1lC7bmT5m5PJ60UARxzgRqzYAXO4scY9K8r/bU+Ldr8Ff2efEHiK7vI9OW3+z7ZGaPcc3MMZ4kIX+MDr39cV6tc+WIOVXaeuRwa+G/+C/Etxe/sFa3a2V1JBqV95H2a3WUrJNs1GxL4UfM2FyTjoOTUR1lY3wUebFRpnkX/BNfwZdeDP2atH1LUrF7XxBrHnf2kzb1M3lXVwsXyMAFwhH3VGc5Oete6pvR5G3/AH8dumKzfArW58Dad9mt1tYf3u2IRiPZ+8bsOBk5P41qZzWs1Zn75leFVLDxiiNYxDCq9xnJ9aRl3U+Sm1J6kZWG+XTqKKC4yuMuImnj8vdiNvvrj73pzTog1va/Z4222/dMZzznr160ucU0PQTKmmQRWFrp2Ut4fJE/+s+ctux06/0rj/2gf2fbL4/+F4bONl0/UtP3fY7sh5vI3vGZP3YYBsrHjnOM5Fdym1mUtRFcyWVz5kZ+X8fSmcuKwtOvB0XuXP2aP297zwFqWn+C/ixH5et3nmeX4mklhtLfUtokmPmQskSQ+WjRRDYX3nk7SefsG21WG4lKrn/ZbPD/AE9cd6+DPix8HvD/AMedAl0nWFuLG6uMfZtRsBHHfWe1kd/KlZWKbwgVsDlSQaz/AIOf8FEPEX7J1/Z+FPjFp99rNgd/2LxDpkEtxHFw8sn2u5upkAy0sMce1eSCp6Al+p+U59wu8O3Vgj9AtK1BtVt45mgmtw2cJMNsg6jle3Tjk8V+Uf7F3/Jy3x4/7G3xB/6VQ1+png3xfp/jXT49Q0u+s9UsZ8+VeWc6z2s2CVPlupIbDKVODwQRX5afsTjf+0v8eP8AsbPEH/pVDUnLwe1HGu/kfRMasTGNpO/CgjopPc+g96W8vrTTLe5mur6xsbSyiaW4urqYQ26BOWUSHjcACcHHAJyKzvHfjzS/hl4SuNW1i4jtrS1t2kt1V0SW8uVRnWBdxAcuFOEB3EivP/hZ+zP8Q/279Vi1jUpdQ8H/AA8kuQ/2Mtc6fcalASr7/LZJIZVkgnK5zhimPujkP0bOeIFhVoybQbLxZ+27qV54b8IrdaL4It9RfTtT1e4s/tEepoCI5RDtUqYZIZkdZhMrYBwoB3V9rfs2fsq+G/2ZPhxD4e0G1ESShZL+QSTMLycxRxyS4kdim7y1O1SAO3eui+DHwc0L4HeBLDw/4fsrO1tbCCOFnSGNJJ3SNIy8hRVDOQi5OBkiuqiVo3Ys2c9ADwKD8jzPNquKqylfRkUNq0Fusccm1I2wBt6IONv/ANfrSm02zh422f3hjO4VMjLz9efrTtmapWPFkm9xtvCsIbaMbmLH3NSUAYoqSgooooAjkg8xm5+8u3GKIoCkaqzbtpyOMYHpUlFAHxb/AMFfPAstl4Z8F+N9MtpJNZ0PxHYm4u1Dt9hsYku52kK8oQj4OXAHYsBxX0p+zr4vi+IXwF8G6pDeLeNJpNlJPMAn7xzbxsxwpKrndnA6Zrh/+Ck0Y/4Yv+Inl2RvbyXw9qUVsFh8xopTY3Gxx3BB7jkZ4rB/4JZyNH+xn4Paa6e6mh0yyguo/N3+RMLG23qwPKlTwQeRnmgD6Kaz8xi3y/Nz1oqVFZ1DKflYZHPaigCFwpPlllLfwhj97ua/OT/gs9qt1qvx9+DvhyaS+bT9U/tr7RAGP2WTy7azkXKng4YZ5Bwfzr9GpSDdhSv3uj9047fWvzZ/4LX+BNS+Lv7T3wM8P6Nq0+hX7f2//pkCkyD/AESzk7On8KEfe6N+BKMdLnZga1OniYzkeyXGhS6c3kxwxxxr0WJCEXvwMVGLC4X/AJZt/wB8muci/wCCWfxQlkb/AIv34mUDGGks55N3/k+MU/8A4dW/E/8A6L94g/8ABdcf/LCjXqfqEeMsNSSg2dAbC4b/AJZt/wB8mj+z7j/nm3/fJrn/APh1b8T/APov3iD/AMF1x/8ALCj/AIdW/E//AKL94g/8F1x/8sKA/wBd8KdB/Z9x/wA82/75NH9n3H/PNv8Avk1z/wDw6t+J/wD0X7xB/wCC64/+WFH/AA6t+J//AEX7xB/4Lrj/AOWFAf68YVHQf2dOf+Wbf98mm/2ZN/zzb/vk1g/8Orfif/0X7xB/4Lrj/wCWFH/Dq34n/wDRfvEH/guuP/lhQV/r1hjf/s2fZt8tv++TSDTbhY9uxvxBrB/4dW/E/wD6L94g/wDBdcf/ACwo/wCHVvxP/wCi/eIP/Bdcf/LCglcbYVS5jauNIumtJBHDN5nG2WNDvj55wccZ6e9VPF/w+0nx54ffSPEfh2DUIrjHzzWCTMNrB+DID/dXt2+lZl5/wSq+Kc1o8cfx/wDE6s2OYrOePHP/AF/8029/4JV/FJ1hj/4X54ukZd2XMM+R/wCT1BjiOMMHXjyzV0cd8CPjT42/4J3eNYdJ8Q2HirxJ8MdSztmWCe8k0bZG7naztFBD5txcKDwd4X+8OfFPgD8ZNL+F3xW+OOtx+ZrLXfiXXpYLXT9lxcTbpo3Xam4ZztwMHkkDvXqf7V37GGufALwFdXHi79oTxPr1nNs/4lt1p126y4kiHDfapFXBkRuVOdoHB5H5yfsKfs0/FzwD478UeNtc8UahqHhuz1e70+5+1SmVZHWSCZ52X7UzMxjVsjYScnknig+Xq1Iqp9Ywi5VI/Ub9lr4BeJv20PFmn+NvHWj6x4f8IaZLGbDQdWtJbWO+EbxTR3LW0ySRyb4pnjMisNwUqOASfv8A0LQ7Hw/4ch07S4ILKzs4VtoorZFjWJVUKoUKABgAAADjAr84vDHh/wCMniLwppuoaL8X3i0ibT4pLO1g069hW2hKBkj51AAlVKjIVQf7o6Ves/Bnx4udLkNv8XrxJFc5Bt7w54/7CIqisTlOOx9Pmbufo1ZR/wCj7csu04JPDMfU1YC4GNw/E1+cM3hL4+FIt3xcu0ZYwDtt7z5j6/8AIRqP/hEPj1/0WC+/78Xn/wAsak8+nwtjYqzR+kQAHdadv91r82/+EQ+PX/RYL7/vxef/ACxo/wCEQ+PX/RYL7/vxef8AyxoK/wBWMZ2P0k3+60b/AHWvzb/4RD49f9Fgvv8Avxef/LGj/hEPj1/0WC+/78Xn/wAsaA/1XxnY/STf7rRv91r82/8AhEPj1/0WC+/78Xn/AMsaP+EQ+PX/AEWC+/78Xn/yxoD/AFXxnY/SQu2f4aDJj+7X5uf8Il8e/wDosF9/34vf/ljSf8Ih8ev+iwX3/fi8/wDljQOPC+MfQ+9vjfpVv4h+Evii1vIYbi3l0i7UpIgcZMLjocjoTXyf/wAEeNcurnR/ihpfmajJZ6X461WzgjuCTBDFGtoqrGM4AA4AAAAzxXkfjfwD8eLzwdrbSfFrVpIYtNndxGLtAwCNlSDfnqP/ANVdx/wQRn1A/CD4mWmqXf2zUofiBqgmu2DeZMRBYhiSWY8tk/ePJ79aDixuU1cOvfPvzzY0+XzFXbxjd0ooEWP+XdG/2iRz70UzxrMjdX3sQ/8ArOnH3MfzzXwT/wAFKtQ8v9uz4BtcQ7dHsv8AhIft77s792n2/l8D5hhv7v48V96Qpug8kNgt3x0718Vf8FzU+yfsk3V9af8AIU0rZ9nf/nn5l7ZK3B+U5XPUH8DTo/DYjEU37RNH2zY2zW9ttkk82T+J9u3dzxxUnl1zfwZuZLz4eafJM2+VvM3NgDP71wOBXVUkzWpTvLUh8ujy6mop8xHskQ+XR5dTUUcweyRD5dHl1NRRzB7JEBWRZU2ruRs7jnp6Ukc/nSbVXcvc56U64R5JYwP9Xzv/AKVVt5VvI5IYW8uOPGDjOc896OZlKmtiW5uFRZN0m0LjJxnGa+dP26P25bX9mrQYdG0hvO8Yaru+wwYK/wCraB5PmaJ4/wDVSE/MR7ZPTg/2vv8AgqNZfC3xEPB/grTf7e8WXX/Hov2hrX7qxTPzNAY/9Uz9W/h45IFeWfAj4MXHw/1m48T61J/bXjnWNvnybRbfYvLV4l4RjE++FgOANuO5OaD6vI+H/rUry2/r+v61yvhX+zB4m1jxv/wl/wAWtV/tfxFF/qbL7NFb/wBl5jaFv3ltJsl8yMRNyvy4x1JNXv8AgkJ4Sh+KF98etJ1i332Go+LfENhjeR+4c2ibflIP3WPOQfevUFtV5hmuPtdyv+tutnl+dnkfIOFwOOOuM1xP/BEdLiTxX8Zluvmjj8ca3s6dnssdPxpbM9viLL1gMLFR0Oa+N3wp8Yf8E6PH11q3h3Rf+En+HuqTvPPa/a4LL7A0kjuz75Glmk2QW6jAA3bs/eBz3vw4+I+mfGTwtBrWjN9skulV7myw8f2B2RXdPMdV8zZvC5Aw2c19vXtrZarDdW7R+ZDNG8E6ZYfIeG5/HtzXwX+2D+yrrf7Lfj6f4lfD1dug30zXOt2uYzuV5Jbm4ffPI7/cijGEQeo5yCzDhviiEf3czuks5rfb5w2jbwnBx7ZFQm6NvPiSLcrdDurmfg98TfD/AMbfCUeo6Hc5uVYLfx+XJ+7utiNIuXVQcF1GVG09q6wCW4LWrfejHXjtxSP1LD1qdaCqaajCdp5/i+YD0FJvpEt2gLK7biCQOKXZSN+WmG+jfRso2UD5aYb6N9GyjZQHLTDzKQSc0vl03Z81PQuMYdin45sVvfhxrztL5MVrYXE8/wAu7fGsTbl9s+o5rH/4IeRSXPgD4pW7Q+XHN471a5s5t27EZjsgny/rzz61zf7Z11caX+yz4zuLeTy5H0m+hB2g5zaTHv8ASvoL/gk5p0Wk/sQeEHiHlzX1lZXFweTvkewtdx9BkjoMCkfl3G1SNOOh9L28iQW8ccjbnRQrNjG4jqaKj+1beM9KK05T8o+truSwLHBHv+ZmP3ievtXiX/BQn4LQ/Gb9mPxJpq6cNTuJvs3lRh5s8XduzYEZyeEz36fWvbVu1kjjkWPEL53bl6Y6frRc2vny+TJHFLbSfeVl3AY5HHTrWa02O5u+rPnf/gmN8ZL74sfsjaLfapqEN9rlv5/2xEWNGhze3KplExtyijGQM4zX0d8yXPLZVug9OK+E/wDgn9br+y3+2L8QvhLc363SX39nfY4Gn8wW+yxnu5NqnZt3eaCdqHOOfU/dSTYkkVv+WeOfrQA+3DCFd53N3NPpqHd82cqelOoAbIWHSgNkUM2KbKcGqREvd94ju5vssJkY4RepFJNLIjR+WyurZ3E/pjFMkDTuqlUaFs7w4zn09utYfj/4i6T8OPDE+uavfW9hpdnt3SSTJEg3OqDJZgv3mGOe/rRy6l0Yut7sTQ8S63b6Dpc015eWdnCu3Ml5KIoV5A+9x3IHXqRXwr+0Z+3H4o/aZ8fSeAvhWot9Djx/amrXNksyPmOOeHyJkMqcPHKj7k64A55HHfFj4w+Pv+CiGrSWej6pqngnwHZY239rc3GmyapuCE7JFaWGXy5rcqf7ocj7x47/AOGPw40f4M+Go9GsLaFbpc41KGNPMmyzP+8lVVLYDlV44HFI+5yXhmbanUVyv8LfgpoHwKW+Xw99oaTVPL+13d1P5l1deXu2eYoxGu3ewHlouRjdk810ki+bGytyrdR61GrOSzTbftDf6zyv9V7be/TrnvShsUj9UwOBp0ILlikS6fbIpjt9v7rn5c/jXA/8EPv9J8W/Gbf82zx3rYX2Aeyr0Gx/4/Y/x/lXn3/BDj/kbvjR/wBj5rn/AKHZUHxfHGtLU/Qww7d2373OKhu9Jh1XT7iCZcrcRNFIMkbgwwf51aHDn60rjcNy9apn5FT93WJ8QftYfsRap8FL6++InwphYXhnkvtY0mQy3qXa5luJ5ok8tpPtDFIkVfMWLttBO6ub+Cvxns/jDo7KytYeJLQGG+tZwsVxBKqp5m+LcxRBI+DkAgjHHSvvq/h+22ckMkaSeYpQoy5VgRjDDuD3r4x/bI/Yk1jw7qdz8RPhbbtaazblrjU9KtI3jXVEUzXEojht4g0ssjiJAGbDYAPODSPsshzypQklUk7ebITcrG8m1JlaOQxymQYWSQdWT1Q9jUkbTBdzIhjbpweK82+DH7Rs3xBuB4d8ZaK/hPxXbt5aWNzZmwnliXZGJGjlcyFjIzqWxglSOoIr0mdJLa5+zM/yYypyeRnFPc/W8DmFLF0/dHIGA+Zg27kY7CnU2MbPlDbvfOcU6pO2MFFWCiiigqyBhkR7e0gL+696argyXEh/1aBgi+45FCyiCfLfdZdv41JFYtPq0UK/6t0Eze4JxQZyqRimeAft965f3/hzwX4PsvLkHi7XrGyu7bbuklt7lZ4XHHzKDwNy8g9Dmv0N/Ze+F1n8LP2fPBmi2tr9jhsdFsUeHzHbbKltEhOX+booGD6dK/Pn4a+HX/ax/wCCnOn2cdwG0f4bWkd1LAZPk8+x1VQSVw652y452nH90df1Et4FtYVVNohijCqq9AB7dOlB+K8WYn2tfkuBtlb+Jv0oqVRvUMNuG5FFXc+P9jHsLHEvl7dq7fTHFEb4kYMfTGTSSMUjZh2oDJdwbv4ag2Phz/go7oP/AAof9ov4b/Eiwt5NPsZP7T/4STWrSPyrkYtbe2tfNuFCjq5RfNfoSq+lfa1pqUd1afatwl94CGjl5xx64/Q1i/GL4Xad8ZfhtqHhnUovN03VPL875mX/AFcqSr91lb7yDoR/SvlH/glV8TLjwt4Zuvg74mX7T4w+GezyZMhPtf297q8biNTGm2IqOZHzj+E5FAH2pp6yRW6xybfMXrt+7U1NiPVf7vf1pdwoAgvJds0cWJN02cMo4XHPJpLrEwZNzqy4ztPzH6UzV5lWICVd1u332z93pjjr1rxX9tb9rbR/2WPh8l/dyed4jmz/AGba7XXz8SQrL84jdFxHKD8w56DnoyqVN1p+yijpf2g/2k/DP7O/w9uta8SX/wBmj+X7NYwzxJqV1+8jR/Kjkdd+3zFZsHhTn0r4Y8WfFXx5/wAFDp7OTUINQ8B/DuHf/ocyXGl3V/nA/eozSwybJ7cFf7ofP3jw34PfB3Wvif4wf4sfEiHzfHeoY+yRbo1/s/Yj2r/NAwik3wrGeUG3tzk17LNefabhhI39rSz486fHkeVj7vy989OOmPemfpXD3DCp2qTKmn6LpvhSzGlaPZRafpdn/qIIoViiXcdzbVUBfvEk4HU+tSMdw5pbdHtIFtVbzLW3z5MuNvmZ5bjqMHjmngYqT9IowhTgkiPGaULmn0UGntUyWx/4/Y/x/lXn3/BDj/kbvjR/2Pmuf+h2Veg2P/H7H+P8q8+/4Icf8jd8aP8AsfNc/wDQ7Kg/P+NnekfogOWP1qQDFRr98/WpKpn5LEY4+b8KCoA5pznA/Gk31JR81/tv/sPaX8cNMm8RaDv0HxvpMJu7K80zZaz3ksYmkjhnkSJpXgaZ1Z1UgkqCCCM183/BX443Gq31x4I8dW8eg+N/DrNaRPcRm1j1iOEpAGjMzebNJLMXwQoDhTwCCK/Rm/vDBMoKfK4Cq2fvseiY7Z9a8S/bL/Y/0P8Aah8BS2txH5HiCzQ3Vhd7pG+xyLHMI22CREfa8ucNweh46B9JkufTwb1PIWK2qbpI2iY9VZdvP0qKKV4X8xl3Rv0JGcZryj4U/FbxB8MPHH/CpvH6btZ0s+VpFxmMfbdOjkW0gm2wqVTe6yHY7lx0PGDXrk8MkV95Lf6phkfnig/ZMvxyxNCNbuA2nlW3BuevSijYkbMqdAefrRQegR3En2BobgKLgyyrbvEw3rGh5MmOxHTd0rL+JviqP4ffDzxFrElz5NrFplyYLgybXScRM6xI2QBgLkKDnvWxBC0123k/6xYy0v8A1xz83X+nNfO/7QDXn7TP7SXgX4T6U23SLDVbDxDqgwp3Il1JazD5tjfdkH3HJ9FzyA+fzXEezpydz3D/AIIx/Ci4uPCnjHx7qVgsOpeIPEl7Lb30sBW5urGZLOdVMjLuaNmy2AxUnnnrX3QhzKyhRt29McVh/DfwbD8Pfh3o2iWny2+k2MFnGOfuxxKg6knoo6k/U1vRcRH6VR+G47EOriGxvmBePlGOKKqvZF3Y+pzRWPvFcse5pUUUVoc5BeJ5hVVby5DnY2M49a+PP+Ck/wCzvrmr6p4f+JHgb9x4j8I/aPtv+rb7T9pFvbx/659i7Yw/3UbPfBwa+vtZtRqNq1uy5jk+8R2wQRx1qrr2mNrenSQfMm7G5cZ3cgjn8O1BdP3XzHA/suftG6H+1l8HNO8baC/lwan5mExI3k+XPLD1dEJyYm/hGP1PcTOulCO3s/mkjzi26eZnn7x6YyT+lfEfxA0O8/4JafGWTxN4f0uV/hf4mx/artJ5dto/kQLHD5s8nnOPNuLltuSnPy/MMY3PjP8A8FQbv4kNDp/wH0V/iBZ3GfM8S6bcf6FZbdjDBlgMUm8rPFw/ytGe+BVXFhcHLGVuSJ1f7a/7azfAzXofA3hm4+3eJtb3eVFs8r+yvKWGdvmkiaOXzI3Y8sNuO5wK+cvgd+xpdeCfFbeKfF0/n+Kp8bX2BcYR4ukUhj/1bJ2/XJre+A/wKh+Etveatrsy6z4u1vZ/a+q4+ziTyt6QfukdohiJ1T5AM4yck16LKzPdLJJN5kJ6OU29vT60vM/Xcn4TWGgpPckuJEnu5HP/AB+Njz29ePl9unpTVGBTpD++YY+XjBz1/DtSUj7Oi1y8iCikVt1LQaqNtAooooGS2P8Ax+x/j/KvPv8Aghx/yN3xo/7HzXP/AEOyr0Gx/wCP2P8AH+Veff8ABDj/AJG740f9j5rn/odlQfn/ABt/CP0QX75+tSVGv3z9akqmfksQBz+dFIvf60tSUFFFFAHiX7ZX7IeiftQ+DpY7pfs+tWMRmsL3Mj/Z5ESbyz5YkRW2vKWw2Qeh46fD3h34v+OP2d/iBF8O/iNpv2PSYZxZ6Lr32i3k/tFBILe3T7PArNHvWOSTLtlcbSc4Nfp1rdtJcTpj5lUhgMf6tufnz3x6Vx/x4+CGl/tEfC2+8L68n2jT7qGQF9zJhmheLojofuyN/F/jVM9jJ+Iq2Hqey+yj5lhvFu4reexg8t5ioebfnzIzyW2t0zwcdakuzKNwjbbIoJDYHzH+ma8rvNA8YfsJ+Jh4f8SW19efDO7uvsWmaoLQLa6bbs/lxRu8YkbEdvAzF5XBwcsQcE9f4j+K/h/QPh5qHiaTVdPuNJsbeSfT2iuBJ9qkSIyxRrtyxZlHAwT7E8VJ+uZfnmGq07zkvvMn9pL4u2PwN+HtqLf/AJGTx3OnhjT4fm/4/ruOTypdxVk/1iY2ttX1YCvZ/wDgl/8Aso6h+zz8KdS1LxB+/wDFHjHVZdcnm+VfKjuYbZmj2pI0ZxJGxyApPoBXk/7DX7NeqftSfEuP4xeP9H1CxtNNlCeGLa6heAyQpLDeWl2pQxsyESyAB4yDg5J6D74gsWt7JoWbz1kOMY27EIxj3x+dNH5vxJmkZ15U6b0JbOKOFJFjXbukJfnq3c1ORhKhtFKReX5flrH8ijOcgdDUzUz5GLu7jaKKKo2JKKKKzMxrLzTc7TSy7sikmGTVBHV2OQ+O3wZ0P4//AA2vvCviW3hudB1Py/tSPHG7fu5UlTAkVk+/GvUHpxzg1+dmu/s/6x/wSx1VbDw7p91qvwpvc+bcRQPPc2O0Bly0aQ26b7m5Ycj5gP7w5/Tm88x1WONFZ26eYCY/+Bf096zPHXgHR/iTos2ja1pVrqGmzbfMhubZJonwyuPlcFThlB5HUCkd2AxTwtZVEfH+g6lp/jXRoLjw7eWmsaHcbvLnMq3Fw21iDvaPKffVgMdh6g1JCVWOST5plhx+6PzEZ/2f1rzX41fsR/Er9kzxvfeJ/A2q3upeB/3fl6Hb3N1M1v8Au0iO23hiSJd00ryHB5xu65B2PhR+0b4X+M1nu0m8sIdYH+v01pYluV5bbmJXZvuoW57c9Kd2fr2T8R069NQbOytn+1wreHK/af8AlmeNm3jp2z1qSia0e3XLK0a/3CMbPw7Zpu7YvzfL7mpPqIJcvNHUcF20UoUsMgEj6Uijf935vpQVGV1dhRRnmigd0S2P/H7H+P8AKvPv+CHH/I3fGj/sfNc/9Dsq9Bsf+P2P8f5V5/8A8ENxnxd8af8AsfNc/wDQ7Kg+A42/hH6Hr98/WpKjX7x+tSbuapn5LERe/wBaWmhgDjI596dnFSUFFG7nHf0oDbun0oAp3jeRdLIRI6sBFsHIznOcUebGk3l4/wBYMlPY+oqaaLL7uuBwO2a8T/aX/bO8J/AyE6XHqWm6j4yvl8i00u2uIZrwyP5ipmHzVl2+amzgE7iAOaA5oo3f2ptX8E6N8HtXHxAj0m40mSKaOC2nWB3djBLt8pZ/lMxUSBcfTpmvz1/Y+/Y28ZfGP9qq517W47yH4K2961zoWizCdYbqNbyJ7cywPG1qyNaOyN5ZwR8q/JXv/wALf2WPiJ+1R8Q4/F3xQ1O6h8FpKLzTtAa4uVczCVZYvNtriN4vJ8qWWNtrZ/hBxkn7C0HwhZ+DtAtNP0uztbS3s4kiSOKJY1jRVCgKFAAIAAHGOKDSNWptF2LnhnQrLw3o8On6baxWVjYqsEFvFGscVuiKFVEVQAqKoAAAwAMVobKhtQywjP8A9c/X3qTNUZyjd+8OC0rDNMFSDpUgN2UUHOe9FFwuOooooAKMZoooAMUUUUAUNd06HUoVimjS4DZ/cSKGjl6H5geDjGR718hftSf8Et9O8Tas2vfCma18CeKpcZW0ddLtHwIk5+zQFziMS/xfec9iRX2NeRGYqvWPncPX0qGa0N0JUmPmQvjCdMY9xz1pmlDFSpTuj809f+OWv/suQy6b8YtLvLO90rHl6rYyR3mnT+Zhj5485rh8CWFE2x8MTn5RurvPA3xO8O/GPSU1HwzqhvluM4M8MsUBwWX5FZAw+42cgZI44r7mv/Dsev2zLeR/K2MR7vuc+oIznAr41/aB/wCCOuh6prc3iP4W6l/wgviKTb5sn2eTVPtOFjjHFxc7F2xiUcDnf6gGn6H3eV8YOgkplqXTZrDMcouYGT74aRTnPI+6TTLeZc4hLN9a8E1TWPj5+yqyx+PvCu7RJP8AUan/AGnpw87GN37qEOy4eWNeevXpnGl4J/4KOfC/4jXYsLHxB/xMR9+L7Dd8cMw5MIX7qk9ak+2wfEOHxEFUk9z2kyZb7uD3xTPOqtpHiPSfESL/AGbefapOfMXyXj2dcfeAznB6elat9oVxYxCSaPYp77gf60z2qWMw01o0R6a++7j/AB/ka4D/AIIbnHi341f9j5rn/odlXoOnWrJeQ8f6zdt98CvOv+CG0yz+J/jbIpysPxA12Nz6MHssil1PiONnTlR91n6JquM0E5pr3CxQ7icKec4pVlUoHz8uM59qZ+TxjZCSI5+4I93+1RCz9JNm7r8uawfGfxL0PwNG8+qXX2dY4TIW8uRvlGT/AAqf7pr50+Jv/BXf4O/Dq/utNtdb+2a8C8cVp9jvo/MkyygbzblBl1AyTjnPSkB9SuGu2ba21o24wcZI7H2rhfjt+0H4W/Zy8LPr3jHUrjRNPjBVZxbyXEUsgR5NuyFXflY3OSAMLjOSAfkbT/2gP2kf2w72ebwT4X/sPwNNM1kdT/tLS7rYSc+Z5MyRynEMyNt/2cZyTj034B/8EtvDnhXxpD448cXH/CVeNmK3H2rZLY/ZpPMjn27IZzE22YOc7cHdjoAKAMXxb+134v8A20dCXR/gZbzafHI+ZPEGsSmwtpEKlCYfJnNyM+dBIu+EYAbOGAWut+AH/BPrT/BWpw+LvH32fxl48RFaa71Rk1K2t3BjlZrd5YvOXbMJChJyA5P3iTX0pb2f2G0WGJf3MUYjSPPYDA5+nFJDZskDKv7nzG3MPvdaAG6FaraWCqoZYzyq8bEGBgIOyDsO1XMUyAMse1hjbwOevvT6ADFGKKKADGKKKKACiiigAooooAKKKKACiiigAYbqTYKKKAExtFBJBooqkTLQhvrGPU7doZl3Rt94ZIzjnt9K8d+J37BPw4+J9u632i/PJjL/AGy67bewlH90UUUmbUa04/Cz5d+I/wDwRF8L/D2C51jwD4o/4Q+8n2/am/s2XUPtGNqJxNdELtDSdBzv56CvL9d/YF8e/ALwjJ4yj+M/9pXUeMRf8Ijbw9XEP3vOYdJM/d7fjRRSPYwuMr2+Jnz3F/wUs+KA1GaOPWtkkO3fJ9ktD5mRxx5HGOlYv7Gv7cnxM/Z81zx1LpviLzv7a1TUNWlH2C1XEkrQk/eib/nmOmB7Ciig2zTEVJYdczPctL/4LIfFbWtcstN+3eVfahstRe+TZt5QdgufL+zYOCd3UZ6V6wP2UPi146sLXx5cfHfYviAJNLYf8IVZnYJh55XzBIM43bchR68dKKKDwaWsNT0DwF/wRo8J/EC8tPFXjDXf+Ek1mRUYzfYprP5SVl27YrkL99nOdv8AF6ACvpb4T/sVeAfg3DC2l6PtuLYLtk+13J5XZg4aVh1QGiigzPVLBlMG1V2rGdijOeBU1FFABRRRQAUUUUAFFFFABRRRQAUUUUAf/9k= 1.0000000 0.3333333 0 0 38]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>3</mn><mn>8</mn></mfrac></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Representacion de fracciones 15 Que fracción representa:

 

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 1.0000000 0.3333333 0 0 23]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>2</mn><mn>3</mn></mfrac></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question> Representacion de fracciones 16 Que fracción representa:

 

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 1.0000000 0.3333333 0 0 15]]> <question><correctAnswers><correctAnswer type="mathml"><![CDATA[<math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>5</mn></mfrac></math>]]></correctAnswer></correctAnswers><assertions><assertion name="syntax_expression"/><assertion name="equivalent_symbolic"/></assertions><options><option name="tolerance">10^(-4)</option><option name="relative_tolerance">false</option><option name="precision">4</option><option name="implicit_times_operator">false</option><option name="times_operator">·</option><option name="imaginary_unit">i</option></options><localData><data name="inputField">inlineEditor</data><data name="gradeCompound">and</data><data name="gradeCompoundDistribution"></data><data name="casSession"/></localData></question>