Notice (8): Use of undefined constant title - assumed 'title' [APP/Controller/UrlsController.php, line 235]Code Context$qsData = json_decode($output)->question;
$metadata = [
title => "Best CAT Coaching In Delhi - " . implode(' | ', $qsData->topic_tags),
$slug = 'cat-quantitative-ability-geometry-mensuration-in-the-square-below-each-vertex-is-joined' $output = '{"success":true,"question":{"_id":"MdQsvYcsyaqTeGf2t","name":"Geometry_mensuration208","common_data":"","questions":[{"type":"MCQ","index":0,"statement":"<p>In the square below, each vertex is joined to the midpoint of the opposite sides and a star shape is formed.</p>\n\n<p><img alt=\"\" border=\"0\" height=\"212\" hspace=\"0\" 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\" style=\"width:300px;height:212px;margin-top:0px;margin-bottom:0px;margin-left:0px;margin-right:0px;border:0px solid black;\" vspace=\"0\" width=\"300\" /></p>\n\n<p>What fraction of the square is shaded?</p>\n","instructions":"","options":[{"index":0,"statement":"<p>Approximately 67%</p>\n","is_correct":false,"feedback":""},{"index":1,"statement":"<p>Approximately 75%</p>\n","is_correct":false,"feedback":""},{"index":2,"statement":"<p>Approximately 50%</p>\n","is_correct":false,"feedback":""},{"index":3,"statement":"<p>Approximately 33%</p>\n","is_correct":true,"feedback":"<p>Genius! Your answer should have arrived in this way.We hope that you have used the ratio of known angles to determine the sides and later calculated the area using area formula. </p>\n"},{"feedback":"","index":4,"statement":"<p>None of these</p>\n","is_correct":false}],"num_of_options":5,"num_of_correct_options":1,"correct_response":"{\"<p>Approximately 67%</p>\":false,\"<p>Approximately 75%</p>\":false,\"<p>Approximately 50%</p>\":false,\"<p>Approximately 33%</p>\":true,\"<p>None of these</p>\":false}","feedback":"{\"<p>Approximately 67%</p>\":\"\",\"<p>Approximately 75%</p>\":\"\",\"<p>Approximately 50%</p>\":\"\",\"<p>Approximately 33%</p>\":\"<p>Genius! Your answer should have arrived in this way.We hope that you have used the ratio of known angles to determine the sides and later calculated the area using area formula. </p>\",\"<p>None of these</p>\":\"\"}","general_wrong_feedback":"<p>Bummer! You should’ve thought a little harder starting with using the known angle to ratio sides and find the area and add them cautiously.</p>\n"}],"state":"DRAFT","topic_tags":["CAT","Quantitative Ability","Geometry","Mensuration"]}}' $islogin = (int) 0 $qsData = object(stdClass) { _id => 'MdQsvYcsyaqTeGf2t' name => 'Geometry_mensuration208' common_data => '' questions => array( (int) 0 => object(stdClass) {} ) state => 'DRAFT' topic_tags => array( (int) 0 => 'CAT', (int) 1 => 'Quantitative Ability', (int) 2 => 'Geometry', (int) 3 => 'Mensuration' ) }UrlsController::question() - APP/Controller/UrlsController.php, line 235 ReflectionMethod::invokeArgs() - [internal], line ?? Controller::invokeAction() - CORE/Cake/Controller/Controller.php, line 499 Dispatcher::_invoke() - CORE/Cake/Routing/Dispatcher.php, line 193 Dispatcher::dispatch() - CORE/Cake/Routing/Dispatcher.php, line 167 [main] - APP/webroot/index.php, line 118
Notice (8): Use of undefined constant desc - assumed 'desc' [APP/Controller/UrlsController.php, line 236]Code Context$metadata = [
title => "Best CAT Coaching In Delhi - " . implode(' | ', $qsData->topic_tags),
desc => !empty($qsData->common_data) ? substr(strip_tags($qsData->common_data), 0, 200) . '...' : $qsData->questions[0]->statement ? substr(strip_tags($qsData->questions[0]->statement), 0, 200) . '...' : 'Best CAT coaching CAT preparation and Personalised learning with unlimited classes, from Alchemist'
$slug = 'cat-quantitative-ability-geometry-mensuration-in-the-square-below-each-vertex-is-joined' $output = '{"success":true,"question":{"_id":"MdQsvYcsyaqTeGf2t","name":"Geometry_mensuration208","common_data":"","questions":[{"type":"MCQ","index":0,"statement":"<p>In the square below, each vertex is joined to the midpoint of the opposite sides and a star shape is formed.</p>\n\n<p><img alt=\"\" border=\"0\" height=\"212\" hspace=\"0\" 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IYW2Txq22e0fuk0TYeNx3VwD7V+X/APwXk+LF5+2n+1T8Mv2PfC91L/Z+o3Efin4hTW7nNtpsBzHA5Gdpc84OPmMR6HI+3v29vAPw2+Evwe8VfGDXZrrwXqfgzTJr9vEWiz/Yb75FJWMlcLLubAEbgqxIHOa/LH/gkzoPxAWy8XftJfErQ77xPr3xsnW6/tK3KtqOm6fGxWFWttqjymUBv3bE4VMIT0AP0E8PaBZ+FdBstN0+3is7DT4EtreGIYSKNBtVQOwAGKuVj+CvH+jfEXTvtWi6jb30anEwQ4kt26lJIzho2A5KsAR6VsEYoAP8814Z/wAFHP2Sov20f2SfE3g+PbHr8UY1Tw/c9Gs9RtwXhZT/AA7vmjJ5wrk17mBu+vp61ynjX4zaL4J1JdOL3Gqa5IAYdJ02P7TeSZzjKA4RSRjfIVTPG6gDr/8Aghn+3hL+3N+wzol5r0jR+PfBDt4a8VW0vE0V5b4TzGHUb1Ab0ySO1e9fGH9rnwl8I9ZXRfOu/EXiqYAw+H9Fg+2ajJn7u5FOIlP9+UovvnAP4v6afFX7Dv8AwVm07UtY1LVPhh8H/wBqa9Fhq8eiaghkt9SRf3fnS7B5DyyNljGwI81wGIWv28+DnwA8H/A3Rza+FtFs9PWZjJPcAGS4u2PV5JWy7s3UliSTQB5jD4G+Ln7SLlvFGqf8Ks8Ky8/2NoVz52s3KHtPeYxDx/DAoYH+MivUPhD+z94S+BWjNZeF9Fs9NWRi80qqXnunPLPLIxLyMepZiSTzXZBOR7dvSnUANEeDTqKKACg9KKbK4SJmPRRmgDxv9tD4halovgLT/CPhuZo/F3xEvBoWlSJy1orKWuLr28mESOCeNyoP4hXo3wu+Hmm/Cj4f6L4c0mFbfTdFtI7O3QDoqKAPx4yT3NeOfs+p/wANA/tC+JvihcfvdF0TzfC/hTdyrxRuPtt2v/XWZBGD/dtwQfmNfQQXFAGd4y/5FHVP+vSX/wBANeP/APBM/wD5R+fBn/sTdL/9Jkr2Dxl/yKOqf9ekv/oBrx//AIJn/wDKPz4M/wDYm6X/AOkyUAe5UUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHz7+2P/wAl9/Zr/wCyhXH/AKj2r19BV8+/tj/8l9/Zr/7KFcf+o9q9fQVABXjn7Zfw21LxF8PrPxR4bh8zxf8AD68XXdIC8NclAVmts/3ZoGkj9iwPUCvY6bMokiZSNwbggjrQBz3wn+JGnfF74d6N4m0mXztP1q0ju4W7qHUHaR2IPBB5Bro6+e/gFL/wz1+0X4m+GNw3laD4h87xT4V3fdRXkH261X/cmcSgelxgcLX0Grbv/wBVAC0UUUAFIx2rSk4FcD+09+0BoX7LfwC8WfEDxJdLaaL4T02bULh2OM7FJCj1ZjgAdyQKAPzN/wCC9Pxbvv2zf2p/hl+xz4XvJlsdVnj8VfEGa3b/AI9tMhO6OByOhcgnnHzeX2NfSnh7QLPwr4esdL023itbDToEtbaGJdqRRoNqgDsABjivjX/gkL8Ote+J8Pjz9pfx5C3/AAm3x01Jr22WXJbTdIRv9HiXPRWA3e6rGa+q/HPxj0TwPf8A9mvJNqWtzD9zpWnx/abyXOQvyA4RSQQHcqueNwNADPG3wU0XxjqS6lGt1o2vRjEWp6c5gul77WI4kXOCUYMrYGRXnPj79pTVP2bryHT/ABHb3HxAZ1/dDwzaedrUa9mns1+UIecyqyrkYC55rrjoPjb4qZbVrz/hC9FbObDTZRJqVwpz/rbkACIMP4YgHUrxIRXWeCfh1ovw509rfRdPgsxIS8sgG6a4c9Xkc5LMT1J69aAPO/BOva5+0lpP29dcg8O+H5MrJp+lT7tWAOcpcykA2zEEExqqyIRw7Zr0TwP8O9E+G+nva6Lp8Fmkzb5pAuZbhyBueRjy7HqSeSeay/GnwV0XxhqK6nEtxo+vRDEeq6bJ9nugOoViPldM8lWBVsDI7VjnxX4y+Fny+INPHivR1P8AyFdJh2XkS9jNbdGwMktER04jNAHI/wDBR/8AZKj/AG0P2SfEnhCHEfiC3Qar4euB8rWmowZeIqf4d3zRk+khOOK96/4Ibft4Tft1/sMaHfa67R+PvBTHw54qtZD++ivbcbC7DqPMUK31LDtWF4I8f6N8Q9NN5ouoW+oQxttkEbfvIWxnZIh+aNv9lwCPSvkD4f8Ajj/h1L/wWg03WjJ9j+EP7UYFhqYPyW+na+hGyQjovmFhycA+c5GdtAH7TZ5opkMiyoGU7lYZBHpT6ACiiigAPSvGf20PiPqWheAbDwn4bmMfi/4iXg0LSnTlrVXBNxc+whhWR8ngsEXPzCvZJpFjiZmOFA5NfPvwAhb9oT9obxN8T7hfM0XQxL4W8K7h8rojj7ddr/10mRYwf7tuCD81AHsfws+HOm/CT4e6L4b0mFYNP0S0js4EHZUUDn1JxknvXQ0gXBpaAM3xl/yKOqf9ekv/AKAa8f8A+CZ//KPz4M/9ibpf/pMleweMv+RR1T/r0l/9ANeP/wDBM/8A5R+fBn/sTdL/APSZKAPcqKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD59/bH/wCS+/s1/wDZQrj/ANR7V6+gq+ff2x/+S+/s1/8AZQrj/wBR7V6+gqACkYbhS0UAeNftn/DjUvEHw/svFXhyJpPF/wAPbtdd0lE+9d7AyzWv0mhaSP6sp6qK9D+FHxG034u/DvRfE2kSibTtas47uBx/ddQcH0I6EHnINdBIgkQqe4x0r59/Z/k/4Z+/aK8TfC+fdDoeveb4p8Kbvuojv/ptop6fu5nEgHZbgDotAH0JRUctzHDEZGZVjXksT8oH1r4d/bs/4L7/AAS/Y51aTwto91e/FT4kzExW3hjwov2ycy84WSRcqnQ5xuIx0HWgD7imuEghaR2VFUZLMcAV+Mv/AAXx/bS0v9tP46/Dn9lL4e6ldeJtJ1DVo9Y+Ic3hwC8kgtIGBW0LKdgZiCTuIAYJk9axfiBb/te/8FTraXUPi94uX9m/4NyKZ5fDPh9x/bF7bAAt58x+6NuD8xYdcqDXqn/BNX9h/wAC/shfDrVNQ8I6LNYzeMLj7YLi+YzagbUcQLLI3zZK/vGXOA8rAcAUAegeG/AHijxL4fstLZo/h74T0+3S1tdK0qRZNQMCjaiSXAAWH5McRAMpHD13Xgf4daL8OLFoNG0+Gz8wl5pBlpbhjyzO5+ZmJ5JJJNbXU0UAB6/yz2ooooADyKAcHjjt9aKKAOR8afBXR/F2prqkP2nRdfjGI9U02TyLgDOQHxxIucEowKnuK+bf+Cln7P8A4t+On7IvibwnrWmr4nuNPQav4e1/SIhHf6ff243wvLBwDuAdXeI5w5xGcV9gGjODn074oAzf+CHv/BTvRf26f2R/Den69rFna/FjwrB/ZHiPRbmURah58HyGbymw5DrhiQMAkg9K+4BICa/Fn9sP/gll4C+K/wC0zY+ObHVPEHw18VeJ4Ta2fiTw5P8AZ5LPVoQ0kJlQYWRZoldTnkNAgHL1q+A/+CkH7W3/AAS8ePTvjZ4Vb9oP4WWmEXxf4dj261YxDIDXEPO7ABJJB/3hQB+yW7mlPSvn39if/gp58Ff+CgPhqO/+G3jTT9UvFANxpM7CDUrQ+jwN83HQkZHvXv0kyqhO4Y7nPagDx39s74j6loHw/svCvhuVk8X/ABDvBoOksnLWwdSZ7r6QwiWTJ43Ko/iFeifCr4dad8Jfh3ovhrSYhDp2h2kdnAv+yi4yfUnqT3NeO/AKI/tCftE+JvifcZk0LQVl8LeFc8qyq4+3XS/9dJkWIH+7b5HDV9BhcGgBaKKKAM3xl/yKOqf9ekv/AKAa8f8A+CZ//KPz4M/9ibpf/pMleweMv+RR1T/r0l/9ANeP/wDBM/8A5R+fBn/sTdL/APSZKAPcqKKKACiiigAooooAKKKKACiiigAooooAKKKKACiiigD59/bH/wCS+/s1/wDZQrj/ANR7V6+gq+ff2x/+S+/s1/8AZQrj/wBR7V6+gi2BQAZoJwKbJMsS5b5QOpPAFfE/7dv/AAXn+B/7FmpyeGbPULv4l/EabMdr4W8Kr9tunk7LI65WMdfUjHIoA+1ppVSNtxwoHzE8AD3r81f+Cu3/AAWK+C/wH1Lw7pvhXWpvHnxr8J6xFf6PonhmM30pPKTwTPHkIssLSIQNxB2nGVFeA+NpP2xv+Cr7M3xD8Q/8M4/CW+5HhrQX367qEJ/hml/gBGDgk9+BXun7J3/BPr4UfsVaXs8C+FrWHVJF/wBJ1m8/0rUrtuu5p3y3XJwCAM0AfO+o337Xf/BYzR7fVPH3i5PgD8GdYRZYPDvht9+r6pbsAQs02fl3KQSGJ5GNoOcfRX7KH/BP34U/sW6R5PgfwvaW+pyDN1rN3/pOpXjcFmeZwW5POAQB2Arofhx/xbj4n6v4Pf5dN1ASa3oZ7BHf/SoB/uTOr89rgADC13+o30Ol6fNdXEqQ29vG0skrttWNVBJYk9gBnPSgDgfjVcN431vSfAluWZdaJvNZIP8AqdPi2l0PvM5SLB+8hlI5WvQkjWFFWNVVFGFVeg+lef8AwGsJtcg1LxpexyR3nix1kto3XDWunpkW0RB5XKs0hU8h53GSK9CoAKKKKACiiigAooooAKKKKAMP4leCE+I3gq+0lpjaSzKslrcqNzWdxGyyQzL/ALSSKre5H4VD8LfG7/EXwHbXV5CLe/jL2WqWmdwt7qJjHNEeem5TgnhlII4NdFwfvdO9cDef8W0+NkNx/q9G8fYt5f7sGqxR/If+29uhX/etkHV6APE/2n/+CRPw1+PXiQ+LvDUmpfCv4kQt5tv4k8Ly/Y5TL1DTIuFk5xkn5sDg15n8QP8Ago5+2L/wTf8Ah7ceDfirYQ/GLwfr0UmmaX470CFv7b01dh3TS2wyXZIw755GVGXGRX3srZ24/i6V5/4CC/Er4max4rkAm0vSUl8P6MrDckihh9tn54O+ZFiBII22+RkOaAPcP+Caf7eXwE/ai+CWg6V8H/F+l3sWi2Uds2jzSC31O1KrgiWBju3cZJGRnvX0+HBr8hv2m/8AgkT8Nfjp4oPjDwtNqfwn+I8LedB4j8KyGzkaQchpo1+WTJ69DgcGsfwF/wAFLP2sv+CYMsGm/HLwm3x8+F9qRGvjLwzFjVrSLOA1zBg7iByTzwDlhQB+yW7mivAv2Kv+CmfwX/b/APCsepfDXxrpurXGzdPpcziDUbQ4+68DHdkd8ZHvXvaSq/SgDP8AGX/Io6p/16S/+gGvH/8Agmf/AMo/Pgz/ANibpf8A6TJXr/jFv+KR1T/r0l/9ANeQf8Ez/wDlH58Gf+xN0v8A9JkoA9yooooAKKKKACiiigAooooAKKKKACiiigAooooAKCcUUUAfPv7ZTiL49/s1scYHxCuDz/2L2r15T+3b/wAF4Pgf+xVqT+G7fUrr4kfEWU+Va+F/Cyfbrt5eyyMmVj75zkjHTvXHf8HDn7Onj39rD4FfCjwD8M/EC+GfGuveOXXT79rh7cLs0XU5JE3r8y741dMj+/8AhX5x/sZ/Ezw7/wAEgNeTwf8AtBfAjUPhd4pnk2P8QhA2rWmrMWHzvdNueME5bg8ZxtoA958bXX7ZH/BV9mbx9r//AAzf8I7wkjw5ocm/XtRgPaaX+DIwevr8oNe5fsnf8E9/hT+xjpe3wX4XtU1abm61u+/0rU7xupZ5ny2SeeMY+nFemfDb4p+G/jH4Vt9d8K67pfiDSbtQ8d1YXCzRtnnqOh9m5+lb3egAJySfXrRQOaM4oA4n47eGLvUvC1vrOkxtLr3hW4GqWKKcNcbVIltx/wBdYmkTnjcyt1UVz/xB8V2vxssvDPhrSZvP0/xdCup6lKuQF0xArMv1lZki2nGUaUj7px6hqN9DpVhNdXMiQ29uhkldyFVFAySSeMYFeA/shWreFPHniRtStWtm8cs+v+H2kJ3Jpvmt/ooU/dKPMJin8Ju9oHy8AH0FHEsKKqKFVRgAdAOw/D+tOoAxRQAUUUUAFFFFABRRRQAUUUUAH/66wviV4Gj+IngnUNJMzWs0yrJaXC8taXEbCSGUe6SKje+MVu0qHDr9aAPLNT+Md74o+EOnw6fssfGXiK5Ph8QKQz6deruS6kx12wLFNICeG2J/fFeheE/DFn4K8L6fo+nR+VY6bbx28K+iKuBn1OO/fmvDfBU8Uf7YGoeMGtRH4Y8SGbw5pt0XO19ShVPOm29FEywNED3NkuMmXn6CJ3H8+P8APpQAUjoJYmV1EiupVlYZVs9ePQ+nNLRQB8p/tM/8Eh/hx8bvFTeMPCU+qfCf4kQv50HiPwvIbSR5ByDLEpCvk4yeuBwRWX4A/wCCmn7WP/BMSWPTfjx4R/4Xx8MbUiNfGnhlP+JraRAkBrmHkscAn1x1avsDGR9fTmvNP2l/2vPhr+yb4Qm1b4i+KtL0O1dDttpXElzd5z8qQDLPnpyMc4zQB9G/suf8FLvgz+378J9Q1L4a+NdN1af7FIZ9MlcQajaEoflkgbDAjvjI963P+CZ5/wCNfnwZ758G6XyOn/HslfhP4t/Y++IP/BWf44Q+P/2b/g/qHwL0bT2ee6+Il9PLpEmsKAxJW2jxv3DHUEcde1fuj/wS8tpLT/gnV8EI5pPNmj8EaSjvz85FrGCfxNAHvNFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQB8+/tj/8AJff2a/8AsoVz/wCo9q9evfE/4P8Ahj41eErnQfFug6T4i0e8Qxy2l/bLPEwPXhgfzFeQ/tj/APJff2a/+yhXH/qPavX0FQB+Vv7Q3/BuVJ8KvFd745/ZL+I2rfB3xI5M0nh+aVrjQdQOd2xoyfkU4xjkfyrxa2/4Kc/Ez9iHxHD4S/a6+FOreDSpEUXjXQbdrzQ7wjCiR9o+Tcc+mPSv27YbhWH49+G2hfFPwxcaL4k0jTdb0m8QpNaXtus0MgPXKsCPXn3oA+J/hT8Y/Cvx28Jwa94N8RaP4m0e4QOlzp9wsqgHoGAOVPB4YA8V0hO0n/Z/zivCv2lv+DcHSfCfi688efsr+PNY+BfjNiZf7LtpHm0K+b+60JJ2A4xx65zjivBLr/go18aP+Cf+vQ+G/wBrj4T6lpWnr+7j8e+Frc3mkXI4+aRVGE6gHBH0JoA+rfjZI3jTVtJ8B27f8hzdc6sf+eWnREeYjf8AXZykWDjKNIQflq38b/Ct1c+FbXWNFhLa54TnGo6fEgwZ1VSstv8A9tIWdB6MVPJAI439jL4v+Fv2k9A1X4jeH9d0zWn8TSjykt7hZJNPsYiyW8MiZ3RsfmlIYcNMwyQK9qB/3Tnj1oAz/C3iWz8ZeG7DVrCVZ7LUoEuYHA4ZHUMMfnWhXnPw3YfDL4k6x4NmJSw1APrmhnt5bvi6gH/XOZg3YYuFA+7Xo3SgAooooAKKKKACiiigAooooAK4/wCNfii80TwrFpukyeX4g8T3K6TpbAZaCR1YyXGPSGJZJPTKAfxCuwPI+vH0rz/wL/xcb4pat4rf59L0XzNC0XP3X2uPtlwP96VFiz6W5I4egDS1/wCD2n6h8H/+ET09jp8VnbRJps4+ZrOaHa8Ew7llkVW564OetW/hT41fx/4Ktr64gWz1GJmtNStQc/ZbuImOaP6B1bB7gg9DXSB/m3e+f6ivn79o39qTwD+wj8QLjxB448SWGh+G/GVs0ssTP5k6ajAgCskKnefPhG3IGA1uozl6APoDt/k+9ea/tJftefDj9kjwlJrHxA8V6X4fgA/dQSybrq5POFjiX52JxgHAGe9fMfhj9pD9p/8A4Ke376b+zn8Pbj4c+A7hjHL8QfGFuYnkjPBe2gPUkcg4JGBzX1V+xp/wbwfC/wCCvi6Hx38WNT1T45/E5mE0mr+JXM1rbSZyfJgPygAk4JHQ0AfKvhr9or9qL/gqFqbab+zr8PZ/hr4BuGKSeP8AxjCY5ZYyTl7aDGSSMEHkgjrX1Z+xf/wbw/Cz4G+K7fxz8VdS1P45fE5m86TWPEr+fbW8nBPkwH5VAOcEjoelfoBpukW+j2MVraQQ2trAoSOGGMRxxgdlUcAe2Ksgc0AYmv6Rb6N4Dv7W1hht7a3spUiijQKka7DwAOB+Aryn/gmlz/wT++DJ/wCpO0v/ANJkr2Dxl/yKOqf9ekv/AKAa8f8A+CZ//KPz4M/9ibpf/pMlAHuVFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQB8+/tj/APJff2a/+yhXH/qPavX0FXz7+2P/AMl9/Zr/AOyhXH/qPavX0FQAUUUUAB6V85/ts6ba/tD654Z+CX2a3vrTxfIdS8SrJEJFg0e3ZTIpB6GaXy4R7M5B+Wvf/EWvWvhjQ7vUb2aO2s7GJp55ZDtWNFGWJPYADrXif7Fmg3XjkeIPi1rEDxal8RJlk0+OUYey0iLcLOLH8O9WaZh/emI5xQB8dftQ/wDBtn4TTxPN46/Zp8Yax8BfHkZ8xYNOmZ9FvWAA2yQfwgjOSO7EmvnXUf2+fj9/wTf1qDQf2tPhbfXXh1SIYfiF4UiNzYyrx+8mjX7vG3P3efWv3HI4qh4l8K6d4z0S403VrGz1PT7tdk1rdQrNDKPRkYEN+IoA/M23+O/gv9rH4VWPjj4VeJNM8V3vhmUapaJYzKbggKVmtnjOGTzI2dBkY3lTnKg17H4W8SWnjPwzp+r6fIs1jqUCXMDr91kYZyP8O3NeUftef8G1ngXxR4suPHv7PPijVfgF8Rlfzo30iVhpN3J282AcDJyTt656V87/ALGP7QnxA/Ye+Oepfs6/tRaloOneLLonWfCOswZW11y2mklMimT7isHBIXjG5wThaAPu6imwyx3NvHNFIksMyh0dDlXB6EHuD1yO1OHP9fagAooooAKKKKACgcmgnAz2+tZfjLxrpPw80C41XXNRtdK061BaS4uJAirgE8Z6nAJwMk4oAxfjT4qu9C8Iw6fpMnl+IPE1yuk6Y3Uwu6lnnx6QxLJLzwSgXqwrl/jD+0X8Lv2FfhPZN4y8T6X4Z0jS7VYLWG4mDXVyFUgCOMHzHY4xnHzH86+TfDPx+/aM/wCCon7Q2rSfst6Hpuk/DnR7aTw9F8Q9diP2e3d2VrqW2jPLSNtiUMOix5/iIr7I/Y2/4N3vhn8HvFsPjv4vatqfx1+JzOJ5NV8RO0lnbSdT5NuTtADdCR3oA+WPDX7Sv7T3/BT/AFF9N/Zv+Hlx8P8AwHcSGOX4g+MLcxF4yT81vbkZJIww78da99+FH/BtX4B8M+FNW8S/EPxVrnxa+Mt5bNNaeJNclMlvpl4PnR4ID8oUSAcEciv0w0vRbXRLCK1s7eC1toVCRxRRhEjUdgBwB7YqwRQB5n+yX8ULf4sfBDSbsWMOk6jp4bS9V02JAi6de258qeIKAAAHUkccggjg16bjmvnqcf8ADNH7Y0cvEPhH4wfunxxHZ65DGSp/7eLdCP8AetwOS1fQitnigB1FFFAGb4y/5FHVP+vSX/0A14//AMEz/wDlH58Gf+xN0v8A9Jkr2Dxl/wAijqn/AF6S/wDoBrx//gmf/wAo/Pgz/wBibpf/AKTJQB7lRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQAUUUUAfPv7Y//Jff2a/+yhXH/qPavX0FXz7+2P8A8l9/Zr/7KFcf+o9q9fQVABQelBOBVLxDr1r4Y0O81C+mjtrOxha4nlc4WONRuZifQAHmgDwz9sG/m+Lfijwz8HdOeRW8XO1/4ieM822jW7KZVPoZ3McI9Q7n+E17xpunw6XYw29vGsUNugjjRRgKoGAB+Arw/wDYv0S68dv4h+LWsQyR6l8QplbTopR81npEW5bSPH8O8FpmH96YjnFe8UAFFFFACP8AdNfm7/wcd/saal8VP2b9E+NXgzT47r4hfAi/XX7ZfJEpv7AFTdQMuCHXaA2CDwjAfeOf0jPIqnrej22u6Tc2d5DHcWt1E0M0bjKyIwwykdwQcUAflz+zLq9n8c/gN4a+Jnwn1xdFsfE9ot5Jo8+bjSxMc+bEyfehZZAVJQ9F4GK9C0/46LoF5HY+NtLl8K3srhI7xm83TLlufuTjhScE7XwQMZPavlv9lPw1N/wTL/4KY/Er9mPVN1v4J8cSP40+HLyHESh8m4tEJ44weD3hJ/jr7e1LT7fVrGW1ureG6t5kKSRTJ5kbr3BB4I/DFAEkUqXEMckbrJHMu9GU5V19Qe49xxTsY/LNeeTfBS88FTy3ngPWG0NmYyPpV1uuNLnPJ+5ndCSSMshwAMBeaztc/am0j4SQR/8ACzY08BmVzHFfXLiTTbxwCcRzAcMQC2xxuAGfUUAeqdvp1xzj8qoeJvFGm+DNKkvtWvrXTrSH70s8gUZ64H948dBkmuGtPin4h+K9vbzeB9NW30e7USReINVBWGZDjD28I+aUEcqxwhx2rQ8NfAvTdO1aPVdburrxVrqjIvNQIZYTkHEMX3IhkZAwSOeaAKP/AAs3xN8SpQng3SW07TZDt/tzWEMaMD3hg+/JkZIL4XjBwK+U/wDgrBdyfDj4N6L4D0O4vPGPxo+OF+nhXRJrw+Y9nFIyrczQxD5YUVWCgjlTJuDcV95SzJCjvJIsccalndjhQo5JPsPU+9fJH/BI3wBJ/wAFJv8Agpv48/aZ1aJrr4e/Cvf4O+HySjMc8wyLi8QeuGbn/psB/DwAfo//AME//wBkHRf2Gf2R/BPwy0WOPyfDmnpHczKuDd3LDfNKfdpGY17OBzSKm0D2p1ABQRkUUUAee/tOfBhfjn8HNW0OOb7JqmEvNKvAMtY3sLCS3mH+7IqnHcZHQmo/2W/jG3xv+D+m6vdQ/Y9aty9hrFmTlrG+hYxzxH6OpwT1GD3r0Vhla+e5d37Nf7Y4YZh8JfGHCN/zzs9cgjOPYfabdD/wK2Hd6APoWimpIHp1AGb4y/5FHVP+vSX/ANANeP8A/BM//lH58Gf+xN0v/wBJkr2Dxl/yKOqf9ekv/oBrx/8A4Jn/APKPz4M/9ibpf/pMlAHuVFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQB8+/tj/wDJff2a/wDsoVx/6j2r19BV8+/tj/8AJff2a/8AsoVx/wCo9q9fQVAA3Svn/wDbCvpfi54o8M/BvTnbf4wdr3xE8Z5tdGgZTMCR0892jhHqJHP8Jr3PxDrlr4a0K81C8mS2tLGFp5pXIVY0UZYknjgCvEv2MNEuvH03iH4tavC8WofEKZG0uKQfNZ6RCWFpGAeV3BnmYf3pyOwoA9z07T4dKsYba3jWKC3QRxoowFUDAA/Kp6BRQAUUUE4FABSN92jdWB8RPil4d+FHhubVvEesWOj6fCMma5lChu+FHVj7AE0AfBv/AAcQfsX618Yv2atH+Mnw9Xyfil8Bbz/hJdJljXMl1apg3Fvx94FVD4PXYR/FWR+zZ+1/4X/aH/Ze8L/E9dQs9N0zXrJZp1llANvcLlZoOeSyyK64AyducV9O6n8cfHf7TljPp/w28LLpfhm+RoZfE/ieFo4ZY2GCba0/1kuQTgthD6ivyk/ZX/Z+sv8Agl5/wVT8XfAXxmY9W0Px5bjxP8P9VvIituZck3EEURYoj5D428jyhyd9AH2ifiR4l+JwCeEdJ/s/TJMD+3NYiKJIP70MH35DjkF8Kcc4q3o37Pmitcm88SNJ4y1SRSHuNXVZo0z1EcBBjjXqRgZGetd0F2nP8R4NLQB55cfBO88HzPdeBtWbQ2JLtpNyGuNLuCeSvlnLQ54BaPoBwop9h8c/+Eduo9P8aabJ4XvJH8uO8J83TLpuQNkw4UnBO1wCAOT2r0DGfx4qHUrW1v8ATp4b6OCWzkjbz1nQPEU/i3KeNvXr6UAfJf8AwV+/aO1TwN+z3o/w58AzfbPiN8ctQTwt4fS3fLxwylRcXAI/hEbhQe3m57V+kP8AwT5/ZA0X9hP9kbwT8MdEjjEXh3T0S6mVcG6umw08p92kZj7dO1fkr/wTD/Ze1z9vn/goR8Qv2j/Ad1YaF4P+E+oP4f8AAVrqls93pupThCtzIozmJGByGjHy+aAAdtfqz4d/bMbwJq1vovxa8PXPw/1KVvLi1Fm+0aLft6x3K8IT12SAMB1oA96oqvp2rWur2cdxa3ENzbzKHjkicOjqehBHBHuKnDZNAC0UUUAB6V57+058Fx8cvg3qmiwzfY9VQJe6VeD71jewsJbeUf7siqSO4yO9ehUj8rQB53+y98Zm+Ofwh03WLiH7JrEO+x1i0Y/NZX0LGOeI/R1bBPUYPevRa+eW/wCMbP2xxyYvCPxh+X0jtNcgjz9B9pt0/wC+rX1evoRX3H+dAGf4y/5FHVP+vSX/ANANeP8A/BM//lH58Gf+xN0v/wBJkr2Dxl/yKOqf9ekv/oBrx/8A4Jn/APKPz4M/9ibpf/pMlAHuVFFFABRRRQAUUUUAFFFFABRRRQAUUUUAFFFFABRRRQB8+/tj/wDJff2a/wDsoVx/6j2r19BHpXz7+2P/AMl9/Zr/AOyhXH/qPavXu2v63beHdFur68lSC1s4mnmkc7VRFGSSe2AOtAHhv7YOpTfFjxH4b+DunO6yeMna8190PNto0BUzg+8ztHAPaRyPumvdtM06HSbGG2t444YIEEcaIMKqgYAA+n8q8N/Yw0S6+IVx4g+L2rxyJf8AxBlU6VHIMNZ6PCSLRAD03gtMR6z4P3RXvPSgBaM4pN+KwfiJ8TvD/wAKvDs2qeItWsdHsIQS011KIwfYdyfYAmgDe3jOKwPiJ8UfD3wq8OTar4j1iw0bT4QSZrqURg47AdWPsATXjcn7RHj79oNjb/Czwz/ZOhyHH/CWeJYWhtyv962tv9ZN7MQqH1Fb3w9/Yu0LSfEEPiPxjqGofETxZGQ66hrZEkNofS3t/wDVwgduGYf3qAMFv2g/iB+0C/kfC3w1/Y+hyHH/AAlXiWJoYXX+9bWv+sm9mbah9RW98Pf2LNB0fxHD4j8YX2ofELxbGQ41LWyJI7ZvS3t/9XEB2wCw/vGvYo4BEoAC8eg4qTFAEaQBFCjovSvz6/4OHP2JdT+P/wCyfZ/E7wRCY/in8DbxfFOh3MK/vpooiGntxjkhlG8DuYwO9foTUGo2EWpWM1vNGskU6GN0I4dTwQfrQB+c/wCxr+0zpf7YH7NfhX4gaTsWPXLNWuYVOfstynyTRH3WQMOeo59K9Pr4R+CfhO6/4JVf8FWvGnwB1DNv8Mfi88nizwDK/wDqra5bme0U9uAwxn/lmndsV93UAFfJP/BYH9ofWfhz8AtN+G3gjzJ/iZ8btRTwpoMEWTLFHLhbicY6BUYID2Mme1fWrvHHGzSsscags7McBVHUk9hwefavkb/gk18P2/4KYf8ABT7x5+0lqkbXHw8+ERfwh4BSRcw3FyM/aLtB9GJB/wCmq904AP0e/wCCe37Hui/sKfsh+Cfhloscfl+HtPRLuZV2m8um+eeZvdpCx9gcdq9e17w3Y+KdJnsNSs7W+sbpdk0FxEJI5V9GVgQfxq4qbT2p1AHgOp/sf6t8Jr2TUvg74nk8KMzGWTw9qG+80K6J6gR/ftyf70ZIA/hqbw/+2Z/wg2sQaL8WPD118PtUmYRQ6g7fadFv27GO6X5VJ/uSYYd694YZFUfEPhqw8V6TcafqVna39jdLsmt7iISRyDuCp4P4igCbTtWttXtI7i1miuLeYBkkjcMjg9CCOD9RVgHNeA6p+yHrHwmupNR+D/iibwvuJeTw7qO+80O5PcKnL25PrHlR/cqTw5+2h/whusQ6L8WPD918PdWlYRxX0h+0aLft/wBMrpeFP+zJtIHUCgD3qg9Kg0/UrfVrKO4tZori3mUMkkThkcHuCOCKnzzQB57+098GP+F5fBzVNFt5vsmrR7L7SbsD5rK9hYS28o/3ZFXI7jI6Gm/svfGb/hefwf0zWriH7Hq8e+y1e0Y5ayvoWMc8R/3ZFYA9wAehFehSco30/Kvn3d/wzX+2Nhv9H8IfGHueI7PXIY+noPtFuuf9629XoA9y8Zf8ijqn/XpL/wCgGvH/APgmf/yj8+DP/Ym6X/6TJXr3i+Td4R1T/rzl/wDQDXkP/BM//lH58Gf+xN0v/wBJkoA9yooooAKKKKACiiigAooooAKKKKACiiigAooooAKKKCcCgD59/bHGfj7+zX/2UK4/9R7V6k/bD1Ob4q+IfDPwd0uRxN40drzXnjOGtdGt2U3GT2852jgHciRiPumqP7cWsW3h/wCMn7Ot9eTJb2tn49u5ppXOFjRfDusEkn2AJqr+zj4v0rT9M8U/HLxzqNpoa+OXU6W99MI/sejwZ+yxjPeTc0xUc5mxztoA+jNL0+HRtPgtbeOOG3t0WKNFG0KoGFAFZfxA+JmgfCzw7NqviLVrHR9PhBLT3UojX6DPJPsMmvGpf2ivHX7QD/Z/hT4a+waLLwfFniSJ7e0I/vW1v/rZ/ZsKh/vVt+Af2K9D0/xFD4i8aahf/EXxVGwdL7WcNb2jdf8AR7Yfu4gOxwWH96gDDk/aJ8eftBP9n+Ffho6bokgwfFniWBoLYj+9bW3+smOOhIVD/eFbnw+/Yt0PTPEMPiLxnqF/8RfFUZDrf60Q8Fow5/0e2H7qEA9MAsP7xr2WOIRIqgKAOwGKdwKAGxwiMKB0UYAx0p9G6jdQAUUbqN1ABQaN1Gc0Afn/AP8ABwx+xHqf7SX7IEPxA8FwtH8UPgneL4s0CeAfvpVhw09vkckMi7gO7RKO9cv+xF+1Dpf7Y/7L/hPx/pckZbWLMJfQKebK8QbZ4W7gq3rzgg96/SLULOPULKaCZVkhmUpIrDhlPBBr8Sfhf4TT/gkz/wAFbfGvwPvWGn/Cf43B/FfgmWZ9lvZXqg+fbBjwoIDrjJ+7D3NAHbf8Fg/2idY+Gn7PunfDnwRuuPiZ8bNQj8J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style=\"width:300px;height:212px;margin-top:0px;margin-bottom:0px;margin-left:0px;margin-right:0px;border:0px solid black;\" vspace=\"0\" width=\"300\" /></p>\n\n<p>What fraction of the square is shaded?</p>\n","instructions":"","options":[{"index":0,"statement":"<p>Approximately 67%</p>\n","is_correct":false,"feedback":""},{"index":1,"statement":"<p>Approximately 75%</p>\n","is_correct":false,"feedback":""},{"index":2,"statement":"<p>Approximately 50%</p>\n","is_correct":false,"feedback":""},{"index":3,"statement":"<p>Approximately 33%</p>\n","is_correct":true,"feedback":"<p>Genius! Your answer should have arrived in this way.We hope that you have used the ratio of known angles to determine the sides and later calculated the area using area formula. </p>\n"},{"feedback":"","index":4,"statement":"<p>None of these</p>\n","is_correct":false}],"num_of_options":5,"num_of_correct_options":1,"correct_response":"{\"<p>Approximately 67%</p>\":false,\"<p>Approximately 75%</p>\":false,\"<p>Approximately 50%</p>\":false,\"<p>Approximately 33%</p>\":true,\"<p>None of these</p>\":false}","feedback":"{\"<p>Approximately 67%</p>\":\"\",\"<p>Approximately 75%</p>\":\"\",\"<p>Approximately 50%</p>\":\"\",\"<p>Approximately 33%</p>\":\"<p>Genius! Your answer should have arrived in this way.We hope that you have used the ratio of known angles to determine the sides and later calculated the area using area formula. </p>\",\"<p>None of these</p>\":\"\"}","general_wrong_feedback":"<p>Bummer! You should’ve thought a little harder starting with using the known angle to ratio sides and find the area and add them cautiously.</p>\n"}],"state":"DRAFT","topic_tags":["CAT","Quantitative Ability","Geometry","Mensuration"]}}' $islogin = (int) 0 $qsData = object(stdClass) { _id => 'MdQsvYcsyaqTeGf2t' name => 'Geometry_mensuration208' common_data => '' questions => array( (int) 0 => object(stdClass) {} ) state => 'DRAFT' topic_tags => array( (int) 0 => 'CAT', (int) 1 => 'Quantitative Ability', (int) 2 => 'Geometry', (int) 3 => 'Mensuration' ) }UrlsController::question() - APP/Controller/UrlsController.php, line 236 ReflectionMethod::invokeArgs() - [internal], line ?? Controller::invokeAction() - CORE/Cake/Controller/Controller.php, line 499 Dispatcher::_invoke() - CORE/Cake/Routing/Dispatcher.php, line 193 Dispatcher::dispatch() - CORE/Cake/Routing/Dispatcher.php, line 167 [main] - APP/webroot/index.php, line 118
Type : MCQ
In the square below, each vertex is joined to the midpoint of the opposite sides and a star shape is formed.
What fraction of the square is shaded?
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