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-triangles--area-of-triangle-deltaabc-and-deltadbf-are-equilateral-triangles-such-that' $output = '{"success":true,"question":{"_id":"eiPa2KihjRmXX4HBh","name":"G33","common_data":"","questions":[{"type":"MCQ","index":0,"statement":"<p>ΔABC and ΔDBF are equilateral triangles such that D is mid-point of BC. What is the ratio of the area of ΔBAE to the area of ΔBEF?</p>\n\n<p><img alt=\"\" border=\"0\" height=\"195\" 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\" style=\"margin: 0px; border: 0px solid black;\" width=\"172\" /></p>\n","instructions":"","options":[{"index":0,"statement":"<p>4:1</p>\n","is_correct":false,"feedback":""},{"index":1,"statement":"<p>2:1</p>\n","is_correct":true,"feedback":"<p>Clever! You do know the basics of Similar triangles.</p>\n"},{"index":2,"statement":"<p>1:2</p>\n","is_correct":false,"feedback":""},{"index":3,"statement":"<p>1:4</p>\n","is_correct":false,"feedback":""}],"num_of_options":4,"num_of_correct_options":1,"correct_response":"{\"<p>4:1</p>\":false,\"<p>2:1</p>\":true,\"<p>1:2</p>\":false,\"<p>1:4</p>\":false}","feedback":"{\"<p>4:1</p>\":\"\",\"<p>2:1</p>\":\"<p>Clever! You do know the basics of Similar triangles.</p>\",\"<p>1:2</p>\":\"\",\"<p>1:4</p>\":\"\"}","general_wrong_feedback":"<p>Bummer! You should’ve thought a little harder! Try using the similarity of triangles.</p>\n"}],"state":"UNDER-REVIEW","topic_tags":["CAT","Quantitative Ability","Geometry","Triangles ","Area of Triangle"]}}' $islogin = (int) 0 $qsData = object(stdClass) { _id => 'eiPa2KihjRmXX4HBh' name => 'G33' common_data => '' questions => array( (int) 0 => object(stdClass) {} ) state => 'UNDER-REVIEW' topic_tags => array( (int) 0 => 'CAT', (int) 1 => 'Quantitative Ability', (int) 2 => 'Geometry', (int) 3 => 'Triangles ', (int) 4 => 'Area of Triangle' ) }UrlsController::question() - APP/Controller/UrlsController.php, line 235 ReflectionMethod::invokeArgs() - [internal], line ?? Controller::invokeAction() - CORE/Cake/Controller/Controller.php, line 499 Dispatcher::_invoke() - CORE/Cake/Routing/Dispatcher.php, line 193 Dispatcher::dispatch() - CORE/Cake/Routing/Dispatcher.php, line 167 [main] - APP/webroot/index.php, line 118
Notice (8): Use of undefined constant desc - assumed 'desc' [APP/Controller/UrlsController.php, line 236]Code Context$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-triangles--area-of-triangle-deltaabc-and-deltadbf-are-equilateral-triangles-such-that' $output = '{"success":true,"question":{"_id":"eiPa2KihjRmXX4HBh","name":"G33","common_data":"","questions":[{"type":"MCQ","index":0,"statement":"<p>ΔABC and ΔDBF are equilateral triangles such that D is mid-point of BC. What is the ratio of the area of ΔBAE to the area of ΔBEF?</p>\n\n<p><img alt=\"\" border=\"0\" height=\"195\" 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\" 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You do know the basics of Similar triangles.</p>\n"},{"index":2,"statement":"<p>1:2</p>\n","is_correct":false,"feedback":""},{"index":3,"statement":"<p>1:4</p>\n","is_correct":false,"feedback":""}],"num_of_options":4,"num_of_correct_options":1,"correct_response":"{\"<p>4:1</p>\":false,\"<p>2:1</p>\":true,\"<p>1:2</p>\":false,\"<p>1:4</p>\":false}","feedback":"{\"<p>4:1</p>\":\"\",\"<p>2:1</p>\":\"<p>Clever! You do know the basics of Similar triangles.</p>\",\"<p>1:2</p>\":\"\",\"<p>1:4</p>\":\"\"}","general_wrong_feedback":"<p>Bummer! You should’ve thought a little harder! Try using the similarity of triangles.</p>\n"}],"state":"UNDER-REVIEW","topic_tags":["CAT","Quantitative Ability","Geometry","Triangles ","Area of Triangle"]}}' $islogin = (int) 0 $qsData = object(stdClass) { _id => 'eiPa2KihjRmXX4HBh' name => 'G33' common_data => '' questions => array( (int) 0 => object(stdClass) {} ) state => 'UNDER-REVIEW' topic_tags => array( (int) 0 => 'CAT', (int) 1 => 'Quantitative Ability', (int) 2 => 'Geometry', (int) 3 => 'Triangles ', (int) 4 => 'Area of Triangle' ) }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
ΔABC and ΔDBF are equilateral triangles such that D is mid-point of BC. What is the ratio of the area of ΔBAE to the area of ΔBEF?
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