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--properties-of-triangles-in-the-givennbspabc-bcabac-what-can-be-the' $output = '{"success":true,"question":{"_id":"n7MqT83SGcE9n7t36","name":"GTL1_27","common_data":"","questions":[{"type":"Subjective","index":0,"statement":"<p>In the given <img alt=\"\" border=\"0\" height=\"11\" hspace=\"0\" src=\"data:image/png;base64,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\" style=\"width:11px;height:11px;margin-top:0px;margin-bottom:0px;margin-left:0px;margin-right:0px;border:0px solid black;\" vspace=\"0\" width=\"11\" />ABC, <img alt=\"\" border=\"0\" height=\"10\" hspace=\"0\" src=\"data:image/png;base64,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\" style=\"width:11px;height:10px;margin-top:0px;margin-bottom:0px;margin-left:0px;margin-right:0px;border:0px solid black;\" vspace=\"0\" width=\"11\" />BCA=<img alt=\"\" border=\"0\" height=\"10\" hspace=\"0\" src=\"data:image/png;base64,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\" style=\"width:11px;height:10px;margin-top:0px;margin-bottom:0px;margin-left:0px;margin-right:0px;border:0px solid black;\" vspace=\"0\" width=\"11\" />BAC. What can be the perimeter of <img alt=\"\" border=\"0\" height=\"11\" hspace=\"0\" src=\"data:image/png;base64,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\" style=\"width:11px;height:11px;margin-top:0px;margin-bottom:0px;margin-left:0px;margin-right:0px;border:0px solid black;\" vspace=\"0\" width=\"11\" />ADC, if all sides have integral values?</p>\n\n<p><img alt=\"\" border=\"0\" height=\"166\" hspace=\"0\" 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\" style=\"width:286px;height:166px;margin-top:0px;margin-bottom:0px;margin-left:0px;margin-right:0px;border:0px solid black;\" vspace=\"0\" width=\"286\" /></p>\n\n<p><em>Type in the answer as an Integer. For example, if your answer is 19, type in 19</em></p>\n","instructions":"","options":[{"index":0,"statement":"13","is_correct":true,"feedback":"<p>Good Work! Using similar triangles, we can easily find out the missing side length! </p>\n"}],"num_of_options":1,"num_of_correct_options":1,"correct_response":"{\"13\":true}","feedback":"{}","general_wrong_feedback":"<p>C’mon! Put on your thinking cap. Think of using similar triangles in triangle ABC & triangle ACD</p>\n"}],"state":"UNDER-REVIEW","topic_tags":["CAT","Quantitative Ability","Geometry","Triangles ","Properties of Triangles"]}}' $islogin = (int) 0 $qsData = object(stdClass) { _id => 'n7MqT83SGcE9n7t36' name => 'GTL1_27' common_data => '' questions => array( (int) 0 => object(stdClass) {} ) state => 'UNDER-REVIEW' topic_tags => array( (int) 0 => 'CAT', (int) 1 => 'Quantitative Ability', (int) 2 => 'Geometry', (int) 3 => 'Triangles ', (int) 4 => 'Properties of Triangles' ) }UrlsController::question() - APP/Controller/UrlsController.php, line 235 ReflectionMethod::invokeArgs() - [internal], line ?? Controller::invokeAction() - CORE/Cake/Controller/Controller.php, line 499 Dispatcher::_invoke() - CORE/Cake/Routing/Dispatcher.php, line 193 Dispatcher::dispatch() - CORE/Cake/Routing/Dispatcher.php, line 167 [main] - APP/webroot/index.php, line 118
Notice (8): Use of undefined constant desc - assumed 'desc' [APP/Controller/UrlsController.php, line 236]Code Context$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--properties-of-triangles-in-the-givennbspabc-bcabac-what-can-be-the' $output = '{"success":true,"question":{"_id":"n7MqT83SGcE9n7t36","name":"GTL1_27","common_data":"","questions":[{"type":"Subjective","index":0,"statement":"<p>In the given <img alt=\"\" border=\"0\" height=\"11\" hspace=\"0\" src=\"data:image/png;base64,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\" style=\"width:11px;height:11px;margin-top:0px;margin-bottom:0px;margin-left:0px;margin-right:0px;border:0px solid black;\" vspace=\"0\" width=\"11\" />ABC, <img alt=\"\" border=\"0\" height=\"10\" hspace=\"0\" src=\"data:image/png;base64,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\" style=\"width:11px;height:10px;margin-top:0px;margin-bottom:0px;margin-left:0px;margin-right:0px;border:0px solid black;\" vspace=\"0\" width=\"11\" />BCA=<img alt=\"\" border=\"0\" height=\"10\" hspace=\"0\" src=\"data:image/png;base64,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\" style=\"width:11px;height:10px;margin-top:0px;margin-bottom:0px;margin-left:0px;margin-right:0px;border:0px solid black;\" vspace=\"0\" width=\"11\" />BAC. What can be the perimeter of <img alt=\"\" border=\"0\" height=\"11\" hspace=\"0\" src=\"data:image/png;base64,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\" style=\"width:11px;height:11px;margin-top:0px;margin-bottom:0px;margin-left:0px;margin-right:0px;border:0px solid black;\" vspace=\"0\" width=\"11\" />ADC, if all sides have integral values?</p>\n\n<p><img alt=\"\" border=\"0\" height=\"166\" hspace=\"0\" 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\" style=\"width:286px;height:166px;margin-top:0px;margin-bottom:0px;margin-left:0px;margin-right:0px;border:0px solid black;\" vspace=\"0\" width=\"286\" /></p>\n\n<p><em>Type in the answer as an Integer. For example, if your answer is 19, type in 19</em></p>\n","instructions":"","options":[{"index":0,"statement":"13","is_correct":true,"feedback":"<p>Good Work! Using similar triangles, we can easily find out the missing side length! </p>\n"}],"num_of_options":1,"num_of_correct_options":1,"correct_response":"{\"13\":true}","feedback":"{}","general_wrong_feedback":"<p>C’mon! Put on your thinking cap. Think of using similar triangles in triangle ABC & triangle ACD</p>\n"}],"state":"UNDER-REVIEW","topic_tags":["CAT","Quantitative Ability","Geometry","Triangles ","Properties of Triangles"]}}' $islogin = (int) 0 $qsData = object(stdClass) { _id => 'n7MqT83SGcE9n7t36' name => 'GTL1_27' 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 => 'Properties of Triangles' ) }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 : Subjective
In the given ABC,
BCA=
BAC. What can be the perimeter of
ADC, if all sides have integral values?
Type in the answer as an Integer. For example, if your answer is 19, type in 19
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