tag:blogger.com,1999:blog-2256620496386854871.post1827689401277590803..comments2019-08-18T07:49:18.500+05:30Comments on Gr8AmbitionZ | Prepare for IBPS PO IX, IBPS Clerks IX, Insurance Eams | Current Affairs 2019: Shortcuts to Solve Classification / Odd Man Out Series Problems - NumbersUnknownnoreply@blogger.comBlogger5125tag:blogger.com,1999:blog-2256620496386854871.post-70057467314339520972014-07-06T02:07:28.320+05:302014-07-06T02:07:28.320+05:30shivani di, you are my engel...... thank you so mu...shivani di, you are my engel...... thank you so much and also thank your team member please try to clear the fundamental problems of all sections of reasoning and english like basic formula etcAnonymousnoreply@blogger.comtag:blogger.com,1999:blog-2256620496386854871.post-79104876460863693382014-07-06T00:01:28.853+05:302014-07-06T00:01:28.853+05:30In problem 3 one more logic is following but then ...In problem 3 one more logic is following but then answer is different...every number has a sum of 14 except option 2....it is quite confusing to follow a particular method..Anonymousnoreply@blogger.comtag:blogger.com,1999:blog-2256620496386854871.post-25185293767477795452014-07-05T20:50:46.795+05:302014-07-05T20:50:46.795+05:30Hi first of all thank you so much for the posts fo...Hi first of all thank you so much for the posts for SBI clerk study material. i have been following all the post in this website.<br /><br />I have found another logic in example no 3: Thought of sharing it:<br /><br /><br /><br />In example 3 there is another logic to get to the answer<br />Another logic is:<br /><br />1+7+6 = 14<br />2+3+1 = 6 ---> This must be the answer<br />5+7+2 = 14<br />4+7+3 = 14<br />6+5+3 = 15<br /><br />I think this logic can also apply.Max Khan is herehttps://www.blogger.com/profile/11250036015792431782noreply@blogger.comtag:blogger.com,1999:blog-2256620496386854871.post-42395937862025257962014-07-05T19:46:13.879+05:302014-07-05T19:46:13.879+05:30Thank u soo much for such a wonderful explanation....Thank u soo much for such a wonderful explanation.ridhighttps://www.blogger.com/profile/18079885744633004954noreply@blogger.comtag:blogger.com,1999:blog-2256620496386854871.post-51876648213968741872014-07-05T18:45:41.301+05:302014-07-05T18:45:41.301+05:30ThanksThanksAnonymousnoreply@blogger.com