1 votes 1 votes VS asked Jan 24, 2018 VS 532 views answer comment Share Follow See all 10 Comments See all 10 10 Comments reply joshi_nitish commented Jan 24, 2018 reply Follow Share (i) (ii) and (iii), all are needed together simultaneously to answer above query. and E is middle person 0 votes 0 votes Anu007 commented Jan 24, 2018 reply Follow Share Nitish look this case EBCDA 0 votes 0 votes hs_yadav commented Jan 24, 2018 reply Follow Share option D is the correct all informaton r needed to decide who is in the midddle.... 0 votes 0 votes joshi_nitish commented Jan 24, 2018 reply Follow Share okk sir, i missed this case, therefore taking all 3 statements together also is not sufficient to answer above query. 0 votes 0 votes hs_yadav commented Jan 24, 2018 reply Follow Share row is like this... AD E BC 0 votes 0 votes joshi_nitish commented Jan 24, 2018 reply Follow Share @harendra, what about 'EBCDA' ? 0 votes 0 votes hs_yadav commented Jan 24, 2018 reply Follow Share @ joshi_nitish bat to sahi kahi bhai...joshi.... means more information is needed...like just left/just right/ adjacent 0 votes 0 votes VS commented Jan 24, 2018 reply Follow Share I think here adjacent is implied ! 0 votes 0 votes VS commented Jan 24, 2018 reply Follow Share If adjacent is implied then we can answer the query using (1) and (3) only I think . (1) CBE / EBC (2) EB (3) ADE / EDA Now, If we take : CBE then ADE (Not feasible) so, only EDA i.e. CBEDA ----> E is middle Now, If we take : EBC then EDA (Not feasible) so, only ADE i.e. ADEBC ----> E is middle Hence, only (1) and (3) are sufficient ! Anything wrong above ? 1 votes 1 votes Tanuj Guha Thakurta commented Jan 24, 2018 reply Follow Share If adjacency is implied then it should be implied for both "to the right" as well as "between". So if we consider the second option which says B is in right of E then it means BE is there. Also if we consider the third statement which says D is in middle of A and E then ADE is there. Right of D can only be A or B not both. So second and third option are contradicting each other if we assume adjacency. 0 votes 0 votes Please log in or register to add a comment.