Out of six numbers in some order, we know third and fourth ranked numbers in every five out of the six numbers. Find the first [closed]

Question

Out of six numbers 1,2,3,4,5 and 6 in some order, we know third and fourth ranked numbers in every five out of the six numbers. Find the first ranked in the order given.

for example, if the ranks were, 3 > 6 > 2 > 5 > 1 > 4

and you gave me 1,2,3,4 and 5, I'd say that third-ranked is 5 and fourth-ranked is 1. In the same way I'd give the third and fourth ranked out of any five given numbers.

How would one find the highest ranked out of all these numbers?(If it is possible at all) And in how many steps (one step is giving me one tuple of five numbers)? I'd also appreciate if one could suggest better tags for this.

EDIT:- also find the last (lowest) ranked out of all these numbers if possible

Answer 1

There's no way: you cannot compare the top two numbers. All comparisons' results will be the same if those two were switched.

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With the new question, yes, it is possible. Say the numbers are secretly (a) to (f), where "a" is the highest and "f" is the lowest.There are six possible comparisons:

ab[cd]e  
ab[cd]f  
ab[ce]f  
ab[de]f 
ac[de]f  
bc[de]f  

The sets of two distinguished elements have one pair that appears exactly once (c and e), and one pair that appears exactly twice (c and d). The set of three undistinguished elements is the same in all three of these trials, except for one of them; the element that is in two of these three sets is the lowest-ranked element.

Answer 2

The new question is:

impossible

because:

ranks 1, 2 and 6 are never returned by the answerer, and so we cannot determine their order.