A lives on an even-numbered floor but not on the floor numbered second or fourth. Only three floors are there between A and P. 
There are equal numbers of floors between the floors on which K and P live and between the floors on which A and K live. Only two people live between Q and K. 
There is no flat empty for L and J in CASE2A so CASE2A is cancelled out. V lives on a floor below J in CASE2B so CASE2B is cancelled out. Final arrangement: 
Statements: Q $ W, W % E, E @ K
Conclusions: a) Q $ K b) W @ K
Statements: R > S > T ≥ U; Q ≥ R; W = V < U
Conclusions:
I. S > Q
II. W < T
III. Q > W
Statements: X < Y < Z = L, R = S > T, T ≥ U < V = W > X
Conclusions:
I. R > Y
II. W < L
III. S > X
Statement: M > K ≥ V ≥ G; Q < T < M
Conclusion:
I. T < G
II. Q < V
Statements: Q ≥ B > G = F ≥ J; W ≤ B = N < L.
Conclusions:
I. N > J
II. Q > L
Statement: C > S > F > B > L; I > B > T
Conclusion: I. I > L II. T < C
In the question, assuming the given statements to be true, find which of the conclusion (s) among given three conclusions is/are definitely true and th...
Statements:
C > D ≥ E ≤ F; Y ≥ Z ≥ A = C
Conclusion:
I. Y > F
II. F ≥ Y
Statements: E = F < G < H; I ≥ J = H; K > I
Conclusions:
I. E > J
II. K = J
III. F < K
Statements: A ≤ B > C ≥ D > F, B ≤ E > G, D < H
Conclusions: I. G ≥ A
II. H > F
