If it is given that 1PS, 3TS and TQ2, is P greater than Q?
I. 1XY means X is not smaller than Y. XY1 means X is not greater than Y.
II. 2XY means Y is neither greater than nor smaller than X.
III. 3XYmeans Y is neither smaller than nor equal to X. XY2 means Y is neither greater than nor equal to X
From I, 1PS means P S From III, 3TS means S > T And TQ2 means Q < T Combining I and III, P S > T > Q Thus, P is greater than Q.
Statements: C = A ≤ H < K ≥ L = Q; S = T ≥ K
Conclusion: I. C < T II. A = S
Statements: P > Q = R ≤ S; R > T > U; U = Z ≥ O
Conclusions:
I. P > U
II. O < S
III. R > P
Statements: M % C & G @ T $ D; W % M # P
Conclusions : I. D % C II. M % G I...
Statements: B > K < Y, E > C ≥ O = Y
Conclusions:
I. C > B
II. E ≤ Y
III. E > K
IV. O ≥ K
...In the question, assuming the given statements to be true, find which of the conclusion (s) among given two conclusions is /are definitely true and the...
Statements: Q @ X % Y % W; Y $ O $ B
Conclusions:
I. X % B
II. Q @ W
III. O $ X
...In the following questions assuming the given statements to be true, find which of the conclusion among given conclusions is/are definitely true and th...
Statements: O < D ≤ T; C ≥ X = U; Y < Z = C > D
Conclusions:
I. U ≤ Z
II. O ≤ C
III. Y < D
Statements: V ≤ R ≥ Q; R ≤ N < Y; I > Y ≤ S
Conclusions:
I. V ≤ S
II. I > Q
III. S > N
Statements: A > Y = D > Q, M ≤ B > P > Y
Conclusion:
I. Y ≤ M
II. B > Q