Statements: N ≥ O ≥ P = Q > R
Conclusions: I. N > R II. R = N
Only conclusion I is true
Only conclusion II is true
Either conclusion I or II is true
Neither conclusion I nor II is true
Both conclusions I and II are true
We have, N≥O≥P = Q > R. Hence, only conclusion I is true.
Statements: B $ N, N × R, R + T
Conclusions: I. B $ R II. T @ N
Statements: N × P, K + P, Q @ K
Conclusions: I. K + N II. Q + N
Statements: P @ Q, M # N, N**Q
Conclusions:
I. P $ M
II. N # P
Statements: P $ Q; N # M; M @ R; R * P
I. P + N
II. Q $ M
Statements: M ÷ N, P × Q, P + N
I. N + Q
II. N - Q