Question
Select the option in which the numbers share the same
relationship in set as that shared by the numbers in the given set. (Note: Operations should be performed on the whole numbers, without breaking down the numbers into its constituent digits. E.g., Operation on 13 such as adding/subtracting/ Multiplying etc. to 13 can be performed. Breaking down 13 into 1 and 3 and then performing mathematical operations on 1 and 3 is not allowed) Given Sets: (45, 75, 105) (62, 92, 122)Solution
The logic followed here is: Second number = First number + 30 Third number = Second number + 30 Checking the given sets: (45, 75, 105) β 45 + 30 = 75, 75 + 30 = 105 (62, 92, 122) β 62 + 30 = 92, 92 + 30 = 122 Now, checking the options: (38, 68, 98) β 38 + 30 = 68, 68 + 30 = 98 (51, 81, 111) β 51 + 30 = 81, 81 + 30 = 111 (57, 87, 119) β 57 + 30 = 87, 87 + 30 = 117 (40, 70, 100) β 40 + 30 = 70, 70 + 30 = 100
- Statements: K < R β€ G < V; K β₯ M > N; I > V
Conclusions:
I. K > I
II. I > M
III. N < G Statements: S @ O, O & E, E $ K, K # C
Conclusions: I. S @ K II. K @ O III. C @ E
...Statements: A > O = I β₯ C = D > K = P, P < M = R
Conclusions:
I. C > R
II. R > K
III. P β€ O
Statements:Β R @ C % L #Β X & P $ AΒ # W; Q $ L @ X
Conclusions:
I. W @ L
II. A # Q
III. R @ X
...Statements: A β₯ B = C > D = F, H < G β€ C, C > I β₯ J β₯ E
Conclusions:
I. H > F
II. A > E
III. H β€ F
Statements: X = P β₯ M; M > M > I > L; P < L < G
Conclusions:
I. G > I
II. X β₯ L
III. L < L
Statement: D > T > G > C > M; J > C > U
Conclusion:
I. J > M
II. U < D
In the question, assuming the given statements to be true, find which of the following conclusion(s) among the three conclusions is/are definitely true...
Statements: H < I; J < L < K; H β₯ L > M
Conclusions:
I. J < I
II. M < K
III. K > I
Statements: S > P = N β₯ G; Y = G β₯ J < O
Conclusions:
I. P β₯ J
II. J < P
