Analytical Reasoning Question No. 64
In a certain target-firing game, a group must fire at seven targets. Exactly one fired is allowed for shooting at-each target. The targets are numbered in consecutive order from 1 to 7. The game is being played by a three-member group consisting of players M, N, and O, who must observe the following rules:
1. The seven targets must be fired at in consecutive order, starting with target 1.
2. Both M and O can fire at odd-numbered and even-numbered targets.
3. N cannot fire at even-numbered targets.
4. M and N must each fire at no fewer than two targets.
5. O must take exactly one fired.
6. M cannot take three consecutive fires.
1. If all group members take exactly their required minimum number of fires before any group member takes an additional fired, then the next target to be fired at in the game after the required minimum of fires is target
(A) 3 (B) 4 (C) 5 (D) 6 (E) 7
2. If N takes the same total number of fires during the game as one other group member, then which of the following is true?
(A) M must fire at even-numbered targets only.
(B) N must fire at all of the odd-numbered targets.
(C) O must fire at an odd-numbered target.
(D) M and O must each fire at exactly one odd-numbered target.
(E) Either M or O, but not both, must fire at exactly one odd-numbered target.
3. If all odd-numbered but no even-numbered targets are hit during the game, then all of the following are possible total numbers of hits for each player at the end of the game EXCEPT
(A) M = 2; N= 1; O = 1 (B) M= 1; N=2; O= 1
(C) M = 0; N = 3; O = 1 (D) M = 2; N = 2; O = 0
(E) M= 1; N = 3; O = 0
4. If, during the game, M and N each hit exactly half of the targets that each shoots at, then the lowest possible total number of hits that the group could make in the game is
(A) 1 (B) 2 (C) 3 (D) 4 (E) 5
1. The seven targets must be fired at in consecutive order, starting with target 1.
2. Both M and O can fire at odd-numbered and even-numbered targets.
3. N cannot fire at even-numbered targets.
4. M and N must each fire at no fewer than two targets.
5. O must take exactly one fired.
6. M cannot take three consecutive fires.
1. If all group members take exactly their required minimum number of fires before any group member takes an additional fired, then the next target to be fired at in the game after the required minimum of fires is target
(A) 3 (B) 4 (C) 5 (D) 6 (E) 7
2. If N takes the same total number of fires during the game as one other group member, then which of the following is true?
(A) M must fire at even-numbered targets only.
(B) N must fire at all of the odd-numbered targets.
(C) O must fire at an odd-numbered target.
(D) M and O must each fire at exactly one odd-numbered target.
(E) Either M or O, but not both, must fire at exactly one odd-numbered target.
3. If all odd-numbered but no even-numbered targets are hit during the game, then all of the following are possible total numbers of hits for each player at the end of the game EXCEPT
(A) M = 2; N= 1; O = 1 (B) M= 1; N=2; O= 1
(C) M = 0; N = 3; O = 1 (D) M = 2; N = 2; O = 0
(E) M= 1; N = 3; O = 0
4. If, during the game, M and N each hit exactly half of the targets that each shoots at, then the lowest possible total number of hits that the group could make in the game is
(A) 1 (B) 2 (C) 3 (D) 4 (E) 5
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