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Company
. I. All G's are H's II. All G's are J's or K's III All J's and K's are G's
IV. All L's are K's V. All N's are M's VI. No M's are G's
Q1. If no P's are K's which of the following must be true
(A) No P is a G (B) No P is an H (C) If any P is an H it is a G (D) If any P is a G it is a J
Q2. Which of the following can be logically deduced from the stated conditions
(A) No M's are H's (B) No H's are M's (C) Some M's are H's (D) No N's are G's
Q3. Which of the following is inconsistent with one or more conditions
(A) All H's are G's (B) All H's are M's (C) Some H's are both M's and G's (D) No M's are H's
Q4. The statement "No L's are J's" is
I. Logically deducible from the conditions stated
II Consistent with but not deducible from the conditions stated
III. Deducible from the stated conditions together with the additional statements "No J's are K's"
(A) I only (B) II only (C) III only (D) II and III only
Read Solution (Total 11)
-
- 1)D
2)D
3)C
4)D
- 12 years agoHelpfull: Yes(8) No(4)
- Q1)ANS IS OPTION A
- 12 years agoHelpfull: Yes(6) No(7)
- Answers :
1. D
2. D
3. B and C
4. D
Reason :
Try using venn diagram.
These answers can be easily deduced.
- 12 years agoHelpfull: Yes(6) No(0)
- Q2)DUE TO LOGIC DEDUCED CONDITION,THE H'S ARE EQUAL ONLY FOR G'S. SO,THE ANSWER IS OPTION C
- 12 years agoHelpfull: Yes(1) No(8)
- Q3) THE ANSWER IS OPTION A & D
- 12 years agoHelpfull: Yes(1) No(5)
- Q1) THE LINK BETWEEN G'S ARE EQUAL TO J'S,K'S AND L'S BUT IT IS NOT EQUAL TO N'S AND M'S,SO P'S ARE NOT EQUAL FOR G'S,SO IT IS EQUAL FOR M'S
- 12 years agoHelpfull: Yes(0) No(4)
- Q1) option is A
- 11 years agoHelpfull: Yes(0) No(0)
- 1(a),
2(a),
3(a).
4(a) - 10 years agoHelpfull: Yes(0) No(0)
- @ANN MARY JOLLY can u explain the 3rd question? from the statement I , H is a superset of G. therefore option A - All H's are G's - also seems to be inconsistent for me!! so the ans should be options A,B & C.
- 10 years agoHelpfull: Yes(0) No(0)
- 1)a
2)b
3)d
4)c - 10 years agoHelpfull: Yes(0) No(0)
- 1) C
2) D
3) C
4) B - 10 years agoHelpfull: Yes(0) No(0)
Microsoft Other Question
In a certain society, there are two marriage groups, red and brown. No marriage is permitted within a group. On marriage, males become part of their wives groups; women remain in their own group. Children belong to the same group as their parents. Widowers and divorced males revert to the group of their birth. Marriage to more than one person at the same time and marriage to a direct descendant are forbidden
Q1. A brown female could have had
I. A grandfather born Red II. A grandmother born Red III Two grandfathers born Brown
(A) I only (B) III only (C) I, II and III (D) I and II only
Q2. A male born into the brown group may have
(A) An uncle in either group (B) A brown daughter (C) A brown son (D) A son-in-law born into red group
Q3. Which of the following is not permitted under the rules as stated.
(A) A brown male marrying his father's sister (B) A red female marrying her mother's brother
(C) A widower marrying his wife's sister (D) A widow marrying her divorced daughter's ex-husband
Q4. If widowers and divorced males retained their group they had upon marrying which of the following would be permissible ( Assume that no previous marriage occurred)
(A) A woman marrying her dead sister's husband (B) A woman marrying her divorced daughter's ex-husband
(C) A widower marrying his brother's daughter (D) A woman marrying her mother's brother who is a widower.
There is a temple, whose premises have a garden and a pond. It has 4
idols, each of Ram, Shiv, Vishnu and Durga. The priest plucks x flowers
from the garden and places them in the pond. The number of flowers
doubles up, and he picks y flowers out of them and goes to offer it to
Lord Ram. By the time he reaches to the pond, he finds the remaining
flowers also have doubled up in the meantime, so he again picks up y from
the pond and goes to Lord Shiv.This process is repeated till all the Gods
have y flowers offered to them, such that in the end no flower is left in
the pond. Find x and y.