In each question below are three statements followed by two conclusions numbered I and II. You have to take the three given statements to be true even if they seem to be at variance with commonly known facts and then decide which of the given conclusions logically follows from the three statements disregarding commonly known facts. Statements: All numbers are digits. All alphabets are numbers. All words are alphabets. Conclusions: I. All words are digits. II. Some numbers are not words.
A) If only Conclusion I follows.
B) If only Conclusion II follows.
C) If either Conclusion I or Conclusion II follows
D) If neither Conclusion I nor Conclusion II follows
A) If only Conclusion I follows.
B) If only Conclusion II follows.
C) If either Conclusion I or Conclusion II follows
D) If neither Conclusion I nor Conclusion II follows
A word is represented by only one set of numbers as given in any one of the alternatives. The sets of numbers given in the alternatives are represented by two classes of alphabets as shown in the given two matrices. The columns and rows of Matrix-I are numbered from 0 to 4 and that of Matrix-II are numbered from 5 to 9. A letter from these matrices can be represented first by its row and next by its column, for example 'K' can be represented by 01, 34, etc... and 'P' can be represented by 65, 99, etc... Similarly, you have to identify the set for the word "BLAND".
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