Problem: - Which term will replace the question mark in the series:
ABD, DGK, HMS, MTB, SBL,?
Solution: Clearly, the first letters of the first, second, third, fourth, and fifth terms are moved three, four, five, six and seven steps forward respectively to obtain the first letter of the successive terms. The second letters of the first, second, third, fourth and fifth terms are moved five, six, seven, eight and nine steps forward respectively to obtain the second letter of the successive terms. The third letters of the first, second, third, fourth and fifth terms are moved seven, eight, nine, ten and eleven steps forward respectively to obtain the third letter of the successive terms.
Thus the missing term is ZKW (Answer)
Difficult Logic Problems next Set
Problem: - A child is looking for his father. He went 90 meters in the east before turning to his right. He went 20 meters before turning to his right again to look for his father at his uncle’s place 30 meter from this point. His father was not there. From there, he went 100 meters to his north before meeting his father in a street. How far did the son meet his father from the starting point?
Solution: - Clearly the child moves from A 90m eastwards up to B, then turns right and moves 20m up to C, then turns right and moves 30m up to D. Finally, he turns right and moves 100m up to E.
difficult logic problem
Clearly, AB = 90m, BF = CD = 30m.
So, AF = AB- BF = 60m
Also, DE = 100m, DF = BC = 20m
So, EF = DE- DF = 80m.
Therefore, his distance from starting point A = AE = `sqrt[ (AF)^2 +(EF)^2]` = `sqrt[(60)^2 + (80)^2]`
= `sqrt(3600 + 6400)` = `sqrt10000` = 100m (Answer)
Problem: - Each odd digit in the number 5263187 is substituted by the next higher digit and each even digit is substituted by the previous lower digit and the digits so obtained are rearranged in the ascending order, which of the following will be the third digit from the left end after the rearrangement?
Solution: - After performing operation on the digit we get 6154278
Arranging the above number in ascending order we get 1245678
Here third digit from the left end is 4. (Answer)
More Difficult Logic Problems
Problem: - In a certain code TEMPORAL is written as OLDSMBSP. How is CONSIDER written in that code? (Answer: RMNBSFEJ)
Problem: - In a certain code language ‘how many goals scored’ is written as ‘5 3 9 7’; ‘many more matches’ is written as ‘9 8 2’ and ‘he scored five’ is written as ‘1 6 3’. How is ‘goals’ written in that code language? (Answer: either 5 or 7)
Problem: - Reaching the place of meeting on Tuesday 15 minutes before 08.30 hours, Jack found himself half an hour earlier than the man who was 40 minutes late. What was the scheduled time of the meeting? (Answer: 8.05 hrs)