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Since they are more logic-based problems, questions on polygonal seating arrangements are frequently asked in various competitive examinations. There are many types of seating arrangements in reasoning. The logical reasoning section has many problems based on this topic, which are quite time-consuming. This, in turn, demands some kinds of polygonal arrangement tricks and short methods that can be used to solve such questions without much time consumption. Many kinds of polygonal seating arrangements tricks have been devised by various experts that not only makes it easy for the candidates to solve these questions but saves them some time to devote to other sections as well.
Polygonal Arrangement
In this seating arrangement, people or any articles have to be placed to end up in the shape of some polygon. There are questions on various types of seating arrangements in the reasoning section. The shape could be any polygon, starting from a three-sided triangle.
For example, suppose there is a pentagonal arrangement. In that case, the candidate has to arrange people in such a manner adjacent to each other that they end up sitting in a pentagonal fashion.
Polygonal seating arrangements tricks
Analyse the question
The first step is to understand all the dynamics of the questions and analyse them. After that, the candidate is expected to understand what the question wants.
Congregate all the information
After that, the candidate is expected to jot down all the conditions given in the questions in bullet points. This would eliminate the task of looking into the question again and again.
For example, if it says X is sitting to the right of Y and H is sitting to the right of U,
you could sum it up as Y →X, U→H
Rough Diagram
After the previous step, from all the information you’ve gathered, try to make a rough diagram that satisfies all the conditions specified in the question. Draw the given polygon and fill up the positions according to the context. There would be instances when one or two conditions would prove the diagram wrong. This is why it would be suggested to keep all the possibilities in mind and draw all the possible diagrams so that the ones that don’t satisfy can be ruled out and in the end, the one that stays is the correct one.
For example, Let’s take a question. Five children, A, K, U, C, Z, sit together. A sits next to K, and K sits to the left of C. Z
Sits to the right of U. After two people sitting on the right of A, C sits. If we move to the right starting from K, after skipping one person, Z is sitting. Determine the two children You is sitting between
How to solve it?
First, we will note down all the information in short points.
K←C
U→Z
A _ _ C
K _ Z
Now, make a polygon and assign positions to every person.
If C is on the right side of K, this naturally means A would be on its left side. This also means that the person sitting between K and Z would be C. So, Z is to the right of C. IF we move to the right side, starting from A, skipping two people, we get C. If Z is on the right of C and all other positions have been assigned, that leaves us with only U. So, U is between A and Z.
Advanced level problems on this topic require permutation and combination since they cannot be solved with the use of simple hit and trial methods. The simple polygonal seating arrangement tricks mentioned above wouldn’t be able to help in those scenarios.
Such questions based on types of seating arrangement in reasoning sections are mainly asked in many competitive examinations. The polygonal seating arrangement tricks come in handy for the candidates appearing for those examinations.
Conclusion
Polygonal Seating Arrangements trick can be quite scoring if used to solve problems with patience. They can easily add up to the overall marks for the exam. According to remarks by experts, questions about this pattern have been recurring for the past few years. If followed in an orderly fashion, the strategies would help the candidates decode the question. The above tricks do act as a major source of help, but at the same time, practice is equally needed for such questions so that one can keep all possibilities in mind while attempting the exam.
