Notice, the table is circular, but since every person to be seated has to be seated in relation to another person, and since the arrangement works from the center, where the two children are, to the outside, where the two sets of grandparents sit, the answer is the same as it would be were we arranging a row of eight people.
You can start this one in multiple ways. Maybe the best way is to start with the children.
The children can be arranged in 2 ways, C₁C₂ or C₂C₁.
The parents of the children have to sit next to the children and can also be arranged in 2 ways, P₁CCP₂ or P₂CCP₁.
The somewhat tricky part is understanding the implications of the fact that the pairs of grandparents are always at the sides of their respective children.
For instance, the grandparents that go with P₁ will always be next to P₁, whether P₁ is to the left or to the right of the children.
We could make G₁ and G₂ the grandparents that go with P₁ and G₃ and G₄ the grandparents that go with P₂.
One possible arrangement is the following.
G₁G₂P₁C₁C₂P₂G₃G₄
If P₁ and P₂ were to swap sides, their respective sets of grandparents would go with them.
G₃G₄P₂C₁C₂P₁G₁G₂
So the positions of the pairs of grandparents are dictated by the positions of the parents that the grandparents sit beside.
Therefore the only way that the grandparents themselves can be arranged in different ways is by reversing them within their own pairs, for instance, the grandparents with P₁ could be arranged G₁G₂P₁ or G₂G₁P₁.
So the parents and children can be arranged in 2 x 2 = 4 ways, and then for each of those four ways each pair of grandparents can be arranged in two different ways, giving us 2 x 2 = 4 ways to arrange the grandparents.
So the total number of ways in which they all can be arranged is 2 x 2 x 2 x 2 = 16 ways.
The correct answer is
.
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Marty Murray | Chief Curriculum and Content Architect
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