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Consider the following Posets:

$I)\left ( \left \{ 1,2,5,7,10,14,35,70 \right \},\leq \right )$

$II)\left ( \left \{ 1,2,3,6,14,21,42 \right \},/ \right )$

$III)\left ( \left \{ 1,2,3,6,11,22,33,66 \right \},/ \right )$

Which of the above poset are isomorphic to $\left ( P\left ( S \right ),\subseteq \right )$ where $S=\left \{ a,b,c \right \}?$

2 Answers

Best answer
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This can be solved easily by drawing a Hasse Diagram..

See that all the properties of isomorphic graphs (same number of edges and vertices, connectivity preservation) are satisfied.

So option 3 is Ans

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This poset has 8 nodes in hasse diagram.

So its isomorphic poset should also have 8 nodes.

So option 2 eliminated as it has only 7 nodes.

Option 1 is a chain so we cant get the cube like structure.

So optiion 1 also eliminated.

$\therefore$ Option 3 is the correct answer.

If we draw it we will get same stucture of hasse diagram as shown above.

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Hi Guys,For the following question provided answer is 1(means 'h' ). But why is element 'g' can not complement of 'b' ?