I want to make sure that this is right with respect to the cardinality Consider the following sets:

Ciara Mcdaniel

Ciara Mcdaniel

Answered question

2022-07-08

I want to make sure that this is right with respect to the cardinality
Consider the following sets: A = { 0 , 1 }, B = { { 0 , 1 } } and C = A B. Enumerate the following sets and report their cardinality:
No. 1: 2 C
No. 2: C × C (cross-product)
No. 1: { } , { 0 } , { 0 , 1 } , { 1 } , { 0 , 0 } , { 0 , 1 } , { 1 , 0 } , { 1 , 1 }, so we have 8, so 2 8 would be 256 and that would be the cardinality.
No. 2: { 0 } , { 0 , 1 } , { 1 } , { 0 , 0 } , { 0 , 1 } , { 1 , 0 } , { 1 , 1 } , { 0 } , { 0 , 1 } , { 1 } , { 0 , 0 } , { 0 , 1 } , { 1 , 0 } , { 1 , 1 } so it would be 14 for the cardinality.
I just want to make sure if these are right, and if not, find out where I went wrong.

Answer & Explanation

Hayley Mccarthy

Hayley Mccarthy

Beginner2022-07-09Added 19 answers

Step 1
There are a number of issues here. For example, you have counted a few elements twice in your enumeration of 2 C e.g. { 0 , 0 } = { 0 } and { 0 , 1 } = { 1 , 0 } and missed out B = { { 0 , 1 } } as a subset of C.
To find the power set, it helps to first explicitly write out the elements of the original set:
C = A B = { 0 , 1 } { { 0 , 1 } } = { 0 , 1 , { 0 , 1 } } ..
Then we count the subsets in increasing order of cardinality as
{ } , { 0 } , { 1 } , { { 0 , 1 } } , { 0 , 1 } , { 0 , { 0 , 1 } } , { 1 , { 0 , 1 } } , { 0 , 1 , { 0 , 1 } } .
You can determine the cardinality of 2 C by noting that since the cardinality of C is 3, then the cardinality of 2 C is 2 3 = 8.
Step 2
To enumerate the elements of C × C, we list the ordered pairs of elements in C i.e.
{ 0 , 0 } , { 0 , 1 } , { 0 , { 0 , 1 } } , { 1 , 0 } , { 1 , 1 } , { 1 , { 0 , 1 } } , { { 0 , 1 } , 0 } , { { 0 , 1 } , 1 } , { { 0 , 1 } , { 0 , 1 } } .
The cardinality of C × C is then 3 × 3 = 9.

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