Having trouble proving if two sets are equal or not I am trying to figure out how to prove if two s

tr2os8x

tr2os8x

Answered question

2022-06-13

Having trouble proving if two sets are equal or not
I am trying to figure out how to prove if two sets are equivalent or not by using the laws and rules of set theory but I am having a hard time with questions involving algebraic expressions.
D = { 3 r + 1 | r Z }
E = { 3 s + 2 | s Z }
Determine if this statement is true or false: D = E

Answer & Explanation

timmeraared

timmeraared

Beginner2022-06-14Added 22 answers

Step 1
A basic axiom of set theory, called Extensionality, is that sets D,E are equal iff they have the same member(s). More precisely, D = E iff every x either belongs to D and to E, OR doesn't belong to D nor to E. So to prove D E, it suffices to find an x with ( x D and x E )) or ( x E and x D ) ..
Step 2
For example, in your Q, 1 = 3 0 + 1 D ,, but 1 E. Because if 1 = 3 s + 2 E with s Z then 1 / 3 = s Z ,, which is absurd.

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