Prove that <munder> &#x22C3;<!-- ⋃ --> <mrow class="MJX-TeXAtom-ORD"> x

Mohamed Mooney

Mohamed Mooney

Answered question

2022-06-13

Prove that x ( 1 , ) [ 1 x , x ) = ( 0 , )
Is my proof correct:
First I would define the union:
S = { y R x ( 1 , ) ; y [ 1 x , x ) }
1) S ( 0 , ) proof: There exists x such that [ 1 x , x ) ( 0 , ), let's say x = 2
2) ( 0 , ) S proof:
Let's say that z ( 0 , ), we can pick z = x 2 z [ 1 x , x ) z S
Is my proof correct ?

Answer & Explanation

Myla Pierce

Myla Pierce

Beginner2022-06-14Added 20 answers

Step 1
You're misusing quantifiers where you write:
z = x 2 , z [ 1 / x , x ) z S
This sentence makes little sense. Pause, and ask what does "Implies for all z in S" really mean? Implies... what?
You cannot use merely a single element to prove subset; that just proves intersection. For example, if A = { 1 , 2 , 3 } , B = { 3 , 4 , 5 }, it is hopefully clear that A B is false, but 3 A , 3 B, so your logic:
x = 2 has [ 1 / x , x ) ( 0 , )
Step 2
Doesn't work. Moreover, you are misusing the "in" relationship; [ 1 / x , x ) is not in ( 0 , ), as every member of ( 0 , ) is a distinct real number, whereas [ 1 / x , x ) is an interval, not a real number. The correct symbol to capture the intuitive idea that it is "in" is subset; [ 1 / x , x ) ( 0 , ) , x > 0 is definitely true.

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