Proof: A, B, and C Sets | A Union B Subset of C

  • Thread starter anon1980_1@hotmail.c
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In summary, to prove that if A union B is a subset of C, then A is a subset of C and B is a subset of C, we must show that A is a subset of C and B is a subset of C. This can be shown by assuming x is in A and using propositional logic to show that x is also in C. This is true for all elements in A, therefore A is a subset of C. The same logic can be applied to show that B is also a subset of C.
  • #1
anon1980_1@hotmail.c
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Suppose A, B, and C are sets.
Prove that if A union B is a subset of C, then A is a subset of C and B is a subset of C.

My proof:
Suppose A, B, and C are sets such that A union B is a subset of C.
Then for all x, if x is in A union B, then x is in C.
Since x is in A union B, this means x is in A or x is in B.
Then if x is in A or x is in B, then x is in C.
Hence, if x is in A, then x is in C, and if x is in B, then x is in C.
Thus, A is a subset of C and B is a subset of C.

Is this ok?
 
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  • #2
why not just the obvious:

A < AuB < C

hence A<C

other wise you've got to do tedious propositional logic.

i teach a course like this, and i can't understand why you have to prove something so obvious to be honest. it's bollocks isn't it?

it's obvious and as is often the case with obvious things writing down the proof is a pain, but you're at least on the right track, although you could tidy it up:

to show A<B you need:

x in A true implies

(x in A) or (xi in B) is true


so x in AuB is true,

hence x in C is true by the definition of subset,
 
  • #3
Can I just assume that A is contained in A union B which is contained in C?
The way I have written my proof is the way we were taught in class.
Does it make sense? Or are there obvious flaws in the logic?
 
  • #4
anon1980_1@hotmail.c said:
Can I just assume that A is contained in A union B which is contained in C?
The way I have written my proof is the way we were taught in class.
Does it make sense? Or are there obvious flaws in the logic?

No obvious flaws. Most teachers will accept your proof. A small minority might ask you how "Then if x is in A or x is in B, then x is in C" leads to "Hence, if x is in A, then x is in C, and if x is in B, then x is in C"
 
  • #5
The next to last line of your proof is a little vague. I'm at a loss for how to make it clearer though.
 
  • #6
How can I clarify the next to last line? Someone please offer me suggestions?
 
  • #7
anon1980_1@hotmail.c said:
Can I just assume that A is contained in A union B which is contained in C?
The way I have written my proof is the way we were taught in class.
Does it make sense? Or are there obvious flaws in the logic?

I gave a proof that A<AuB

you should try to minimize the number of lines.

Here's my full word proof:

We must show that A<C. Let x be in A

(x in A) => (x in A)or(x in B) => (x in AuB) => (x in C)

and we are done.

if you want more words then write 'which implies that'
 

FAQ: Proof: A, B, and C Sets | A Union B Subset of C

1. Is this a clear proof?

The answer to this question depends on the specific context and topic at hand. In general, a clear proof is one that presents evidence and logical reasoning that supports a specific conclusion. It should be free from errors and be able to withstand scrutiny from other scientists.

2. How do you determine if something is a clear proof?

Determining if something is a clear proof involves evaluating the evidence and reasoning presented. This can include checking for any flaws or biases in the data, ensuring that the conclusions drawn are supported by the evidence, and considering alternative explanations. Peer review by other scientists can also help determine if a proof is clear.

3. What makes a proof unclear?

A proof can be considered unclear if it lacks sufficient evidence or if the evidence presented is flawed. It can also be unclear if the reasoning used is illogical or if there are biases present. Additionally, a proof may be considered unclear if it does not address alternative explanations or fails to adequately address counterarguments.

4. Can a proof be considered clear if it is not accepted by the scientific community?

While acceptance by the scientific community is an important aspect of determining the validity of a proof, it does not necessarily guarantee that a proof is clear. A proof may still have flaws or biases even if it is accepted by some scientists. The scientific community may also reject a proof if it does not align with current accepted theories or if it lacks sufficient evidence.

5. Is it possible for a proof to be clear but still be proven wrong in the future?

Yes, it is possible for a proof to be considered clear at the time it is presented but later be proven wrong. This is because new evidence or advancements in technology may reveal flaws in the original proof or provide additional information that changes the understanding of the topic. This is why the scientific process involves constant evaluation and revision of theories and proofs.

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