Sets and Functions. Prove that If A0 subseteq X and A1 subseteq X, then f(A0) - f(A1) subseteq f(A0 - A1). Prove that if A0 subseteq X, A1 subseteq X and f is one to one, then f(A0) - f(A1) = f(A0 - A1)

teevaituinomakw

teevaituinomakw

Answered question

2022-09-04

Sets and Functions
Prove that If š“ 0 āŠ† š‘‹ and š“ 1 āŠ† š‘‹ , then š‘“ ( š“ 0 ) āˆ’ š‘“ ( š“ 1 ) āŠ† š‘“ ( š“ 0 āˆ’ š“ 1 )
Prove that if š“ 0 āŠ† š‘‹ , š“ 1 āŠ† š‘‹ and š‘“ is one to one, then š‘“ ( š“ 0 ) āˆ’ š‘“ ( š“ 1 ) = š‘“ ( š“ 0 āˆ’ š“ 1 )

Answer & Explanation

Waylon Jenkins

Waylon Jenkins

Beginner2022-09-05Added 17 answers

Step 1
Since you have no idea how to start I'm going to give you a hint. Let x āˆˆ f ( A 0 ) āˆ’ f ( A 1 ) this means that x āˆˆ f ( A 0 ) and x āˆ‰ f ( A 1 ), so that there exists y āˆˆ A 0 such that f ( y ) = x and y āˆ‰ A 1 .
Step 2
From this reasoning you can see that your first statement holds. Write this more formally, and follow the same reasoning for the second statement.

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