3, namely ${\displaystyle a,b}$ and ${\displaystyle \{a,b\}}$

1. False

2. True

3. True

4. True

5. False

6. False

7. False

8. True

9. True

The set of even integers

The set of composite numbers

The set of all rational numbers.

The set of all fathers

The set of all grandparents

The set of all people that are married to a woman

The set of all siblings

The set of all people that are younger than someone

The set of all people that are older than their father

${\displaystyle \{x\in R|x>0\}}$

${\displaystyle \{x\in Z|}$ there exist ${\displaystyle y\in Z}$ such that ${\displaystyle x=2*y+1\}}$

${\displaystyle \{x\in R|}$ there exist ${\displaystyle y\in N}$ such that ${\displaystyle 5*y*x=1\}}$

{n^3|n is an integer and -5<n<5}

${\displaystyle \{x\in N|}$ there exist ${\displaystyle y\in N}$ such that ${\displaystyle x=4*y+1\}}$

A = {1,2}, B = {1,2,{1,2}}

Using the definition of a subset: For any x ∈ A, then x ∈ B, and because x ∈ B, x ∈ C. The same goes for any y ∈ B or any z ∈ C.

False. Counterexample. Let A be a set of even integers and B a set of odd integers.Then A and B are not equal, and A is not a subset of B, and B is not a subset of A. A and B are disjoint.

${\displaystyle 𝒫(A)=\{\mathrm{\varnothing },x,y,z,w,\{x,y\},\{x,z\},\{x,w\},\{y,z\},\{y,w\},\{z,w\},\{x,y,z\},\{x,y,w\},\{x,z,w\},\{y,z,w\},\{x,y,z,w\}\}}$

${\displaystyle 𝒫(𝒫(\mathrm{\varnothing }))=\{\mathrm{\varnothing },\{\mathrm{\varnothing }\}\}}$

${\displaystyle 𝒫(𝒫(\{\mathrm{\varnothing }\}))=\{\{\mathrm{\varnothing },\{\mathrm{\varnothing }\}\},\{\mathrm{\varnothing }\},\{\{\mathrm{\varnothing }\}\},\mathrm{\varnothing }\}}$

(1) false (2) true (3) true (4) true (5) false (6) true (7) false (8) false (9) true

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