Answer:
[tex]\{5,8\}[/tex] is a subset of [tex]\{2,5,8\}[/tex]
Step-by-step explanation:
Required
Difference between subset and proper subset
To answer this question, I will use the following illustration.
[tex]A = \{1,2,3\}[/tex]
[tex]B = \{2,3\}[/tex]
[tex]C = \{1,2,3\}[/tex]
In the above sets, set B is a proper subset of set A because all elements of B can be found in A, but not element of A can be found in B.
Set C is a subset of A because [tex]A = C[/tex]
Using the above illustration, we have:
[tex]\{5,8\}[/tex] and [tex]\{2,5,8\}[/tex]
[tex]\{5,8\}[/tex] is a subset of [tex]\{2,5,8\}[/tex], because 5 and 8 are in [tex]\{2,5,8\}[/tex] but 2 which ca be found in [tex]\{2,5,8\}[/tex] is not in [tex]\{5,8\}[/tex]
