Consider sets R, S, and T, defined as follows: R = x ϵ Z S = y ϵ Z T = z ϵ Z a) Is R ⊆ T? Explain. b) Is T ⊆ R? Explain. c) Is T ⊆ S? Explain.

Answer:a) No b) Yes c) No

Step-by-step explanation:

a) No, R is not a subset of T that is NOT ALL the elements of R can be found in T. For R ⊆ T, it means that ALL the element of R can be found in T which is false in this case.

b) Yes, T is a subset of R that is ALL the element of T can be found in T since all the elements in both sets are all even. For T ⊆ R, it means that ALL the element of T can be found in R

c) No, T is not a subset of S that is NOT ALL the elements of T can be found in S. For T ⊆ S, it means that ALL the element of T can be found in S which is false in this case.