Let D = \{10, 13, 15\}; E = \{10, 12, 13, 14\} and F = \{9, 11, 12, 13, 15\} List the elements in the set DUE. DUE = boxed \ (Use commas to separate answers.)
The set DUE can be found by taking the intersection of the sets D, U, and E.
D = {10, 13, 15}
U = {10, 12, 13, 14}
E = {9, 11, 12, 13, 15}
Taking the intersection of these three sets gives:
D ∩ U ∩ E = {13}
So, the elements in the set DUE are {13}.
To find the elements in the set DUE, we need to take the intersection of sets D, U, and E.
First, let's find the intersection between sets D and E:
D ∩ E = \{10, 13\}
Now, let's find the intersection between the resulting set and set F:
(D ∩ E) ∩ F = \{10, 13\} ∩ \{9, 11, 12, 13, 15\} = \{13\}
Therefore, the elements in the set DUE are: 13.
To find the elements in the set DUE, we need to identify the common elements among sets D, U, and E.
First, let's determine what the set U represents. Unfortunately, you haven't provided the definition or contents of set U in your question. Can you please provide that information so I can assist you further?