Set Unions
The union of two sets produces a new set which consists of all the elements from both sets “dumped together” into one big set (without duplicates).
Try the following!
\((0,3)\cup(2,5)=(0,5)\).
Solution: \((0,3)\cup(2,5)=(0,5)\). The given two intervals \((0,3)\) and \((2,5)\) overlap on the interval \((2,3)\), so the list of elements that are in \((0,3)\) OR \((2,5)\) are all elements between 0 and 3, non-inclusive of endpoints. See number line below. Everything shaded is in the set \((0,3)\cup(2,5)\).
\((-1,2)\cup (3,6)\) cannot be simplified any more than it is.
The two intervals listed do not overlap at all, so all numbers between 2 and 3 (including 2 and 3 themselves) are NOT in the set \((-1,2)\cup (3,6)\). This set is drawn below on the number line. Everything that is shaded is in the set.
\((-1,4)\cup [4,6]=(-1,6]\).
While the intervals \((-1,4)\) and \([4,6]\) do not overlap at all, the interval \((-1,4)\) ends where the interval \([4,6]\) starts. In other words, \((-1,4)\) contains all numbers greater than -1 up to 4, and \([4,6]\) contains all numbers from 4 to 6, INCLUDING 4. Because of this “one set picking up where the other left off”, we can write this union as a single interval. NOTE: if 4 was NOT included in the second interval, we could not have written this union as a single interval; there would have been a “gap” between the two sets occurring at 4. See number line below. Everything that is shaded lives in the union.
Can’t be simplified any more, so \((-\infty, 0)\cup (0,\infty)\)
Solution: Can’t be simplified any more. While the first interval stops where the second one starts, neither set contains the element 0, so one cannot write \((-\infty, 0)\cup (0,\infty)=(-\infty,\infty)\), because the set on the right-hand side of the equation contains 0, whereas the one on the left-hand side does not!
