We have a 3 Set Venn Diagram. The sets are A, B, and C. How many regions of the Venn diagram correspond to elements that are part of set A? Why so many?
2007-01-19 15:20:56 · 3 answers · asked by Anonymous in Science & Mathematics ➔ Mathematics
There are those that are exclusively A, those that are A and B, those that are A, B and C and lastly those that are A and C.
So there are 4 regions.
2007-01-19 15:25:58 · answer #1 · answered by tval_friedly 2 · 0⤊ 0⤋
Draw a 3 set venn diagram. In other words a venn diagram with 3 circles. Then label one of the circles and count how many regions are in that circle. The reason there are so many is because elements in set A can also be in the other sets.
2007-01-19 15:27:42 · answer #2 · answered by AibohphobiA 4 · 1⤊ 0⤋
Could be up to four, based on the values in each set.
You have a region of A that is not common with either part of B or C, a region of A that is comon only with part of B, a region of A that is only common with part of C, and finally a region of A that is common with parts of both B and C.
2007-01-19 15:27:34 · answer #3 · answered by cattbarf 7 · 1⤊ 0⤋