In Exercises 87–92. (a) use a Venn diagram to show that the two sets are not equal in general; (b) try to find specific sets A, B (and C if necessary) for which the two sets are equal; and (c) try to find a general condition under which the two sets are always equal. Recall that U represents the universal set. 92. ( A − C ) ∪ ( B − A ) and B – C
In Exercises 87–92. (a) use a Venn diagram to show that the two sets are not equal in general; (b) try to find specific sets A, B (and C if necessary) for which the two sets are equal; and (c) try to find a general condition under which the two sets are always equal. Recall that U represents the universal set. 92. ( A − C ) ∪ ( B − A ) and B – C
Solution Summary: The author illustrates the Venn diagram for the set (A-C)cup
In Exercises 87–92. (a) use a Venn diagram to show that the two sets are not equal in general; (b) try to find specific sets A, B (and C if necessary) for which the two sets are equal; and (c) try to find a general condition under which the two sets are always equal. Recall that U represents the universal set.
Fundamentals of Differential Equations and Boundary Value Problems
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