Sets, Relations and Functions
Represent set A, B, C such that $$A \subset B, A \cap C = \phi$$ and $$B \cap C \neq \phi$$ by Venn diagram. The number of separate regions representing $$A \cup (B\cap C)$$ is/are:
The Venn diagram shows sets $$\xi, P$$ and $$Q$$ The shaded region in the Venn diagram represents set
The shaded region is a part of set Q.
Set P' includes every region apart from set P which contains region Q and the Universal Set.
Thus, the shaded region is $$P'\cap Q$$
Represent set A, B, C such that $$A \subset B, A \cap C = \phi$$ and $$B \cap C \neq \phi$$ by Venn diagram. The number of separate regions representing $$A \cup (B\cap C)$$ is/are:
If $$ A $$ and $$B$$ are subsets of a set $$X$$, then what is $$(A\cap (X-B))\cup B$$ equal to
Let $$P$$ be the set of points inside the square, $$Q$$ be the set of points inside the triangle and $$R$$ be the set of points inside the circle. If the triangle and circle intersect each other and are contained in the square then,
Let the universal set U, be a set all students of your school, A is set of boys. B is the set of girls C is the set of students participating in sports. Describe the following set in words and represent them by the Venn diagram. $$A \cup (B \cap C)$$
In the Venn diagram, $$\xi = F\cup G\cup H$$. The shaded region in the diagram represents set
The Venn diagram shows the relationship between sets $$\xi, P, Q$$ and $$R$$. The shaded region in the diagram represents set
The Venn diagram shows sets P, Q and R with regions labelled, I, II, III and IV. State the region which represents set $$[P\cap (Q\cup R)']$$
In the Venn diagram, $$\xi = F\cup G\cup H$$. The shaded region represents
Shaded portion of the following Venn diagram represents :
Which of Venn diagram represents set $$ A - ( B \cap C ) $$ is :