B (В - А) n се

Shade the region corresponding to 

formula listed in attachment 

 

Thank you 

Transcribed Image Text:

The image depicts a Venn diagram with three intersecting circles labeled A, B, and C. The circles are enclosed within a rectangular border, representing the universal set. - Circle A represents one set. - Circle B represents another set. - Circle C represents a third set. The expression \((B - A) \cap C^c\) is written below the diagram. Here's a breakdown of the expression: - \(B - A\) refers to the elements that are in set B but not in set A. - \(C^c\) denotes the complement of set C, which includes all elements not in C. - \((B - A) \cap C^c\) signifies the intersection of the elements that are in B but not in A, with those not in C. This area would include elements unique to B, excluding any that overlap with sets A and C. The diagram visually illustrates these relationships among the three sets and helps understand the concept of set operations and intersections, showing areas common and distinct among the sets.