The exercise says like this:
Two inspectors $A$ and $B$ independently inspected the same batch of articles. 4% of items are defective. The examination showed that:
- 5% of items are considered defective by $A$.
- 6% of items are considered defective by $B$.
- 2% of items are correctly considered defective by $A$.
- 3% of items are correctly considered defective by $B$.
- 4% are considered defective by both $A$ and $B$.
- 1% are considered correctly defective by both $A$ and $B$.
$a)$ Construct a Venn diagram, which shows the percentages of the items in the 8 possible disjoint classes, motivated by the classification of the inspectors and the actual classification of the articles.
$b)$ What percentage of the articles are defective but are considered as if not by both inspectors?
And I have something like this:
($C$ is "correctly defective")
So, the answer means $C∩(A∪B)^c$, the blue zone?
4% of items are actually defective. 1% are considered so by both A and B; that leaves 3% that are correctly considered defective by at most one inspector. A correctly considers a total of 2% defective; that means 1% beyond the overlap. B correctly considers a total of 3% defective; that means 2% beyond the overlap. That adds up to 3% beyond the overlap that are correctly considered defective by at least one inspector. There was only 3% left over; that means that there's nothing left to be defective but not considered defective by either inspector. So, 0%.