Answer:
8 students
Step-by-step explanation:
Let x be the number of students which had brown hair and blue eyes. Then
Hence,
30-((15-x)+x+(17-x)) students had neither brown hair nor blue eyes.
[tex]30-((15-x)+x+(17-x))=30-15+x-x-17+x=x-2=6,\\ \\x=8.[/tex]
Answer:
The number of students who had brown hair and blue eyes = 8
Step-by-step explanation:
It is given that,There are total 30 students.
15 had brown hair and 17 had blue eyes and 6 had neither brown hair nor blue eyes.
From the given information we get,
The number students in which either brown hair or blue eyes or both is given by = 30 - 6 = 24
Let x students had brown hair and y students had blue eyes
x∩y = the number of students who had brown hair and blue eyes
x = 15 and y = 17
we can write
24 = x + y - x∩y
x∩y = x + y -24 = 15 + 17 - 24
x∩y = 8
Therefore the number of students who had brown hair and blue eyes = 8
