In a class of 80 students, some students like Mathematics (M), Science (S), and English (E).
40 students like Mathematics
35 students like Science
30 students like English
15 students like both Mathematics and Science students
12 students like both Mathematics and English
10 students like both Science and English
5 students like all three subjects
Based on the above information, answer the following question.
How.many students like exactly two subjects?
In a class of 80 students, some students like Mathematics (M), Science (S), and English (E).
40 students like Mathematics
35 students like Science
30 students like English
15 students like both Mathematics and Science students
12 students like both Mathematics and English
10 students like both Science and English
5 students like all three subjects
Based on the above information, answer the following question.
How many students like Mathematics only?
In a class of 80 students, some students like Mathematics (M), Science (S), and English (E).
40 students like Mathematics
35 students like Science
30 students like English
15 students like both Mathematics and Science students
12 students like both Mathematics and English
10 students like both Science and English
5 students like all three subjects
Based on the above information, answer the following question.
How many students like none of the three subjects?
Choose the correct Venn diagram for the following groups: Teachers (A), Women (B), Mothers (C)
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Question ID: 11159
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