A group of students was surveyed to find out if the students like fiction books and/or non-fiction books. The results of the survey are shown below:

Question

44 students like fiction books
8 students like fiction books but do not like non-fiction books
51 students like non-fiction books
5 students do not like fiction books or non-fiction books
Four students created the tables below to represent the data. F represents fiction books, and NF represents non-fiction books.

Jake
Like F	Do Not Like F	Total
Like NF	36	15	51
Do Not Like NF	8	5	13
Total	44	20	64
Bella
Like F	Do Not Like F	Total
Like NF	8	23	31
Do Not Like NF	36	15	51
Total	44	28	64
Cate
Like F	Do Not Like F	Total
Like NF	23	8	29
Do Not Like NF	15	36	11
Total	38	44	82
Rob
Like F	Do Not Like F	Total
Like NF	5	36	51
Do Not Like NF	23	8	31
Total	28	44	72

Which student's table is correct?
 Jake
 Bella
 Cate
 Rob

GPT-4o mini · Answer

To analyze the survey data, we need to find out how many students enjoy fiction (F) and non-fiction (NF) books, and then check each student's table against the given information:

Total students surveyed = 64
Students who do not like fiction or non-fiction = 5
Therefore, the students who like either fiction or non-fiction or both = 64 - 5 = 59 students.

Now, breaking it down:

Students who like only fiction: 8 (given)
Students who like fiction (total): 44 (given)
Students who like non-fiction (total): 51 (given)

We can calculate the number of students who like both fiction and non-fiction using the principle of inclusion-exclusion:

Let:

\( F \) = Total students who like fiction = 44
\( NF \) = Total students who like non-fiction = 51
\( B \) = Students who like both fiction and non-fiction
Students who like only fiction = 44 - B
Students who like only non-fiction = 51 - B

From our known data: \[ (44 - B) + (51 - B) + B + 5 = 64 \]

This simplifies to: \[ 44 + 51 - B + 5 = 64 \] \[ 100 - B = 64 \] \[ B = 36 \]

So:

Students who like both fiction and non-fiction: 36
Students who only like fiction: \( 44 - 36 = 8 \)
Students who only like non-fiction: \( 51 - 36 = 15 \)

Now, we can summarize the student count:

Like Fiction Only: \( 8 \)
Like Non-Fiction Only: \( 15 \)
Like Both: \( 36 \)
Total who like either (or both) = \( 8 + 15 + 36 = 59 \)
Do not like either: \( 5 \)

Now we'll analyze the tables created by each student.

Jake's Table:
- Likes Fiction & Likes Non-Fiction: 36
- Likes Fiction & Does Not Like Non-Fiction: 8
- Does Not Like Fiction & Likes Non-Fiction: 15
- Does Not Like Fiction & Does Not Like Non-Fiction: 5
- Total = 36 + 8 + 15 + 5 = 64 (Correct)
Bella's Table:
- Likes Fiction & Likes Non-Fiction: 8
- Likes Fiction & Does Not Like Non-Fiction: 23 (Incorrect, since it needs to be 36)
- Does Not Like Fiction & Likes Non-Fiction: 36
- Does Not Like Fiction & Does Not Like Non-Fiction: 15
- Total = 8 + 23 + 36 + 15 = 82 (Incorrect)
Cate's Table:
- Likes Fiction & Likes Non-Fiction: 23 (Incorrect)
- Likes Fiction & Does Not Like Non-Fiction: 15
- Does Not Like Fiction & Likes Non-Fiction: 36
- Does Not Like Fiction & Does Not Like Non-Fiction: 11 (Incorrect)
- Total = 38 + 44 = 82 (Incorrect)
Rob's Table:
- Likes Fiction & Likes Non-Fiction: 5 (Incorrect)
- Likes Fiction & Does Not Like Non-Fiction: 36
- Does Not Like Fiction & Likes Non-Fiction: 23
- Does Not Like Fiction & Does Not Like Non-Fiction: 8
- Total = 28 + 44 = 72 (Incorrect)

Therefore, only Jake's table correctly represents the survey data.