There are 68 students in the Travel Club. They discovered that 30 members have visited country A, 27 have visited country B, 33 have been to country C, 8 have visite countries A and B, 16 have been only to country C, and 10 have been only, to country A. Some club members have not been to any of the three foreign countries, and, curiously, an equal number have been to all three countries. (a) How many students have been to all three countries? (b) How many students have been only to country B? (a) How many students have been to all three countries? 3 (b) How many students have been only to country B? 17

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We denote by $$A$$, $$B$$, and $$C$$ the sets of students who have visited countries A, B, and C, respectively. We are given:
- Total students: $$68$$
- $$|A|=30$$
- $$|B|=27$$
- $$|C|=33$$
- $$8$$ students have visited countries A and B (this count includes those who have visited all three)
- $$16$$ students have been only to country C
- $$10$$ students have been only to country A
- An equal number of students have been to all three countries as have been to none of the three countries

We introduce the variable:
- Let $$x$$ be the number of students who have visited all three countries.

Also, we denote:
- $$a$$: number only in $$A$$ (given $$a=10$$)
- $$b$$: number only in $$B$$ (unknown)
- $$c$$: number only in $$C$$ (given $$c=16$$)
- $$AB_{\text{only}}$$: number in $$A$$ and $$B$$ but not in $$C$$
- $$AC_{\text{only}}$$: number in $$A$$ and $$C$$ but not in $$B$$ (unknown)
- $$BC_{\text{only}}$$: number in $$B$$ and $$C$$ but not in $$A$$ (unknown)

Because $$8$$ students have visited both $$A$$ and $$B$$ (possibly with $$C$$ as well), we have:
$$
AB_{\text{only}}+x=8 \quad\Longrightarrow\quad AB_{\text{only}}=8-x.
$$

Now, write the formula for the total in country $$A$$:
$$
a + AB_{\text{only}} + AC_{\text{only}} + x = 30.
$$
Substitute $$a=10$$ and $$AB_{\text{only}}=8-x$$:
$$
10 + (8-x) + AC_{\text{only}} + x = 30.
$$
Notice that $$-x+x$$ cancel:
$$
10+8+AC_{\text{only}}=30 \quad\Longrightarrow\quad AC_{\text{only}}=30-18=12.
$$

Next, for country $$C$$ we have:
$$
c + AC_{\text{only}} + BC_{\text{only}} + x =33.
$$
Substitute $$c=16$$ and $$AC_{\text{only}}=12$$:
$$
16 + 12 + BC_{\text{only}} + x =33 \quad\Longrightarrow\quad 28 + BC_{\text{only}} + x =33.
$$
So,
$$
BC_{\text{only}} =33-28-x=5-x.
$$

For country $$B$$, the total is:
$$
b + AB_{\text{only}} + BC_{\text{only}} + x =27.
$$
Substitute $$AB_{\text{only}}=8-x$$ and $$BC_{\text{only}}=5-x$$:
$$
b + (8-x)+(5-x)+x =27.
$$
Combine like terms:
$$
b+ (8+5) -x -x +x = b+13 - x =27.
$$
Thus,
$$
b=27-13+x=14+x.
$$

Now, the total number of students who have visited at least one country is the sum of those who belong only to one country, those in exactly two countries, and those in all three:
$$
\text{At least one} = a + b + c + AB_{\text{only}} + AC_{\text{only}} + BC_{\text{only}} + x.
$$
Substitute the known quantities:
$$
= 10 + (14+x) + 16 + (8-x) + 12 + (5-x) + x.
$$
Combine constant terms and the terms in $$x$$:
$$
\text{Constants: } 10+14+16+8+12+5 = 65.
$$
For the $$x$$-terms:
$$
x - x - x + x =0.
$$
Thus,
$$
\text{At least one} =65.
$$

Since there are $$68$$ students in total, the number who have not visited any of the three countries is:
$$
68-65=3.
$$

The problem states that the number of students who have been to all three countries is equal to the number who have not been to any. Therefore, we have:
$$
x=3.
$$

Finally, the number of students who have been only to country $$B$$ is:
$$
b=14+x=14+3=17.
$$

$$
\boxed{(a)\ x=3,\quad (b)\ \text{Only to }B=17.}
$$
(a) 3 students have been to all three countries. (b) 17 students have been only to country B.

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