Matching Die Trio

We approach this problem using conditional expectation and casework probability. Since the three dice are not labeled, the probability of getting a matching set on the second roll depends on the structure of the first roll.

Step 1: Classifying Cases Based on First Roll

When rolling three fair 6-sided dice, the possible cases based on distinctness of numbers are:

1. Case 1: All three dice show distinct numbers.

   • The probability of this occurring: $$P(C_1)=\frac{\left(\genfrac{}{}{0ex}{}{6}{3}\right)\cdot 3!}{6^3}=\frac{20\cdot 6}{216}=\frac{120}{216}$$
   • On re-rolling, all 3 numbers must appear again. The number of favorable outcomes is the number of ways to permute the same three numbers, which is $3!$.
     • Probability of matching: $$P(M\mid C_1)=\frac{3!}{6^3}=\frac{6}{216}$$

2. Case 2: Two dice show the same number, and the third is different.

   • The probability of this occurring: $$P(C_2)=\frac{\left(\genfrac{}{}{0ex}{}{6}{1}\right)\cdot \left(\genfrac{}{}{0ex}{}{5}{1}\right)\cdot \frac{3!}{2!}}{6^3}=\frac{6\cdot 5\cdot 3}{216}=\frac{90}{216}$$
   • On re-rolling, we must obtain the same structure (two of one number and one of another), and the arrangement of dice does not matter.
     • Probability of matching: $$P(M\mid C_2)=\frac{\frac{3!}{2!}}{6^3}=\frac{3}{216}$$

3. Case 3: All three dice show the same number.

   • The probability of this occurring: $$P(C_3)=\frac{6}{216}$$
   • On re-rolling, the only way to match is if the same number appears on all three dice.
     • Probability of matching: $$P(M\mid C_3)=\frac{1}{6^3}=\frac{1}{216}$$

Step 2: Computing the Final Probability

Using the Law of Total Probability:

$$P(M)=P(M\mid C_1)P(C_1)+P(M\mid C_2)P(C_2)+P(M\mid C_3)P(C_3)$$

Substituting values:

$$P(M)=\left(\frac{6}{216}\times \frac{120}{216}\right)+\left(\frac{3}{216}\times \frac{90}{216}\right)+\left(\frac{1}{216}\times \frac{6}{216}\right)$$ $$P(M)=\frac{720}{46656}+\frac{270}{46656}+\frac{6}{46656}$$ $$P(M)=\frac{996}{46656}$$ $$P(M)=\frac{83}{3888}$$

Thus, the probability that the second roll matches the first roll is $\frac{83}{3888}$