2008 iTest Problems/Problem 35

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Problem

Let $b$ be the probability that the cards are from different suits. Compute $\lfloor1000b\rfloor$.

Solutions

Solution 1

Use complementary counting to count the number of ways one can draw two cards with the same rank. There are $4$ ranks, and each rank has $13$ cards. That means the probability of getting two cards with the same rank is $\tfrac{4 \cdot 13 \cdot 12}{52 \cdot 51} = \tfrac{12}{51}$, so the probability of getting two cards with different ranks is $\tfrac{39}{51}$. That means $\lfloor 1000b\rfloor = \boxed{764}$.

Solution 2

The first card can be any card, so the probability is $1$. However, of the $51$ cards remaining, only $3 \cdot 13 = 39$ of them have a different rank. Thus, the probability of getting two cards with different ranks is $1 \cdot \tfrac{39}{51} = \tfrac{39}{51}$, so $\lfloor 1000b\rfloor = \boxed{764}$.

See Also

2008 iTest (Problems)
Preceded by:
Problem 34
Followed by:
Problem 36
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