A fair die is thrown until the number appears. What is the probability that appears in an even number of throws?
- A
- B
- C
- D
A fair die is thrown until the number appears. What is the probability that appears in an even number of throws?
Correct answer:C
Standard Method
Given: A fair die is thrown until the number appears.
Find: The probability that first appears on an even-numbered throw.
The probability of getting on one throw is , and the probability of not getting is .
For to appear on an even throw, it can first appear on the , , , and so on.
So the required probability is
Geometric Series Evaluation
This is an infinite geometric series:
Using first term and common ratio
The first term is
and the common ratio is
Final computation
Using the sum of an infinite geometric series,
we get
Therefore, the correct option is C.
Assuming the probability is only for the throw. The event includes appearing first on the , and all even-numbered throws. Sum the entire infinite series.
Using common ratio instead of . Consecutive valid terms differ by two extra failures before success, so the ratio is .
Forgetting that the first appearance condition requires all previous throws to be not . For appearance on the throw, the first throws must avoid except the last one, which must be .
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