A coin is biased so that the head is times as likely to occur as tail. This coin is tossed until a head or tails occur. If denotes the number of tosses of the coin, then the mean of is:
- A
- B
- C
- D
A coin is biased so that the head is times as likely to occur as tail. This coin is tossed until a head or tails occur. If denotes the number of tosses of the coin, then the mean of is:
Correct answer:A
Standard Method
Given: The coin is biased with probability of head and tail as
Find: The mean value of , where is the number of tosses until a head occurs or tails occur.
Since the process stops as soon as the first head appears or when tails have occurred, the possible values of are .
For , the first toss must be a head:
For , the first toss must be a tail and the second toss must be a head:
For , the first two tosses must be tails, and then the third toss may be either head or tail:
Now compute the expectation:
Therefore, the mean of is , so the correct option is A.
Case-wise Probability Listing
Given: Stopping occurs at the first head or after tails in total.
Find: The expected number of tosses.
List all stopping sequences:
Their probabilities are:
Hence,
and therefore
Thus the required mean is .
A common mistake is to take incorrectly as something other than . Since head is times as likely as tail, the ratio is , so the correct probabilities are and .
Students often miss that includes both sequences and . It is wrong to count only one of them. The process stops on the third toss in either case.
Another mistake is to assume the experiment can continue beyond tosses. That is not possible here because after tails the stopping condition is already met.
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