Three distinct numbers are selected randomly from the set . If the probability that the selected numbers are in an increasing G.P. is , where , then is equal to:
- A
- B
- C
- D
Three distinct numbers are selected randomly from the set . If the probability that the selected numbers are in an increasing G.P. is , where , then is equal to:
Correct answer:D
Standard Method
Given: Three distinct numbers are chosen from .
Find: The value of if the probability of getting an increasing G.P. is .
The solution counts the favorable selections and gets
and the number of increasing G.P. triplets as
Therefore,
So,
and hence
Thus, the working shown in the solution gives . However, this does not match any of the listed options. The solution's lists option D as the correct option, so there is a clear discrepancy between the options and the extracted solution content.
Counting ordered triples instead of selected sets is incorrect because the question asks for three numbers to be selected, not arranged. Use combinations for the total sample space.
Assuming only integer common ratios misses valid G.P. triplets such as those with ratio . For integer terms, use the form with coprime integers .
Forgetting the condition that all three terms must lie in leads to overcounting. Always impose the bound on the largest term, namely .
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