Let three real numbers , , be in arithmetic progression, and , , in geometric progression. If and their arithmetic mean is , the cube of their geometric mean is:
- A
- B
- C
- D
Let three real numbers , , be in arithmetic progression, and , , in geometric progression. If and their arithmetic mean is , the cube of their geometric mean is:
Correct answer:D
Standard Method
Given: the solution states that are in A.P. and are in G.P.
Find: The required value from the working shown in the solution.
Using A.P., let the common difference be . Then
Using G.P., let the common ratio be . Then
Substitute the A.P. values:
From the first relation,
Now compare with the second relation:
So or .
Check with :
Hence and
Therefore, the arithmetic mean is
the solution concludes this corresponds to option D. There is a discrepancy between the given question text/options and the solution, but the correct option is D, i.e. .
Detailed Solution Working
Given: The extracted solution works with in A.P. and in G.P.
Find: The final answer indicated by the solution.
From A.P.:
From G.P.:
Substitute the A.P. forms into these equations:
From ,
Also from ,
So,
Multiply by :
Thus or .
Now use to test:
Therefore,
Then
Their arithmetic mean is
So the solution's working ends with , and the page marks option D as correct. Therefore, using the solution as authority, the answer is D.
Using the raw given question text and ignoring that the solution is based on a different statement. This is wrong because answer extraction must prioritize the solution when it is present. Use the solution-page working and note the mismatch explicitly.
Accepting both roots and from the quadratic without checking the G.P. condition . This is wrong because algebraic candidates must satisfy all original conditions. Substitute back before finalizing .
Writing A.P. terms incorrectly, for example taking , , when the solution uses in A.P. This shifts every term and changes the result. Keep the indexing consistent with the given progression.
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