Let be in a geometric progression. If , , , are subtracted respectively from , then the resulting numbers are in an arithmetic progression. Then the value of is:
- A
- B
- C
- D
Let be in a geometric progression. If , , , are subtracted respectively from , then the resulting numbers are in an arithmetic progression. Then the value of is:
Correct answer:D
Standard Method
Given: are in G.P.
After subtracting respectively, the numbers are in A.P.
Find:
Let
Since the modified terms are in A.P.,
So,
Hence,
Also, using the next A.P. relation,
So,
Hence,
Dividing (ii) by (i),
Therefore,
so,
Substituting in (i),
Thus,
Therefore,
Now,
Therefore, the correct option is D.
Using consecutive common differences
Given: are in G.P., and are in A.P.
Find:
Write the G.P. terms as
For four numbers in A.P., consecutive differences are equal:
This gives
Using the first two expressions,
which simplifies to
Using the first and third expressions,
which simplifies to
Dividing the second equation by the first,
So,
that is,
Then
Hence the G.P. is
Therefore,
So the required value is and the correct option is D.
Assuming the A.P. condition means only one pair of differences is equal. For four terms in A.P., the common difference must be consistent across the sequence. Use equal-difference relations carefully before substituting the G.P. terms.
Making a sign error while simplifying the subtracted terms, especially with , , and . These constants come from expressions like and must be expanded carefully.
Using the incorrect value of the first term from the flawed solution step. The correct substitution from with gives , not . The final product remains positive because all four terms multiply to a positive number.
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