If in a G.P. of terms, the sum of all terms is times the sum of the odd terms, then the common ratio of the G.P. is equal to:
- A
- B
- C
- D
If in a G.P. of terms, the sum of all terms is times the sum of the odd terms, then the common ratio of the G.P. is equal to:
Correct answer:D
Standard Method
Given: A G.P. has terms, and the sum of all terms is times the sum of the odd terms.
Find: The common ratio .
Let the first term be and the common ratio be .
The sum of all terms is
The odd terms are
which form a G.P. with first term , common ratio , and terms.
So, their sum is
According to the question,
Canceling the common factor , we get
Cross-multiplying,
so
and hence
Factoring,
Thus,
From the solution, is discarded, so the common ratio is .
Therefore, the correct option is D.
Using explicit GP terms
Given: The G.P. is
and the total sum is times the sum of the odd terms.
Find: The common ratio .
The total sum is
The odd-position terms are
So,
Given that
we get
Canceling ,
Cross-multiplying,
which simplifies to
Factorizing,
Hence,
The solution concludes that does not satisfy the intended condition, so we take .
Therefore, the correct option is D.
Using the sum of odd terms with common ratio instead of is incorrect because the odd-position terms are . Always identify the new G.P. formed by the selected terms before applying the sum formula.
Taking the number of odd terms as instead of is wrong. In total terms, exactly half are in odd positions, so the odd-term sum must use terms.
Canceling factors carelessly and writing the wrong simplified equation can lead to an incorrect quadratic. After substitution, cancel only the common factor and then cross-multiply carefully.
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