If the sum and product of four positive consecutive terms of a G.P. are and , respectively, then the sum of common ratios of all such GPs is:
- A
- B
- C
- D
If the sum and product of four positive consecutive terms of a G.P. are and , respectively, then the sum of common ratios of all such GPs is:
Correct answer:C
Standard Method
Given: Four positive consecutive terms of a G.P. have sum and product .
Find: The sum of all possible common ratios .
Let the four consecutive terms be
with and .
Using the product,
So,
Using the transformed variable
From
we get
Convert the sum into a symmetric form
Now use the sum condition:
Substituting ,
Dividing by ,
Group the terms as
Let
Then
Hence,
From the working in the solution,
So,
Multiplying by ,
Squaring,
Therefore, the two possible common ratios are the roots of this quadratic, and their sum is .
The solution marks option C, but the derived value is , which matches option A. Therefore, the defensible correct option is A.
Taking the four terms as treats them as an A.P., not a G.P. This gives the wrong equations. Use instead.
Using the product incorrectly as is wrong because the powers of add to . The correct product is .
After getting , forgetting to multiply by before squaring can lead to algebra errors. First write , then square carefully.
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