Let and , be two G.P.s with common ratios and , respectively, such that and . Let . If and , then is equal to:
JEE Mathematics 2023 Question with Solution
Answer
Correct answer:9
Step-by-step solution
Standard Method
Given: , , and the solution working gives .
Find: as used in the solution.
For the two G.P.s,
So,
Hence,
Also, from the solution,
Therefore,
Using
we get
So the common ratios are
because .
Now,
Substituting,
Next,
so
And,
so
Thus,
Finally,
Therefore, the answer is .
Note: The source question text shows and , but the solution works with and .
Common mistakes
Using the question text values without reconciling them with the solution. Here the provided working uses and an infinite sum, not and a finite sum to . Always follow the authoritative solution source when extracting the final answer.
Writing or . In a G.P. with first term , the th term is , so and .
Finding and but not using the identity . Without this step, the product and hence the individual ratios cannot be obtained correctly.
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