Let be a G.P. of increasing positive terms such that and . Then is equal to:
- A
- B
- C
- D
Let be a G.P. of increasing positive terms such that and . Then is equal to:
Correct answer:D
Standard Method
Given: are in G.P. with increasing positive terms, and .
Find: .
Let and common ratio be . Since the terms are increasing and positive, and .
Using ,
So,
Hence,
Therefore, .
Now use
Since , we get
Also, from ,
Substituting,
Let . Then
So,
Solving,
Thus,
Since the G.P. is increasing, , hence . Therefore,
Now,
Factor out :
Using and ,
Therefore, the correct option is D.
Pattern Recognition
Given: and .
Find: .
For three consecutive G.P. terms,
Hence,
Now,
Using ,
This gives
So or , and since the terms are increasing, choose
Now observe
Therefore,
Therefore, the correct option is D.
Assuming or multiplying the terms without using the G.P. structure is incorrect. For three consecutive G.P. terms, the middle term controls the product: . Use the symmetry of consecutive terms in a G.P.
Choosing ignores the condition that the terms are increasing positive terms. If , the G.P. decreases. Since the sequence is increasing, you must take , hence .
Computing directly from without multiplying by is wrong. Each corresponding term shifts forward by two places, so the whole sum gets multiplied by . Therefore use .
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