Let and be distinct positive real numbers. The th term of a GP (first term , third term ) equals the th term of another GP (first term , fifth term ). Find :
- A
- B
- C
- D
Let and be distinct positive real numbers. The th term of a GP (first term , third term ) equals the th term of another GP (first term , fifth term ). Find :
Correct answer:C
Standard Method
Given: Two geometric progressions are defined. In the first GP, the first term is and the third term is . In the second GP, the first term is and the fifth term is . The th term of the first GP equals the th term of the second GP.
Find: The value of .
Let the common ratio of the first GP be . Since its third term is ,
So,
The th term of the first GP is
Now let the common ratio of the second GP be . Since its fifth term is ,
Hence,
Therefore, the th term of the second GP is
Given that ,
Dividing both sides by ,
So,
Equating exponents,
Thus,
Therefore, the correct option is C.
Exponent Comparison Trick
Given: The first GP has first term and third term . The second GP has first term and fifth term .
Find: The value of for which the th term of the first GP equals the th term of the second GP.
From the first GP,
Hence,
So the th term is
From the second GP,
Thus,
So the th term is
Equating the two terms directly gives
Therefore,
which gives
Therefore, the correct option is C.
Using the term formula incorrectly as instead of . This shifts every term index by one and gives a wrong equation for the th or th term. Always use the th term of a GP as .
Equating the common ratios of the two GPs. The two progressions are different, so their ratios need not be equal. First find and from the given third and fifth terms separately, then compare the required terms.
Writing from or from . This ignores the powers on the ratio. Instead, solve carefully to get and .
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