For the two positive numbers , if and are in a geometric progression, while are in an arithmetic progression, then is equal to:
JEE Mathematics 2023 Question with Solution
Answer
Correct answer:3
Step-by-step solution
Standard Method
Given: are in GP and are in AP.
Find: .
From the GP condition,
So,
From the AP condition,
Multiplying by ,
Now substitute :
Since , divide by :
Solving this quadratic gives
Using ,
Now,
Therefore, the required value is .
Direct Substitution Route
Given: are in GP and are in AP.
Find: .
Use the two progression conditions directly:
and
Substituting into the second relation,
This leads to
Taking the positive root,
Then
Hence,
So the answer is .
Common mistakes
Using the GP condition incorrectly. In a geometric progression, the square of the middle term equals the product of the extremes, so . Do not write relations like . Use .
Applying the AP condition wrongly. For three terms in AP, the middle term is the average of the other two, so , which gives . Do not equate consecutive differences without care.
Ignoring the condition that the numbers are positive. The quadratic in gives two roots, but only the positive value is valid here. Always check the sign restriction before choosing the final root.
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