If then:
- A
are in G.P.
- B
are in G.P.
- C
are in A.P.
- D
are in A.P.
If then:
are in G.P.
are in G.P.
are in A.P.
are in A.P.
Correct answer:A
Standard Method
Given:
with .
Find: Which relation among follows.
From the given equation,
Use the identity
Since the solution uses the fact that
we get
and hence
Therefore,
After simplification, we obtain
This is exactly the condition for three numbers to be in geometric progression. Therefore, are in G.P.
The correct option is A.
Tangent Form Recognition
Given:
Find: The sequence relation among .
The key observation from the provided working is that the expression can be reduced, using trigonometric identities and , to the compact form
For three positive quantities to be in G.P., the middle term satisfies
Here the middle term is , so
which shows that are in G.P.
The correct option is A.
Assuming the sequence is in A.P. because three terms are involved is incorrect. The relation obtained is , which is the condition for G.P., not A.P. For A.P., you would need .
Using the wrong identity for leads to an incorrect simplification. The correct identity is . Do not replace it with sum-to-product formulas for directly.
Ignoring the condition is a major conceptual error. The solution relies on converting into using this condition. Without that substitution, the expression does not simplify cleanly.
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