The parabolas: and intersect on the line . If are positive real numbers and are in G.P., then
- A
are in A.P.
- B
are in G.P.
- C
are in A.P.
- D
are in G.P.
The parabolas: and intersect on the line . If are positive real numbers and are in G.P., then
are in A.P.
are in G.P.
are in A.P.
are in G.P.
Correct answer:C
Standard Method
Given: The curves are and , and their points of intersection lie on . Also, are positive and in G.P.
Find: Which statement among the options is correct.
From the first parabola, putting gives
Since are in G.P.,
Therefore,
which can be written as
Hence the common intersection point on has
Using this in the second parabola with ,
so
Therefore,
Dividing by ,
Now, since are in G.P., we have
Thus,
So are in A.P.
Therefore, the correct option is C.
The solution labels the option as D, but the written concluding statement matches option C in the given options.
Use the repeated root insight
Given: On the line , the first parabola becomes a quadratic in with coefficients in G.P.
Find: The relation among .
Because are in G.P.,
So the quadratic
has discriminant
Hence it has a repeated root. Since the two parabolas intersect on , that repeated root must also satisfy
Substituting the repeated root relation leads to
which is exactly the condition that
are in A.P.
Therefore, the correct option is C.
Assuming the option label shown in the solution is final. Here the header says D, but the algebra and concluding statement correspond to are in A.P., which is option C in the given list. Always match the derived result with the actual options.
Using the G.P. condition incorrectly as . That is the A.P. relation. For a G.P., the correct identity is .
Making a sign error while completing the square or finding the repeated root from . Since all quantities are positive and , the root is negative: .
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