Let the image of parabola in the line be , where . Then is equal to
- A
- B
- C
- D
Let the image of parabola in the line be , where . Then is equal to
Correct answer:B
Standard Method
Given: The parabola is and it is reflected in the line .
Find: The values of in the image equation , and then evaluate .
Use the reflection formula across the line :
For the reflected curve, substitute
into the original parabola
This gives
Expanding,
Rearranging,
Comparing with the required form
we get , , and .
The solution computes the sum as
Hence the correct option is B.
Using coordinate transformation
Given: Reflection of the parabola in the line .
Find: The transformed equation and the value of .
So the reflected parabola has parameters , , .
Using the final computation shown in the solution, the required sum is . Therefore, the correct option is B.
Using the reflection formula for the line instead of . That would give the wrong shifted image. First account for the constant term in the line, then apply the correct coordinate transformation.
Comparing with and taking directly. Since , the correct comparison gives , not .
Substituting reflected coordinates in the wrong direction. The original equation must be written in terms of the new coordinates by replacing and , not the other way around.
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