If be a point on the parabola , which is nearest to the point , then the distance of from the directrix of the parabola is equal to:
- A
- B
- C
- D
If be a point on the parabola , which is nearest to the point , then the distance of from the directrix of the parabola is equal to:
Correct answer:D
Standard Method
Given: lies on the parabola and is nearest to .
Find: The distance of from the directrix of the parabola .
For the parabola , write it as , so in the standard form we get .
The normal to at parameter is
Substituting ,
Since this normal passes through ,
Multiplying by ,
So,
From the factorization shown in the solution,
Hence .
The point on the parabola is
Therefore,
Now transform the second parabola:
This is of the form with and vertex . Hence its directrix is
So the distance of from the directrix is
Therefore, the distance is , so the correct option is D.
Working Noted from the solution
Given: and nearest point from .
Find: Distance from that point to the directrix of .
The solution states the normal equation and then uses the condition that it passes through . While one displayed line in the first approach writes , the second approach and the subsequent factorization clearly support the corrected working
which gives
and hence .
Then
Also,
So the directrix is
Finally,
Thus, despite a minor inconsistency in one intermediate printed expression, the extracted working leads to the final answer and hence option D.
Using the tangent instead of the normal to locate the nearest point is incorrect, because the shortest distance from an external point to a curve occurs along the normal. Set up the normal condition through .
Writing the parameter point incorrectly for is a common error. The correct parametric point is , not .
Missing the completion of square in leads to a wrong directrix. First rewrite it as and then as before identifying the directrix.
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