Tangent line and normal on a parabola

AI Thread Summary
The discussion revolves around proving that if the normal at point P on the parabola y^2 = 4ax intersects the curve again at point Q, then the relationship p^2 + pq + 2 = 0 holds. Participants are struggling with the simplification of equations and the correct application of the point-slope form. There is confusion regarding the locus of the intersection of tangents at points P and Q, with participants questioning whether the tangents meet at a point. Additionally, discrepancies in the coordinates of the intersection points and the given locus equation are noted, leading to uncertainty about the correctness of the problem statement. The conversation highlights the challenges in deriving the required relationships and verifying the correctness of the equations involved.
sooyong94
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Homework Statement


If the normal at P(ap^2 ,2ap) to the parabola y^2 = 4ax meets the curve again at Q(aq^2, 2aq), show that p^2 +pq+2=0

Homework Equations


Point-slope form

The Attempt at a Solution


Capture.jpg

I tried putting y=2aq and x=aq^2 but I can seem to simplify the whole thing other than dividing both sides by a
 
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sooyong94 said:

Homework Statement


If the normal at P(ap^2 ,2ap) to the parabola y^2 = 4ax meets the curve again at Q(aq^2, 2aq), show that p^2 +pq+2=0

Homework Equations


Point-slope form

The Attempt at a Solution


Capture.jpg

I tried putting y=2aq and x=aq^2 but I can seem to simplify the whole thing other than dividing both sides by a
The expression is also dividable by q-p.
 
Strangely enough I got this:
Capture.png
 
sooyong94 said:
Strangely enough I got this:
Capture.png
There should be minus in front of the last term in the first equation. You made a mistake when copying.
 
Thanks - worked that out quickly.
 
Now I'm stuck on the second part:

Show that the equation of the locus of the point of intersection of the tangents at P and Q to the parabola is y^2(x+2a)+4a^3 =0. What does this mean? Does this mean that the tangents at P and Q meet at a point?

I managed to find the points of intersection of the two tangents (apq, a(p+q)), but I can't seem to continue at this point.
 
sooyong94 said:
Show that the equation of the locus of the point of intersection of the tangents at P and Q to the parabola is y^2(x+2a)+4a^3 =0. What does this mean? Does this mean that the tangents at P and Q meet at a point?

I managed to find the points of intersection of the two tangents (apq, a(p+q)), but I can't seem to continue at this point.
You have to work with x and y. What are p and q now?
 
x=apq
y=a(p+q)
 
sooyong94 said:
x=apq
y=a(p+q)
Have you copied the question correctly? These x and y values do not fulfill the equation given y^2(x+2a)+4a^3 =0.
 
  • #10
I'm sorry - but I can't catch it.
 
  • #11
sooyong94 said:
I'm sorry - but I can't catch it.
I mean the problem might be wrong. The coordinates of the point of intersection do not fit to the given locus.
 

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