Parametric equation? extension question?

2 ANSWERS

1. 
   

   Okay, here is how you begin these type of questions.
   
   Firstly, you need to find a relationship with p's and q's so you can eliminate the parameters and find a cartesian equation for the locus.
   
   We begin by finding the equation of the chord PQ.
   
   First find the gradient:
   
   Using the gradient formula:
   
   m = [ap^2 - aq^2] / [2ap - 2aq]
   
   Factorising using the difference of two squares:
   
   = a(p - q)(p + q) / 2a(p - q)
   
   Cancel the a's and the (p - q):
   
   m = (p + q) / 2
   
   Using the point gradient equation to find the equation:
   
   y - ap^2 = [(p + q) / 2] [x - 2ap]
   
   Taking the 2 to the other side and expanding:
   
   2y - 2ap^2 = (p + q)x - 2ap^2 - 2apq
   
   Cancelling the 2ap^2 and dividing by 2.
   
   y = [(p + q) / 2]x - apq
   
   Okay now that we have the equation, we know that it has to pass through the vertex (0,2a). Now we substitute x = 0 and y = 2a into that equation.
   
   2a = -apq
   
   Therefore pq = -2. (cancelling a and changing sign)
   
   This is the relationship we need to find the cartesian equation. Now we find the midpoint like you did, i won't go through it because it is really simple.
   
   We get this:
   
   (ap+aq, (ap^2+aq^2)/2)
   
   Okay now write it like:
   
   x = a(p + q)   and y = a(p^2 + q^2) / 2.
   
   We need to eliminate the p's and q's from these by substituting and rearranging etc. Notice how we found pq = -2 from before, since we know this must be used, you have to use a special relationship involving that. This relationship is:
   
   Since: (p + q)^2 = p^2 + 2pq + q^2
   
   p^2 + q^2 = (p + q)^2 - 2pq.
   
   Notice how there is a p^2 + q^2 in the y equation, and that there is a pq which we know the value of.
   
   p^2 + q^2 = (p + q)^2 + 4 since pq=-2.
   
   Now to remove the (p + q)^2.
   
   Notice the similarity with the equation involving x.
   
   x = a(p + q)
   
   x/a = p + q
   
   x^2 / a^2 = (p + q)^2
   
   Therefore
   
   p^2 + q^2 = x^2 / a^2 + 4
   
   or
   
   p^2 + q^2 = [x^2 + 4a^2] / [a^2]
   
   Now we sub it into y to find the final equation.
   
   y = a(p^2 + q^2) / 2.
   
   y = a([x^2 + 4a^2] / [a^2]) / 2.
   
   Cancel the a's:
   
   
   
   y = [x^2 + 4a^2] / [a] / 2.
   
   Therefore the final cartesian equation is:
   
   y = (x^2) / (2a) + 2a
   
   Notice the removal of the p's and q's, and how the a's will make the equation vary as the parabola changes. They could ask you to do this but with a real equation of a parabola like x^2 = 2y, and this would just mean the equation would no longer have a's (y = x^2).

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2. 
   

   What class is this for?
   
   Slope of the chord:
   
   m = (aq^2 - ap^2)/(2aq - 2ap) = (q^2 - p^2)/(2q - 2p) = (q + p)/2
   
   Must go through the point (0,2a) so:
   
   y = mx + b
   
   2a = b
   
   y = [(q + p)/2]x + 2a is the equation of the chord
   
   But the fact that it must go thorugh the point (0,2a) sets constraints on the values of p and q. The line must also go through (2ap,ap^2) so:
   
   ap^2 = [(q + p)/2](2ap) + b
   
   b = -pqa
   
   Then 2a = -pqa or pq = -2
   
   Now solve the chord equation for q + p:
   
   (q + p) = 2(y - 2a)/x
   
   Now this x can be set equal to the midpoint value:
   
   x = a(p + q) = a2(y - 2a)/x
   
   x^2 = 2ay - 4a^2
   
   And this is the equation you are looking for.
   
   Check by putting in x from the midpoint:
   
   (ap + aq)^2 = 2ay - 4a^2
   
   a^2p^2 + 2a^2qpq + a^2q^2 = 2ay - 4a^2
   
   ap^2 + 2apq + aq^2 = 2y - 4a
   
   Now use the midpoint y to replace ap^2 + aq^2:
   
   2apq + 2y = 2y - 4a
   
   2apq = -4a
   
   And remember that pq = -2 from the above discussion:
   
   2a(-2) = -4a
   
   And it seems to  be OK.
   
   The equation is:
   
   x^2 = 2ay - 4a^2

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