The question is actually longer, it is separated into like 5 parts. this one is the last part. The full question is this:
The point P(4p,2p^2) and Q(4q, 2q^2) lie on a parabola.
1. Find the Cartesian equation of the parabola
x^2=8y
2. Show that the equation of the chord PQ is (p+q)x-2y-4pq=0
3. if the chord passes through the focus of the parabola, show that the tangents at the end of the focal chord PQ are at right angle.
4. Show that the equation of the normal at P is y=-x/p+2p^2+4
5. The normal at point P intercept the parabola at Point R. Find the Cartesian Equation of the locus of the midpoint PR.
I have already done 1-4, but no idea how to do the fifth one, so please help.
okay... now that you've made it clear
... here's what i would have done (without taking into account of anything i might need at all from Q1-4): {ie. i might be wrong}
to find the point(s) of intersection of the normal at P and the parabola, one would normally go on to equate both equation by eliminating 'y':
ie. x^2/8 = -x/p+2p^2+4
--->
x^2 + (8/p)x - 16p^2 - 32 = 0 ; which is a quadratic in 'x'.
now, you
don't need to SOLVE this quadratic since that would be silly:
you're asked to find the midpoint of PR - meaning that the x-coordinate of the midpoint would simply be the
sum of the roots of that quadratic equation divided by 2.
hence, sum of roots = -8/p ; ie. x-coordinate of midpoint =
-4/p
since the normal is a line and the midpoint of PR lies on the line connecting P and R, then the midpoint lies on the normal. ie. substitute in the newly found x-value:
ie. y =
4/p^2 + 2p^2 + 4
Therefore, the Midpoint is: {-4/p , 4/p^2 + 2p^2 + 4}
let x = -4/p ---> p = -4/x ; subsitute this into the y-coordinate:
ie. y = 4/(16/x^2) + 2(16/x^2) + 4
----->
y = x^2/4 + 32/x^2 + 4 is the locus of the Midpoint of PR.
hope that helps
and i hope that's right also... there's a distinct probability i am completely wrong on account of not taking note of anything in Q1-4...
