Q1: If the points P(8p,4p^2) and Q(8q,4q^2) lie on the parabola x^2=16y and R [4(p+q), 4pq] is the point in which the tangents at p and q meet. What is the Cartesian equation for the locus of R?
Q2: The equation of the chord of PQ is y= (p+q/2)x -apq. M is the midpoint of the focal chord PQ which is (ap+aq, ap^2+aq^2/2) and N is a point on the directric such that MN is perpendicular to the directrix. T is the midpoint of MN which is [a(p+q), a(p^2+q^2-2)/4]. Find the equation of the locus of T.
Q3: The chord of contact of the tangents to the parabola x^2 = 4ay from an external point A(x1,y1) passes through the point B (0,2a). Find the equation of the locus of the midpoint AB
IF anybody can help on any of these questions it would be greatly appreciated.
Q2: The equation of the chord of PQ is y= (p+q/2)x -apq. M is the midpoint of the focal chord PQ which is (ap+aq, ap^2+aq^2/2) and N is a point on the directric such that MN is perpendicular to the directrix. T is the midpoint of MN which is [a(p+q), a(p^2+q^2-2)/4]. Find the equation of the locus of T.
Q3: The chord of contact of the tangents to the parabola x^2 = 4ay from an external point A(x1,y1) passes through the point B (0,2a). Find the equation of the locus of the midpoint AB
IF anybody can help on any of these questions it would be greatly appreciated.