M@ster P
Member
- Joined
- Feb 9, 2008
- Messages
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- Male
- HSC
- 2009
P, Q are points (2ap, ap^2) and (2aq, aq^2) on the parabola x^2 = 4ay.
i) Find the gradient of the chord PQ and prove that the equation of PQ is y-1/2(p + q)x + apq = 0
ii) Find the coordinates of the point B where the chord meets the axis of the parabola, and deduce that if OM, ON are the ordinates of P, Q (where O is the vertex), then OB^2 = OM . ON
iii) E, F are the feet of the perpendiculars from P, Q to the directrix. Find the coordinates of G the midpoint of EF, and show that GS has gradient -2/(p+q), where S is the focus. Hence deduce that GS is at right angles to PQ.
Can someone draw a diagram of the parabola + worked solutions please, I did i) but ii) and iii) lost me
i) Find the gradient of the chord PQ and prove that the equation of PQ is y-1/2(p + q)x + apq = 0
ii) Find the coordinates of the point B where the chord meets the axis of the parabola, and deduce that if OM, ON are the ordinates of P, Q (where O is the vertex), then OB^2 = OM . ON
iii) E, F are the feet of the perpendiculars from P, Q to the directrix. Find the coordinates of G the midpoint of EF, and show that GS has gradient -2/(p+q), where S is the focus. Hence deduce that GS is at right angles to PQ.
Can someone draw a diagram of the parabola + worked solutions please, I did i) but ii) and iii) lost me
