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Parametric question (1 Viewer)

fjitlid

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Jun 5, 2016
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P(2ap, ap^2) and Q(2ap^2, ap&4) are two points on the parabola x^2=4ay.

I) show that the chord PQ has a gradient m=(1/2)(P^2 + P)

II) Find the minimum gradient of the chord PQ.


i could do part I pretty easily, but am struggling with part II, and the solution makes no sense to me at all. could someone pease help me, and define the minimum gradient in a question like this.


The solution reads...

The minimum occurs when P = (-1/2)/(2x(1/2))
= (-1/2)

then sub -1/2 into the gradient PQ equation to get (-1/8)
 

pikachu975

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dm/dp = (1/2)(2p+1)
Back to 2 unit, min/max occurs when derivative = 0
2p+1 = 0
p = -1/2

d^2 m/dp^2 = (1/2)(2) = 1 which is always positive so p = -1/2 gives a minimum (concave up)

Sub it back in to get -1/8
 

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