MedVision ad

Paramateric equations help! (1 Viewer)

Prazo1994

New Member
Joined
Mar 15, 2011
Messages
17
Gender
Male
HSC
2012
Hi guys,
could you help me with this question:
The tangent to the point P(2ap, ap^2) on the parabola x^2=4ay cuts the x-axis in A and the y-axis on B.
i) Find the coordinates of M, the midpoint of A and B in terms of P
ii) show that the locus of M is a parabola

thanks!!!!!!!
 

Sanjeet

Member
Joined
Apr 20, 2011
Messages
239
Gender
Male
HSC
2012
i) Differentiate, sub 2ap into x to get the gradient of the tangent (should end up being p). sub into point-gradient formula and sub x = 0 and y = to get the coordinates of B and A respectively, then use midpoint formula for these two points to get M
ii) using the x and y coordinates of M, find p in terms of x and sub that into y to get the locus
 

cineti970128

Member
Joined
Apr 25, 2012
Messages
139
Gender
Male
HSC
2014
Hello
Well first of all you need to find the equation of the tangent.
the parabola equation can be differentiated to y' = 2x/4a
therefore when you sub x = 2ap to find the gradient of the tangent
m = p
using gradient and a point formula
(y-ap^2)/(x-2ap) = p

thus y = px - ap^2 (after expansion and simplification

then the coordinate of A (x1, 0) since y = 0 is x int

thus x1 = (0 + ap^2)/p = ap
thus coordinate of A (ap, 0)


Coordinate of B is when x = 0
therefore y = p(0) - ap^2

thereofre coordinate of B (0,-ap^2)

therefore Midpoint = ((0 + ap)/2, (-ap^2 + 0)/2 )
M (ap/2 , (-ap^2)/2 )

thus M has x coordinate moving at ap/2
and y coordnate moving at (-ap^2)/2 as parameter p changes

1. x = ap/2 ,,,,,, 2x/a = p

2. y = (-ap^2)/2

Now solving simultaneously use equation 1 into 2

y = (-a(2x/a)^2)/2
thus y = (-4x^2)/2
thus y = -2x^2

this is ofc parabola ^^
Hope this helps
 

Users Who Are Viewing This Thread (Users: 0, Guests: 1)

Top