MedVision ad

Focus in parametrics (1 Viewer)

Help Galore

New Member
Joined
Jul 10, 2010
Messages
13
Gender
Male
HSC
2011
In trying to do some locus problems, some of the questions which involve the focus (0, a) tend to switch the 'a' with a 1. I can't see how this works. I highly doubt my answer is wrong, but I'm pretty sure the answer in the back is also correct. It's probably a stupid question, but I would like to know.
Thanks in advance.
 

Help Galore

New Member
Joined
Jul 10, 2010
Messages
13
Gender
Male
HSC
2011
P(2p,p^2) is a variable point on the parabola x^2 = 4y, whose focus S and vertex O. M, N are the midpoints of SP, OM respectively.
(i) Show the locus of M is the parabola y = 1/2(x^2 + 1), and find the locus of N.

That isn't the full question. It's from Coroneos 3U btw. I don't know why I find Coroneos more difficult then the Fitz in parametrics >_>.
 

random-1006

Banned
Joined
Jun 25, 2010
Messages
988
Gender
Male
HSC
2009
P(2p,p^2) is a variable point on the parabola x^2 = 4y, whose focus S and vertex O. M, N are the midpoints of SP, OM respectively.
(i) Show the locus of M is the parabola y = 1/2(x^2 + 1), and find the locus of N.

That isn't the full question. It's from Coroneos 3U btw. I don't know why I find Coroneos more difficult then the Fitz in parametrics >_>.

thats not that hard, ill post up answer now


Focus= S= ( 0,1)
Vertex = O= (0, 0)

M is midpoint of SP, ie x= (0 +2p) / 2= p
y= (p^2 +1) /2 = (x^2 +1) / 2

ie M ( p, (p^2 +1)/ 2)

N is midpoint OM:

x= (p +0)/2, ie p=2x
y= [(p^2 +1) / 2 + 0 ] / 2
= [p^2 + 1 ]/ 4
= [4x^2 +1] /4 ----> locus of N
 
Last edited:

Help Galore

New Member
Joined
Jul 10, 2010
Messages
13
Gender
Male
HSC
2011
It's not necessarily the difficulty of the question. I'm just confused as to why the a becomes a 1.
 

hscishard

Active Member
Joined
Aug 4, 2009
Messages
2,033
Location
study room...maybe
Gender
Male
HSC
2011
Are you saying A1?

Or do you mean a is 1?

a is the length between the focus and the vertex = length between vertex and directrix.

In your example, x^2 = 4y
Comparing to x^2 = 4ay, a = 1.
 

Help Galore

New Member
Joined
Jul 10, 2010
Messages
13
Gender
Male
HSC
2011
*sigh*, I knew it was something simple -.-

Thanks anyways, sorry to bother you with a stupid question
 

Help Galore

New Member
Joined
Jul 10, 2010
Messages
13
Gender
Male
HSC
2011
The tangent at P(2ap,ap^2) to the parabola x^2 = 4ay meets the x-axis at A. Find A. S is the focus of this parabola. Prove that SA is perpendicular to AP. Prove that the equation of the locus of the centre C of a circle through P,S, and A is the parabola x^2 = 2ay - a^2
 
Joined
Dec 31, 2009
Messages
4,741
Location
sarajevo
Gender
Female
HSC
2015
Uni Grad
2017
Solve equation of tangent and x-axis simultaneously,

y=px-ap2
y=0

0=px-ap2
x=ap
y=0

.: A(ap,0)
 
Joined
Dec 31, 2009
Messages
4,741
Location
sarajevo
Gender
Female
HSC
2015
Uni Grad
2017
Solve equation of tangent and x-axis simultaneously,

y=px-ap2
y=0

0=px-ap2
x=ap
y=0

.: A(ap,0)
 

MetroMattums

Member
Joined
Apr 29, 2009
Messages
233
Gender
Male
HSC
2010
For the second part, the centre C of the circle is the midpoint M of P and S (circle geometry) - you can derive the locus from there.
 
Joined
Dec 31, 2009
Messages
4,741
Location
sarajevo
Gender
Female
HSC
2015
Uni Grad
2017
Gradient of SA,

m=(0-a)/(ap-0)
m=-1/p

Gradient of AP,

m=p

-1/p*p=-1

.: SA perp. to AP
 

Help Galore

New Member
Joined
Jul 10, 2010
Messages
13
Gender
Male
HSC
2011
I've also gotten what ohexploitable did, and they were the right answers. A little clueless as to how to attack the circle thing though. o_O
 

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

Top