MedVision ad

Conics Question (1 Viewer)

FD3S-R

Member
Joined
Oct 9, 2004
Messages
59
6.
a) Show that if y=mx+k is a tangent to the rectangular hyperbola xy=c^2, then k^2+4mc^2=0

b) Hence find the equations of the tangents from the point (-1, -3) to the rectangular hyperbola xy=4 and find the coordinates of their points of contact.

a) i can do, its just the discriminant.

b) need help!!
 

KFunk

Psychic refugee
Joined
Sep 19, 2004
Messages
3,323
Location
Sydney
Gender
Male
HSC
2005
FD3S-R said:
6.
a) Show that if y=mx+k is a tangent to the rectangular hyperbola xy=c^2, then k^2+4mc^2=0

b) Hence find the equations of the tangents from the point (-1, -3) to the rectangular hyperbola xy=4 and find the coordinates of their points of contact.

a) i can do, its just the discriminant.

b) need help!!
I havn't done this kind of conics questions for a while but I remember that they really used to piss me off, here goes.

Consider the fact that m = -1/t<sup>2</sup> [gradient of (cp, c/p) point of contact] so:
mct + c/t = 0 (1)

(cp, c/p) satisfies y = mx + k so:
mct - c/t = -k (2)

(1) + (2) yields 2mct = -k so:
x = -k/2m

(1) - (2) yields 2c/t = k so:
y = k/2

You then have the coordinates of the points of contact in terms of k (-k/2m , k/2)

y = mx + k is satisfied by (-1, -3) and can be written as y + 3 = m(x+1) ---> y = mx + m-3 , &there4; k = m-3

by combining k= m - 3 and k<sup>2</sup> + 16m = 0 (since c<sup>2</sup> = 4) we obtain: m<sup>2</sup> + 10m + 9 = 0 where m = -1 or -9

when m = -1 , k= -4 ..... when m= -9, k= -12

this gives us the point of contact (-2, -2) with the tangent y = -x -4 and the point (-2/3 , -6) with the tangent y = -9x - 12 using y = mx + k and point of contact is (-k/2m, k/2)


There is probably a method which is elegant, this is just how I did it ages ago. If anyone can offer such a method, please do because this is way too long.
 

KFunk

Psychic refugee
Joined
Sep 19, 2004
Messages
3,323
Location
Sydney
Gender
Male
HSC
2005
I think it's nice to have multiple answers, especially for conics when you have so many different paths you can take.

edit: damn, you should post it back up. Mine isn't that great in the first place.
 

brett86

Member
Joined
Jul 19, 2005
Messages
89
Location
Sydney
Gender
Male
HSC
2004
its very similar to yours though...

i think ur solutions very good, its a lot clearer than mine



[EDIT: correct an error in the second tangent]
 
Last edited:

FD3S-R

Member
Joined
Oct 9, 2004
Messages
59
9.
a) Show that if y=mx+k is a tangent to the hyperbola x^2/a^2 - y^2/b^2 =1, then m^2.a^2 - b^2 = k^2

if y = mx+k touches the hyperbola at point p(asecθ, btanθ), then:
m = b/asinθ
amsinθ = b
amsinθ - b = 0 (1)

also P must satisfy y=mx+k ie:
btanθ = amsecθ+k
amsecθ - btanθ = -k (2)

how do i make this into m²a² - b² = k²

thanks
 
Joined
Mar 26, 2004
Messages
154
Gender
Male
HSC
2005
Isn't it the same as the ellipse one?
Sub in y=mx+c into x^2/a^2-y^2/b^2=1 and let delta=0
Although the way you've done it is probably just about there anyway
 

KFunk

Psychic refugee
Joined
Sep 19, 2004
Messages
3,323
Location
Sydney
Gender
Male
HSC
2005
FD3S-R said:
9.
a) Show that if y=mx+k is a tangent to the hyperbola x^2/a^2 - y^2/b^2 =1, then m^2.a^2 - b^2 = k^2

if y = mx+k touches the hyperbola at point p(asecθ, btanθ), then:
m = b/asinθ
amsinθ = b
amsinθ - b = 0 (1)

also P must satisfy y=mx+k ie:
btanθ = amsecθ+k
amsecθ - btanθ = -k (2)

how do i make this into m²a² - b² = k²

thanks
I think this is your problem: "m = b/asinθ" , --> at P dy/dx = bsec&theta;/atan&theta; = m

a.m.tan&theta; - bsec&theta; = 0 (1)

as you said: amsecθ - btanθ = -k (2)

(1)<sup>2</sup> = a<sup>2</sup>m<sup>2</sup>tan<sup>2</sup>&theta; + b<sup>2</sup>sec<sup>2</sup>&theta; -2ambtan&theta;sec&theta; = 0

(2)<sup>2</sup> = a<sup>2</sup>m<sup>2</sup>sec<sup>2</sup>&theta; + b<sup>2</sup>tan<sup>2</sup>&theta; - 2ambtan&theta;sec&theta; = k<sup>2</sup>

(1)<sup>2</sup> - (2)<sup>2</sup> =

a<sup>2</sup>m<sup>2</sup>(tan<sup>2</sup>&theta; - sec<sup>2</sup>&theta; ) + b<sup>2</sup>(sec<sup>2</sup>&theta; - tan<sup>2</sup>theta; ) = -k<sup>2</sup>

-a<sup>2</sup>m<sup>2</sup> + b<sup>2</sup> = - k<sup>2</sup>

&there4; a<sup>2</sup>m<sup>2</sup> - b<sup>2</sup> = k<sup>2</sup>
 

FD3S-R

Member
Joined
Oct 9, 2004
Messages
59
yeah i just found out and someone posted reply before i can delete hehe

thanks anyway
 

lum

Member
Joined
Nov 23, 2004
Messages
137
Gender
Male
HSC
2005
hey kfunk, good solutions!, but i got really lost at this part...
Consider the fact that m = -1/t2 [gradient of (cp, c/p) point of contact] so:
mct + c/t = 0 (1)

well if i sub bak x and y in, it's mx + y = 0, where was this from? and what's with the consider the fact that m = -1/t^2, where'd you use that?

i then did it myself as i had no idea why u did that, couldn't u just start at subbing in the pt into the tangent, get values for m, get values for k and work it out? i mean u didn't really use the first part of the working anyways.(prolly just that i'm not used for finding an expression first in terms of k and m though.., haven't done conics in a long time)

and brett, gw on ur sol'n too, but i don't understand the derivatives part, actually the last 4 lines... i did exactly the same thing as you up to the m=-1, k=-4 and m=-9, k=-12

i'm so failing the bloody cssa on monday...
 

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

Top