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 , ∴
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.
