A conic section is defined by the equations x = - 1 + sect y = 2 + z tant. The coordinates of the foci are,
~and~ (-1+\sqrt{10},2)\)
The parametric form of the conic section is given as (-1+sec t,2+3 tant)=(x,y).
i.e,sect=x+1,tant=(y−2)3
We know
sec2t−tan2t=1
Eliminating from this form,
(x+1)2−[y−23]2=1
This is a hyperbola with origin at (-1,2)
a2=1
b2=9
e2=1+b2a2=1+9
=10
∴ Coordinates of focus=(±ae−1,0+2)
(±√10−1,+2)
∴ foci are (−1+√10,2) and (−1−√10,2)