6.3 Ellipses 369intersects the conic at two points, then the mid-point of the chord ofthe conic
joining these points has coordinates (x,y), where
_ m 2+2(A-m2)
x-b2(A-m2)' y -b
IM'
2(!1 -m2)Use this result to show that, for each fixed m, the set D of mid-points of chords
having slope m lies on a line through the center of the conic. Remark: This set
D, which is always a line segment when the conic is a circle or an ellipse and is
sometimes a whole line when the conic is a hyperbola, is called a diameter of the
conic.
10 Let m be a positive constant. A surface S contains the origin, and when
y 6 0, it contains the circlewhich lies in a plane parallel to the xz plane and has
a diameter coincidingwith the line segment joining the two points (O,y,O) and
(0,y,2my) in the yz plane. Sketch a figure showing S and show that the equation
of S is
x2 + (z - -y)2 = m2y2.Remark: One who wishes to rise above minimum requirements may show that
(i) S is a quadric surface, (ii) S is a cone and hence is a quadric cone, (iii) S is
not a right circular cone. One who wishes to rise to still greater heights may
try to decide whether we know enough to determine whether the cone has an
axis and, if so, whether sections made by planes perpendicular to this axis are
ellipses.6.3 Ellipses Remarkable geometric properties of ellipses can be
extracted from Figure 6.31. This
figure, like Figure 6.22, shows a
cone having a vertical axis. The
axis lies in the plane of the paper.
The plane 7r intersects the cone in
an ellipse E of which the two points
(vertices, in fact) Yl and Y2 lie in
the plane of the paper. The smaller
circle represents a sphere which is
tangent to the cone at the points of
a circle which determines the plane
7r1 and is tangent to a atFl. As we
saw in Section 6.2, al and ir inter-
sect in a line LI and, moreover, Fl is
a focus and Ll is a directrix of the
ellipse E. The larger circle repre-
sents a sphere which is tangent to
the cone at the points of a circle
which determines the plane 72 andFigure 6.31is tangent to it at F2. The planes 7r2 and ,r intersect in a line L2, and the
same procedure which was applied to F, and L, shows that F2 is another