PROBLEMS AND SOLUTIONS.
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Then the points 0, O', 0" lie on a conic circumscribed about the triangle ABC.
In fact, if in the subsidiary theorem the inscribed conic be a circle, and the
points I, J be the circular points at infinity, the point 0 will be the centre of the
circle, that is, the point of intersection of the interior bisectors of the angles ; O' will
be the point of intersection of the lines to the points of contact of the inscribed
circle; and 0" the point of intersection of the perpendiculars on the sides of the
triangle; and, these three points being on a conic circumscribed about the triangle,
the general theorem will apply to the three points in question.
I first prove the subsidiary theorem. Taking x = 0, y = 0, z — 0 for the equations
of the sides of the triangle and (a, ¡3, 7), (a', /3', 7') for the coordinates of the points
I, J respectively; the equation of the inscribed conic is
V® > \!y , \/z = 0,
Va, V/3, V7
Va, VÆ', V7
or say
a \]x + b \]y + c \fz = 0,
where
a = \/ßy — V/3'7 =p — p 1} b = V^yof — t/ya = q — q 1} c— Va/3' — VV/3 = r — r lt suppose.
The coordinates of the point of intersection of the lines from the vertices to the
points of contact on the opposite sides are
1
¥
1
that is,
111
(p-pi? ‘ (q-qi) 2 ’ ( r - n) 2 '
The equation of the line IJ is
((3y — /3'y) x + (7a! — y'a.) y + (a/3' — a'¡3) z = 0 ;
or, what is the same thing,
(p 2 —pi*)x+ (q 2 — qi 2 )y+ (r 2 — rf) z — 0.
Representing this for a moment by \x + ¡xy + vz = 0, the coordinates of the pole of
this line, in regard to the inscribed conic a s/x + b \Jy + c \/z — are as
c 2 ya + ¥v : a?v + c 2 A. : ¥\ + a?fx.
Now
cyi + ¥v = (r — r^f (q 2 — qf) + (q — q^f (r 2 — rf),
= (r- n) (q ~ ?i) [(r - r0 (q + ft) + (? - ft) (r + r a )],
= 2 (r - r a ) (q - ft) (qr - ftn),
