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Now, since bocsin' A=abc sin B sin C=(24)', these equations may be written under the form

(vw — u"?) k– (vc' + wb* + 2u'bc cos A)k + 4A' =0, (u'w'-uu')ko+{a (au'+bu'cos C+cw'cos B)—bccos A'.u}k+4A?=0, Combining these with the four similar equations, we get {wu – v"? + uv — w" – 2 (u'v' – uu')} k

- {U (+ c – 2bc cos A) + va’ + wa + 2a’u' + 2cu' (ccos B + b cos C) + 2aw' (6 cos C+c cos B)}=0, wu - 02 + uv 2 (v'w' uu')

-k. (u +v+w+ 2u' + 20' + 20') a* Two other corresponding expressions may of course be obtained for k, and the required condition is therefore wu-v%2+uv—w*2–2(v'w-uu') uv-w+vw-u" – 2 (w'u' — 107') aa

72 VW u"? + wu 2012 2 (u'v' - ww')

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EXAMPLES.

1. A parabola is described about a triangle so that the tangent at one angular point is parallel to the opposite side; shew that the

square roots of the perpendiculars on any tangent to the curve are in arithmetical progression.

2. A conic is circumscribed about a triangle such that the tangent at each angular point is parallel to the opposite side; shew that, if p, q, r be the perpendiculars from the angular points on any tangent,

+pt+of+pt = 0.

3. Shew that the equation of the centre of this conic is

P +9+ r = 0.

4. Conics are drawn each touching two sides of a triangle at the angular points and intersecting in a point; prove that the intersections of the tangents at this common point with the sides cutting their respective conics lie on one straight line, and that the common tangents to the conics intersect the sides in the same three points.

5. A system of hyperbolas is described about a given triangle; prove that, if one of the asymptotes always pass through a fixed point, the other will always touch a fixed conic, to which the three sides of the triangle are tangents.

6. A parabola touches one side of a triangle in its middle point, and the other two sides produced ; prove that the perpendiculars, drawn from the angular points of the triangle upon any tangent to the parabola, are in harmonical progression.

11. There is another system of Tangential Co-ordinates, which bears a close analogy to the ordinary Cartesian system. If x, y be the Cartesian co-ordinates of a point, referred to two rectangular axes, then the intercepts on these axes of the polar of the point, with respect to a circle whose centre is the origin,

kak2 and radius k, will be respectively. These intercepts

' y completely determine the position of the line, and their reciprocals may be taken as its co-ordinates, and denoted by the

X

letters , n.

12. In this system, every equation of the first degree represents a point. Let

+ bn=1 be an equation of the first degree.

Draw the straight lines OX, OY at right angles to one another; on OX take the point A, such that OA = a, and on OY take the point B, such that OB=b. Draw AP, BP perpendicular to 0X, OY respectively, meeting in P. Then, the equation

ag + bn=1 shall represent the point P.

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Through P draw any straight line, meeting Ox, OY in H, K, respectively. Then, if ę, n be the co-ordinates of this line,

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= n.

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a relation which is satisfied by the co-ordinates of every line passing through the point P. This equation therefore represents the point P.

13. In this system, as in that described in the former part of the present chapter, an equation represents the curve, the

co-ordinates of whose tangents satisfy it, and an equation of the nth degree will therefore represent a curve of the nth class.

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14. If the perpendicular O Q let fall from 0 on the straight line HK (fig. 23) be denoted by p, and the angle QOX by $, we shall have

cos P

р and a point will then be represented by the equation a cos $ + b sin =P;

b an equation which, if a + b2 be put =c', and

=tana, becomes prccos ($-a).

We thus obtain a method of representing curves by a relation between the perpendicular from a fixed point on the tangent and the inclination of that perpendicular to a fixed straight line. These may be called the tangential polar coordinates of the curve. This method will be found discussed in the Quarterly Journal of Pure and Applied Mathematics, Vol. I. p. 210.

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EXAMPLES.

1. Prove that the distance between the points aš + bn=1, a'& +6'n=1, is {(a' – a)* + (6— 5)234.

2. Prove that the cosine of the angle between the lines (, n),

+ m (F, ) is

(8° +7°)*($*+n'?) 3. Prove that the distance from the point (+ bn = 1) to the line ($,, n) is (aš, + bn, - 1)(É, +

+

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4. Prove that the equation * + m + 2PĚ + 2Q1+R= 0, represents a conic, of which the focus is the origin.

What are the co-ordinates of its directrix ? What is its eccentricity, and what its latus-rectum ?

5. Prove that the equation pra + c cos $ represents a circle;

and determine the radius of the circle.

6. Prove that the evolute of the ellipse a'la +b'n' =1 is represented by the equation

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