"CONTENTS 1. Introduction 2. Coordinates, Lengths of Straight Lines and Areas of Triangles Polar coordinates 3. Locus, Equation to a Locus 4. The Straight Line, Rectangular Coordinates Straight line through two points Angle between two given straight lines Conditions that they may be parallel and perpendicular Length of a perpendicular Bisectors of angles 5. The Straight Line (Continued) Polar Equations and Oblique Coordinates Equations involving an arbitrary constant Examples of loci 6. On Equations Representing Two or More Straight Lines Angle between two lines given by one equation General equation of the second degree 7. Transformation of Coordinates Invariants 8. The Circle Equation to a tangent Pole and polar Equation to a circle in polar coordinates Equation referred to oblique axes Equations in terms of one variable 9. Systems of Circles Orthogonal circles Radical axis Coaxal circles 10. The Parabola Equation to a tangent Some properties of the parabola Pole and polar Diameters Equations in terms of one variable 11. The Parabola (Continued) Loci connected with the parabola Three normals passing through a given point Parabola referred to two tangents as axes 12. The Ellipse Auxiliary circle and eccentric angle Equation to a tangent Some properties of the ellipse Pole and polar Conjugate diameters Four normals through any point Examples of loci 13. The Hyperbola Asymptotes Equation referred to the asymptotes as axes One variable. Examples 14. Polar Equation of a Conic Section, Its Focus being the Pole Polar equation to a tangent, polar, and normal 15. General Equation of the Second Degree, Tracing of Curves Particular cases of conic sections Transformation of equation to centre as origin Equation to asymptotes Tracing a parabola Tracing a central conic Eccentricity and foci of general conic 16. The General Conic Tangent Conjugate diameters Conics through the intersections of two conics The equation S = ï¬uv General equation to the pair of tangents drawn from any point The director circle The foci The axes Lengths of straight lines drawn in given directions to meet the conic. Conics passing through four points Conics touching four lines The conic LM = R2 17. Miscellaneous Propositions On the four normals from any point to a central conic Confocal conics Circles of curvature and contact of the third order Envelopes Answers "
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