A Treatise on Plane Co-ordinate Geometry as Applied to the Straight Line and the Conic SectionsMacmillan, 1862 - 326 σελίδες |
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Σελίδα 52
... pairs of points : ( 1 ) ( 0 , 1 ) , and ( 1 , −1 ) . ( 2 ) ( 2 , 3 ) , and ( 2 , 4 ) . ( 3 ) ( 1 , 1 ) , and ( — 2 , — 2 ) . ( 4 ) ( 0 , −a ) , and ( 0 , —b ) . 2. Find the equations to the lines which pass through the point ( 4 , 4 ) ...
... pairs of points : ( 1 ) ( 0 , 1 ) , and ( 1 , −1 ) . ( 2 ) ( 2 , 3 ) , and ( 2 , 4 ) . ( 3 ) ( 1 , 1 ) , and ( — 2 , — 2 ) . ( 4 ) ( 0 , −a ) , and ( 0 , —b ) . 2. Find the equations to the lines which pass through the point ( 4 , 4 ) ...
Σελίδα 73
... ī m ī m = 14. Find the equation to the straight line passing through the intersections of the pairs of lines and 2au + by + cw = 0 , 2bu + av + cw = = 0 , bv - cw = 0 ; av - cw = 0 . 15. If a = 0 , B = 0 , EXAMPLES ON THE STRAIGHT LINE .
... ī m ī m = 14. Find the equation to the straight line passing through the intersections of the pairs of lines and 2au + by + cw = 0 , 2bu + av + cw = = 0 , bv - cw = 0 ; av - cw = 0 . 15. If a = 0 , B = 0 , EXAMPLES ON THE STRAIGHT LINE .
Σελίδα 94
... pair of tangents be drawn to a circle , the chords of contact will all pass through a fixed point . Let Ax + By + C = 0 .... ..... . ( 1 ) be the equation to the straight line ; let ( x ' , y ' ) be a point in this line from which ...
... pair of tangents be drawn to a circle , the chords of contact will all pass through a fixed point . Let Ax + By + C = 0 .... ..... . ( 1 ) be the equation to the straight line ; let ( x ' , y ' ) be a point in this line from which ...
Σελίδα 125
... pair of tangents be drawn to a parabola , the chords of contact will all through a fixed point . Let Ax + By + C = 0 ............ .. ..... pass ( 1 ) be the equation to the straight line ; let ( x ' , y ' ) be a point in this line from ...
... pair of tangents be drawn to a parabola , the chords of contact will all through a fixed point . Let Ax + By + C = 0 ............ .. ..... pass ( 1 ) be the equation to the straight line ; let ( x ' , y ' ) be a point in this line from ...
Σελίδα 136
... pairs of tangents are drawn at points whose abscissæ are in the ratio of 1 μ ; shew that the equation to the locus of their inter- section will be = 2 ах when the points are on the same side of the axis , and y2 = ( μ + - μ3 ) 2 ax when ...
... pairs of tangents are drawn at points whose abscissæ are in the ratio of 1 μ ; shew that the equation to the locus of their inter- section will be = 2 ах when the points are on the same side of the axis , and y2 = ( μ + - μ3 ) 2 ax when ...
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Συχνά εμφανιζόμενοι όροι και φράσεις
a²b² a²b³ a²y abscissa asymptotes ax² axes axis of x b²x² bisects centre chord of contact circle conic section conjugate diameters conjugate hyperbola constant Crown 8vo cy² denote directrix distance Edition ellipse equa equal Examples external point find the equation find the locus fixed point focal chord focus given lines given point Hence the equation inclined latus rectum Let the equation line drawn line joining lines meet lines which pass major axis meet the curve middle point negative normal ordinate origin parabola parallel perpendicular point h point of intersection polar co-ordinates polar equation pole positive preceding article proposition radical axis radius ratio rectangular required equation respectively right angles shew shewn sides Similarly student suppose tangent tion triangle vertex x₁ y₁
Δημοφιλή αποσπάσματα
Σελίδα 100 - A point moves so that the sum of the squares of its distances from the points (0, 0), (1, 0) is constant.
Σελίδα 304 - Or, four terms are in harmonical proportion, when the first is to the fourth as the difference of the first and second is to the difference of the third and fourth.
Σελίδα 25 - In this equation n is the tangent of the angle which the line makes with the axis of abscissae, and B is the intercept on this axis from the origin.
Σελίδα 141 - Thus a parabola is the locus of a point which moves so that its distance from a fixed point is equal to its distance from a fixed straight line (see fig.
Σελίδα 189 - Hyperbola is the locus of a point which moves so that its distance from a fixed point, called the focus, bears a constant ratio, which is greater than unity, to its distance from a fixed straight line, called the directrix.