Co-ordinate Geometry : - ( Co ordinate points in plane ) - 1. |
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Co ordinate geometry : - ( Two forms of an ellipse ) - 96. An ellipse is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always less than 1. Two forms of an ellipse. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Uploads. |
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Co-ordinate Geometry : - ( Conditions to form regular figures ) - 2. |
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Co-ordinate Geometry : - ( Distance formula ; Problem solving ) - 3. |
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Co-ordinate Geometry : - ( Section formula ) - 4. |
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Co-ordinate Geometry : - ( Centroid of triangle ) - 5. |
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Co-ordinate Geometry : - ( Section formula ; Problem solving ) - 6. |
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Co-ordinate Geometry : - ( Area of triangle ) - 7. |
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Co-ordinate Geometry : - ( Area of triangle; Solving problems ) - 8. |
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Co-ordinate Geometry : - ( Proving given points are co linear ) - 9. |
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Co-ordinate Geometry : - ( Straight line ; Introdcution ) - 10. |
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Co-ordinate Geometry : - ( Different forms of Equation of Straight Line ) - 11. |
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Co-ordinate Geometry : - ( Equation of Straight line in two point and point intercept form ) - 12. |
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Co-ordinate Geometry : - ( Equation of straight line in perpendicular or normal form ) - 13. |
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Co-ordinate Geometry : - ( Equation of straight line ; Solving problems ) - 14. |
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Co-ordinate Geometry : - ( Equation of Straight line ; Solving problems ) - 15. |
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Co-ordinate Geometry : - ( Equation of Straight line ; Solving problems ) - 16. |
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Co-ordinate Geometry : - ( Equation of Straight line ; Solving problems ) - 17. |
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Co-ordinate Geometry : - ( General equation of Straight line ) - 18. |
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Co-ordinate Geometry : - ( Transformation of General equation of Straight line in different form ) - 19. |
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Co-ordinate Geometry : - ( Transformation of General equation of Straight line into Intercept form ) - 20. |
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Co-ordinate Geometry : - ( Transformation of General equation of Straight line into Normal form ) - 21. |
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Co-ordinate Geometry : - ( Position of a point relative to the line ) - 22. |
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Co-ordinate Geometry : - ( Point of intersection of two lines ) - 23. |
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Co-ordinate Geometry : - ( Ortho centre of triangle ) - 23. |
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Distance of a point from the line ) - 25. |
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Co-ordinate Geometry : - ( Distance between two parallel lines ) - 26. |
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Co-ordinate Geometry : - ( Distance of a point from a line ; Problem solving ) - 27. |
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Co-ordinate Geometry : - ( Angle between two lines ) - 28. |
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Co-ordinate Geometry : - ( Angle between two lines ; Solving problems ) - 29. |
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Co-ordinate Geometry : - ( Equation of straight line passing through given point ) - 30. |
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Co-ordinate Geometry : - ( Angular bisectors of lines ) - 31. |
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Co-ordinate Geometry : - ( Angular bisectors of lines ; Solving problems ) - 32. |
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Co-ordinate Geometry : - ( Family of lines through intersection of two lines ; Solving problems ) - 33. |
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Co-ordinate Geometry : - ( Family of lines through intersection of two lines ; Solving problems ) - 34. |
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Co-ordinate Geometry : - ( Shifting of origin without rotation ) - 35. |
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Co-ordinate Geometry : - ( Roation of axes ) - 36. |
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Co-ordinate Geometry : - ( Condition for pair straight line ) - 37. |
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Co ordinate Geometry : - ( Equation of pair of straight lines ; Introduction ) - 38. |
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Co-ordinate Geometry : - ( Splitting of pair of straight lines ) - 39. |
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Co-ordinate Geometry : - ( Splitting of pair of straight lines ; Solving problems ) - 40. |
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Co-ordinate geometry : - ( Angle between pair of straight lines ) - 41 |
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Co-ordinate Geometry : - ( Angle between pair of lines ; Solving problems ) - 42. |
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Co-ordinate Geometry : - ( Distance between pair of parallel lines ; Solving problems ) - 42a. |
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Co-ordinate Geometry : - ( Equation angle of bisectors of pair of straight lines ; Solving problems ) - 43. |
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Co-ordinate Geometry : - ( equation of angle of bisectors of pair straight lines ; Solving problems ) - 44. |
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Co-ordinate Geometry : - ( Equation of circle ; Introduction ) - 45. |
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Co-ordinate geometry : - ( Equation of circle in particular cases ) - 46. |
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Co-ordinate Geometry : - ( Equation of Circle ; Solving problems ) - 47. |
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Co-ordinate Geometry : - ( Equation of Circle ; Solving problems ) - 48. |
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Co ordinate Geometry : - ( General equation of Circle ) - 49. |
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Co-ordinate Geometry : - ( General equation of Cicle ; Solving problems ) - 50. |
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Co-ordinate Geometry : - ( General equation of Circle ; Solving problems ) - 51. |
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Co ordinate Geometry : - ( General equation of Circle ; Solving problems ) - 52. |
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Co-ordinate Geometry : - ( Co ordinate points in plane ) - 53. |
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Co ordinate Geometry : - ( Position of the circle with respect to the circle ; Solving problems ) - 54 |
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Co-ordinate Geometry : - ( Concyclic points ; Solving problems ) -55. |
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Co-ordinate Geometry : - ( Parametric equation of circle ) - 56. |
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Co-ordinate Geometry : - ( Equation of circle from parametric to cartesian form ) - 58. |
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Co-ordinate Geometry : - ( Equation of circle ; Solving problems ) - 59. |
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Co-ordinate Geometry : - ( Intersection of a straight line and a circle ) - 60. |
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Co ordinate Geometry : - ( Intersection of a line and a circle ; Solving problems ) - 61. |
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Co-ordinate Geometry : - ( Intersection of a line and a circle ) - 62. |
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Co-ordinate Geometry : - ( Length of a chord of a circle ) - 64. |
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Co-ordinate Geometry : - ( Equation of a tangent of a circle ) - 65. |
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Co-ordinate Geometry : - ( Equation of a tangent of a circle ) - 66. |
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Co-ordinate geometry : - ( Equation of tangent to the circle ; Slope form ) - 67. |
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Co ordinate Geometry : - ( Equation of normal to the Circle ) - 68. |
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Co ordinate Geometry : - ( Length of tangent of a circle ) - 69. |
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Co ordinate Geometry : - ( Equation of tangent and normal to the Circle ; Solving problems ) - 70. |
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Co ordinate Geometry : - ( Equation of tangent and normal to the Circle ; Solving problems ) - 71. |
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Co ordinate Geometry : - ( Family of circle one/two parameters ) - 72. |
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Co ordinate Geometry : - ( Family of circle ; Solving problems ) - 73. |
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Co ordinate Geometry : - ( Family of Circle ; Solving problems ) - 74. |
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Co ordinate Geometry : - ( Equation of circle through intersection of a line and a circle ) - 75. |
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Co ordinate Geometry : - ( Equation of circle through intersection of two Circle ; Solving problems ) - 76. |
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Co ordinate Geometry : - ( Angle between two intersecting circles; Solving problems ) - 77. |
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Co ordinate Geometry : - ( Orthogonal Circle ; Solving problems ) - 78. |
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Co ordinate geometry : - ( Conic section ; Introduction ) - 79. Co ordinate geometry is one of the most important and exciting ideas of mathematics. It provides a connection between algebra and geometry through graphs of lines and curves. The Conic section is the intersection of a plane and a cone. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Uploads. |
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Co ordinate geometry : - ( General equation of Conic ) - 80. Co ordinate geometry is one of the most important and exciting ideas of mathematics. It provides a connection between algebra and geometry through graphs of lines and curves. The Conic section is the intersection of a plane and a cone. General equation of Conic. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Uploads. |
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Co ordinate geometry : - ( Conic section ; Solving problems ) - 81. Co ordinate geometry is one of the most important and exciting ideas of mathematics. It provides a connection between algebra and geometry through graphs of lines and curves. The Conic section is the intersection of a plane and a cone. Conic section ; Solving problems. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Uploads. |
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Co ordinate geometry : - ( Parabola ; Equation in standard form ) - 82. Co ordinate geometry is one of the most important and exciting ideas of mathematics. It provides a connection between algebra and geometry through graphs of lines and curves. The Conic section is the intersection of a plane and a cone. A Parabola is the locus of a point which moves so that its distance from a fixed point (focus) is equal its distance from a fixed straight line (directrix). For |
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Co ordinate geometry : - ( Parabola ; General equation ) - 83. Co ordinate geometry is one of the most important and exciting ideas of mathematics. It provides a connection between algebra and geometry through graphs of lines and curves. The Conic section is the intersection of a plane and a cone. A Parabola is the locus of a point which moves so that its distance from a fixed point (focus) is equal its distance from a fixed straight line (directrix). For |
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Co ordinate geometry : - ( Some definition on Parabola ) - 84. Co ordinate geometry is one of the most important and exciting ideas of mathematics. It provides a connection between algebra and geometry through graphs of lines and curves. The Conic section is the intersection of a plane and a cone. A Parabola is the locus of a point which moves so that its distance from a fixed point (focus) is equal its distance from a fixed straight line (directrix). For |
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Co ordinate geometry : - ( Parabola ; Solving problems ) - 87. Co ordinate geometry is one of the most important and exciting ideas of mathematics. It provides a connection between algebra and geometry through graphs of lines and curves. The Conic section is the intersection of a plane and a cone. A Parabola is the locus of a point which moves so that its distance from a fixed point (focus) is equal its distance from a fixed straight line (directrix). For |
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Co ordinate geometry : - ( Position of a point with respect to parabola ) - 85. Co ordinate geometry is one of the most important and exciting ideas of mathematics. It provides a connection between algebra and geometry through graphs of lines and curves. The Conic section is the intersection of a plane and a cone. A Parabola is the locus of a point which moves so that its distance from a fixed point (focus) is equal its distance from a fixed straight line (directrix). For |
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Co ordinate geometry : - ( Standrd form of four Parabolas ) - 86. Co ordinate geometry is one of the most important and exciting ideas of mathematics. It provides a connection between algebra and geometry through graphs of lines and curves. The Conic section is the intersection of a plane and a cone. A Parabola is the locus of a point which moves so that its distance from a fixed point (focus) is equal its distance from a fixed straight line (directrix). For |
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Co ordinate geometry : - ( Parabola ; Solving problems ) - 88. Co ordinate geometry is one of the most important and exciting ideas of mathematics. It provides a connection between algebra and geometry through graphs of lines and curves. The Conic section is the intersection of a plane and a cone. A Parabola is the locus of a point which moves so that its distance from a fixed point (focus) is equal its distance from a fixed straight line (directrix). For |
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Co ordinate geometry : - ( Parabola ; Solving problem ) - 89. Co ordinate geometry is one of the most important and exciting ideas of mathematics. It provides a connection between algebra and geometry through graphs of lines and curves. The Conic section is the intersection of a plane and a cone. A Parabola is the locus of a point which moves so that its distance from a fixed point (focus) is equal its distance from a fixed straight line (directrix). For |
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Co ordinate geometry : - ( Parabola ; Solving problem ) - 90. Co ordinate geometry is one of the most important and exciting ideas of mathematics. It provides a connection between algebra and geometry through graphs of lines and curves. The Conic section is the intersection of a plane and a cone. A Parabola is the locus of a point which moves so that its distance from a fixed point (focus) is equal its distance from a fixed straight line (directrix). For |
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Co ordinate geometry : - ( Parabola ; Solving problem ) - 91. Co ordinate geometry is one of the most important and exciting ideas of mathematics. It provides a connection between algebra and geometry through graphs of lines and curves. The Conic section is the intersection of a plane and a cone. A Parabola is the locus of a point which moves so that its distance from a fixed point (focus) is equal its distance from a fixed straight line (directrix). For |
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Co ordinate geometry : - ( Ellipse ; Introduction ) - 92. Co ordinate geometry is one of the most important and exciting ideas of mathematics. It provides a connection between algebra and geometry through graphs of lines and curves. The Conic section is the intersection of a plane and a cone. An ellipse is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This |
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Co ordinate geometry : - ( Standard equation of an ellipse ) - 93. Co ordinate geometry is one of the most important and exciting ideas of mathematics. It provides a connection between algebra and geometry through graphs of lines and curves. The Conic section is the intersection of a plane and a cone. An ellipse is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This |
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Co ordinate geometry : - ( Definition of terms of an ellipse ) - 94. An ellipse is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always less than 1. Definition of terms of an ellipse. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Uploads. |
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https://www.youtube.com/embed/eGlVrH6zGbg An ellipse is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always less than 1. Equation of an ellipse ; Shifting the origin. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Uploads. |
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Co ordinate geometry : - ( Two forms of an ellipse ) - 96. An ellipse is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always less than 1. Two forms of an ellipse. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Uploads. |
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Co ordinate geometry : - ( Ellipse ; Solving problems ) - 97. An ellipse is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always less than 1. Ellipse ; Solving problems. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Uploads. |
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Co ordinate geometry : - ( Ellipse ; Solving problems ) - 98. An ellipse is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always less than 1. Ellipse ; Solving problems. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Uploads. |
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Co ordinate geometry : - ( Ellipse ; Solving problems ) - 99. An ellipse is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always less than 1. Ellipse ; Solving problems. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Uploads. |
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Co ordinate geometry : - ( Ellipse ; Solving problems ) - 100. An ellipse is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always less than 1. Ellipse ; Solving problems. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Uploads. |
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Co ordinate geometry : - ( Ellipse ; Solving problems ) - 101. An ellipse is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always less than 1. Ellipse ; Solving problems. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Uploads. |
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Co ordinate geometry : - ( Position of points with respect to an ellipse ) - 102 An ellipse is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always less than 1. Position of points with respect to an ellipse. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Uploads. |
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Co ordinate geometry : - ( Parametric equation of an ellipse ) - 103. An ellipse is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always less than 1. Parametric equation of an ellipse. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Uploads. |
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Co ordinate geometry : - ( Intersection of a line and an ellipse ) - 104. An ellipse is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always less than 1. Intersection of a line and an ellipse. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Uploads. |
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Co ordinate geometry : - ( Condition of tangency of an ellipse and a line ) - 105. An ellipse is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always less than 1. Condition of a line and an ellipse. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Uploads. |
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Co ordinate geometry : - ( Equation of tangent to an ellipse ) -106. An ellipse is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always less than 1. Equation of tangent to an ellipse. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Uploads. |
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Co ordinate geometry : - ( Equation of tangent and normal to an ellipse ) - 107. An ellipse is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always less than 1. Equation of tangent and normal to an ellipse. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Uploads. |
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Co ordinate geometry : - ( Condition of tangency ; Solving problems ) - 108. An ellipse is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always less than 1. Condition of tangency ; Solving problems . For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Uploads. |
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Co ordinate geometry : - ( Tangent and normal ; Solving problems ) - 109. An ellipse is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always less than 1. Equation tangent and normal to an ellipse. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Uploads. |
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Co ordinate geometry : - ( Hyperbola ; Introduction ) - 110. The Conic section is the intersection of a plane and a cone. A hyperbola is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always greater than 1. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Up |
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Co ordinate geometry : - ( Definition of terms of hyperbola ) - 111. The Conic section is the intersection of a plane and a cone. A hyperbola is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always greater than 1. Definition of terms in hyperbola . For more videos please visit : www.ameenacademy.com Please subscribe our YouTu |
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Co ordinate geometry : - ( Comparison of hyperbola and its conjugate ) - 112. The Conic section is the intersection of a plane and a cone. A hyperbola is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always greater than 1. Comparison of hyperbola and its conjugate. For more videos please visit : www.ameenacademy.com Please subscribe o |
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Co ordinate geometry : - ( Hyperbola ; Solving problem ) - 113. The Conic section is the intersection of a plane and a cone. A hyperbola is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always greater than 1. Hyperbola ; Solving problem. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube ch |
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Co ordinate geometry : - ( Parabola ; Solving problem ) - 114. A hyperbola is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always greater than 1. Hyperbola ; Solving problem. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Uploads. |
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Co ordinate geometry : - ( Hyperbola ; Shifting the origin ) - 115. A hyperbola is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always greater than 1. Hyperbola ; Shifting the origin. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Uploads. |
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Co ordinate geometry : - ( Hyperbola ; Shifting the origin ; Solving problem ) - 116. A hyperbola is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always greater than 1. Hyperbola ; Shifting the origin ; Solving problem. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Uploads. |
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Co ordinate geometry : - ( Hyperbola ; Solving problems ) - 118. A hyperbola is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always greater than 1. Hyperbola ; Solving problem. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Uploads. |
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Co ordinate geometry : - ( Hyeperbola ; Solving problems ) - 119. A hyperbola is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always greater than 1. Hyperbola ; Solving problem. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Uploads. |
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Co ordinate geometry : - ( Hyperbola ; Condition for tangency ) - 120. A hyperbola is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always greater than 1. Hyperbola ; Condition for tangency.. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Uploads. |
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Co ordinate geometry : - ( Hyperbola ; Equation of tangents ; Solving problem ) - 121. A hyperbola is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always greater than 1. Hyperbola ; Equation of tangents ; Solving problem. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Uploads. C |
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Co ordinate geometry : - ( Hyperbola ; Tangent ; Solving problem ) - 122. A hyperbola is the locus of a point which moves so that its distance from a fixed point (focus) bears a constant ratio to its fixed straight line (directrix). This ratio is called eccentricity e .It is always greater than 1. Hyperbola ; Tangent ; Solving problem. For more videos please visit : www.ameenacademy.com Please subscribe our YouTube channel for you to get latest Uploads. |
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