Examination Papers |
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( a ) Find the curved surface of a cylindroid and prove Pappus ' theorem for the surface of a solid generated by the translation of a curve . ( b ) By considering the generation of a right circular cone find the position of a centre of ...
( a ) Find the curved surface of a cylindroid and prove Pappus ' theorem for the surface of a solid generated by the translation of a curve . ( b ) By considering the generation of a right circular cone find the position of a centre of ...
Pagina
( a ) Find the curved surface of a cylindroid and prove Pappus ' theorem for the surface of a solid generated by the translation of a curve . ( 6 ) By considering the generation of a right circular cone find the position of a centre of ...
( a ) Find the curved surface of a cylindroid and prove Pappus ' theorem for the surface of a solid generated by the translation of a curve . ( 6 ) By considering the generation of a right circular cone find the position of a centre of ...
Pagina
( b ) Thence show that three normals may be drawn from any point . 5. Obtain the polar equation to all the conics , the pole being at the focus . 6. Prove that the normal to the curve at any Queen's University Examinations : April ...
( b ) Thence show that three normals may be drawn from any point . 5. Obtain the polar equation to all the conics , the pole being at the focus . 6. Prove that the normal to the curve at any Queen's University Examinations : April ...
Pagina
Prove that the normal to the curve at any point bisects the angle between the focal lines internally in the ellipse , and externally in the hyperbola . 7. Find the locus of the intersection of two tangents to an ellipse , they being ...
Prove that the normal to the curve at any point bisects the angle between the focal lines internally in the ellipse , and externally in the hyperbola . 7. Find the locus of the intersection of two tangents to an ellipse , they being ...
Pagina
... ellipses have the same major axis the chords at two corresponding points in each ellipse meet at the same point on the major axis . HONOURS . Calculus , I. = 1. Assuming the rule 6. Prove that the normal to the curve at any point.
... ellipses have the same major axis the chords at two corresponding points in each ellipse meet at the same point on the major axis . HONOURS . Calculus , I. = 1. Assuming the rule 6. Prove that the normal to the curve at any point.
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Informații bibliografice
| Titlu | Examination Papers |
| Autor | Queen's University (Kingston, Ont.) |
| Publicată | 1898 |
| Exemplar original de la | Universitatea Harvard |
| Scanată la | 8 mai 2007 |
| Exportă citatul | BiBTeX EndNote RefMan |