## The Principles of the Solution of the Senate-house 'riders,' Exemplified by the Solution of Those Proposed in the Earlier Parts of the Examinations of the Years 1848-1851Macmillan & Company, 1851 - 116 pages |

### From inside the book

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**mirror**; and within what space must a point be situated to be seen by the eye in a given position ? Let AB be the**mirror**; P ( fig . 52 ) a given point . Its image will by ( A ) , be a fixed point p equally distant from the**mirror**on ... Page 85

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**mirror**B , then an image Q of Q by the**mirror**A , and so on . And a similar set of images will be formed by the rays which fall first on the**mirror**B. Now if Q move along a line QP1 , Q , will by the nature of reflection move along Q ... Page 88

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**mirror**: trace the pencil by which an eye will see the image formed after two reflexions at each**mirror**. Let 0 ( fig . 60 ) be the centre of the spherical**mirror**, F the principal focus half - way between 0 and the**mirror**, a Cb the ... Page 106

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**mirror**which moves so as always to be a tangent to its path , find the locus of the sun's image . The rectangle under the abscissæ of the axis - major of an ellipse is to the square of the semi - ordinate as the square of the axis ... Page 114

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**mirrors**, find the position of an eye which sees itself by reflection in both**mirrors**. ( A ) . Explain what is meant by the 114 SOLUTIONS OF SENATE - HOUSE RIDERS ' .### Other editions - View all

The Principles of the Solution of the Senate-House 'Riders: Exemplified by ... Francis J. Jameson No preview available - 2018 |

The Principles of the Solution of the Senate-House 'Riders: Exemplified by ... Francis J. Jameson No preview available - 2015 |

### Common terms and phrases

AC² AN.NM Arithmetic arithmetical progression axis bisects body C₁ Cambridge centre of gravity chord CHURCHILL BABINGTON circle cloth cone Conic Sections conjugate hyperbola constant curvature curve cycloid describe diameter direction directrix distance drawn Edition ellipse equations equilibrium Fellow of St fluid focus geometrical given point Hence horizontal hyperbola inches inclined inscribed John's College joining latus-rectum least common multiple Lemma length locus meet mirror move number of seconds oscillation parabola parallel parallelogram particle perpendicular plane polygon pressure prop proportional proposition prove pullies quadrilateral quantity radius ratio rays rectangle refraction right angles sewed shew sides specific gravity spherical square straight line string surface tan² tangent triangle ABC Trinity College tube V₁ vary vertex vertical W₁ weight

### Popular passages

Page 4 - To divide a given straight line into two parts, so that the rectangle contained by the whole and one of the parts, shall be equal to the square of the other part.

Page 6 - The angle at the centre of a circle is double of the angle at the circumference upon the same base, that is, upon the same part of the circumference.

Page 11 - AB is a diameter, and P any point in the circumference of a circle; AP and BP are joined and produced if necessary ; if from any point C of AB, a perpendicular be drawn to AB meeting AP and .BP in points D and E respectively, and the circumference of the circle in a point F, shew that CD is a third proportional of CE and CF.

Page 9 - IF the angle of a triangle be divided into two equal angles, by a straight line which also cuts the base; the segments of the base shall have the same ratio which the other sides of the triangle have to one another...

Page 4 - In any right-angled triangle, the square which is described upon the side subtending the right angle, is equal to the squares described upon the sides which contain the right angle.