Solutions of the problems and riders proposed in the Senate-house examination for 1854, by the moderators and examiners |
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Resultat 1-5 av 43
Side 12
... Similarly = CP2 . Hence ( BB ' ) + 1 = ( aa ' ) & π ( BB ' ) 1 CP * + CD h = CA + CB h = a constant quantity . 15. Supposing the velocity of a body in a given elliptic orbit to be the same at a certain point , whether it describe the ...
... Similarly = CP2 . Hence ( BB ' ) + 1 = ( aa ' ) & π ( BB ' ) 1 CP * + CD h = CA + CB h = a constant quantity . 15. Supposing the velocity of a body in a given elliptic orbit to be the same at a certain point , whether it describe the ...
Side 13
... Similarly , for the other ray , the deviation at each reflection = 2π = 2π ; 8 +1 9 therefore the deviation after n reflections = 2nπ 9 Now after n reflections the rays are parallel to each other ; therefore the deviation of one must ...
... Similarly , for the other ray , the deviation at each reflection = 2π = 2π ; 8 +1 9 therefore the deviation after n reflections = 2nπ 9 Now after n reflections the rays are parallel to each other ; therefore the deviation of one must ...
Side 14
... Similarly for all like pairs of strips . Hence the centre of pressure of BB'C ' C lies in the line PM . 19. A cone is totally immersed in a fluid , the depth of the centre of its base being given . Prove that , P , P ' , P ' " , being ...
... Similarly for all like pairs of strips . Hence the centre of pressure of BB'C ' C lies in the line PM . 19. A cone is totally immersed in a fluid , the depth of the centre of its base being given . Prove that , P , P ' , P ' " , being ...
Side 15
Cambridge univ, exam. papers. Then Now hence Similarly , PR22B.R.sina + B2 . = Roπrh , and B = σπr3k ; P2 = ƒơ3π3r * ( h2 – 6hks + 9k2 ) . P12 = ƒo3π2r2 ( h2 — 6hks ' + 9k2 ) , P'2 = ‡ o2π2r1 ( h * — 6hks " + 9k2 ) . - Multiplying these ...
Cambridge univ, exam. papers. Then Now hence Similarly , PR22B.R.sina + B2 . = Roπrh , and B = σπr3k ; P2 = ƒơ3π3r * ( h2 – 6hks + 9k2 ) . P12 = ƒo3π2r2 ( h2 — 6hks ' + 9k2 ) , P'2 = ‡ o2π2r1 ( h * — 6hks " + 9k2 ) . - Multiplying these ...
Side 16
... Similarly , x 0980 C3 x = tan ( sun's zenith distance when on the meridian ) , = tan ( λ - 8 ) . 2 = tan ( λ , - 8 ) . -1 C3 λ = tan1 tan1 = tan Hence λ - λ2 х and therefore ,, Similarly C3C1 X C1C2 X X -1 C2 x C -1 3 " + x x ( 1 ) ...
... Similarly , x 0980 C3 x = tan ( sun's zenith distance when on the meridian ) , = tan ( λ - 8 ) . 2 = tan ( λ , - 8 ) . -1 C3 λ = tan1 tan1 = tan Hence λ - λ2 х and therefore ,, Similarly C3C1 X C1C2 X X -1 C2 x C -1 3 " + x x ( 1 ) ...
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Solutions of the Problems and Riders Proposed in the Senate-House ... Exam Papers Cambridge Univ Ingen forhåndsvisning tilgjengelig - 2016 |
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angular velocity asymptote axes Cambridge catenary centre of force centre of gravity chord circle cloth conic section constant cos² cose cosẞ cota cotß Crown 8vo curvature curve cylinder denoting described diameter direction distance dx dy dy dx ecliptic elastic ellipse equal equation equilibrium Fellow of St fixed point fluid geometrical progression given Hence horizontal hyperbola inclined plane intersection lamina latus rectum length locus longitude M.A. Fellow major axis middle point motion orbit parabola parallel particle passing perpendicular position pressure projection prove radius refraction right angles ring shew sides Similarly sine sino sinẞ straight line string Supposing surface tana tangent tanß triangle Trinity College tube V₁ vertical
Populære avsnitt
Side 221 - Prize Essay for 1877. 8vo. 8.r. 6V. SMITH— Works by the Rev. BARNARD SMITH, MA, Rector of Glaston, Rutland, late Fellow and Senior Bursar of St. Peter's College, Cambridge. ARITHMETIC AND ALGEBRA, in their Principles and Application ; with numerous systematically arranged Examples taken from the Cambridge Examination Papers, with especial reference to the Ordinary Examination for the BA Degree.
Side 213 - HEMMING— AN ELEMENTARY TREATISE ON THE DIFFERENTIAL AND INTEGRAL CALCULUS, for the Use of Colleges and Schools. By GW HEMMING, MA, Fellow of St. John's College, Cambridge. Second Edition, with Corrections and Additions. 8vo.
Side 214 - For really ripe scholarship. extensive acquaintance with Latin literature, and familiar knowledge of continental criticism, ancient and modern, it is unsurpassed among English editions.
Side 220 - Geometry. With a numerous collection of Easy Examples progressively arranged, especially designed for the use of Schools and Beginners. By G. HALE PUCKLE, MA, St. John's College, Cambridge, Mathematical Master in the Royal Institution School, Liverpool.
Side 209 - The Evidences of Christianity as Exhibited in the Writings of its Apologists down to Augustine. An Essay which obtained the Hulsean Prize for the Year 1852. By WJ BOLTON, of Gonville and Caius College, Cambridge. 8vo. cloth, 6s.
Side 167 - AB into two parts, so that the rectangle contained by the whole line and one of the parts, shall be equal to the square on the other part.
Side 221 - Arithmetic and Algebra, in their Principles and Application: with numerous systematically arranged Examples, taken from the Cambridge Examination Papers. With especial reference to the ordinary Examination for BA Degree. By BARNARD SMITH, MA, Fellow of St.
Side 222 - Psalms and Hymns for Public Worship. Selected and Edited by the Rev. JF THRUPP, MA 18ms.
Side 209 - ANTHOLOGIA Latina Selecta. In 2 vols. Small 8vo. VOL. I.— Containing select Epigrams of Catullus, Virgil, Claudian, Ausonius, with others from the Anthologia Latina.
Side 167 - To describe an isosceles triangle, having each of the angles at the base double of the third angle.