Book contents
Appendix: a selection of examination papers, syllabuses, etc.
Published online by Cambridge University Press: 07 October 2011
Summary
1802: CAMBRIDGE TRIPOS PAPERS
[Students took up to four papers. The seventh and eighth classes (containing the ordinary degree students) were set only bookwork questions.]
Monday morning problems—Mr Palmer
First and second classes (i.e. the expectant wranglers)
Given the three angles of a plane triangle, and the radius of its inscribed circle, to determine its sides.
The specific gravities of two fluids, which will not mix, are to each other as n : 1, compare the quantities which must be poured into a cylindrical tube, whose length is (a) inches, that the pressures on the concave surfaces of the tube, which are in contact with the fluids, may be equal.
Determine that point in the arc of a quadrant from which two lines being drawn, one to the centre and the other bisecting the radius, the included angle shall be the greatest possible.
Required the linear aperture of a concave spherical reflector of glass, that the brightness of the sun's image may be the same when viewed in the reflector and in a given glass lens of the same radius.
Determine the evolute to the logarithmic spiral.
Prove that the periodic times in all ellipses about the same centre are equal.
The distance of a small rectilinear object from the eye being given, compare its apparent magnitude when viewed through a cylindrical body of water with that perceived by the naked eye.
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- A History of Mathematics Education in England , pp. 212 - 238Publisher: Cambridge University PressPrint publication year: 1982