xlv 
tation about accept- 
lly in view of the 
on of the necessary 
iation of the eccen- 
instinct and power 
lemoir, in which he 
ration of the moon’s 
Ld was of substantial 
ributions to mathe- 
moirs. Yet it must 
lumerous) can safely 
> convey new results 
ire always fresh and 
1 a brief solution of 
t important results, 
lutions of differential 
sition of the theory 
there obtained the 
s work, and on the 
earches are based. 
/■’s place among the 
lered to the science 
With a singleness 
or,” he persevered to 
uence on those who 
lis genius: and they 
A. R. F. 
pp. 171—231. 
6—12. 
COURSES OF LECTURES DELIVERED BY PROFESSOR CAYLEY. 
(M. denotes Michaelmas Term; L. denotes Lent Term.) 
1863. 
M. 
Analytical Geometry. 
1864. 
M. 
Analytical Geometry. 
1865. 
M. 
Analytical Geometry and Mechanics. 
1866. 
M. 
Dynamics. 
1867. 
M. 
Miscellaneous Analysis. 
1868. 
M. 
Dynamics and Differential Equations. 
1869. 
M. 
Analytical Geometry. 
1870. 
M. 
Theories of correspondence and transformation in analytical geometry. 
1871. 
M. 
Graphical Geometry. 
1872. 
M. 
Elliptic Functions. 
1873. 
M. 
Theory of Equations and Miscellaneous Analysis. 
1874. 
M. 
Integral Calculus. 
1875. 
M. 
On a course of pure mathematics. 
1876. 
M. 
Differential Equations. 
1877. 
M. 
Algebra. 
1878. 
M. 
Solid Geometry. 
1879. 
M. 
Differential Equations. 
1880. 
M. 
Theory of Equations. 
1881. 
M. 
Abel’s Theorem and the Theta Functions. 
1882. 
M. 
Abelian and Theta Functions. 
1883. 
M. 
Higher Algebra and the Theory of Numbers. 
1884. 
M. 
Some recent developments in Analysis and Geometry. 
1885. 
M. 
Higher Algebra. 
1886. 
M. 
Differential Equations and Analytical Geometry.