Never was a man whose outer physique so belied his powers as that of Cayley. There was something eerie and uncanny in his ways, that inclined strangers to pronounce him neither to be wholly sane nor gifted with much intelligence, which was the very reverse of the truth ... he appeared so frail as to be incapable of ordinary physical work.

We are surrounded by some of the highest mountains in Scotland, among which the most beautiful is certainly Schiehallion famous in the history of gravitation; I have been trying in vain to induce Cayley to repeat Dr Maskelyne's experiments on its summit and to acquire to himself a never dying fame; but alas he has no desire for notoriety, and has a rooted aversion to experiments and calculations of all kinds: he is now sitting by my side carrying on those dreadful investigations commenced in the Mathematical Journal, in which having exhausted all the letters of the Greek and English alphabets, he is fain to turn his δελτα s tops turvy, and have recourse to the old English.

I wish I could manage a visit to Lincoln, I should so much enjoy talking over some things with you, not to mention the temptation of your Cathedral. I think I must contrive it some time in the next six months, in spite of there being no railway, which one begins to consider oneself entitled to in these days.

We have been busy (when we ought to have been drawing acts of parliament and such sublunary matters) in constructing the developable surface generated by the tangent to the curve of intersection of the straight cylinder and sphere of double its radius ...

Kirkman's paper is decidedly interesting and his main result a very elegant one.

The law was always drudgery to him. The superabundant verbiage of legal forms was always distasteful to him. He once remarked that "the object of law was to say a thing in the greatest number of words, of mathematics to say it in the fewest."

At Cambridge, and even as a pupil barrister, he could retire to his study. As a newly qualified barrister, with a growing scientific reputation, it became obligatory to adopt a more public persona, a role which did not sit easily with his retiring disposition. Cayley maintained contact with Cambridge and from serving as Senior Examiner at the annual Trinity College examinations, he progressed to the responsibility of being Senior Moderator for the Mathematical Tripos in 1851 and Senior Examiner in 1852.

... to explain and teach the principles of pure mathematics and to apply himself to the advancement of that science.

Cayley was concerned with mathematics 'per se', while most students wanted competence in a circumscribed syllabus. Any deviation from it was regarded as a waste of time and effort.

Although the term "matrix" was introduced into mathematical literature by James Joseph Sylvester in 1850, the credit for founding the theory of matrices must be given to Arthur Cayley, since he published the first expository articles on the subject. ... Cayley's introductory paper in matrix theory was written in French and published in a German periodical [in 1855]. ... [He] introduces, although quite sketchily, the ideas of inverse matrix and of matrix multiplication, or "compounding" as Cayley called it. The above basic properties are expanded in a second expository article [of 1858] which also lists many additional properties of matrices.

... the symbol 1 will naturally denote an operation which (either generally or in regard to the particular operand) leaves the operand unaltered. .... A symbol xy denotes the compound operation, the performance of which is equivalent to the performance, first of the operation y, and then of the operation x; xy is of course in general different from yx. But the symbols x, y, ... are in general such that x(yz) = (xy)z etc, so that xyz, xyzt, etc. have a definite signification independent of the particular mode of compounding the symbols ...

It is well known that Euclid's twelfth axiom, even in Playfair's form of it, has been considered as needing demonstration: and that Lobachevsky constructed a perfectly consistent theory, wherein this axiom was assumed not to hold good, or say a system of non-Euclidean plane geometry. My own view is that Euclid's twelfth axiom in Playfair's form of it does not need demonstration, but is part of our experience - the space, that is, which we become acquainted with by experience, but which is the representation lying at the foundation of all external experience. Riemann's view ... is that, having 'in intellectu' a more general notion of space (in fact a notion of non-Euclidean space), we learn by experience that space (the physical space of our experience) is, if not exactly, at least to the highest degree of approximation, Euclidean space. But suppose the physical space of our experience to be thus only approximately Euclidean space, what is the consequence which follows? Not that the propositions of geometry are only approximately true, but that they remain absolutely true in regard to that Euclidean space which has been so long regarded as being the physical space of our experience.

... I attended a meeting of the Mathematical Society of London. The room was small, and some twelve mathematicians were assembled round a table, among them was Prof Cayley ... At the close of the meeting Cayley gave me a cordial handshake and referred in the kindest terms to my papers which he had read. He was then about 60 years old, considerably bent, and not filling his clothes. What was most remarkable about him was the active glance of his grey eyes and his peculiar boyish smile.

... a thin weak-looking individual with a large head and face marked with small-pox: he speaks with difficulty and stutters slightly. He never sits upright on his chair but with his posterior on the very edge he leans one elbow on the seat of the chair and throws the other arm over the back.

Cayley, in addition to his wondrous originality, was assuredly the most learned and erudite of mathematicians. Of him in his science it might be said he knew everything, and he was the very last man who ever will know everything. His was a very gentle, sweet character. Sylvester told me he never saw him angry but once, and that was (both were practicing law!) when a messenger broke in on one of their interviews with a mass of legal documents - new business for Cayley. In an access of disgust, Cayley dashed the documents upon the floor.

Cayley was Britain's outstanding pure mathematician of the nineteenth century. An algebraist, analyst, and geometer, he was able to link these vast domains of study. More than fifty concepts and theorems of mathematics bear his name. By the end of his life he was revered by mathematicians the world over.