And now with respect to the beauty of figure as far as it depends on the other circumstances mentioned; as to which, having room only for a slight specimen, I confine myself to the simplest figures. A circle and a square are each of them perfectly regular, being equally confined to a pre-<203>cise form, which admits not the slightest variation: a square however is less beautiful than a circle. And the reason seems to be, that the attention is divided among the sides and angles of a square; whereas the circumference of a circle, being a single object, makes one entire impression. And thus simplicity contributes to beauty: which may be illustrated by another example: a square, tho’ not more regular than a hexagon or octagon, is more beautiful than either; for what other reason, but that a square is more simple, and the attention less divided? This reasoning will appear still more conclusive, when we consider any regular polygon of very many sides; for of this figure the mind can never have any distinct perception.
A square is more regular than a parallelogram, and its parts more uniform; and for these reasons, it is more beautiful. But that holds with respect to intrinsic beauty only; for in many instances, utility turns the scale on the side of the parallelogram: this figure for the doors and windows of a dwelling-house, is preferred because of utility; and here we find the beauty of utility, prevailing over that of regularity and uniformity.
A parallelogram again depends, for its beauty, on the proportion of its sides: a great inequality of sides annihilates its beauty: approximation toward equality hath the same effect; for proportion there degenerates into imperfect uniformity, and the figure appears an unsuccessful attempt to-<204>ward a square. And thus proportion contributes to beauty.
An equilateral triangle yields not to a square in regularity, nor in uniformity of parts, and it is more simple. But an equilateral triangle is less beautiful than a square; which must be owing to inferiority of order in the position of its parts: the sides of an equilateral triangle incline to each other in the same angle, being the most perfect order they are susceptible of; but this order is obscure, and far from being so perfect as the parallelism of the sides of a square. Thus order contributes to the beauty of visible objects, no less than simplicity, regularity, or proportion.
A parallelogram exceeds an equilateral triangle in the orderly disposition of its parts; but being inferior in uniformity and simplicity, it is less beautiful.
Uniformity is singular in one capital circumstance, that it is apt to disgust by excess: a number of things destined for the same use, such as windows, chairs, spoons, buttons, cannot be too uniform; for supposing their figure to be good, utility requires uniformity: but a scrupulous uniformity of parts in a large garden or field, is far from being agreeable. Uniformity among connected objects, belongs not to the present subject: it is handled in the chapter of uniformity and variety.
In all the works of nature, simplicity makes an<205> illustrious figure. It also makes a figure in works of art: profuse ornament in painting, gardening, or architecture, as well as in dress or in language, shows a mean or corrupted taste:
Poets, like painters, thus unskill’d to trace
The naked nature and the living grace,
With gold and jewels cover ev’ry part,
And hide with ornaments their want of art.
Pope’s Essay on Criticism. 3
No single property recommends a machine more than its simplicity; not solely for better answering its purpose, but by appearing in itself more beautiful. Simplicity in behaviour and manners has an enchanting effect, and never fails to gain our affection: very different are the artificial manners of modern times. General theorems, abstracting from their importance, are delightful by their simplicity, and by the easiness of their application to variety of cases. We take equal delight in the laws of motion, which, with the greatest simplicity, are boundless in their operations.
A gradual progress from simplicity to complex forms and profuse ornament, seems to be the fate of all the fine arts: in that progress these arts resemble behaviour, which, from original candor and simplicity, has degenerated into artificial refinements. At present, literary productions are crowded with words, epithets, figures: in music,<206> sentiment is neglected for the luxury of harmony, and for difficult movement: in taste properly so called, poignant sauces with complicated mixtures of different savours, prevail among people of condition: the French, accustomed to artificial red on a female cheek, think the modest colouring of nature altogether insipid.
The same tendency is discovered in the progress of the fine arts among the ancients. Some vestiges of the old Grecian buildings prove them to be of the Doric order: the Ionic succeeded, and seems to have been the favourite order, while architecture was in its height of glory: the Corinthian came next in vogue; and in Greece, the buildings of that order, appear mostly to have been erected after the Romans got footing there. At last came the Composite with all its extravagancies, where simplicity is sacrificed to finery and crowded ornament.
But what taste is to prevail next? for fashion is in a continual flux, and taste must vary with it. After rich and profuse ornaments become familiar, simplicity appears lifeless and insipid; which would be an unsurmountable obstruction, should any person of genius and taste endeavour to restore ancient simplicity.*4<207>
The distinction between primary and secondary qualities in matter, seems now fully established. Heat and cold, smell and taste, though seeming to exist in bodies, are discovered to be effects caused by these bodies in a sensitive being: colour, which appears to the eye as spread upon a substance, has no existence but in the mind of the spectator. Qualities of that kind, which owe their existence to the percipient as much as to the object, are termed secondary qualities; and are distinguished from figure, extension, solidity, which in contradistinction to the former are termed primary qualities, because they inhere in subjects whether perceived or not. This distinction suggests a curious inquiry, Whether beauty be a primary or only a secondary quality of objects? The question is easily determined with respect to the beauty of colour; for if colour be a secondary quality, existing no where but in the mind of the spectator, its beauty must exist there also. This conclusion equally holds with respect to the beauty of utility, which is plainly a conception of the mind, arising not from sight, but from reflecting that the thing is fitted for some good end or purpose. The question is more intricate with respect to the beauty of regularity; for if regularity be a primary quality, why not also its beauty? That<208> this is not a good inference, will appear from considering, that beauty, in its very conception, refers to a percipient; for an object is said to be beautiful, for no other reason but that it appears so to a spectator: the same piece of matter that to a man appears beautiful, may possibly appear ugly to a being of a different species. Beauty therefore, which for its existence depends on the percipient as much as on the object perceived, cannot be an inherent property in either. And hence it is wittily observed by the poet, that beauty is not in the person beloved, but in the lover’s eye. This reasoning is solid; and the only cause of doubt or hesitation is, that we are taught a different lesson by sense: a singular determination of nature makes us perceive both beauty and colour as belonging to the object, and, like figure or extension, as inherent properties. This mechanism is uncommon; and when nature to