Consequently if the bounding line to which we have referred form a circle, the most perfect of all plane figures, it will contain a greater space than if the same length of line took the form of a square, while a square contains a greater space than a triangle having the same total perimeter, and an equilateral triangle than a scalene triangle.

But there are other points which perhaps present greater difficulty. I will take an example which is easy even for those who have no knowledge of geometry. There is scarcely anyone who does not know that the Roman acre is 240 feet long and 120 feet broad, and its total perimeter and the area enclosed can easily be calculated.

But a square of 180 feet gives the same perimeter, yet contains a much larger area within its four sides. If the calculation prove irksome to any of my readers, he can learn the same truth by employing smaller numbers. Take a ten foot square: its perimeter is forty feet and it contains 100 square feet. But if the dimensions be fifteen feet by five, while the perimeter is the same, the area enclosed is less by a quarter.

On the other hand if we draw a parallelogram measuring nineteen feet by one, the number of square feet enclosed will be no greater than the number of linear feet making the actual length of the parallelogram, though the perimeter will be exactly as that of the figure which encloses an area of 100 square feet. Consequently the area enclosed by four lines will decrease in proportion as we depart from the form of a square.

It further follows that it is perfectly possible for the space enclosed to be less, though the perimeter be greater. This applies to plane figures only: for even one who is no mathematician can see that, when we have to consider hills or valleys, the extent of ground enclosed is greater than the sky over it.

But geometry soars still higher to the consideration of the system of the universe: for by its calculations it demonstrates the fixed and ordained courses of the stars, and thereby we acquire the knowledge that all things are ruled by order and destiny, a consideration which may at times be of value to an orator.

When Pericles dispelled the panic caused at Athens by the eclipse of the sun by explaining the causes of the phenomenon, or Sulpicius Gallus discoursed on the eclipse of the moon to the army of Lucius Paulus to prevent the soldiers being seized with terror at what they regarded as a portent sent by heaven, did not they discharge the function of an orator?

If Nicias had known this when he commanded in Sicily, he would not have shared the terror of his men nor lost the finest army that Athens ever placed in the field. Dion for instance when he came to Syracuse to overthrow the tyranny of Dionysius, was not frightened away by the occurrence of a similar phenomenon. However we are not concerned with the uses of geometry in war and need not dwell upon the fact that Archimedes singlehanded succeeded in appreciably prolonging the resistance of Syracuse when it was besieged.

It will suffice for our purpose that there are a number of problems which it is difficult to solve in any other way, which are as a rule solved by these linear demonstrations, such as the method of division, section to infinity, Quintilian is perhaps referring to the measurement of the area of an irregular figure by dividing it into a number of small equal and regular figures the size of which was calculable. and the ratio of increase in velocity. From this we may conclude that, if as we shall show in the next book an orator has to speak on every kind of subject, he can under no circumstances dispense with a knowledge of geometry.