LEM. II. If in any figure AaE (PLCCCXLV. n. 1.) terminated by the right line Aa, AE, and the curve aE, there be inscribed any number of parallelograms Ab, Bc, Cd, &c. comprehended under equal bases AB, BC, CD, &c. and the sides Bb, Cc, Dd, &c. parallel to one side Aa of the figure; and the parallelograms aKbl, bLcm, cMdn, &c. are completed. Then if the breadth of these parallelograms be supposed to be diminished, and their number augmented in infinitum; the ultimate ratios which the inscribed figure AKblcMdn, the circumscribed figure AalbmendoE, and curvilinear figure Aa

bcdE, will have to one another, are ratios of equality. Newtonian Philosophy. — For the difference of the inscribed and circumscribed figures is the sum of the parallelograms Kl, Lm, Mn, Do; that is, (from the equality of all their bases), the rectangle under one of their bases Kb, and the sum of their altitudes Aa, that is, the rectangle AB/a. But this rectangle, because its breadth AB is supposed diminished in infinitum, becomes less than any given space. And therefore, by lem. 1. the figures inscribed and circumscribed become ultimately equal the one to the other; and much more will the intermediate curvilinear figure be ultimately equal to either.