And as the same is true of all the other triangles having their vertices in D, which make up the inscribed polygon, therefore the whole of the inscribed polygon is less than the rectangle contained by DA, and AK half the perimeter of the polygon. Now, the rectangle DA.AK is less than DA.AH; much more, therefore, is the polygon whose side is AB less than DA.AH; and the rectangle DA.AH is therefore greater than any polygon inscribed in the circle ABC. But the same rectangle DA.AH has been proved to be less than any polygon described about the circle ABC; therefore, the rectangle DA.AH is equal to the circle ABC (2. Cor. 4. 1. Sup.). Now, DA is the semidiameter of the circle ABC, and AH the half of its circumference. Therefore, &c. Q. E. D. Cor. 1. Because DA: AH :: DA2 : DA.AH (1. 6.); and because by this proposition, DA.AH=the area of the circle, of which DA is the radius: therefore, as the radius of any circle to the semicircumference, or as the diameter to the whole circumference, so is the square of the radius to the area of the circle. Cor. 2. Hence a polygon may be described about a circle, the perimeter of which shall exceed the circumference of the circle by a line that is less than any given line. Let NO be the given line. Take in NO the part NP less than its half, and less also than AD, and let a polygon be described about the circle ABC, so that its excess above ABC may be less than the square of NP (1. Cor. 4. 1. Sup.). Let the side of this polygon be EF. And since, as has been proved, the circle is equal to the rectangle DA. AH, and the polygon to the rectangle DA.AL, the excess of the polygon above the circle is equal to the rectangle DA.HL; therefore the rectangle DA.HL is less than the square of NP; and therefore, since DA is greater than NP, HL is less than NP, and twice HL less than twice NP, wherefore, much more is twice HL less than NO. But HL is the difference between half the perimeter of the polygon whose side is EF, and half the circumference of the circle: therefore, twice HL is the difference between the whole perimeter of the polygon and the whole circumference of the circle (5. 5.). The difference, therefore, between the perimeter of the polygon and the circumference of the circle is less than the given line NO. Cor. 3. Hence also, a polygon may be inscribed in a circle, such that the excess of the circumference above the perimeter of the polygon may be less than any given line. This is proved like the preceding. PROP. VI. THEOR. The areas of circles are to one another in the duplicate ratio, or as the squares, of their diameters. Let ABD and GHL be two circles, of which the diameters are AD and GL; the circle ABD is to the circle GHL as the square of AD to the square of GL. Y Let ABCDEF and GHKLMN be two equilateral polygons of the same number of sides inscribed in the circles ABD, GHL; and let Q be such a space that the square of AD is to the square of GL as the circle ABD to the space Q. Because the polygons ABCDEF and GHKLMN are equilateral and of the same number of sides, they are similar (2. 1. Sup.), and their areas are as the squares of the diameters of the circles in which they are inscribed. Therefore AD2 : GL:: polygon ABCDEF : polygon GHKLMN; but AD2: GL2 :: circle ABD: Q; and therefore, ABCDEF : GHKLM :: circle ABD : : Q. Now, circle ABD 7 ABCDEF; therefore Q7 GHKLMN (14.5.), that is, Qis greater than any polygon inscribed in the circle GHL. In the same manner it is demonstrated, that Q is less than any polygon described about the circle GHL; wherefore, the space Qis equal to the circle GHL (2. Cor. 4. 1. Sup.). Now, by hypothesis, the circle ABD is to the space Q as the square of AD to the square of GL; therefore the circle ABD is to the circle GHL as the square of AD to the square of GL. Therefore, &c. Q. E. D. Cor. 1. Hence the circumferences of circles are to one another as their diameters. Let the straight line X be equal to half the circumference of the eircle ABD, and the straight line Y to half the circumference of the X Y circle GHL: And because the rectangles AO.X, and GP.Y are equal to the circles ABD and GHL (5. 1. Sup.); therefore AO.X: GP.Y :: AD2 : GL2 :: AO2: GP; and alternately, AO.X : AO2 : : GP.Y : GP2; whence, because rectangles that have equal altitudes are as their bases (1. 6.), X :: AO :: Y : GP, and again alternately, X : Y :: AO : GP'; wherefore, taking the doubles of each, the circumference ABD is to the circumference GHL as the diameter AD to the diameter GL. COR. 2. The circle that is described upon the side of a right angled triangle opposite to the right angle, is equal to the two circles described on the other two sides. For the circle described upon SR is to the circle described upon RT as the square of SR to the square of RT; and the circle described upon TS is to the circle described upon RT as the square of ST to the square of RT. Wherefore, the circles described on SR and on ST are to the circle describ ed on RT as the squares of SR and of ST to the square of RT (24.5.). But the squares of RS and of ST are equal to the square of RT (47. 1.); therefore the circles described on RS and ST are equal to the circle described on RT. R PROP. VII. THÉOR. S T Equiangular parallelograms are to one another as the products of the numbers proportional to their sides. Let AC and DF be two equialar parallelograms, and let M, N, P and Q be four numbers, such the AB: BC:: M:N; AB: DE:: M: P, and AB: EF :: M: Q, and therefore ex æquali, BC: EF :: N: Q. The parallelogram AC is to the parallelogram DF as MN to PQ. Let NP be the product of N into P, and the ratio of MN to PQ will be compounded of the ratios (def. 10. 5.) of MN to NP, and of NP to PQ. But the ratio of MN to NP is the same with that of M J : C F A BD E to P (15. 5.), because MN and NP are equimultiples of M and P; and for the same reason, the ratio of NP to PQ is the same with that of N to Q; therefore the ratio of MN to PQ is compounded of the ratios of M to P, and of N to Q. Now, the ratio of M to Pis the same with that of the side AB to the side DE (by Hyp.); and the ratio of N to Q the same with that of the side BC to the side EF. Therefore, the ratio of MN to PQ is compounded of the ratios of AB to DE, and of BC to EF. And the ratio of the parallelogram AC to the parallelogram DF is compounded of the same ratios (23. 6.); therefore, the parallelogram AC is to the parallelogram DF as MN, the product of the numbers M and N, to PQ, the product of the numbers P and Q. Therefore, &c. Q. E. D. Cor. 1. Hence, if GH be to KL as the number M to the number N; the square described on GH will be to the square described on G KL as MM, the square of the num ber M to NN, the square of the number N. COR. 2. If A, B, C, D, &c. are any lines, and m, n, r, s, &c. numbers proportional to them; viz. A:B::m:n:A:C::m:r, A: D::m:s, &c.; and if the rectangle contained by any two of the lines be equal to the square of a third line, the product of the numbers proportional to the first two, will be equal to the square of the number proportional to the third; that is, if A.C=B2, mXr=nXn, or=n2. For by this Prop. A.C: B2 ::mXr:n2; but A.C=B2, therefore mXr=n2. Nearly in the same way it may be demonstrated, that whatever is the relation between the rectangles contained by these lines, there is the same between the products of the numbers proportional to them. So also conversely if mandr be numbers proportional to the lines A and C; if also A.C=B2, and if a number n be found such, that n2 =mr, then A:B::m:n. For let A: B::m: q, then since, m, q, rare proportional to A, B, and Cd A.C=B2; therefore, as has just been proved, q2=mXr; but wqXr, by hypothesis, therefore n2=q2, and n=q; wherefore A:B::m:n. SCHOLIUM. In order to have numbers proportional to any set of magnitudes of the same kind, suppose one of them to be divided into any number, m of equal parts, and let H be one of those parts. Let H be found n times in the magnitude B, r times in C, s times in D, &c., then it is evident that the numbers m, n, r, s are proportional to the magnitudes A, B, C and D. When therefore it is said in any of the following propositions, that a line as A a number m, it is understood that A=m XH, or that A is equal to the given magnitude H multiplied by m; and the same is understood of the other magnitudes, B, C, D, and their proportional numbers, H being the common measure of all the magnitudes. This common measure is omitted for the sake of brevity in the arithmetical expression; but is always implied, when a line, or other geometrical magnitude, is said to be equal to a number. Also, when there are fractions in the number to which the magnitude is called equal, it is meant that the common measure H is farther subdivided into such parts as the numerical fraction indicates. Thus, if A=360.375, it is meant that there is a certain magnitude H, 375 1000 such that A=360×H+ XH, or that A is equal to 360 times H, together with 375 of the thousandth parts of H. And the same is true in all other cases, where numbers are used to express the relations of geometrical magnitudes. PROP. VIII. THEOR. The perpendicular drawn from the centre of a circle on the chord of any arch is a mean proportional between half the radius and the line made up of the radius and the perpendicular drawn from the centre on the chord of double that arch: And the chord of the arch is a mean proportional between the diameter and a line which is the difference between the radius and the foresaid perpendicular from the centre. Let ADB be a circle, of which the centre is C; DBE E any arch, and DB the half of it; let the chords DE, DB be drawn; as also CF and CG at right angles to DE and DB; if CF be produced it will meet the circumference in B; let it meet it again in A, and let AC be bisected in H; CG is a mean proportional between AH and AF; and |