obtuse; for it is measured by half the arc BAC, greater than a semi-circumference. Cor. 4. The opposite angles A and C, of an inscribed quadrilateral ABCD, are together equal to two right angles; for the angle DAB is measured by half the arc DCB, the angle DCB by half the arc A B D C DAB : hence, the two angles, taken together, are mea sured by half the circumference: hence, their sum is equal to two right angles. PROPOSITION ΧΙΧ. THEOREM. Any angle formed by two chords, which intersect, is measured by half the sum of the included arcs. Let DEB be an angle formed by the intersection of the chords AB and CD: then will it be measured by half the sum of the arcs AC and DB. XVIII.); therefore, DEB is measured by half of FDB; that is, by half the sum of FD and DB, or by half the sum of AC and DB; which was to be proved. PROPOSITION XX. THEOREM. The angle formed by two secants, is measured by half the difference of the included arcs. Let AB, AC, be two secants : then will the angle BAC be measured by half the difference of the arcs BC and DF. A and EC, or by half the difference of BC and DF; which was to be proved. PROPOSITION XXI. THEOREM. An angle formed by a tangent and a chord meeting it at the point of contact, is measured by half the included arc. Let BE be tangent to the circle AMC, and let AC be a chord drawn from the point of contact A: then will the angle BAC be measured (P. XVIII.): hence, the angle BAC, which is equal to the sum of the angles BAD and DAC, is measured by half the sum of the arcs AMD and DC, or by half of the arc AMC; which was to be proved. which is the difference of Scholium. The angle CAE, DAE and DAC, is measured by half the difference of the arcs DCA and DC, or by half the arc CA. 6 PRACTICAL APPLICATIONS. PROBLEM I. To bisect a given straight line. Let AB be a given straight line. From A and B, as centres, with a radius greater than one half of AB, describe arcs intersecting at E and F: join E and F, by the straight line EF. Then will EF bisect the given line А.В. For, E and F are each equally distant from A and B; and consequently, the line EF bisects AB (B. I., P. XVI., C.). A PROBLEM II. To erect a perpendicular to a given straight line, at a given point of that line. Let BC be a given line, and let A be a given point on that line. : Lay off from A the equal distances AB and AC; from B and C, as centres, with a radius greater than one half of BC, describe arcs intersecting + A at D; draw the line AD : then will AD be the perpendicular required. For, D and A are each equally distant from Band C; consequently, DA is perpendicular to BC at its middle point A4 (B. I., P. XVI., C.). PROBLEM III. To draw a perpendicular to a given straight line, from a given point without that line. Let BD be the given line, and A the given point. From A, as a centre, with a ra dius sufficiently great, describe an arc cutting BD in two points, Band D; with Band D as centres, and a radius greater than one-half of BD, describe arcs intersecting at E; draw AE: then will AE be the perpendi A C B D TE cular required. For, A and E are each equally distant from Band D: hence, AE is perpendicular to BD (B. L., P. XVI., C.). PROBLEM IV. At a point on a given line, to construct an angle equal to a given angle. Let A be the given point, AB the given line, and From A as a centre, with a radius AB, equal to KI, |