...16, 32, etc., sides. To get the corresponding circumscribed polygons, we have merely to draw tangents at the middle points of the arcs subtended by the sides of the inscribed polygons. Cor. 5. It is plain that each inscribed polygon is but a part of one having...

...16, 32, etc., sides. To get the corresponding circumscribed polygons, we have merely to draw tangents at the middle points of the arcs subtended by the sides of the inscribed polygons. Cor. 5. It is plain that each inscribed polygon is but a part of one having...

...number of sides. EXERCISE. Theorem.—If a regular polygon is inscribed in a circle, the tangents drawn at the middle points of the arcs subtended by the sides of the inscribed polygon form a circumscribed regular polygon, whose sides are parallel to the sides of...

...number of sides. EXERCISE. Theorem.—If a regular polygon is inscribed in a circle, the tangents drawn at the middle points of the arcs subtended by the sides of the inscribed polygon form a circumscribed regular polygon, whose sides are parallel to the sides of...

...number of sides. EXERCISE. Theorem.—If a regular polygon is inscribed in a circle, the tangents drawn at the middle points of the arcs subtended by the sides of the inscribed polygon form a circumscribed regular polygon, whose sides are parallel to the sides of...

...Therefore, the polygon FGHKL is regular. (§ 341.) PROPOSITION III. THEOREM. 346. Tangents to a circle at the middle points of the arcs subtended by the sides of a regular inscribed polygon, form a regular circumscribed polygon. D' H C' Let ABCDE be a regular polygon inscribed in the circle...

...the polygon FGHKL is regular. (§ 341.) PROPOSITION III. THEOREM. 346. Tangents to a circle at tlic middle points of the arcs subtended by the sides of a regular inscribed polygon, form a regular circumscribed polygon. D" II C' Let ABCDE be a regular polygon inscribed in the circle...

...the number of sides. 301. COROLLARY V. If a regular polygon is inscribed in a circle, tangents drawn at the middle points of the arcs subtended by the sides of the inscribed polygon, form a regular circumscribed polygon whose sides are parallel to the sides of...

...apothem of the inscribed. 506. If the sides of a regular circumscribed polygon are tangent to the circle at the middle points of the arcs subtended by the sides of a similar inscribed polygon, then the sides of the circumscribed figure are parallel to those of the...

...apothem of the inscribed. 506. If the sides of a regular circumscribed polygon are tangent to the circle at the middle points of the arcs subtended by the sides of a similar inscribed polygon, then the sides of the circumscribed figure are parallel to those of the...