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" C and area S. To PROVE S — ^RxC. Circumscribe a regular polygon and call its perimeter C' and area S'. Then S "
Elements of Geometry - Page 177
by Andrew Wheeler Phillips, Irving Fisher - 1897 - 354 pages
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A Treatise on Special Or Elementary Geometry

Edward Olney - Geometry - 1872 - 472 pages
...equals altitude into |(AB + DC), = altitude into ab. QED FIG. 228. PROPOSITION raí. 326. Theorem. — The area of a regular polygon is equal to onehalf the product of its apothem into its perimeter. DEM. — Let ABCDEFC be a regular polygon whose apothem is Oa; then is its area...
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A Treatise on Special Or Elementary Geometry, Volumes 1-2

Edward Olney - Geometry - 1872 - 562 pages
...altitude into i (AB + DC), — altitude into ab. q. ED Fra. PROPOSITION VIII. 326. Ttieorem. — T/ie area of a regular polygon is equal to onehalf the product of its apothem into its perimeter, DEM. — Let ABCDEFC be a regular polygon whose apolhem is Oa; then is its area...
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Elements of Plane and Solid Geometry

George Albert Wentworth - Geometry - 1877 - 416 pages
....-.R—lim.(r) = Q. §199 .'. lim. (r) = R. BEGULAR POLYGONS AND CIRCLES. PROPOSITION IX. THEOREM. 379. The area of a regular polygon is equal to one-half the product of its apothem by its perimeter. E D Let P represent the perimeter and R the apothem of the regular polygon ABC, etc....
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Elements of Plane and Solid Geometry

George Albert Wentworth - Geometry - 1877 - 416 pages
...and denote its perimeter by P, and its apothegm by r. Then the area of this polygon = J r XP, § 379 (the area of a regular polygon is equal to one-half the product of its apothegm by the perimeter). Conceive the number of sides of this polygon to be indefinitely increased,...
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A Treatise on Special Or Elementary Geometry

Edward Olney - Geometry - 1877 - 272 pages
...altitude into i(AB + DC), = altitude into ab. QED n- B FIG. 228. PROPOSITION VIII. 326. Theorem.—The area of a regular polygon is equal to onehalf the product of its apothem into its perimeter. DEM.—Let ABCDEFC be a regular polygon whose apothem is Oa; then is its area equal...
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Elements of Plane and Solid Geometry

George Albert Wentworth - Geometry - 1877 - 436 pages
...polygon, and denote its perimeter by P, and its apothem by r. Then the area of this polygon =£rXP, §379 (the area of a regular polygon is equal to one-half the product of Us apothem by the perimeter). Conceive the number of sides of this polygon to be indefinitely increased,...
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The Elements of Plane and Solid Geometry: With Chapters on Mensuration and ...

Isaac Sharpless - Geometry - 1879 - 282 pages
...polygons of 12, 24, etc.; from a pentedecagon, figures of 30, 60, etc. Proposition 9. Theorem.—The area of a regular polygon is equal to onehalf the product of its perimeter and apothem. Let ABC be a polygon and DE its apothem; then the area of AB C is equal to $(AB+BF...
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Elements of Geometry

George Albert Wentworth - Geometry, Modern - 1881 - 266 pages
...polygon, and denote its perimeter by P, and its apothem by r. Then the area of this polygon = lr XP, §379 (the area of a regular polygon is equal to one-half the product of its apothem by the perimeter). Conceive the number of sides of this polygon to be indefinitely increased, the polygon...
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Elements of Geometry

George Albert Wentworth - Geometry, Modern - 1879 - 262 pages
...."". Urn. (R — r) = Q. .-.R—lim.(r) = 0. §199 .-. lim. (r) = R. QED PROPOSITION IX. THEOREM. 379. The area of a regular polygon is equal to one-half the product of Us apothegm by its perimeter. B ED Let P represent the perimeter and R the apothegm of the regular...
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Elementary Geometry: Including Plane, Solid, and Spherical Geometry, with ...

Edward Olney - Geometry - 1883 - 352 pages
...DC) ; and area ABCD. which equals £ (AB + DC) x IK, = ab x IK. QED PROPOSITION IX. 351. Theorem. — The area of a regular polygon is equal to one-half the product of its apothem into its perimeter. DEMONSTRATION. Let ABCDEFG be a regular polygon, whose perimeter is AB + BC + CD...
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