| David Munn - 1873 - 160 pages
...area of an equilateral triangle inscribed in a circle to that of the inscribed regular hexagon. n. The sides of a triangle are 42, 40, and 37 feet; find...area of the regular hexagon inscribed in a circle is \ of the area of the circumscribing hexagon. 13. Indicate upon the faces of a pyramid the trace of... | |
| Charles Godfrey, Arthur Warry Siddons - Geometry - 1903 - 384 pages
...circumscribed about a circle is twice the area of the square inscribed in the same circle. Ex. 1474. Prove that the area of the regular hexagon inscribed in a circle is twice the area of the inscribed equilateral triangle. Verify this fact by cutting a regular hexagon... | |
| Arthur Warry Siddons, Reginald Thomas Hughes - Geometry - 1926 - 202 pages
...and any straight line cut the outer circle at A, D and the inner at B, C, prove that L AOB= / COD. 8. Prove that the area of the regular hexagon inscribed in a circle is twice the area of the inscribed equilateral triangle. Verify this fact by cutting a regular hexagon... | |
| 464 pages
...circumscribed about a circle is twice the area of the square inscribed in the same fig. 235. circle. Ex. 1194. Prove that the area of the regular hexagon inscribed in a circle is twice the area of the inscribed equilateral triangle. Verify this fact by cutting a regular hexagon... | |
| Geometry - 1973 - 204 pages
...circumscribed about a circle is twice the area of the square inscribed in the same circle. Ex. 1474. Prove that the area of the regular hexagon inscribed in a circle is twice the area of the inscribed equilateral triangle. Verify this fact by cutting a regular hexagon... | |
| 480 pages
...and any straight line cut the outer circle at A, D and the inner at B, C, prove that L AOB= L COD. 8. Prove that the area of the regular hexagon inscribed in a circle is twice the area of the inscribed equilateral triangle. Verify this fact by cutting a regular hexagon... | |
| Thomas Tate (Mathematical Master, Training College, Battersea.) - 1860 - 404 pages
...the regular hexagon. Prove that the area of the star. hexagon is twice that of the hexagon. Ex. 13. Prove that the area of the regular hexagon inscribed in a circle is twice the area of the inscribed equilateral triangle. Yerify this fact by cutting a regular hexagon... | |
| 352 pages
...circumscribed about a circle is twice the area of the square inscribed in the same fig. 235. circle. Ex. 1194. Prove that the area of the regular hexagon inscribed in a circle is twice the area of the inscribed equilateral triangle. Verify this fact by cutting a regular hexagon... | |
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