| George Washington Hull - Geometry - 1807 - 408 pages
...coincide by superposition, but they are said to be equal by symmetry, PROPOSITION XXVI. THEOREM. 423. Tlie **sum of any two face angles of a trihedral angle is greater than the third.** The theorem requires proof only when the angle considered is greater than each of the others. Given... | |
| Sir Norman Lockyer - Electronic journals - 1902 - 1074 pages
...which the angle varies as the line in the plane revolves. The statement of Prop, xxii., § 458, " that **the sum of any two face angles of a trihedral angle is greater than the third** angle," should be limited by inserting the word " convex" before the word " trihedral." The seventh,... | |
| Sir Norman Lockyer - Electronic journals - 1902 - 688 pages
...which the angle varies as the line in the plane revolves. The statement of Prop, xxii., § 458, " that **the sum of any two face angles of a trihedral angle is greater than the third** angle," should be limited by inserting the word "convex" before the word "trihedral." The seventh,... | |
| 1876 - 646 pages
...circles being 10 and 6 feet, required the area of the ring contained between their circumferences. 5. **The sum of any two face angles of a trihedral angle is greater than the third.** 6. The lateral area of a frustrum of a regular pyramid is equal to its slant height into half the sum... | |
| George Albert Wentworth - Geometry - 1877 - 436 pages
...to coincide by superposition, but are said to be equal by symmetry. PROPOSITION XXIII. THEOREM. 487. **The sum of any two face angles of a trihedral angle is greater than the third.** Let S-ABC be a trihedral angle in which the face angle ASC is greater than either angle AS B or angle... | |
| Rutgers University. College of Agriculture - 1893 - 680 pages
...proportional are similar. 6. The diameter of a circle is five feet; find the side of the inscribed square. 7. **The sum of any two- face angles of a trihedral angle is greater than the third.** 05) 8. Two symmetrical spherical triangles are equivalent. 9. The lateral area of a cone of revolution... | |
| Arthur Latham Baker - Geometry, Solid - 1893 - 154 pages
...dihedrals of a trihedral are equal, the trihedral is isosceles. PROPOSITION XIX. . THEOHEM. 91. The sum of **two face angles of a trihedral angle is greater than the third.** Notation. Let a, j3 and y be the three face angles of u trihedral angle, of which /3 is the greatest.... | |
| George Albert Wentworth - Geometry - 1894 - 456 pages
...posithat is, the trihedral angles SOLID GEOMETRY. — BOOK VI. PROPOSITION XXIV. THEOREM. 539. Tlie **sum of any two face angles of a trihedral angle is greater than the third** face angle. 8 In the trihedral angle S-ABC let the angle ASC be greater than ASB or BSC. To prove Z... | |
| George Clinton Shutts - Geometry - 1894 - 412 pages
...symmetrical solids. The right glove cannot fit the left hand. PROPOSITION XXXIII. 473. Theorem. The sum oj **any two face angles of a trihedral angle is greater than the third** face angle. A Let AB С D represent a trihedral angle in which each of the face angles DAB and В А... | |
| George Albert Wentworth - Geometry - 1896 - 68 pages
...two straight lines not in the same plane, one common perpendicular can be drawn, and only one. 539. **The sum of any two; face angles of a trihedral angle is greater than the third** face angle. 540. The sum of the face angles of any convex polyhedral angle is less than four right... | |
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