| Euclid, John Keill - Geometry - 1723 - 436 pages
...the one -u> ill be greater than the Bafe of the other; which was to be demonftrated. PROPOSITION XXV, **THEOREM. If two Triangles have two Sides of the one equal to two Sides of the other, each to each,** and the Bafe of the one greater than the Bafe of the other ; they fh all alfo have the Angles, contain1d... | |
| Euclid, John Keill - Geometry - 1733 - 446 pages
...equal to it. Where^ fore the Angle BAC is neceflarily greater than the Angle EDF. If) therefore, two **Triangles have two Sides of the one equal to two Sides of the-** other, eachto each, and the Bafe of the one greater than the Bafe of the other ; they Jhall alfo have... | |
| Robert Simson - Trigonometry - 1762 - 488 pages
...Which was to be done. PROP. XXIV. THE OR. TF two triangles have two fides of the one equal to two fides **of the other, each to each, but the angle contained by the two** fides of one of them greater than the angle contained by the two fides equal to them, of the other;... | |
| John Keill - Geometry - 1772 - 462 pages
...having the fame Ends which the firjl Right Lines have; which was to be demonftrated. PROPOSITION VIII. **THEOREM. . If two Triangles have two Sides of the one equal to two Sides of the other, each to each,** and the Bafes equal, then the Angles contained under the eoual Sides will be equal. LET the two Triangles... | |
| Benjamin Donne - Geometry, Plane - 1775 - 336 pages
...; much more then muft л. BDC be Г ¿_ A. Q^ ED PI.2.FI 92- THEOREM 14. If two Triangles ABC, DEF, **have two Sides of the one equal to two Sides of the other, each to** eacbi viz. AB — DE, and AC — DF; eut the contained Angle of one greater than the contained Angle... | |
| Robert Simson - Trigonometry - 1775 - 534 pages
...to be done. PROP. XXIV. THEO R. SeeN. TF two triangles have two fides of the one equal to two fides **of the other, each to each, but the angle contained by the two** fides of one of them greater than the angle contained by the two fides equal to them, of the other... | |
| Euclid - 1781 - 552 pages
...PROP. XXIV. THEO R. S«'eti. TF two triangles have two fides of the one equal to two •*• fides **of the other, each to each, but the angle contained by the two** Tides of one ot them greater than the angle contained by the two fides equal to them, of the other;... | |
| John Keill - Geometry - 1782 - 472 pages
...equal to it. Wherefore the Angle BAC is neceflarily greater than the Angle EDF. If, therefore, two **Triangles have two Sides of the one equal to two Sides of the** tiber, each ts each, and the Baje of the one greater than the Bafe of the other ; they jhatl alfo have... | |
| John Playfair - Euclid's Elements - 1795 - 462 pages
...Which was to be done. PROP. XXIV. THEO R. IF two triangles have two fides of the one equal to two fides **of the other, each to each, but the angle contained by the two** fides of one of them greater than the angle contained by the two fides equal to them, of the other... | |
| Alexander Ingram - Trigonometry - 1799 - 374 pages
...Which was to be done. PROP. XXIV. THEOR. IF two triangles have two fides of the one equal to two fides **of the other, each to -each, but the angle contained by the two** fides of one of them, greater than the angle contained by the two fides equal to them, of the other... | |
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