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|[[ 16 ]]|| In any triangle, if one of the sides be produced, the exterior angle is greater than either of the interior and opposite angles. || 279 | |[[ 16 ]]|| In any triangle, if one of the sides be produced, the exterior angle is greater than either of the interior and opposite angles. || 279 | ||
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− | |26 part II || | + | |26 part II || If two triangles have the two angles equal to two angles respectively, and one side equal to one side, namely, either the side adjoining the equal angles, or that subtending one of the equal angles, <strike>they will also have the remaining sides equal to the remaining sides</strike> and the remaining angle to the remaining angle. || 301 |
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|45 || To construct, in a given rectilineal angle, a parallelogram equal to a given rectilineal figure. || 345 | |45 || To construct, in a given rectilineal angle, a parallelogram equal to a given rectilineal figure. || 345 |
Latest revision as of 19:01, 2 October 2009
Larson, Jennifer K., Maser, Jonathan E., McKittrick, Craig C., Reagin, Susan J.: 16,26 part II,45
Our online discussion of the Euclid propositions.
Proposition Number | Proposition | Page |
---|---|---|
16 | In any triangle, if one of the sides be produced, the exterior angle is greater than either of the interior and opposite angles. | 279 |
26 part II | If two triangles have the two angles equal to two angles respectively, and one side equal to one side, namely, either the side adjoining the equal angles, or that subtending one of the equal angles, |
301 |
45 | To construct, in a given rectilineal angle, a parallelogram equal to a given rectilineal figure. | 345 |