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Euclid: Elementa
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PROPOSITION 1. 
 
幾何原本第六卷 本篇論線面之比例 計三十三題
第一題 
Triangles and parallelograms which are under the same height are to one another as their bases. 
 
等高之三角形、方形。自相與為比例。與其底之比例等。 
Let ABC, ACD be triangles and EC, CF parallelograms under the same height;  I say that, as the base BC is to the base CD, so is the triangle ABC to the triangle ACD, and the parallelogram EC to the parallelogram CF. 
   
   
For let BD be produced in both directions to the points H, L and let [any number of straight lines] BG, GH be made equal to the base BC, and any number of straight lines DK, KL equal to the base CD; let AG, AH, AK, AL be joined. 
 
 
Then, since CB, BG, GH are equal to one another,  the triangles ABC, AGB, AHG are also equal to one another. [I. 38]  Therefore, whatever multiple the base HC is of the base BC,  that multiple also is the triangle AHC of the triangle ABC.  For the same reason, whatever multiple the base LC is of the base CD, that multiple also is the triangle ALC of the triangle ACD;  and, if the base HC is equal to the base CL, the triangle AHC is also equal to the triangle ACL, [I. 38]  if the base HC is in excess of the base CL,  the triangle AHC is also in excess of the triangle ACL, and, if less, less.  Thus, there being four magnitudes, two bases BC, CD and two triangles ABC, ACD,  equimultiples have been taken of the base BC and the triangle ABC, namely the base HC and the triangle AHC,  and of the base CD and the triangle ADC other, chance, equimultiples, namely the base LC and the triangle ALC;  and it has been proved that, if the base HC is in excess of the base CL,  the triangle AHC is also in excess of the triangle ALC;  if equal, equal; and, if less, less.  Therefore, as the base BC is to the base CD, so is the triangle ABC to the triangle ACD. [V. Def. 5] 
                             
                             
Next, since the parallelogram EC is double of the triangle ABC, [I. 41]  and the parallelogram FC is double of the triangle ACD,  while parts have the same ratio as the same multiples of them, [V. 15]  therefore, as the triangle ABC is to the triangle ACD, so is the parallelogram EC to the parallelogram FC.  Since, then, it was proved that, as the base BC is to CD, so is the triangle ABC to the triangle ACD,  and, as the triangle ABC is to the triangle ACD, so is the parallelogram EC to the parallelogram CF,  therefore also, as the base BC is to the base CD, so is the parallelogram EC to the parallelogram FC. [V. 11] 
             
             
Therefore etc.  Q. E. D. 
   
   
 
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