Proposition 2
Let the square on the straight line AB be five times the square on the segment AC of it, and let CD be double AC.
I say that, when CD is cut in extreme and mean ratio, then the greater segment is CB.
Describe the squares AF and CG on AB and CD respectively, draw the figure in AF, and draw BE through.
Now, since the square on BA is five times the square on AC, therefore AF is five times AH. Therefore the gnomon MNO is quadruple AH.
And, since DC is double CA, therefore the square on DC is quadruple the square on CA, that is, CG is quadruple AH. But the gnomon MNO is also quadruple AH, therefore the gnomon MNO equals CG.
And, since DC is double CA, while DC equals CK, and AC equals CH, therefore KB is also double BH.
But the sum of LH and HB is also double HB, therefore KB equals the sum of LH and HB.
But the whole gnomon MNO was also proved equal to the whole CG, therefore the remainder HF equals BG.
And BG is the rectangle CD by DB, for CD equals DG, and HF is the square on CB, therefore the rectangle CD by DB equals the square on CB.
Therefore DC is to CB as CB is to BD. But DC is greater than CB, therefore CB is also greater than BD.
Therefore, when the straight line CD is cut in extreme and mean ratio, CB is the greater segment.
Πηγή: aleph0
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