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Contemplate a Euclidean aircraft. Draw factors O and S. Put I between them in order that half the space between O and I is the space between O and the purpose one-third of the best way from O to S. Say that S and I are one bloit aside. Now put D as removed from O as S is from the purpose between I and O, in order that the ratio of the space between D and I and the space between O and the purpose between D and I is twice the space between O and the purpose between D and O. Mark E in order that the space between O and the purpose between E and the purpose between D and E is half the space between O and I, and half the space between S and E is the space between the purpose between S and D and D. Now, P is positioned in order that the sum of the distances between P and S and between P and D, one in every of which is 2 bloits, is so long as E is way from the purpose 3 times as removed from O as it’s from D in order that D is between that time and E. P is nearer to I than it’s to S, but when it weren’t, H could be the purpose between P and D as removed from the place P actually is as I is from the place P could be. R is as removed from H as O is from S and as removed from D as D is from E. So what’s the form of the determine OSRHP, and what’s its space in sq. bloits?
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