Pars

1   4|  demonstratio, quod in regula praedicta ponitur, ut, ad quodcumque
2   4| consequentias nihil attingere praedicta regula uidetur; sed tantum
3   4|      in composita hypothetica praedicta locus esset, oporteret in
4   4|      categoricis> syllogismis praedicta regula cassatur ut in hypotheticis.
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