Petri Philomeni de Dacia in algorismum vulgarem Johannis de Sacrobosco commentarius. Una cum algorismo ipso edidit et praefatus est Maximilianus Curtze.
84 numeri huius sit cyfra, constat igitur, quod in toto est bene factu m. DE RADICUM EXTACTIONE IN NUMERIS CUBICIS. Sequitztr de radicum extractione etca. Cum igitur executus 5 sit auctor de his, quae proponebantur determinanda circa radicis extractionem in nurneris quadratis, consequenter aggreditur hic determinando de eisdem propositis circa radicis extractioneln in cubicis, et facit duo. Primo enim proponit seu praemittit quaedam necessaria ad propositum, et secundo de intento exe10 quitur, cum dicit: Proposito. Adhuc primo facit (duo, quia primo facit) hoc in generali, et secundo singulum notificat in speciali, cum dicit: Est igituzr mumerus. Prima pars patet. In secunda tria facit secundum numerum trium praemissorunm, et patet pars quaelibet, quarum secunda incipit ibi. Radix autem; 15 tertia ibi: Radicem autem cubicam. Proposito ergo aliquo numiero: exequitur et facit tria, quia primo disponit figuras, et secundo docet operari secundum modum, quern auctor iste assuevit, id est secundum modum, quem compositor huius tractatus magis ab inventore huius artis invenerit traditum; et 20 tertio dat alium modum novum considerandi ordinem figurarum pro inceptione operis, qui modus idem est realiter cum priore, et hoc facit in fine, cum dicit: In hac autemn radice. Adhuc primo docet operari in extractione radicis a pluribus figuris quam tribus, et secundo, cum fuerint tres vel pauciores in nu25 mero proposito, cum dicit: Notandzmn etiam. Circa primum adhuc duo facit. Primo enim facit, quod dictum est, et secundo dat quandam cautelam hie observandam, cum dicit: Si autem aliquis digitus. Adhuc primo docet, qualiter sit hie operandum, et secundo docet rectificare operationem ibi: Hoc autem facto. 30 Adhuc primo docet, quid sit agendum iuxta inceptionem huius operationis, et secundo docet, qualiter in sequentibus sit procedendum ibi: Quo facto triplandus. Partes omnes patebunt in exemplo. In secunda parte duo facit. Primo enin docet, qua
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About this Item
- Title
- Petri Philomeni de Dacia in algorismum vulgarem Johannis de Sacrobosco commentarius. Una cum algorismo ipso edidit et praefatus est Maximilianus Curtze.
- Author
- Sacro Bosco, Joannes de, fl. 1230.
- Canvas
- Page 80
- Publication
- Hauniae,: A. F. Host,
- 1897.
- Subject terms
- Arithmetic
Technical Details
- Link to this Item
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https://name.umdl.umich.edu/acv7283.0001.001
- Link to this scan
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https://quod.lib.umich.edu/u/umhistmath/acv7283.0001.001/105
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The University of Michigan Library provides access to these materials for educational and research purposes. These materials are in the public domain in the United States. If you have questions about the collection, please contact Historical Mathematics Digital Collection Help at [email protected]. If you have concerns about the inclusion of an item in this collection, please contact Library Information Technology at [email protected].
DPLA Rights Statement: No Copyright - United States
Related Links
IIIF
- Manifest
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https://quod.lib.umich.edu/cgi/t/text/api/manifest/umhistmath:acv7283.0001.001
Cite this Item
- Full citation
-
"Petri Philomeni de Dacia in algorismum vulgarem Johannis de Sacrobosco commentarius. Una cum algorismo ipso edidit et praefatus est Maximilianus Curtze." In the digital collection University of Michigan Historical Math Collection. https://name.umdl.umich.edu/acv7283.0001.001. University of Michigan Library Digital Collections. Accessed May 29, 2025.