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cod-al7b27_alalal-d48805.xml
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cod-al7b27_alalal-d48805.xml
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<?xml version="1.0" encoding="UTF-8"?>
<?xml-model href="https://raw.githubusercontent.com/lombardpress/lombardpress-schema/1.0.0/src/out/diplomatic.rng" type="application/xml" schematypens="http://relaxng.org/ns/structure/1.0"?>
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<TEI xmlns="http://www.tei-c.org/ns/1.0">
<teiHeader>
<fileDesc>
<titleStmt>
<title>Articulus 5</title>
<author ref="#Albert">Albertus Magnus</author>
<respStmt>
<name ref="#jeffreycwitt">Jeffrey C. Witt</name>
<resp>Transcription Editor</resp>
<resp>TEI Encoder</resp>
</respStmt>
</titleStmt>
<editionStmt>
<edition n="0.0.0-dev">
<title>Articulus 5</title>
<date when="2022-06-21">June 21, 2022</date>
</edition>
</editionStmt>
<publicationStmt>
<authority>SCTA</authority>
<availability status="free">
<p>Published under a <ref target="https://creativecommons.org/licenses/by-nc-sa/4.0/">Attribution-NonCommercial-ShareAlike 4.0 International (CC BY-NC-SA 4.0)</ref>
</p>
</availability>
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<sourceDesc>
<listWit>
<witness xml:id="Bc" n="cod-al7b27">Paris 1894, v. 27</witness>
</listWit>
</sourceDesc>
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<editorialDecl>
<p>Encoding of this text has followed the recommendations of the LombardPress 1.0.0
guidelines for a diplomatic edition.</p>
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<revisionDesc status="draft">
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<change when="2022-06-21" status="draft" n="0.0.0">
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<text xml:lang="la">
<front>
<div xml:id="starts-on">
<pb ed="#Bc" n="264"/>
</div>
</front>
<body>
<div xml:id="alalal-d48805"><!-- l2d14a5 -->
<head xml:id="alalal-d48805-Hd1e99">Articulus 5</head>
<head xml:id="alalal-d48805-Hd1e101" type="question-title">Quare celo attribuitur figura spherica ?
et, Utrum sit figura coeli ?</head>
<p xml:id="alalal-d48805-d1e104">
<cb ed="#Bc" n="b"/>
<lb ed="#Bc" n="10"/>ARTICULUS V.
<lb ed="#Bc" n="11"/>Quare celo attribuitur figura spherica ?
<lb ed="#Bc" n="12"/>et, Utrum sit figura coeli ?
</p>
<p xml:id="alalal-d48805-d1e115">
<lb ed="#Bc" n="13"/>Deinde quaeritur de tertio quod dicitur,
<lb ed="#Bc" n="14"/>ibi, <quote xml:id="alalal-d48805-Qd1e121"> Queri etiam solet, Cujgus figure
<lb ed="#Bc" n="15"/>sit coelum ? </quote>
</p>
<p xml:id="alalal-d48805-d1e127">
<lb ed="#Bc" n="16"/>Hoc videtur falsum quod dicit
Magi<lb break="no" ed="#Bc" n="17"/>ster, et Augustinus, et Damascenus, et
<lb ed="#Bc" n="18"/>multi alii Sancti, qui dicunt coelum esse
<lb ed="#Bc" n="19"/>spherice forme.
</p>
<p xml:id="alalal-d48805-d1e139">
<lb ed="#Bc" n="20"/>Quaeritur etiam ulterius, Quare coelo
<lb ed="#Bc" n="21"/>attribuitur figura spherica ?
</p>
<p xml:id="alalal-d48805-d1e146">
<lb ed="#Bc" n="22"/>Solutio, Dicendum, quod Scriptura
<lb ed="#Bc" n="23"/>non enarravit hoc in Canone, licet
san<lb break="no" ed="#Bc" n="24"/>cti Patres hoc scripserunt.
</p>
<p xml:id="alalal-d48805-d1e155">
<lb ed="#Bc" n="25"/>Ad aliud dicendum, quod spherica
<lb ed="#Bc" n="26"/>figura est in corpore, sicut circularis in
<lb ed="#Bc" n="27"/>superficie. Circularis autem et spherica
<lb ed="#Bc" n="28"/>duas habent proprietates : quia simpli-
<cb ed="#Bc" n="c"/>
<lb ed="#Bc" n="29"/>cissime sunt omnium figurarum, et quia
<lb ed="#Bc" n="30"/>capacissime : et propter primam dantur
<lb ed="#Bc" n="31"/>corpori circumdanti totum.
</p>
<p xml:id="alalal-d48805-d1e175">
<lb ed="#Bc" n="32"/>Hoc autem sic probatur : Omnis figura
<lb ed="#Bc" n="33"/>in cujus omni divisione numquam
resul<lb break="no" ed="#Bc" n="34"/>tat alia figura, et numquam ratio totius
<lb ed="#Bc" n="35"/>ejusdem figure, sed semper ratio partis”
<lb ed="#Bc" n="36"/>ejus figure, est simplicior omni alia
<lb ed="#Bc" n="37"/>figura in cujus aliqua divisione resultat
<lb ed="#Bc" n="38"/>alia et alia figura, et alia ratio totius
<lb ed="#Bc" n="39"/>ejusdem figure quae dividitur. Sic au-.
<lb ed="#Bc" n="40"/>tem. se habet circulus ad omnem
figu<lb break="no" ed="#Bc" n="41"/>ram : ergo circulus est simplicissima figu- '
<lb ed="#Bc" n="42"/>rarum. Propario prime est : quia si
ali<lb break="no" ed="#Bc" n="43"/>qua figurarum est simplicior circulo, illa
<lb ed="#Bc" n="44"/>est triangulus : quia omnis alia figura ex
<lb ed="#Bc" n="45"/>tot triangulis componitur, quot habet
<lb ed="#Bc" n="46"/>angulos. Sed triangulus potest dividi
<lb ed="#Bc" n="47"/>duobus modis, scilicet linea ducta de
la<lb break="no" ed="#Bc" n="48"/>tere in latus, et tune provenit
quadran<lb break="no" ed="#Bc" n="49"/>gulus et triangulus : et linea ducta de
<lb ed="#Bc" n="50"/>angulo super basim vel super latus
alter<lb break="no" ed="#Bc" n="51"/>utrum, et tune proveniunt duo
trian<lb break="no" ed="#Bc" n="52"/>guli. Quocumque autem modo circulus
<lb ed="#Bc" n="53"/>dividatur, velin semicirculos, vel in
pro<lb break="no" ed="#Bc" n="54"/>portiones, numquam provenit circulus
<lb ed="#Bc" n="55"/>vel alia figura, sed semper pars circuli:
<lb ed="#Bc" n="56"/>ergo circulus est simplicissima
figura<lb break="no" ed="#Bc" n="57"/>rum: ergo aitribuenda est primo corpori.
</p>
<p xml:id="alalal-d48805-d1e234">
<pb ed="#Bc" n="265"/>
<cb ed="#Bc" n="a"/>
<lb ed="#Bc" n="1"/>Quod autem sit capacissima sic
pro<lb break="no" ed="#Bc" n="2"/>batur: Non enim illud intelligitur de
<lb ed="#Bc" n="3"/>omni angulata figura, quia numquam
<lb ed="#Bc" n="4"/>potest dari circulus tante capacitatis,
<lb ed="#Bc" n="5"/>quin posset mathematice conscribi sibi
<lb ed="#Bc" n="6"/>figura angulata majoris capacitatis, si
<lb ed="#Bc" n="7"/>detur e converso : sed intelligitur de
<lb ed="#Bc" n="8"/>figura angulata inscripta in circulo,
cu<lb break="no" ed="#Bc" n="9"/>jus omnes anguli ad circumferentiam
<lb ed="#Bc" n="10"/>extenduntur. Hoc igitur notato si est
<lb ed="#Bc" n="11"/>possibile, quod figura angulata sit
capa<lb break="no" ed="#Bc" n="12"/>citatis circuli, hoc non potest esse, nisi
<lb ed="#Bc" n="13"/>propter multiplicationem angulorum
<lb ed="#Bc" n="14"/>magis disfantium a centro quam latera
<lb ed="#Bc" n="15"/>faciant : crescunt ergo anguli in
infini<lb break="no" ed="#Bc" n="16"/>tum : ergo si perveniunt figure
polygo<lb break="no" ed="#Bc" n="17"/>ne ad capacitatem circuli, tune
perve<lb break="no" ed="#Bc" n="18"/>nient. Contra : Adhuc infinitis angulis
<lb ed="#Bc" n="19"/>existentibus, semper est angulata :
an<lb break="no" ed="#Bc" n="20"/>gulus autem est duarum linearum
alter<lb break="no" ed="#Bc" n="21"/>nus contactus : ergo illa linea quae
con<lb break="no" ed="#Bc" n="22"/>tingit aliam in angulo, est chorda
alicu<lb break="no" ed="#Bc" n="23"/>jus portionis circuli: ergo non tantum
<lb ed="#Bc" n="24"/>recedit a centro quantum circumferentiae
<lb ed="#Bc" n="25"/>portio cui subtenditur : ergo non
perve<lb break="no" ed="#Bc" n="26"/>nit ad circuli capacitatem : ergo circulus
<lb ed="#Bc" n="27"/>capacissima est figurarum : ergo maxime
<lb ed="#Bc" n="28"/>competit primo corpori circumdanti
om<lb break="no" ed="#Bc" n="29"/>nia.
</p>
</div>
</body>
</text>
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