363182
Sphæram solidam bisecare
secundum datam
[Translation: To bisect a solid sphere in a given ]
secundum datam
[Translation: To bisect a solid sphere in a given ]
Sit centrum sphæræ
et axis , quæ dividatur
in puncto secundum datam
rationem ad
[Translation: Let be the centre of the sphere, and the axis , which is divided at the point in the given ratio to .
et axis , quæ dividatur
in puncto secundum datam
rationem ad
[Translation: Let be the centre of the sphere, and the axis , which is divided at the point in the given ratio to .
Secet axim , linea ad angulos rectos in puncto .
Manifestum est quod planum circuli cuius diameter dividit
superficiem sphæræ secundum rationem
[Translation: The line cuts the axis at right angles in the point .
It is clear that the plane of the circle whose diameter is divides the surface of the sphere in the given ratio.
Manifestum est quod planum circuli cuius diameter dividit
superficiem sphæræ secundum rationem
[Translation: The line cuts the axis at right angles in the point .
It is clear that the plane of the circle whose diameter is divides the surface of the sphere in the given ratio.
Pro divisione soliditatus ita agendum:
Fiat . Et dividetur arcus in tres
æquales partes, et subtensæ unius partis fiat æqualis .
Et per punctum agatur ad angulus rectus cum .
Dico quod:
Planum circuli cuius diameter bisecet solidum sphæram
secundum datam rationem.
vel, ita:
fiat: sinus duplus tertiæ partis arcus illius, cuius est sinus.
et per punctum fit divisio secundum datam rationem;
[Translation: For the division of solidity, it is to be done thus:
Construct , and divide the arc into three equal parts; and the chore of one part is equal to . And through the point is drawn at right angles to .
I say that: the plane of the circle with diameter bisects the solid sphere in the given ratio.
Or, thus:
Construct , twice the sine of the third part of that arc of which is the sine; and through the point make the division in the given ratio, etc.
Fiat . Et dividetur arcus in tres
æquales partes, et subtensæ unius partis fiat æqualis .
Et per punctum agatur ad angulus rectus cum .
Dico quod:
Planum circuli cuius diameter bisecet solidum sphæram
secundum datam rationem.
vel, ita:
fiat: sinus duplus tertiæ partis arcus illius, cuius est sinus.
et per punctum fit divisio secundum datam rationem;
[Translation: For the division of solidity, it is to be done thus:
Construct , and divide the arc into three equal parts; and the chore of one part is equal to . And through the point is drawn at right angles to .
I say that: the plane of the circle with diameter bisects the solid sphere in the given ratio.
Or, thus:
Construct , twice the sine of the third part of that arc of which is the sine; and through the point make the division in the given ratio, etc.
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