Salusbury, Thomas
,
Mathematical collections and translations (Tome I)
,
1667
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1 - 30
31 - 60
61 - 90
91 - 120
121 - 150
151 - 180
181 - 210
211 - 240
241 - 270
271 - 300
301 - 330
331 - 360
361 - 390
391 - 420
421 - 450
451 - 480
481 - 510
511 - 540
541 - 570
571 - 600
601 - 630
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661 - 690
691 - 701
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Angle K H M: Therefore
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(f) O G
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and H N are parallel,
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and the
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(g)
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Angle H N F equall to the Angle O G F; for
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that G O being Perpendicular to E F, H N ſhall alſo be per-
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pandicnlar to the ſame: Which was to be demon ſtrated.
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(a)
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By Cor. </
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>of 8. of
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6. of
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Euclide.</
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(b)
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By 17. of the
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6.</
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(c)
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By 14. of the
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6.</
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(d)
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By 33. of the
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1.</
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(e)
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By 4. of the
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1.</
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(f)
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By 28. of the
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1.</
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(g)
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By 29. of th
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1</
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<
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>And the part which is within the Liquid
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doth move upwards according to the Per
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pendicular that is drawn thorow B parallel
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to R T.]
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The reaſon why this moveth upwards, and that
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other downwards, along the Perpendicular Line, hath been ſhewn above in the 8 of the firſt
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Book of this; ſo that we have judged it needleſſe to repeat it either in this, or in the reſt
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that follow.
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G</
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<
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>THE TRANSLATOR.</
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In the
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Antient
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Parabola (namely that aſſumed in a Rightangled
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Cone) the Line
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juxta quam Poſſunt quæ in Sectione ordinatim du
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cuntur
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(which I, following
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Mydorgius,
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do call the
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Parameter
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) is
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(a)
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double to that
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quæ ducta eſt à Vertice Sectionis uſque ad Axem,
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or in
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Archimedes
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phraſe,
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<
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which I for that cauſe, and
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for want of a better word, name the
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Semiparameter:
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but in
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Modern
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Parabola's it is greater or leſſer then double. </
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<
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>Now that throughout this
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Book
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Archimedes
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ſpeaketh of the Parabola in a Rectangled Cone, is mani
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feſt both by the firſt words of each Propoſition, & by this that no Parabola
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hath its Parameter double to the Line
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quæ eſt a Sectione ad Axem,
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ſave
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that which is taken in a Rightangled Cone. </
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<
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>And in any other Parabola, for
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the Line
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<
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">τᾱς μσ́χριτοῡ ἄεον<34></
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or
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quæ uſque ad Axem
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to uſurpe the Word
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Se
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miparameter
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would be neither proper nor true: but in this caſe it may paſs
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(a) Rîvalt.
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in
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Ar
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chimed.
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de Cunoid
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& Sphæroid.
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Prop.
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<
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>3. Lem. </
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>1.</
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<
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>PROP. III. THEOR. III.</
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The Right Portion of a Rightangled Conoid, when it
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ſhall have its Axis leſſe than ſeſquialter of the Se
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mi-parameter, the Axis having any what ever pro
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portion to the Liquid in Gravity, being demitted into
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the Liquid ſo as that its Baſe be wholly within the
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ſaid Liquid, and being ſet inclining, it ſhall not re
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main inclined, but ſhall be ſo reſtored, as that its Ax
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is do ſtand upright, or according to the Perpendicular.
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<
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>Let any Portion be demitted into the Liquid, as was ſaid; and
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let its Baſe be in the
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L
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iquid;
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<
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and let it be cut thorow the
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Axis, by a Plain erect upon the Sur
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face of the Liquid, and let the Se
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ction be A P O
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L,
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the Section of a
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Right angled Cone: and let the Axis
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of the Portion and Diameter of the </
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