Harriot, Thomas - Mss. 6785

217109

[Commentary:

On this page, Harriot works on the second part of Proposition 14 from Effectionum geometricarum canonica recensio (Viète 1593b, Prop .
Propositio XIV.
Idem quadratum a media proportionali inter hypotenusam trianguli rectanguli & perpendiculum ejusdem, proportionale est inter quadratum hpotenusæ & quadratum idem hypotenusæ multatum basis
The square of the mean proportional between the hypotenuse of a right-angled triangle and its perpendicular, is the proportional between the square of the hypotenuse and the square of the same hypotenuse minus the square of the
Viète demonstrated this proposition geometrically and showed that it can be represented by the quartic

A^{4} - B^{2} A^{2} = D^{4}

(in modern notation), where

A

is the hypotenuse,

B

the base, and

D

the mean. As in the earlier pages in this set, Harriot works the other way round, beginning from the equation

a a a a - b b a a = d d d d

and then deriving the corresponding construction. ]

h.) Effectiones
[Translation: Geometrical ]

2.)

a a a a - 2 c b a a = d d d d

Et intelligatur.

2 c = b

[Translation: 2.)

a a a a - 2 c b a a = d d d d

; and it may be understood that

2 c = b

Notatio pro effectione
[Translation: Notation for the geometric ]

161 (81)	162 (81v)
163 (82)	164 (82v)
165 (83)	166 (83v)
167 (84)	168 (84v)
169 (85)	170 (85v)

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