26673
DEF concurrentes punctis S, T;
erit ſemper DT = 2 DS.
Quòd
11Fig. 99. ſi DE ſunt ut cubi ipſarum DF, erit ſemper DT = 3 DS; ac ſi-
mili deinceps modo.
11Fig. 99. ſi DE ſunt ut cubi ipſarum DF, erit ſemper DT = 3 DS; ac ſi-
mili deinceps modo.
X.
Sint rectæ VD, TB concurrentes in T, quas decuſſet poſnio-
22Fig. 100 ne data recta DB; tranſeant etiam per B lineæ EBE, FBF tales,
ut ductâ quâcunque PG ad DB parallelâ, ſit perpetuò PF eodem or-
dine media Arithmeticè inter PG, PE; tangat autem BR curvam
EBE, opertet lineæ FBF tangentem ad B determinare.
22Fig. 100 ne data recta DB; tranſeant etiam per B lineæ EBE, FBF tales,
ut ductâ quâcunque PG ad DB parallelâ, ſit perpetuò PF eodem or-
dine media Arithmeticè inter PG, PE; tangat autem BR curvam
EBE, opertet lineæ FBF tangentem ad B determinare.
Sumptis NM (ordinum in quibus ſunt PF, PE exponentibus)
fiat N x TD + M \\ - N} x RD. M x TD: : RD. SD; & connecta-
tur BS; hæc curvam FBF continget.
fiat N x TD + M \\ - N} x RD. M x TD: : RD. SD; & connecta-
tur BS; hæc curvam FBF continget.
Nam utcunque ducta ſit PG, dictas lineas ſecans ut vides.
Eſtque
EG. FG: : M. N. ergò FG x TD. EG x TD: : N x TD. M x TD. Item EF x RD. EG x TD: : M - N x RD. M x
3311. Lect.
VII. TD. Quapropter (antecedentes conjungendo) erit FG x TD +
EF x RD. EG x TD: : N x TD + M - N x RD. M x TD;
(hoc eſt): : RD. SD. Eſt antem LG x TD + KL x RD. 44_Conſtr._554. Lect.
VII. KG x TD: : RD. SD. quare FG x TD + EF x RD. EG x
TD: : LG x TD + KL x RD. KG x TD. hinc, cùm ſit EG 66_Hyp_& gt; KG; erit FG x TD + EF x RD & gt; LG x TD + KL x RD;
vel FG. EF + TD. RD & gt; LG. KL + TD. RD; ſeu (dem-
ptâ communi ratione) FG. EF & gt; LG. KL. vel componendo
EG. EF & gt; KG. KL & gt; EG. EL. unde eſt EF & lt; EL. 771. Lect.
VII. itaque punctum L extra curvam FBF ſitum eſt; adeoque liquet
Propoſitum.
EG. FG: : M. N. ergò FG x TD. EG x TD: : N x TD. M x TD. Item EF x RD. EG x TD: : M - N x RD. M x
3311. Lect.
VII. TD. Quapropter (antecedentes conjungendo) erit FG x TD +
EF x RD. EG x TD: : N x TD + M - N x RD. M x TD;
(hoc eſt): : RD. SD. Eſt antem LG x TD + KL x RD. 44_Conſtr._554. Lect.
VII. KG x TD: : RD. SD. quare FG x TD + EF x RD. EG x
TD: : LG x TD + KL x RD. KG x TD. hinc, cùm ſit EG 66_Hyp_& gt; KG; erit FG x TD + EF x RD & gt; LG x TD + KL x RD;
vel FG. EF + TD. RD & gt; LG. KL + TD. RD; ſeu (dem-
ptâ communi ratione) FG. EF & gt; LG. KL. vel componendo
EG. EF & gt; KG. KL & gt; EG. EL. unde eſt EF & lt; EL. 771. Lect.
VII. itaque punctum L extra curvam FBF ſitum eſt; adeoque liquet
Propoſitum.
XI.
Quinetiam, reliquis ſtantibus iiſdem, ſi PF ſupponatur ejuſ-
dem ordinis Geometricè media liquet (planè ſicut in modò præceden-
tibus) eandem BS curvam FBF contingere.
dem ordinis Geometricè media liquet (planè ſicut in modò præceden-
tibus) eandem BS curvam FBF contingere.
_Exemplnum._
Si PF ſit è ſex mediis tertia, ſeu M = 7;
&
N = 3;
erit 3 TD + 4 RD. 7 MD: : RD. SD; vel SD = {7 MD x RD/3 TD + 4 RD. }
erit 3 TD + 4 RD. 7 MD: : RD. SD; vel SD = {7 MD x RD/3 TD + 4 RD. }
XII.
Patet etiam, accepto quolibet in curva FBF puncto (ceu F)
rectam ad hoc tangentem conſimili pacto deſignari. Nempe per F
88Fig. 101. ducatur recta PG ad DB parallela, ſecans curvam EBE ad E; &
per E ducatur ER curvam EBE tangens; fiátque N x TP + M/- N} x RP.
rectam ad hoc tangentem conſimili pacto deſignari. Nempe per F
88Fig. 101. ducatur recta PG ad DB parallela, ſecans curvam EBE ad E; &
per E ducatur ER curvam EBE tangens; fiátque N x TP + M/- N} x RP.