FILO FLEXILI CONNEXORFM d^c. i6y 



chronas, ponatiirque maltii corporis rupremi = w; me- 

 dii — M et infimi — fx: diftantia AH — /; HF — L; 

 FG~X; diftantia corporis H a linen verticiili AP— i; 

 diftantia vcro corporis F ab eadem linca verticalizr .f^ 

 erit 



{(MMl>.-hMixI\)ss-\-7!i M /X 4- ;/,' |x /L - ;;/ M LX 

 -MM/X-MMLX -h;;/;x,X ~ M/x/X -MjaLX) .f 

 -;;/[x/X -///M/X^K^^fM/X H-- fx/X).f-;//L X-M/X 

 — M L X - |JL /X — fjL L X -f- ;;/ /L ^ ~ ;// ;;/ /x //L L .f. 



Diftantia autem corporis infimi a linea verticali erit 

 pro quauis radice ipfius s aequalis 



. mmx _, inX_ _, f , X _, I^ _ ^ _ MMX mmX mx 



MX -s MX_ X 



ml ) ^ |aL L • 



Haec vt demonftrentur , ponatur rurfus filum infi- 

 mum FG flicillime extcndi atquc fic corpus G vi gra- 

 uitatis naturali accckratum , ailumto aliquo tempusculo 

 infinite paruo verticalitcr delccndcrc ex G in s , dum 

 interea ambo corpora fuperiora accelerentur, vti in figu- 

 ra priraa , fliciendo arculos (iios H;/ et Y ii. Patet au- 

 tem , fi G.f in figura (ecunda aequalis ponatur dc(cen- 

 fui FE in figura prima , fore pariter arculos H;/ et F/^ 

 idem in vtraque figura ; erit igitur per praecedentcm pa- 

 ragraphum lln—{\—^)xGs et ¥u—(\-\-~xGs^m' 

 telligendo per x lineolam // M perpendiciilariter ad pro- 

 longatam An dudlam, prouti deinceps per j intellige- 

 mus lineolamj"y, quae perpendicularis eil ad prolon- 

 gatam nir. iamducantur horizontalis FQ_ac verticalis QG, 



(iimtaque 



