APPROPINQVATIONE METVENDO. 5*3 



calculus igitur ad modum praecedentis ita procedit 

 o/Y = 2, 8888229^ /j> = 2, 91 80775 al(j>-Y)zni, 731943» 

 /X = 4,37?9 8 57/ * =4,38i2774f-i(*-X)—i,8539799 



/tang. ^ = 9,8779632 

 ergo vp = 37°> 3 y - 9",. 



/tang.(])= 8, 5088372/tang. (0=8,5368001 

 ideoque <p — i^.^o^sVideoque (0 = i°.5 8 y .i7 



ad/X = 4,3799857^ /.r =34,3812774 

 / fec. Cf) =r 1 o, 00 o 2 260 / fec. (o — 1 0,000 2 5 69 



/« — 4,3802117 /17—4,3815343 

 hinc k = 24000, 03 hinc v — 24073, 23 



ad / a —9,61 1 8924.10! / A —9,6118924 

 add./X— 4,3799857/ # —4,3812774 



ad/(*-X)= 1,8539799 

 /fec. ^=10,0979467 



/<zy = 1,9519266 

 hinc w = 89, 5 2 i 



3,9918781 

 £/«* —3,1406351 



/.££ —0,8512430 



/tang.Cj)— 8,5088372 



3,9931698 



f. /i> 5 rr 3, 1446029 



/4/ =0,8485669 



/tang.w = 8,5 368001 



/Al =9,3600802 

 ergo f 3 ? = 7, 100 

 et ^=0,229 



t*P =9,3853670 

 ergo 4.?= 7, 056 



et ^ = 0,243 



ad/$ =4,0555899 

 /(x-X) = 1,8539799 



5,9095698 



f. liv =5,8557798 



/^f^=o,o5379©o 

 /tang.\+v = 9, 877963*2 



/ i!2=JQ=9,93 17532 

 ergo ^=^=1,132 

 et £i2=I) = o,85* 



Nunc adhuc duplicentur valores ~=F~ et ^^T— 



\t[ fit 



ddX~- 4, 836. </? 2 1 ddxz^ — 9, Ziod?* 

 d d Y = + 1 , 479. </ T 2 I d dy zz— i,9$i dr 



hincque colligimus 



X' = 2 39 87, 546- 13,188.^-2,41 8. dr* 

 Y>— 774,146 + 412, 804.. </r + o,739- ^ 7 " 2 

 *' =24058,992 — 5 82,63 \.dt— 4,660. dr 2 

 y = 828,090— 20,147. tfr- 0,975. dr 



V v v 2 deinde 



