9

t 3

MöK- 3i

2 <^ . 3 $_£

W5K-

4 d 3

5 b fS ' 7 bb , 7 9 b3 t 9 & c

lll _ ll 3 , 5^ ^

7^ 3 «j/* 4

Sumatur primo tantum haec aequatio n zz t -}- \ t s , &

per modum praecedentem quaeratur valor ipsius /, sitque0, ita ut sit n zr 0 -f- | 0 3 ,- eritque ob F valde par-vam quantitatem 0 valor ipsius / vero proximus. Sit igi-tur verus valor t zu 0 —s- A 0 3 —f— B 0 S —}— C0 7 —J— &c.

erit t 3 m0 3 + 3 A 9 S + 3 B 0 7

H- 3 A 2 0 7

/s — 0 5 -h 6 A 0 7 , &c. & t 7 — 0 7 .

quibus substitutis in aequatione orietur n z= 0 -+- 0 3 zz

4- &c.

0

A 0 34 0 3

B 0 5A 0 52 F5 b£**05

$bb

C

B

0 7

0 7

05

A 2

2 $

0 7

A 0 7 &c.

b

3 — AÖ’

U

2(J 3 .

2- 07

7 bb- 4^07

7^ 3

Singulis ergo terminis more solito ad nihilum reductis erit

Azzo;