Diagram for the computation by the Engine of the 
Numbers of Bernoulli, See Note G. (page 722 et seq.) 
a ae Datas : Working Variables. = al F Result Variables, 
sult Variables 
: v, | avy] ov, | ov, | ov, | ov, | ov, ev, lev, Te 
§ | wi f} 3 4 ‘ G 7 a || °Vy |\°Vig Vv), oy 
ra Indication of | o f°) fc) fe) ©) or @ | ola lie a 7 
a Variables change in the eG t | 0 0 0 0 0 0 0 0 
2) acted value on any Statement of Results, Y 0 | 0 0 0 0 0 0 0 0 0 
= upon. | results Variable. | 2 4} 0 0} 0 0 010] 0 0 
5 | = 
: | HAO oI LZ 
: alles | 
Willig oe | n | 2n | 2n | Qn 
1 @n—1 | | | | 
2 | | 
; 1 Int1 | | 
f cnlmo Qn-1 
4 Inf | 
Sas callmeeed| aaliee SO Ties 
: | 2 2n4t 
| on | 1 2n-1 
U ; | 0 72 anzi— “0 
\7 lta | |n—1 
| — ee | 
8 a 2 
is 
9 | =|ve=Y, pail ieee ABW EE | oc | a / 
| te pale an 
10} X |Varx?Viy | oA Bat =B, Ay B 
ot Y, o o | | 1 2n 
TT] NV yt HV | eta Hic if aon 7 eeerce ci 0 {- 1 ant 
+ [Maat Vag | Papi tery 
| — v= =n—2(=2) 1 el | ss hee} 
} ——{ 
hac] ay, =2n—-1 we 1 a tes as a | (Sn— | 
MW PV; taph " 1 3 | 
| 5 | | 
hs IV, =— dovatscessoeats llisee a) cco ||. on - 2n—-1] 3 
16 || Uxitvy, x3Va Vir jes 
7||_--ky, —v, bv, =2n-2 rood] HL Wecca [ge I) aie Il an ee | 
is [eh +2V, PV, [3 fe Lmtd vscsar ects vraveeresvoooe| | lal | 4 
| Qn-2 | lan—2 
ho lhe 3V;/IV5 os ae a | 2n—9| 4 j 
(20) | UX|!Vq x4Va Vai ose ee } | 0 
| 
ft] | x'Vay28V,,)°Vie «= “ | 0 By Ay ate rftiosd 
#2) + )Virt Vian = Ay +B, Ar+ Bs Ay ral : | an 0 {artmai+ 3 3} 
| 
bs =LV9— Vj Vip.» FM B(=V) crrrnrrrereetnd Vf | oane |v |e Pane Pa [ce | on [wma 
Here follows a repetition of Operations thirteen to twenty-three. 
| ; ae dere [nen por eater | 
4 | lV 54°ValltVay ..» SBN cata TeaVl| Weeroil | kensic | Cazes || teccia| zeny |] Weep I harcsona frase hn maar F 
| =n+la4+1=5 Ul) gel el oo, ojo 
bs ty, 4 yhiy H | 
2 a4) Mat 1Va)IVs by a Variable-cardl 
by a Variable-eard, 
