, 057^5 
Remainders are- — — r, 3, 5. i„ | e . - 5, 
,' : Mere you. fee tff, a&l 45, for the purpofe, and take the Pro- 
greffion, adding the common difference 24 ( which isthe.leaft Di- 
vidend meafured by 6p and 8, )' and you have 21, 45. 69,9^ 
rv?i a'41. ; . msd ■ > r ' . 
Admit the Queflion had concdrhed thefe three Divi- 
fors. ■ 
The Multiplies of I 
increafed by 5, are } 
Thofe divided by 6^ the 
8 the R emaindm hefn? ? C Then d 'V#g thefot^f Mogceffion by 
8 the Remainders being s h 9 . theRemaWers aVe 3.o.6. 3 .o. 6. 
Wherefore I conclude, that th^ third and fixth of thefe Numbers 
are thofe fought 5 to wit 69. or 141 5 and fo on progreflively : 
Whereas, if you ha f d propounded the Remainder of to have 
been any other Number, than | ? o, 6, th ofrohknie, as concerning, 
all thefe, had ootbeenpoffible. . - r . h ' 
Some eafte Cafes. of th are thefe : 
When the Remainder of fotne Divifdr iso, and of ‘each of the 
reft of the Divifors, an vnit> orleffe by an Unit, then, the Divi- 
for, '■ ' ' : 
In which Cafes you are to find £uch a Multiplex of the Prpdud 
or lead Dividend meafurable by thofe Divifors, that have Re- 
mainders, which, increafedior ditniflik-by an U.nit^ may be a juft 
Multiplex of thatDivifbr, that hath <no Remainder. Thefe Ca- 
fes are handled hy Tucquet ^an& Bechet in his Problemes plaifans & 
deleffahles, 
PKOBLEME . 
To find the Year of the Julian Period for any Year ef Wf Lord 
iropoiea. 
It is neceffary to be furnifht with the Suns Cycle y the Prime 
Mumvrr^ and the Number of th € Bomm TndiPlion^ which the in- 
duftrious Mr, Street thus performs 1 
When. 
