( h ) 
|^s“h?"F *^° «°t/'>feM^ W^/^ <^^ahcdefg,xh^t 
j the Excefs of the Number of the Roots of the 
Equation above the Dimenfions ofabcdefg,^ Term of 
G that IS to . - r But in colle^fug all the 
laid Produfts,« — r_j-x^=Z;>^'.</^/Vmuft arife as 
often as there are Uniis in r: Becaufe the Terras 
which are fubtraded from abc may differ from it in 
the Root r,as ^ bh, a bi^abk, 5cc. or in the Root^^ as 
ach,ac t,ack,Kc . or in the Root^ zsbc h,bcf,bck 
tliere'L nT "" 7^ -nuft arife as often as 
n In/ in a Term of C,or as often 
in general, as there are units in r, which expreffes the 
Dimenfions of C : Therefore the Term ^ -b ‘c ‘de fl 
wil l arife in th e Sum of the above-mentioned Produdk 
r y. n — r — s times. 
Part muff confift of the Terms of 
15 M doubledj each of which. as a^=Z,Vi/e/V may a. 
rile as often as there can be Differences c—d,c — e, 
^ E-i d——ey 6cc., airumed amongfl: the Terms 
whofe Number is equal to j 4 - 2 that is 7+^ 
X ~ times J, and therefore a’b'e d efg or any other 
Pa rt of B 'PI' mufl arife in the negative Part 7Ifr7 
X J + 1 times ; and fince the whole aggresate muff 
be pofitive it_^Iows _£^^x . C'G' muft I 
ways exceed J + I X J- -j- ^ X B' H'. 
CoR,. 
