(996) 
(harplbone faftn'd to the Head. Tooth-kfs m the upper Jaw, 
as being of the ruminating kind. V^ry cloven footed 5 and.final- 
hoofed before , but thick- flefli't on the hinder parts oftheleggs, 
like a Camel. 
As to the inward parts , it had a Liver ftiaped tike that of a 
man , divided into two Lobes 5 and in tfee hollow part of the 
Liver there were two Ljmphatick branches, which faftn'd the 
vmkohhtFemforta to the fuperiour Orifice of the Stomach. 
The fubftance of this Liver plainly appeared to them glandu- 
lar, each grain of it being pierced,as they thought, in the midle, 
byreafonof a little red cleft they had , whence iffued blood , , 
when preffed. And the caufe > why thefe glandules feldomeap- 
peare vnfevered one from another , may be, that when the a* 
nimal is in health they are fpungy and fiird out with bood^whichi 
they are not 5 when it is fick^ or emaciated^ drc^ 
jll. LABYRIKTHUS ALG EBRJE, Amb.fo&i 
^AC. F MRGU SON. Frwttdat //?rHagU€;>^ 4^ 1667. 
WHat we mentioned in Nuwh. 46. p. 931. fed:. 8. a- 
bout new methods, pretended byfometobefouiidouc 
forgiving the Roots of allCubick and Bi-quadratick^quatienSy 
albeit thofe Roots are Fractions or Surds^ Binomials or Refiduals 5 
We find fince to be already accompliflied by this Dutch Wri- 
ter 5 upon the Curfory perufal of whofe Book we take the firft 
part of it to be, as follows. 
I. Hefliows, how to ext raft the Squm and CMck Roots 
out of BimmiaU z^i Re^dual Numbers j ^sz medium^ which 
lie afterwards hath oecafion to ufe. 
>. Then proceeds to give one general Rule for finding the 
Roots of z\\ ^adratick JEquationS j and commends the worth 
of his method from the eafinefs , although you be incumbred 
with Fradions or great Numbers either in the Coefficients 02» 
Abfolute. 
3. He gives one General Rule ( where others make more Ca- 
fes of it ) for finding the Roots of all Cuhick -Equations . in 
which the Second term or ^uadratick jfecies is waming^znd rhta 
hmt^ how all other ^EqEations ^ wherein it is /rr/f;?^;^ 
