CUR 
Bizerty in Barbary, 1724 - PeyJJonel 
Marfeilles - - PeyJJonel 
Bonne (called alfo Hipone) in Barbary PeyJJonel 
Curve. Short and eafy method of drawing tangents 
to all geometrical curves, without any labour 
of calculation - - Slufius 
Eafy way of demonftrating his method of draw- 
ing tangents to all forts of curves, without any 
labour of calculation - Slufius 
■ - Analytic inveftigation of the curve of quickeft 
defcent - - Sault 
— — Some eafy methods for the meafuiing of curve- 
lined figures, plain and folid Wallis 
The method of fquaring any kind of curves, or 
reducing them to more fimple curves De Moivre 
Of the tangents of curves deduced immediately 
from the theory of Maxima and Minima 
- Ditton 
— The curve afligned by Caflini to the planets a? 
their orbit, confidered and rejected Gregory 
On the length of curve lines - Craig 
— A ready defcription and quadrature of a curve 
of the third order, refembling that commonly 
called the foliate - De Moivre 
— Treatife on the conftruclion and meafure of 
curves - - Maclaurin 
■ ■■■— A new univerfal method of defcribing all curves 
of every order, by the help only of given an- 
gles and right lines - Maclaurin 
The general quadrature of trinomial hyperbolic 
curves contained in two theorems KlingerJiein 
— A general method of defcribing curves by the 
interfedlion of right lines ; moving about points 
in a given plane - Brakenridge 
• A letter concerning the defcription of curve 
lines - - Maclaurin 
» ■ An abfira£t of what has been printed fince the 
year 1721, as a fupplement to a treatife con- 
cerning the defcription of curve lines publifhed 
in 1719, and of what the author propofes to 
add to that fupplement - Maclaurin 
— Of the cardoide curve, fo called from its figure 
- - Cajiilioneus 
— — A general inveftigation of the nature of the 
curve, formed by the fhadow of a prolate fphe- 
roid, upon a plane Handing at right angles to 
the axis of the fhadow - Witchdl 
125 
Tran ft 
XL 1 X 6 35 
— 637 
- 638 
Abridg. 
VII 5*43 
WH 
t — 1 
OO 
VIII 6059 
— 21 
XX 42s 
— 463 
XXII 547 
-58 
XXIII 1 1 13 
IV 15 
— *333 
— 7 
XXI V 1704 
XXVI 64 
— 206 
~ 43 
XXIX 329 
— 24 
XXX 803 
— 5 1 
— 939 
— 57 
XXXVII 45 
VI 82 
XXXIX 25 
VIII 58 
- 143 
— 148 
XLI778 
— 108 
LVJI 28 
1 
1 
A 
