504 SIMSON. 



Dr. Simson's definition is such, that it connects 

 itself with an indeterminate case of some problem 

 solved, but it is defective, in appearance rather than 

 in reality, from seeming to confine itself to one class 

 of porisms. This appearance arises from using the 

 word "given' (data or datum) in two different senses, 

 both as describing the hypothesis and as affirming the 

 possibility of finding the construction so as to answer 

 the conditions. This double use of the word, indeed, 

 runs through the book, and though purely classical, 

 is yet very inconvenient ; for it would be much more 

 distinct to make one class of things those which are 

 assuredly data, and the other, things which may be 

 found. Nevertheless, as his definition makes all the 

 innumerable things not given have the same relation 

 to those which are given, this should seem to be a 

 limitation of the definition not necessary to the poristic 

 nature. Pappus's definition, or rather that which he 

 says the ancients gave, and which is not exposed to 

 the objection taken by him to the modern one, is 

 really no definition at all ; it is only that a porism is 

 something between a theorem and a problem, and in 

 which, instead of anything being proposed to be done, or 

 to be proved, something is proposed to be investigated. 



might be called the Harmonical Curve, did not another of the 12th 



order rather merit that name, which has its axis divided harmoni- 



r cally by the tangent, the normal, the ordinate, and a given point in 



f*l (J ft fJ -y> 



the axis. Its differential equation is 2 d y* -f d x* ' 



JC 



which is reducible, and its integral is an equation of the 12th order. 

 There is another Harmonical Curve, also, a transcendental one, in 

 which chords vibrate isochronously. 



