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3 | On a method for algebraic reciprocal trajectories |
| 5 | Solution to the problem of reciprocal trajectories |
| 23 | On rectifiable algebraic curves |
| 73 | The solution to a geometric problem about circles shaped as moons |
| 75 | Solution of a problem proposed in the Nova Acta Eruditorum in November, 1743 |
| 79 | A problem of geometry proposed publicly by an anonymous geometer |
| 83 | On several properties of the conic sections which intersect with an infinity of other curved lines |
| 85 | Solution to a catoptric problem proposed in this journal in September 1745 on page 523 |
| 106 | Solution to the catoptric problem in Novis Actis Eruditorum Lipsiensibus proposed in November 1745 |
| 129 | Investigation of curves which produce evolutes similar to themselves |
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133 | On the surface of scalene cones and of other conic bodies |
| 135 | Various geometric demonstrations |
| 147 | On the apparent contradiction in the rule of curved lines |
| 148 | Proof concerning the number on points where two lines of ordinary order can intersect |
| 166 | On the reduction of curved lines to the arcs of circles |
| 169 | On the cuspidal points of the second kind of Monsieur le Marquis de l'Hopital |
| 173 | New method of finding reciprocal algebraic trajectories |
| 192 | Solution of a problem of geometry |
| 214 | Principles of spherical trigonometry taken from the method of the maxima and minima |
| 215 | Elements of spheroidal trigonometry taken from the method of the maxima and minima |
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220 | Reflections on a problem of geometry dealt with by certain geometers which nevertheless is impossible |
| 224 | Notice |
| 230 | Elements of the doctrine of solids |
| 231 | Proof of some of the properties of solid bodies enclosed by planes |
| 298 | On the notable advancement of the inverse method of tangents |
| 300 | Demonstration of a Bernoullian theorem in which cycloids are ultimately produced from the evolution, continued to infinity, of any right-angled curve |
| 324 | Properties of triangles for which certain angles have a ratio between themselves |
| 325 | Easy solutions to some difficult geometric problems |
| 333 | Research into the curvature of surfaces |
| 346 | De arcubus curvarum aeque amplis earumque comparatione |
|
368 | On a hyperbolic curve expressed by this equation y = 1*2*3*...*x |
| 390 | (Considerations of orthogonal trajectories) |
| 392 | Development of a notable paradox concerning the equality of surfaces |
| 408 | On rectifiable curves on spherical surfaces |
| 419 | On solids whose (entire) surface can be unfolded onto a plane |
| 422 | The solution of a certain altogether remarkable geometrical problem |
| 423 | Considerations on the measurement of circles |
| 433 | An aside on trajectories, both orthogonal and oblique-angled |
| 490 | On the representation of spherical surfaces on a plane |
| 491 | On the geographical projections of spherical surfaces |
|
492 | On de Lisle's geographic projection and its use |
| 505 | De corporibus regularibus per doctrinam sphaericam determinatis; ubi simul nova methodus globos sive coelestes sive terrestres charta obducendi traditur |
| 513 | On triangular curves |
| 514 | On the measure of solid angles |
| 524 | A universal spherical trigonometry, derived briefly and from first principles |
| 543 | Problematis cuiusdam Pappi Alexandrini constructio |
| 563 | On the smallest ellipse which is to circumsrcibe a given rectilinear parallelogram |
| 573 | De duplici genesi tam epicycloidum quam hypocycloidum |
| 574 | De curvis rectificabilibus in superficie coni recti ducendis |
| 601 | De symptomatibus quatuor punctorum, in eodem plano sitorum |
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602 | Methodus facilis omnia symptomata linearum curvarum non in eodem plano sitarum investigandi |
| 604 | On rectilinear and oblique reciprocal trajectories |
| 609 | Considerations about rectilinear and oblique trajectories |
| 611 | Investigatio curvarum quae similes sint suis evolutis vel primis vel secundis vel tertiis vel adeo ordinis cuiuscunque |
| 623 | De lineis rectificabilibus in superficie sphaeroidica quacunque geometrice ducendis |
| 646 | De duabus pluribusve curvis algebraicis in quibus si a terminis fixis aequales arcus abscindantur eorum amplitudines datam inter se teneant rationem |
| 647 | De methodo tangentium inversa ad theoriam solidorum translata |
| 648 | An easy solution of a problem, in which a circle is searched for, given three circles tangent to it |
| 654 | Methodus facilis investigandi radium osculi ex principio maximorum et minimorum petita |
| 665 | The evolution of a problem whose analytic solution is most difficult, while the synthetic solution for it is obvious |
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666 | Problema geometricum ob singularia symptomata imprimis memorabile |
| 667 | De curvis hyperbolicis quae intra suas assymtotas spatium finitum includunt |
| 691 | Problema geometricum quo inter omnes ellipses quae per data quatuor puncta traduci possunt ea quaeritur quae habet aream minimam |
| 692 | Solutio problematis maxime curiosi quo inter omnes ellipses quae circa datum triangulum circumscribi possunt ea quaeritur cuius area sit omnium minima |
| 693 | On the center of similarity |
| 697 | Investigatio superficierum quarum normales ad datum planum productae sint omnes inter se aequales |
| 698 | Several speculations about the area of spherical triangles |
| 712 | De corporibus cylindricis incurvatis |
| 729 | Dilucidationes super Problemate geometrico de quadrisectione trianguli a Iacobo Bernoulli olum tractato |
| 730 | Solutio completa problematis de quadrisectione trianguli per duas rectas inter se normales |
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733 | Solutio facilis problematis, quo quaeritur sphaera, quae datas quatuor sphaeras utcunque dispositas contingat |
| 749 | About geometry and spheres |
| 757 | On the problem of orthogonal trajectories, translated to surfaces |
| 767 | De curvis quarum radii osculi tenent rationem duplicatam distantiae a puncto fixo earumque mirabilibus proprietatibus |
| 771 | Solutio trium problematum difficiliorum ad methodum tangentium inversam pertinentium |
| 814 | Foundations of Differential Calculus, volume 3 |
| 815 | Solution of problems from the theory of maxima and minima |
| 819 | Continuation of some fragments taken from the Mathematics day book |