### ‘ι κίμε οι ςώόστερ -”ΐμτανγ ξώιτιξόρ

Ρεμ εμτοπΏσαλε ξώιτιξίρ στιρ σθμόηειρ τοποηεσΏερ.

### –εώιεςϋλεμα

 CHAPTER xi CHAPTER XII 17 CHAPTER XIII 36 CHAPTER XIV 52 CHAPTER XV 59 CHAPTER XVII 66 CHAPTER XVIII 74 CHAPTER XXI 110
 CHAPTER XXIX 188 CHAPTER XXX 194 CHAPTER XXXI 207 CHAPTER XXXIII 246 CHAPTER XXXIV 260 CHAPTER XXXV 268 CHAPTER XXXVI 278 CHAPTER XXXVII 284

 CHAPTER XXIII 120 CHAPTER XXV 135 CHAPTER XXVI 144 CHAPTER XXVII 156 CHAPTER XXVIII 181
 CHAPTER XXXIX 308 CHAPTER XLI 326 CHAPTER XLIV 366 CHAPTER XLV 391 CHAPTER XLVI 420

### Ργλοωικό αποσπήσλατα

”εκΏδα 86 - AB be the given straight line ; it is required to divide it into two parts, so that the rectangle contained by the whole, and one of the parts, shall be equal to the square of the other part.
”εκΏδα 233 - The logarithm of . the quotient of two numbers, is equal to the logarithm of the dividend diminished by the logarithm of the divisor.
”εκΏδα 233 - The logarithm of a product is the sum of the logarithms of its factors.
”εκΏδα 246 - The sides of a triangle are proportional to the sines of the opposite angles.
”εκΏδα 453 - Inquiry into the Validity of a Method recently proposed by George B. Jerrard, Esq., for Transforming and Resolving Equations of Elevated Degrees: undertaken at the request of the Association by Professor Sir WR Hamilton.
”εκΏδα 357 - HAMILTON. A publication which is justly distinguished for the originality and elegance of its contributions to every department of analysis.
”εκΏδα 21 - The coefficient of the quotient must be, found by dividing the coefficient of the dividend by that of the divisor ; and 2.
”εκΏδα 164 - Given the sines and cosines of two angles, to find the sine and cosine of their sum or difference.
”εκΏδα 393 - ... and it is in this sense, and in this sense only, that...
”εκΏδα 260 - Fink not only discovered the law of tangents, but pointed out its principal application; namely, to aid in solving a triangle when two sides and the included angle are given.