...beft guard againft exceptions and cavils, and vary lefe from the old foundations of geometry. A 2 They They found, that fimilar triangles are to each other in the duplicate ratio ot their homologous fides; and, by refblving fimilar polygons into fimilar triangles, the fame propofition...

...cavils, and vary less from the old foun- " dations of geometry. A 2 They • They found, that similar triangles are to each other in the duplicate ratio of their homologous sides ; and, by resolving similar polygons into similar triangles, the same proposition was extended to these polygons...

...MISCELLANEOUS QUESTIONS. Trisect a right angle. Find the diameter and diagonal of a cube whose side Similar triangles are to each other in the duplicate ratio of their homologous sides. — Prove it. JProve the truth of the Arithmetical rules for the addition, tubtraction, multiplication,...

...MISCELIANEOUS QUESTIONS. Trisect a right angle. Find the diameter and diagonal of a cube whose side = 7Similar triangles are to each other in the duplicate ratio of their homologous sides. — Prove it. Prove the truth of the Arithmetical rules for the addition, subtraction, multiplication,...

...FGIKLare equiangular, they are similar (5). PROP. XIX. THEOR. Fig. 25. Similar triangles (ABC, F1L) are to each other in the duplicate ratio of their homologous sides, Take a third proportional KC to the homologous . (3) Constr. Since AC is to CB as FL to LI (l), permutando...

...proportionals, the greatest and least of them together are greater than the other two together. 8. Similar triangles are to each other in the duplicate ratio of their homologous sides. 9. In any parallelogram, the sum of the squares of the diagonals is equal to the sum of the squares...

...figure equal to it in area, is given. PROPOSITION XIX. THEOREM. (625) Similar triangles (ABC, FIL) are to each other in the duplicate ratio of their homologous sides. Take a third proportional KC to the homologous sides AC and FL, and join B K. B Since AC 'is to CB...

...divided into similar triangles, equal in number and proportional to the polygons : and the polygons are to each other in the duplicate ratio of their homologous sides. Part 1. For the angles G and E are equal, and the (i) Hypoth. sides about them proportional (1), therefore...

...divided into similar triangles ; equal in number and proportional to the polygons ; and the polygons are to each other in the duplicate ratio of their homologous sides. PART 1. Divide the polygons into AS by lines drawn from the vertices of corresponding L s. The A s...

...being to each other as the squares of their homologous sides, (19. VI.) we Cor. As similar polygons are to each other in the duplicate ratio of their homologous sides, (20. VI.) it follows that the square of the side of any polygon, multiplied by the area of a similar...