| American School (Chicago, Ill.) - 1903
...В constructed on В С contains 25 squares. Now, 0 + 16 = 25 AB +AC = В С 159. Then we may say : **The square of the hypothenuse is equal to the sum of the** squares of the other two sides. This statement is true for all right-angled triangles ; it does not,... | |
| Sir Oswald Stoll - 1904 - 202 páginas
...geometrical truths set " down in our Euclids. It suffices to learn that in a " right-angled triangle **the square of the hypothenuse " is equal to the sum of the** squares of the two other " sides. It is demonstrable, and that is enough. Con" cerningthe multitudes... | |
| Charles Riborg Mann, George Ransom Twiss - 1905 - 449 páginas
...right angles to each other, the resultant is the hypothenuse of a right triangle; and therefore, since **the square of the hypothenuse is equal to the sum of the** squares of the other two sides, the square of the resultant is equal to the sum of the squares of the... | |
| Fred Herbert Colvin - 1907
...? Why 1 2 , of course. " About this time Euclid made the discovery that in a right-angled triangle **the square of the hypothenuse is equal to the sum of the** squares of the other two sides of the triangle. That is, if one square of 36 pebbles is placed in such... | |
| William Findlay Shunk - 1908 - 345 páginas
...are given, the third may be found by means of the rule that the square of the hypolhenuse is equal to **the sum of the squares of the remaining sides. 3....Another method for solving right-angled triangles is as** follows1 — To find a side. Call any one of the sides radius, and write upon it the word -radius.--... | |
| Evan Arthur Atkins - 1908 - 491 páginas
...give the length of the front plate. From the well-known property of the right-angle triangle : — ' ' **The square of the hypothenuse is equal to the . sum of the** the squares of the two sides," the slant height, or length of front, can be calculated thus : — FRONT... | |
| Paul Carus - 1911
...Visser, 1908. Pp. 239. Price 4 fl. This famous theorem (Euclid I, 47), which states the fundamental law **that the square of the hypothenuse is equal to the sum of the** squares of the other two sides, is here restored in its original form and is regarded as the foundation... | |
| Ethel Blackwell Robinson - 1911 - 122 páginas
...physical, mental and spiritual will one day be known as definitely as we now know that in a triangle **the square of the hypothenuse is equal to the sum of the** squares of the other two sides. And marvelous computations with the soul will be ours. As the physical... | |
| 1912
...enabling them to locate this point with precision. If we remember that for any right-angled triangle **the square of the hypothenuse is equal to the sum of the** squares of the two opposite sides, and that if we know one side and the hypothenuse, the other side... | |
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