| George Bruce Halsted - 1904 - 324 pągines
...to the diameter is the mean proportional between the parts of the diameter. F1G. 99. 246. Theorem. The square of the hypothenuse equals the sum of the squares of the two -sides. Proof. AC:AB=AB:AD,iha,tis, AB2=AC-AD. Same way BC* = AC-DC. Now add. 247. Theorem.... | |
| Ontario. Department of Education - 1907 - 334 pągines
...Geometrical Forms and Arithmetical Solids, containing Blocks to demonstrate the Carpenter's Theorem, that the square of the hypothenuse equals the sum of the squares of the other two sides : Flat black-board Brush, of lamb's wool. with handle on top: Archmledes Screw... | |
| Max Heindel - 1909 - 488 pągines
...is at once apparent. No one would say that twice two is five, or quarrel over the proposition that the square of the hypothenuse equals the sum of the squares of the other sides of a triangle. That was the reason why Pythagoras and other occult teachers demanded... | |
| William Henry Timbie, Henry Harold Higbie - 1914 - 562 pągines
...and the hypothenuse, we can always find the length of the third side. FIG. 2a. In a right triangle the square of the hypothenuse, //, equals the sum of the squares of the legs, A and B. Thus H2 = A1 + B>. FIG. 3a. In the right triangle A2 = tf + o!. Example 1a. One... | |
| Arthur Frederick Sheldon - 1917 - 74 pągines
...nation. Science rises above individuals and nationalities. Two plus two equals four the world over. The square of the hypothenuse equals the sum of the squares of the other two sides of the triangle in every nation. The law of gravity operates with equal certainty... | |
| Dugald Caleb Jackson, John Price Jackson - 1919 - 684 pągines
...mathematically to be represented by the hypothenuse AB of the right triangle. But we know in a right triangle the square of the hypothenuse equals the sum of the squares of the other two sides. That is, Q—Angli of Lag Ohmic Keaietance Fia. 226. — Ohmic resistance and... | |
| William Henry Timbie, Henry Harold Higbie - 1919 - 402 pągines
...the reactive power squared. This is stated in a more general way as follows: In any right triangle, The square of the hypothenuse equals the sum of the squares of the other two sides. Or The square of either side of a right triangle equals the square of the hypothenuse... | |
| Mary Austin - 1925 - 376 pągines
...inherit explicit knowledge of mathematics. Everybody still has to learn the multiplication table and that the square of the hypothenuse equals the sum of the squares of the other two sides. But we do seem to bring along with us a capacity for acquiring and handling mathematical... | |
| William Le Roy Hart - 1926 - 412 pągines
...is divided into two parts whose product is 357, find the two parts. 31. In a right-angled triangle, the square of the hypothenuse equals the sum of the squares of the other two sides. In a certain right-angled triangle, the hypothenuse is л/53 feet long. The sum... | |
| Edward Gleason Spaulding - 1928 - 296 pągines
...was a principle present which applies to any right triangle whatsoever. This is the principle that the square of the hypothenuse equals the sum of the squares of the other two sides: x2+y2=z2. But the Greek who first discovered this saw with his reason and not... | |
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