| Adrien Marie Legendre - Geometry - 1838 - 372 pages
...BC2=AB2+AC2. Cor. 1. Hence the square of one of the sides of a right angled triangle is equivalent to the square of the hypothenuse diminished by the square of the other side ; which is thus expressed : AB2=BC2— AC2. Cor. 2. It has just been shown that the square AH is equivalent... | |
| James Bates Thomson - Geometry - 1844 - 268 pages
...1. Hence, by transposition, the square of one of the sides of a right-angled triangle is equivalent to the square of the hypothenuse diminished by the square of the other side ; which is thus expressed, ABS=BC2 — AC2. Cor. 2. It has just been shown that the square AH is equal... | |
| Nathan Scholfield - 1845 - 894 pages
...BC"=AB'-fAC2. Cor. 1. Hence the square of one of the sides of a right angled triangle is equivalent to the square of the hypothenuse diminished by the square of the other side; which is thus expressed : AB2=BC2— AC:. Cor. 2 It has just been shown that the square AH is equivalent... | |
| John Hunter (of Uxbridge.) - 1847 - 266 pages
...and 12'04. Comparison of the Sides of Right-Angled Triangles. The sum of the squares of the base and perpendicular of a right-angled triangle is equal to the square of the hypotenuse or longest side : or, the difference between the square of the hypotenuse and that of the... | |
| Charles Davies - Trigonometry - 1849 - 372 pages
...BC 2 ^AB < ' Cor. 1. Hence the square of one of the sides of a right angled triangle is equivalent to the square of the hypothenuse diminished by the square of the other side ; which is thus expressed : AB 2 =BC 2 —AC 2 . Cor. 2. It has just been shown that the square AH... | |
| Elias Loomis - Conic sections - 1849 - 252 pages
...squares ABFG, ACIH, described on the two other sides; that is, BC'=AB'+AC'. triangle, is equivalent to the square of the hypothenuse, diminished by the square of the other side ; that is, AB'=BC'—AC'. Cor. 2. The square BCED, and the rectangle BKLD, having the same altitude,... | |
| Charles Davies - Geometry - 1850 - 238 pages
...the other two sides. Cor. Hence, the square of either side of a right angled triangle is equivalent to the square of the hypothenuse diminished by the square of the other side. That is, in the right angled triangle ABC or Bl?=A(?-AT?. Sch. The last theorem may be illustrated... | |
| Charles Davies - Geometry - 1850 - 218 pages
...the other two sides. Cor. Hence, the square of either side of a right angled triangle is equivalent to the square of the hypothenuse diminished by the square of the other side. That is, in the right angled triangle ABC *=;AC*— Iff Sch. The last theorem may be illustrated by... | |
| James B. Dodd - Arithmetic - 1852 - 410 pages
...be expressed thus : AC2=:AB2 + BC2. Hence also the square on either of the two perpendicular sides, is equal to the square of the hypothenuse diminished by the square of the other side ; that is, AB2=AC3 — BC3: and BC - - AC 3 — AB2. On these principles, any one side of a right angled... | |
| Adrien Marie Legendre - Geometry - 1852 - 436 pages
...of the squares BALH, CIKA, described on the two other sides ; that is, angled triangle is equivalent to the square of the hypothenuse diminished by the square of the other side; thus, Cor. 2. If from the vertex of the right angle, a perpendicular be let fall on the hypothenuse,... | |
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