 | Charles Hutton - Mathematics - 1811 - 424 pages
...dividing line, and the distance of its two extremities from the extremities of the longest side. Ex. 3. It is required to find the length and position...triangle whose sides are 25, 24, and 7 respectively. Ex, 4. The sides of a triangle are 6, 8, and 10 : it is required to cut off" nine- sixteenths of it,... | |
 | Charles Hutton - Mathematics - 1812 - 620 pages
...dividing line, and the distance of its two extremities from the extremities of the longest side. Ex. 3. It is required to find the length and position...triangle whose sides are 25, 24, and 7 respectively. Ex. 4. The sides of a triangle are 6, 8, and 10 : it is required to cut off nine-sixteenths of it,... | |
 | Charles Hutton - Mathematics - 1822 - 616 pages
...dividing line, and the distance of its two extremities from the extremities of the longest side. Ex. 3. It is required to find the length and position...triangle whose sides are 25, 24, and 7 respectively. Ex. 4. The sides of a triangle are 6, 8, and 10 : it is required to cut off nine-sixteenths of it,... | |
 | Charles Hutton - Mathematics - 1825 - 608 pages
...dividing line, anrl (he distance of its two extremities from the extremities of the longest side. £i.3 It is required to find the length and position of...triangle whose sides are 25, 24, and 7 respectively. Ex. 4. The sides of a triangle are 6, 8, and 10 : it is required to cut off nine-sixteenths of it,... | |
 | Olinthus Gregory - Euclid's Elements - 1840 - 208 pages
...length of the dividing line, and the distance of its two extremities from those of the longest side. Ex. 3. It is required to find the length and position...triangle whose sides are 25, 24, and 7 respectively. Ex. 4. The sides of a triangle are 6, 8, and 10 : it is required to cut off nine-sixteenths of it,... | |
 | Horatio Nelson Robinson - Navigation - 1858 - 356 pages
...the extremity on 5, is 5(^/3 — ,/2); on the side of 12, it is 12(^/3^-^/¥) ; both divided by ^1. The division line is 3. It is required to find the...triangle whose sides are 25, 24, and 7 respectively. RKMARK. — It is obvious that the division line must cut the sides 25 and 24, and to make it the shortest... | |
 | Horatio Nelson Robinson - Navigation - 1878 - 564 pages
...12.014 chains for AE and AD each, the line DJ?wi\l be the shortest that will cut off 7 acres. Example 3. — It is required to find the length and position...possible, the triangle cut off must be isosceles. Am. The division line makes an angle with the sides 25 and 24 of 81° 52' 10", and its length is 4.899.... | |
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Ex. 3. It is required to find the length and position of the shortest possible line, which shall divide, into two equal parts, a triangle whose sides are 25, 24, and 7 respectively. Ex. 4. The sides of a triangle are 6, 8, and 10 : it is required to cut... 