| Charles Hutton - Mathematics - 1807
...RULE I. FIND the area of the sector having the same arc with the segment, by the last problem. Find **also the area of the triangle, formed by the chord of the segment and the** two radii of the sector. Then add these two together for the answer, when the segment is greater than... | |
| Mathematics - 1808 - 470 pages
...Find the area of the sector, having the same arc with • the segment, by the last problem. 2. Find **the area of the triangle, formed by the chord of the segment and the radii of the sector.** S. Then the sum of these two will be the 'answer, when the segment is greater than a semicircle ; but... | |
| Charles Hutton - Mathematics - 1811
...Circle. , I. FIND the area of the sector having the same arc "with the segment, by the last problem. Find **also the area of the triangle, formed by the chord of the segment and the** two radii of the sector. Then add these two together for the answer, when the segment is greater than... | |
| Jeremiah Day - Measurement - 1815 - 388 pages
...the area of a SEGMENT of a circle• 35. Find the area of the SECTOR which has the same art, and alto **the area of the TRIANGLE formed by the chord of the segment and the radii of the sector.** .'-\ •• . i^.' • ' Then, if the segment be LESS than a semi-circle, SUBTRACT the area of the... | |
| Thomas Keith - 1817 - 304 pages
...area of the sector, having the same arc as the segment. (Problem XV.) Kind the area of the triangK', **formed by the chord of the segment and the radii of the sector. Then,** if the segment be less than a semicircle, the difference of these two ar;'as will give the answer;... | |
| Charles Hutton - Mathematics - 1822 - 618 pages
...RULE I. FIND the area of the sector having the same arc with Ihe segment, by the last problem. Find **also the area of the triangle, formed by the chord of the** segiiiiHit ;itid t!>e two radii of the stctor. Th«»n add these two together tor the answer, when... | |
| Jeremiah Day - Geometry - 1824
...find the area of a SEGMENT of a circle. 35. FIND THE AREA OF THE SECTOR WHICH HAS THE SAME ARC, AND **ALSO THE AREA OF THE TRIANGLE FORMED BY THE CHORD OF THE SEGMENT AND THE RADII OF THE SECTOR. THEN,** w THE SEGMENT BE LESS THAN A SEMI-CIRCLE, SUBTRACT THE AREA OF THE TRIANGLE FROM THE AREA OF THE SECTOR.... | |
| Anthony Nesbit - Measurement - 1824 - 434 pages
...circle. RULE I. • f Find the area of the sector, having the Same arc as the segment ; also, find **the area of the triangle formed by the chord of the segment and the radii of the sector ; then** the difference of these areas, when the segment is less than a semicircle, or their sum, when it is... | |
| John Nicholson - Machinery - 1825 - 838 pages
...Circle. Rule. Find the area of the sector having tbe same arc with the segment, by the last problem. Find **the area of the triangle, formed by the chord of the segment and the** two radii of the sector. Then the sum of these two will be tbe answer when the segment is greater than... | |
| Robert Brunton - Mechanical engineering - 1828 - 189 pages
...the area of the sector, having the same arc with the segment, by the 2nd rule of last Problem. Find **also the area of the triangle, formed by the chord of the segment and the** two radii of MENSURAT10 the sector; then add these together for the answer, when the segment is greater... | |
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