 | Charles Hutton - Mathematics - 1807 - 464 pages
...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... | |
 | Samuel Webber - Mathematics - 1808 - 466 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 - 494 pages
...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 - 306 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; but if the segment... | |
 | Charles Hutton - Mathematics - 1822 - 616 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 - 440 pages
...To 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 - Surveying - 1824 - 476 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 - 222 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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ALSO THE AREA OF THE TRIANGLE FORMED BY THE CHORD OF THE SEGMENT AND THE RADII OF THE SECTOR. THEN... 
