 | Mathematics - 1801 - 658 pages
...132 5'5 5-2 . 88 RULE 3.* Square the side of the polygon ; multiply that squne by the multiplier, set opposite to its name in the following table, and the product will be the area. EXAMPLES. * DEMONSTRATION. The multipliers in the table arc lie areas of the polygons, to which they... | |
 | Charles Vyse - Arithmetic - 1806 - 342 pages
...Pray what is that ? RULE II. Multiply the Square of the Side of any regular Figure by the Multiplier standing opposite to its Name in the following Table ; and the Product will be the Area. EXAMPLES. No. of Names. Multipliers. Sides. 3 Trigon or equal A. 0,433013 4 Tetragon or Square. 1,000000... | |
 | Charles Hutton - Mathematics - 1807 - 464 pages
...Square the side of the polygon; then multiply that square by the tabular area, or multiplier set against its name in the following table, and the product will be the areaf. No. * Tins is only in effect resolving the polygon into as many equal triangles as it has sides,... | |
 | Peter Nicholson - 1809 - 426 pages
...side only is given. Multiply the square of the given side of the polygon by that number which stands opposite to its name in the following table, and the product will be the area. MENSURATION. In the above Table, those multipliers marked with the sign -J-, are rather too small ;... | |
 | Charles Hutton - Mathematics - 1811 - 442 pages
...the side of the polygon ; then multiply that square by the tabular area, or multiplier set against its name in the following table, and the product will be the area f . No. * This is only in effect resolving the polygon into as many equal triangles ai it has sides,... | |
 | Charles Vyse - Arithmetic - 1815 - 340 pages
...triangles. Pray what is that? RULE. Multiply the square of the side of any regular figure by the multiplier standing opposite to its name in the following table ; and the product will be the area. EXAMPLES. (10) What re the area of a hexagon, whose side is 30? (\ 1) What is the area of an octagon,... | |
 | Encyclopaedia Perthensis - 1816 - 772 pages
...Square the fide of the polygon ; then multiply that fqu.in- by the area, or multiplier, fet •• "Mil its name in the following table, and the product will be the area. Kitt. The numbers in the above tpble txprefs the areas of the regular polygons, when the linear fide... | |
 | Encyclopedias and dictionaries - 1816 - 764 pages
...Square the fide of the polygon ; then multiply that fquare by the area, or multiplier, fet againft its name in the following table, and the product will be the area. Note. The numbers in the above table exprefs the areas of the regular polygons, when the linear .•It-... | |
 | Thomas Keith - 1817 - 306 pages
...polygon to the riliddle of one of the sides, and halt the product will be the area. •f' RULE 11. Multiply the square of the side of the polygon, by...standing opposite to its name in the following table, under the word area, and the product will give the area of the polygon. * Every regular polygen is... | |
 | Charles Hutton - Mathematics - 1822 - 616 pages
...the side of the polygon ; then multiply that square by the tabular area, or multiplier set against its name in the following table, and the product will be the area-t No. * This is only in effect resolving the polygon into afi many equal triangles as it has sides,... | |
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Multiply the square of the side of the polygon by the number standing opposite to its name in the following table, and the product will be the area. 
