| William Ruger - Arithmetic - 1832 - 282 pages
...length and breadth, one under the other, so that feet may stand under feet, inches under inches, &c. 2d. Multiply each term in the multiplicand, beginning...feet in the multiplier, and set the result of each directly under its corresponding term, observing to carry 1 for every 12, from (he inches to the feet.... | |
| Francis Walkingame - 1832 - 224 pages
...DUODECIMAL!/*. 1. TTNDER the Multiplicand write the corresponding deno*•' mitiations of the Multiplier. B. Multiply each term in the Multiplicand (beginning at the lowest) by the feet in the Multiplier ; write each result under its respective term, observing to carry an unit for every 12, from each lower... | |
| Charles Potts - Arithmetic - 1835 - 202 pages
...RULE. Set down the two dimensions to be multiplied together, one under the other, so that feet shall stand under feet, inches under inches, &c. Multiply...feet in the multiplier, and set the result of each immediately under its corresponding term, observing to carry 1 for every 12 in each I product. In like... | |
| John Bonnycastle - Measurement - 1835 - 308 pages
...under the other, so that feet shall stand under feet, inches under inches, <fcc. Multiply each term of the multiplicand, beginning at the lowest, by the feet in the multiplier, and set the result of each immediately under its corresponding term, observing to carry 1 for every 12, from the inches to the... | |
| Luke Hebert - Industrial arts - 1835 - 816 pages
...inches under inches, and parts under parts ; then multiply each term in the multiplicand, beginning with the lowest, by the feet in the multiplier, and set the result of each directly under its respective term, observing to carry one for every 12 from the parts to the inches,... | |
| Luke Hebert - Industrial arts - 1836 - 814 pages
...inches under inches, and parts under parts ; then multiply each term in the multiplicand, beginning with the lowest, by the feet in the multiplier, and set the result of each directly under its respective term, observing to carry one for every 12 from the parts to the inches,... | |
| William Ruger - Arithmetic - 1836 - 274 pages
...feet, inche; under inches, &c. 2d. Multiply each term in the multiplicand, beginning at the IOTest, by the feet in the multiplier, and set the result of each directly under its corresponding term, observing to carry 1 for every 12, from the inches to the feet.... | |
| Benjamin Greenleaf - Arithmetic - 1839 - 356 pages
...the multiplicand write the same names or denominations of the multiplier; that is, feet under feel, inches under inches, &?c. Multiply each term in the...multiplicand, beginning at the lowest by the feet of the multiplier, and write each. result under its respective term, observing to curry a unit for... | |
| William Ruger - Arithmetic - 1841 - 268 pages
...length and breadth, one under the other, so that feet may stand under feet, inches under inches, &c. 2d. Multiply each term in the multiplicand,, beginning at the lowest, by the feet in ths multiplier, and set the result of each directly under its corresponding term, observing to carry... | |
| Benjamin Greenleaf - Arithmetic - 1841 - 334 pages
...same names or denominations of the multiplier; that is, feet under feet, inches under inches, Sfc. Multiply each term in the multiplicand, beginning at the lowest by the feet of the multiplier, and write each result under its respective term, observing to carry a unit for every... | |
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