 | Mathematics - 1801 - 446 pages
...any given number at a time. RULE.* f. Take the series i, 2, 3, 4, &c. up to the number to be taken at a time, and find the product of all the terms. 2. Take * This rule, expressed algebraically, is — X — — l- X - - X m * , &c. to n terms ; where m is... | |
 | Nicolas Pike - Algebra - 1808 - 470 pages
...given number at a time, RULB.«, 1. Take the series 1, 2, 3, 4, &c. up to the number to be taken af a time, and find the product of all the terms. 2....decreasing by 1, from the given number, out of which the election is to be made, and find the producr. of all the terms. 3. Divide the last produft by the former,... | |
 | Samuel Webber - Arithmetic - 1812 - 260 pages
...case, will be truly expressed by 1+2+3. In the same manner it may be shown, that the .whole number 2. Take a series of as many terms, decreasing by 1 from the given number, out of which the election is to be made, and find the product of all the terms. of combinations of 2, in 5 things, will... | |
 | Charles Hutton - Mathematics - 1812 - 620 pages
...series 1, 2, 3, 4, &c. up to the number to be taken at a time, and find the product of all the terms'. Take a series of as many terms, decreasing by 1, from the given number, out of which the election is to be made, and find the product of all the terms. Divide the last product by the former,... | |
 | James Maginness - Arithmetic - 1821 - 378 pages
...any given number at a time, RULE. 1 . Take the series, l, 2, 3, 4, &c., up to the number to be taken at a time, and find the product of all \ the terms....decreasing by 1, from the given number, out of which the election is to be made, and find the product of all the terms. 3. Divide the last product by the former,... | |
 | Nicolas Pike - Arithmetic - 1822 - 562 pages
...any given number at a time. RULE.* 1. Take the series 1, 2, 3, 4, &c. up to the number to be taken at a time, and find the product of all the terms....Take a series of as many terms, decreasing by 1, from tbc given number, out of which the election is (o be made, and find the product of all the terms. 3.... | |
 | Beriah Stevens - Arithmetic - 1822 - 436 pages
...fake the series 1,3,3,4, &c. np to the number to be taken at a time, and find the prqduct of all tshe terms. 2. Take a series of as many terms decreasing by 1, from the given number, out of which the election is4o' be made, and find the product of all the term*. 3. Divide the last product by the former,... | |
 | Charles Hutton - Mathematics - 1822 - 616 pages
...series 1, 2, 3, 4, &c. up to the number to be taken at a time, and find the product of all the terms. Take a series of as many terms, decreasing by 1 , from the given number, out of which the election is to be made, and find the product of all the terms. Divide the last product by the former,... | |
 | Roswell Chamberlain Smith - Arithmetic - 1827 - 216 pages
...1, 2, 3, 4, &c. up to the number to be taken at a time, and find the product of all the term?. 2d. Take a series of as many terms, decreasing by 1 from the given number, out of which the election is to be made, and find the product of all the term». 3. Divide the last product by the former,... | |
 | Arithmetic - 1829 - 196 pages
...RULE I. Multiply together the natural series, 1, 2, 3, &c. up to the number to be taken at a time. EL. Take a series of as many terms, decreasing by 1, from the number, out of which the choice is to be made, and find their continued product. III. Divide this last... | |
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Take a series of as many terms, decreasing by 1, from the given number, out of which the election is to be made, and find the product of all the terms. 
