| George G. Carey - 1818 - 602 σελίδες
...progression there are five different particulars concerned ; viz. 1. The least term. 2. The greatest term. 3. The number of terms. 4. The common difference. 5. The sum of all the terms. Any three of face being given, the other two may l»e foiled. st: L THE LEAST TERM, THE GREATEST TERM,... | |
| 1818 - 264 σελίδες
...called the EXTREMES. Any three of the five following terms being given, the oth^p two may be readily found. ' ', 1. The first term. . . 2. The last term. 3. The number of terms. 4. The comtnpn difference. 5. The sum of all the terms. PROBLEM I. The first term, the last term, and the... | |
| Phinehas Merrill - 1819 - 116 σελίδες
...readily found. 1. The first term, ? . ,, , . 2. The last term, { сотт°^У called the extremes. 3. The number of, terms. 4. The common difference. 5. The sum of all the terms. CASE I. 'я. The first term, the number qftermt,and the common diff aeing- given, to find the last... | |
| Beriah Stevens - 1822 - 436 σελίδες
...or series, five things occur to be con side red. 1. The first term. "t „ . a T, , . , > Extremes. 2. The last term. $ 3. The number of terms. 4. The common difference. .5. The sum of all the terms. The properties of numbers, in arithmetical progression, are various and numerous ; but the chief, or... | |
| Nicolas Pike - 1822 - 536 σελίδες
...other terms the means. Any three of the five following things being given, the other two may be easily found. 1. The first term. 2. The last term. 3. The number of terms. 4. The common difference. 5. The fiim of all the terms. ^ PROBLEM I. The first term, the last term, and the number of terms being given,... | |
| Daniel Parker - 1828 - 358 σελίδες
...8X8) 9X9) Five particulars are requisite equally in Geometrical Progression as in Arithmetical ; viz. 1. The first term. 2. The last term. 3. The number of terms. 4. The common difference, от ratio. 6. The sum of all .the terms. JVbte. — To find the last term in a long series, by continued... | |
| Michael Walsh - 1828 - 312 σελίδες
...4X16=8X8=64. In Geometrical Progression the same five things are to be observed,, as in Arithmetical, viz. 1. The first term. 2. The last term. 3. The number of terms. NOTE. Aa the last term in a long series of numbers, is very t«. dious to come at, bj continual multiplication... | |
| Roswell Chamberlain Smith - 1829 - 284 σελίδες
...there are reckoned 5 terms, any three of vrhieû being given, the remaining two may be found, viz. 1. The first term. 2. The last term. , ^ 3. The number of terms. 4. The common difference. The urst term, the lost term, and the number of terms, being given, to find the common difference ;... | |
| James L. Connolly (mathematician.) - 1829 - 266 σελίδες
...terms, and the product will be the answer. The five things in progression are numbered as follows : 1. The first term. 2. The last term. 3. The number of terms. ' 4. The commcm difference. 5. The sum of all the terms. EXAMPLES. 1. How many strokes does a clock strike in... | |
| Frederick Augustus Porter Barnard - 1830 - 308 σελίδες
...made as in Arithmetical Progression. Any three of the five following terms being given, the other lico may be found. 1. The first term. 2. The last term. 3. The number of terms. 4. The ratio. 5. The sum of all the terms. 1. A man bought 5 sheep, giving $1 for the first ; $3 for the second... | |
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