Books Books RULE. Multiply all the terms of the natural series of numbers, from 1 up to the given number, continually together, and the last product will be the answer required. ExAMPLEs. The Youth's Assistant in Theoretic and Practical Arithmetic: Designed for ... - Page 120
by Zadock Thompson - 1848 - 168 pages ## Mathematics: Compiled from the Best Authors and Intended to be the ..., Volume 1

Mathematics - 1801 - 426 pages
...things, all different from each other. Multiply all the terms of the natural series of numbers* from i up to the given number, continually together, and the last product will be the answer required. EXAMPLES. * The reason of the rule may be shewn thus : any one thing a is capable only of one position,... ## Mathematics, Volume 1

Samuel Webber - Mathematics - 1808
...permutations, or changes, that can be made of any givm number of things, all different from each other. RULE.* Multiply all the terms of the natural series of numbers,...and the last product will be the answer required. EXAMPLES. 1. How many changes may be made with these three let' ters, abc ? .* The reason of the rule... ## A Course of Mathematics: For the Use of Academies as Well as Private Tuition

Charles Hutton - Mathematics - 1812
...Permutations, or Changes, that can be made of any Given Number of Things, all different from each other. RULE*. MULTIPLY all the terms of the natural series of numbers,...and the last product will be the answer required. EXAMPLES • The reason of the Rule may be shown thus ; any one thing ai* capable only of one position,... ## A Course of Mathematics: In Two Volumes : for the Use of Academies ..., Volume 1

Charles Hutton - Mathematics - 1816
...'Permutations, or Changes, that can be made of any Given Number of Things,all different from each other, RULE'. MULTIPLY all the terms of the natural series of numbers, from 1 up 10 the given number, continually together, and the last product will be the answer required. EXAMPLES.... ## A Course of Mathematics: For the Use of Academies, as Well as Private Tuition

Charles Hutton - Mathematics - 1818
...Changes, that can be made of any Given 'Number ef things, all different from each other. RULE*. MULT1PLY all the terms of the natural series of numbers, from...and the last product will be the answer required. EXAMPLES. • The reason of the Rule may be shown thus ; any one thing a i• capable only of one position,... ## Daboll's Schoolmaster's Assistant: Improved and Enlarged. Being a Plain ...

Nathan Daboll - Arithmetic - 1818 - 240 pages
...from each other. . • ' . ., RULE. Multiply all the terms of the natural series of numbers,, from one up to the given number, continually together, and the last product will be the answer required. EXAMPLES. 1. How many changes caw be made of the three first letters of the. alphabet ? . Proofi 1x2x3=6... ## Logarithmick Arithmetick: Containing a New and Correct Table of Logarithms ...

Arithmetic - 1818 - 251 pages
...different from one another. RULE. Multiply all the terms of the natural series of numbers, from one up to the given number, continually together, and the last product will be the answer required. EXAMPLES. 1. How many changes can be made of the letters in the word and 1 X 2 X 3 =- 6 Ans. Proof... ## Daboll's Schoolmaster's Assistant: Improved and Enlarged. Being a Plain ...

Nathan Daboll - Arithmetic - 1818 - 240 pages
...different from each other. RULE. Multiply all the terms of the natural series of numbers, from one up to the given number, continually together, and the last product will be the answer required. EXAMPLES. 1. How many changes can be made of the three first letters qf the alphabet?, Proof) 1x2x3=6... ## A New, Copious and Complete System of Arithmetic: For the Use of Schools and ...

James Maginness - Arithmetic - 1821 - 372 pages
...permutations, or changes, that can be made of any given number of things, all different from each other, B.ULE. Multiply all the terms of the natural series of numbers,...and the last product will be the answer required. EXAMPLES. I How many changes of position can a company of 6 persons assume? 1x2x3x4x5 x6 = 2. How many... 