Salusbury, Thomas
,
Mathematical collections and translations (Tome I)
,
1667
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double, and the quantity increaſing nonuple, the height increa
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ſeth triple; ſo that, by adding to units all the odde numbers, ac
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cording to their Series, the heights increaſe according to the na
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tural progreſſion of all the numbers, from units. </
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<
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>As for exam
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ple, there paſſing thorow a Regulator ſuch a certain quantity of
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Water in one time; adding three of thoſe meaſures, the quick
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height is two of thoſe parts, which at firſt was one; and con
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tinuing to adde five of thoſe ſaid meaſures, the height is three of
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thoſe parts which at firſt were one; and thus adding ſeven, and
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then nine, and then 11. and then 13, &c. </
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<
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>the heights ſhall be 4.
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then 5, then 6. then 7, &c. </
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>And for the greater facility of the
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Work, we have deſcribed the following Table, of which we will
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declare the uſe: The Table is divided into three Series or Pro
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greſſions of Numbers: the firſt Series containeth all the Num
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bers in the Natural Progreſſion, beginning at a Unit, and is called
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the Series of the Heights; the ſecond containeth all the odde
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numbers, beginning at an unit, and is called the Series of the
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Additions: the third containeth all the ſquare numbers, begin
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ning at an unit, and is called the Series of Quantity.
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<
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>Heights.</
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>1</
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<
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>2</
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<
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>3</
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<
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>4</
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<
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>5</
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<
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>6</
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<
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>7</
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<
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>8</
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<
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>9</
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<
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>10</
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<
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>11</
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</
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<
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<
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>Additions.</
cell
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<
cell
>1</
cell
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<
cell
>3</
cell
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<
cell
>5</
cell
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<
cell
>7</
cell
>
<
cell
>9</
cell
>
<
cell
>11</
cell
>
<
cell
>13</
cell
>
<
cell
>15</
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<
cell
>17</
cell
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<
cell
>19</
cell
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<
cell
>21</
cell
>
</
row
>
<
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>
<
cell
>Quantities.</
cell
>
<
cell
>1</
cell
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<
cell
>4</
cell
>
<
cell
>9</
cell
>
<
cell
>16</
cell
>
<
cell
>25</
cell
>
<
cell
>36</
cell
>
<
cell
>49</
cell
>
<
cell
>64</
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>
<
cell
>81</
cell
>
<
cell
>100</
cell
>
<
cell
>121</
cell
>
</
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</
table
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The uſe of the afore-mentioned Table.
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<
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>Firſt, if we ſuppoſe the whole quick height of a River of Run
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ning Water to be divided into any number of equal parts, at
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pleaſure, and would abate the ſame one fift, by means of a divi
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ſron; let there be found in the Table in the Series of heights the
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number 5. the denominator of the part which the River is to a
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bate, and take the number that is immediately under it in the
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row of Additions, which is 9. which let be ſubſtracted from the
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number 25. placed underneath the ſame in the row of Quanti
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ties, the remainder 16. ſignifieth that of the 25. parts of Water
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that ran in the River, whilſt it was 5 meaſures high, there do
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onely run 16. parts; ſo that to make it abate 1/5 it is neceſſary to
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take 9/25 from the Water that the whole River did carry; ſo that
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with ſubſtracting ſomewhat more than one third of the Water of
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the River, it is abated but only one fift.</
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<
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>2. And thus, in the ſecond place, if on the contrary, one would
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know how much water is to be added to the ſaid River to make
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it increaſe one fift more in height, ſo as that it may run in the </
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