The Theory and Practice of Gauging, Demonstrated in a Short and Easy Method ... |
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Page 5
... viz . tenths under tenths , hundreds un- der hundreds , thousands under thoufands , & c . then add them together as whole Numbers , and B 3 place place the decimal Point of the Sum directly under thofe PRACTICE of GAUGING . 5.
... viz . tenths under tenths , hundreds un- der hundreds , thousands under thoufands , & c . then add them together as whole Numbers , and B 3 place place the decimal Point of the Sum directly under thofe PRACTICE of GAUGING . 5.
Page 6
... Point directly under thofe above , fo fhall you have the Difference fought . Examp . I. H. III . 8,7284 460,0954 From , 5743 Subftract , 2579 1,5896 29.7387 Remainder , 3164 7,1388 430,3567 IV . 9438,0000 72,5847 9365,4153 Mul- " " 1 ...
... Point directly under thofe above , fo fhall you have the Difference fought . Examp . I. H. III . 8,7284 460,0954 From , 5743 Subftract , 2579 1,5896 29.7387 Remainder , 3164 7,1388 430,3567 IV . 9438,0000 72,5847 9365,4153 Mul- " " 1 ...
Page 11
... Point on the left hand , fo fhall you have the Answer , if there is no Remainder ; but when that happens , you may continue the Quotient at pleasure , by conftantly annexing a Cypher to each Remainder . Example I. Let , 13975 be divided ...
... Point on the left hand , fo fhall you have the Answer , if there is no Remainder ; but when that happens , you may continue the Quotient at pleasure , by conftantly annexing a Cypher to each Remainder . Example I. Let , 13975 be divided ...
Page 13
... Point be the Answer , and the Remainder ( if any ) a De- cimal in that Denomination . What are the Values of , 84375 of a Pound Sterling , of , 75 of a Yard , of 754 of a Year ? , 84375 20 Shillings in a Pound . 16,87500 12 Pence in a ...
... Point be the Answer , and the Remainder ( if any ) a De- cimal in that Denomination . What are the Values of , 84375 of a Pound Sterling , of , 75 of a Yard , of 754 of a Year ? , 84375 20 Shillings in a Pound . 16,87500 12 Pence in a ...
Page 17
... Points more by one ; that is , if P be the Number of Points , then P + 1 is the Number of Integral Figures in the Root : Alfo the Square Root of the first Divifion to the Left - hand , if a Square Number , or the Root of the next less ...
... Points more by one ; that is , if P be the Number of Points , then P + 1 is the Number of Integral Figures in the Root : Alfo the Square Root of the first Divifion to the Left - hand , if a Square Number , or the Root of the next less ...
Other editions - View all
The Theory and Practice of Gauging, Demonstrated in a Short and Easy Method ... Robert Shirtcliffe No preview available - 2018 |
The Theory and Practice of Gauging, Demonstrated in a Short and Easy Method Robert Shirtcliffe No preview available - 2018 |
The Theory and Practice of Gauging, Demonstrated in a Short and Easy Method Robert Shirtcliffe No preview available - 2023 |
Common terms and phrases
Abfciffa againſt Ale Gall alfo alſo Angle Area Bafe Baſe becauſe betwixt Breadth Bung-Diameter Cafk called Caſk Chap Circle circular Segment Cone Conic Conic Sections Conoid Content Corol correfponding Curve Decimal denote Diam Diſtance divided Divifion Divifor dry Inches Ellipfe equal Example expreffed faid fame fecond fhall fhew fhewn Figure fimilar fince firft firſt fome Fruftum ftand fuch fufficient fuppofe fure Gauging given gives Height hence Hoof Hyperbola Hyperbolic Segment laft laſt Lemma Length Logarithms mean Diameter Meaſure Method multiplied muſt Number oppofite Ordinate orems parabolic parallel perpendicular Plane Points Product Prop Propofition Quotient Radius Reaſon refpectively Root Rule Scholium Section Segment ſhall Side Sliding-Rule Solid Spheroid Spindle Square taken Terms thefe Theorem thereof theſe thofe thoſe thro tranfverfe Axis Triangle Ullage uſe verfed Sine Vertex wet Inches whence whofe Wine Gallons
Popular passages
Page 59 - The circumference of every circle is supposed to be divided into 360 equal parts called degrees, and each degree into 60 equal parts called minutes, and each minute into 60 equal parts called seconds, and these into thirds, fourths, &c.
Page 7 - In multiplication of decimals, we know that the number of decimal places in the product is equal to the sum of those in both the factors.
Page 97 - J of the square of their difference, then multiply by the hight, and divide as in the last rule. Having the diameter of a circle given, to find the area. RULE. — Multiply half the diameter by half the circumference, and the product is the area ; or, which is the same thing, multiply the square of the diameter by .7854, and the product is the area.
Page 282 - Sort is, to multiply the two Weights together, and extract the Square Root of. the Product, which Root will be the true Weight.
Page 283 - Backs time ufed, and become more and more uneven as they grow older, efpecially fuch as are not every where well and equally fupported ; many of them...
Page 187 - Sum of thofe next to them, C the Sum of the two next following the laft, and fo on ; then we (hall have the following fables of Areas, for the feveral Numbers of Ordinates prefixt againft them, viz.
Page 86 - Progreflion from o, is equal to the Product of the laft Term by the Number of Terms, and this divided by the Index (m) plus Unity.
Page 272 - To half the Sum of the Squares of the Top and Bottom Diams.
Page 95 - The latter being taken from the former, leaves 3.14.15.9265.5 for the Length of half the Circumference of a Circle whofe Radius is Unity : Therefore the Diameter of any Circle is to its Circutuftrence as I is to 3.1415.9265.5 nearly.
Page 86 - Numbr infinitely greAt, therefore the firft Term of the above Value of /, muft be infinitely greater than any of the...