Arithmetic, Both in the Theory and Practice: Made Plain and Easy in All the Common and Useful Rules ... With the Addition of Several Algebraical Questions |
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Page 15
... example may be seen . Other examples for practice . 41262 12346 46725632 71621 12982624 32423 37890167 4216 34256782 2194 42167142 2651 46300001 3986 29067892 7894 6724 167 729 814 672 32142 72900 500 12162 4678 27 42164 290 424 59786 ...
... example may be seen . Other examples for practice . 41262 12346 46725632 71621 12982624 32423 37890167 4216 34256782 2194 42167142 2651 46300001 3986 29067892 7894 6724 167 729 814 672 32142 72900 500 12162 4678 27 42164 290 424 59786 ...
Page 16
... Example . S. d . q . 12 36 15 14 12 18 15 I 21 322 7872 91 16 2 o Begin with the farthings , and fay , 2 and 2 is 4 ... examples for practice . 1. ' . S. d 16 Addition of MONEY .
... Example . S. d . q . 12 36 15 14 12 18 15 I 21 322 7872 91 16 2 o Begin with the farthings , and fay , 2 and 2 is 4 ... examples for practice . 1. ' . S. d 16 Addition of MONEY .
Page 17
... examples for practice . 1. ' . S. d . q .. 42 169 I 36 18 2 I 2131 1. ? go So di 365 16 8 I 321 12 5 178 188 421 12 7 624 ... Example . lb. oz.pw.gr. 24 7 11 15 36 5 15 13 64 2 14 12 Begin with the grains , and fay , 12 gr . and 13 is 25 ...
... examples for practice . 1. ' . S. d . q .. 42 169 I 36 18 2 I 2131 1. ? go So di 365 16 8 I 321 12 5 178 188 421 12 7 624 ... Example . lb. oz.pw.gr. 24 7 11 15 36 5 15 13 64 2 14 12 Begin with the grains , and fay , 12 gr . and 13 is 25 ...
Page 18
... examples . oz . pw . gr . 364 7 17 II 142 8 18 ΙΟ 219 6 10 14 216 7 12 10 lb. oz . prv . gr . 4216 7 10 19 1216 5 ... Example . q . lb. oz . 36 2 II 8 14 I 17 5 64 2 . 13 10 14 7 Begin with the ounces , and fay , To ounces and 5 is 15 ...
... examples . oz . pw . gr . 364 7 17 II 142 8 18 ΙΟ 219 6 10 14 216 7 12 10 lb. oz . prv . gr . 4216 7 10 19 1216 5 ... Example . q . lb. oz . 36 2 II 8 14 I 17 5 64 2 . 13 10 14 7 Begin with the ounces , and fay , To ounces and 5 is 15 ...
Page 24
... examples . C. q . lb. oz . C. 9 . Bought 436 2 lb. 19 Sold 1983 25 Bought 1442 14 05 Sold 79 319 10 3 Reft Reft Proof ... Example in money . 1. S. d . Lent 421609 . Paid 18 162017 Add Reft 2319 10 Proof 42 16 09 In Troy - Weight . lb. oz ...
... examples . C. q . lb. oz . C. 9 . Bought 436 2 lb. 19 Sold 1983 25 Bought 1442 14 05 Sold 79 319 10 3 Reft Reft Proof ... Example in money . 1. S. d . Lent 421609 . Paid 18 162017 Add Reft 2319 10 Proof 42 16 09 In Troy - Weight . lb. oz ...
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Common terms and phrases
A's gain Anfw Anfwer annexed annuity arithmetical becauſe betwixt bufhel cent ciphers compound intereft confift coſt crowns cube root decimal fraction denominator difference divided dividend divifion divifor double ells equal errour EXAMPLE Facit faid fame farthings fecond feven fhall fhews fhillings fhould fide figure fimple intereft firft firſt foldiers fome fought fquare root ftand fubtract fuch fuppofe fuppofition gallons geometrical progreffion given number gives greateſt grofs hath hundred increafe integer laft laſt leaft lefs likewife logarithm meaſure mixed number months muft multiplicand multiplied muſt number given number of terms obferve ounces pence pound pound Sterling prefent worth principal PROP propofition proportion purchaſe quantity quarters quarts queftion QUEST quotient ready money reft remainder Rule of Three thefe THEOREM theſe thofe thoſe uſe Vulgar Fractions whofe yards coft
Popular passages
Page 11 - 3765 is a decimal consisting of four places; consequently, 1 with four ciphers annexed ( 10000) is its proper denominator. Any decimal may be expressed in the form of a common fraction by writing under it its proper denominator.
Page 125 - Multiply the numerators together for a new numerator, and the denominators together for a new denominator.
Page 407 - If you take away 5 from my years, and divide the remainder by 8, the quotient will be $ of your age; but if you add 2 to your age, and multiply the whole by 3, and then subtract 7 from the product, you will have the number of the years of my age. What was the age of the father and son ? Ans., 53 and 18.
Page 134 - ... 1. The first term; 2. The last term; 3. The number of terms; 4. The common difference; 5. The sum of all the terms.
Page 182 - Add n competent number of ciphers to the numerator, and divide by the denominator, the quotient is the decimal fraction 'required. EXAMPLE I. Let it, be required to find the decimal fraction of .. . / S
Page 416 - I add the fquare of my crowns to the fquare of your bufhels, the fum will be 424 : How many bufhels did B fell, and how many crowns did A receive ? 99. To find two numbers, the firft of which...
Page 37 - ... a remainder, it must be multiplied by a number, which, in the 3rd denomination, is equal to an integer in the 2nd — the quotient shall be of the 3rd denomination ; and if there be still a remainder, it must be multiplied by a number, which, in the 4th denomination, is equal to an integer in the 3rd ; and divided as before, the quotient will be of the 4th denomination, and so on till tha remainder cannot be reduced to any lower terms : thus you have the square or rectangle ACI L.
Page 413 - ... was over, they had taken between them 42 crowns : How many ells did each of them fell for a crown ? 80.
Page 138 - A man is to receive £360 at 12 several payments, each to exceed the former by £4, and is willing to bestow the first payment on any one that can tell him what it is : what will that person have for his pains ? Ans.
Page 361 - Note The folid contents of fimilar figures are in proportion to each other, as the cubes of their fimilar fides or diameters. 3. If a bullet 6 inches diameter weigh 32 ft,, What will a bullet of the fame metal weigh, whofe diameter is 3 inches ? 6x6x6=216.