An Elementary Treatise on Arithmetic, in Theory and Practice: Adapted to the Instruction of Youth in Schools and Academies in the United States |
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Page 93
... Problem 1. To multiply a number of more denomina- tions than one , by a number not exceeding 12 . RULE . Commencing with the lowest denomination , multiply successively the several numbers in the multi- plicand by the multiplier ...
... Problem 1. To multiply a number of more denomina- tions than one , by a number not exceeding 12 . RULE . Commencing with the lowest denomination , multiply successively the several numbers in the multi- plicand by the multiplier ...
Page 94
... PROBLEM 2 . Ans . 232 ° 25 ' ′ 31 ′′ . To multiply by a number which exceeds 12 , but is the pro duct of two or more factors , each less than 13 . Rule . 53. By the preceding problem , multiply the given multiplicand , by one of the ...
... PROBLEM 2 . Ans . 232 ° 25 ' ′ 31 ′′ . To multiply by a number which exceeds 12 , but is the pro duct of two or more factors , each less than 13 . Rule . 53. By the preceding problem , multiply the given multiplicand , by one of the ...
Page 96
... PROBLEM 3 . Ans . 10yrs . 18. Multiply 1 ° 30 ′ 30 ′′ by 163 . To multiply by a number which exceeds 12 , but is not pro- duced by factors below 13 . Rule 1 . 54. Use those factors whose product is nearly equal to the multiplier ...
... PROBLEM 3 . Ans . 10yrs . 18. Multiply 1 ° 30 ′ 30 ′′ by 163 . To multiply by a number which exceeds 12 , but is not pro- duced by factors below 13 . Rule 1 . 54. Use those factors whose product is nearly equal to the multiplier ...
Page 101
... problem ; and it has been attempted to be shown , even with the semblance of geometrical demonstration , that if 2s . 6d . be multiplied by 2s . 6d . the product will be 31. or 6s . 3d . Let it be considered , however , that in ...
... problem ; and it has been attempted to be shown , even with the semblance of geometrical demonstration , that if 2s . 6d . be multiplied by 2s . 6d . the product will be 31. or 6s . 3d . Let it be considered , however , that in ...
Page 102
... Problem 1. To divide a number of more denominations than one , by a number not exceeding 12 . 57. RULE . Divide the highest denomination by the given divisor by short division . Reduce the remainder , if there be any , to the ...
... Problem 1. To divide a number of more denominations than one , by a number not exceeding 12 . 57. RULE . Divide the highest denomination by the given divisor by short division . Reduce the remainder , if there be any , to the ...
Other editions - View all
An Elementary Treatise on Arithmetic, in Theory and Practice: Adapted to the ... James Ryan No preview available - 2017 |
An Elementary Treatise on Arithmetic, in Theory and Practice: Adapted to the ... James Ryan No preview available - 2017 |
An Elementary Treatise on Arithmetic, in Theory and Practice: Adapted to the ... James Ryan, Fra No preview available - 2016 |
Common terms and phrases
2qrs 3qrs acres amount of $1 annexed annuity annum answer antecedent Arithmetic barrel bushels called cents per lb ciphers column common difference compound interest contained cube root debt decimal fractions denominator digits discount divided dividend division divisor drams equal equivalent evident Exam example exchange Exercises Exercises.-1 expressed factors farthings feet figure fourth proportional furlongs gain gallons given fraction given numbers given sum grains greater Hence hundred improper fraction least common multiple lowest terms method miles millions minuend mixed number months multiplicand Multiply New-York number of terms operation ounces payable pence pennyweights performed poles pound sterling pounds present worth principal PROBLEM proceed quantity quotient rate per cent Reduce remainder Repeat the rule Required the cost Required the sum result roods shillings square root subtract third term thousand tion tons Troy weight units weight whole numbers yards
Popular passages
Page 66 - The circumference of every circle is supposed to be divided into 360 equal parts, called degrees...
Page 129 - Rule. — Divide the numerator by the denominator, the quotient will be the whole number...
Page 129 - To reduce a mixed fraction to an equivalent improper fraction. RULE. — Multiply the whole number by the denominator of the fractional part, and to the product add the numerator, and place their sum over the said denominator.
Page 244 - When the sum of the series, the number of terms, and one of the extremes are given, to find the other extreme. Divide twice the sum of the series by the number of terms, and from the quotient take the given extreme.
Page 54 - WEIGHT. 16 drams, dr. make 1 ounce, - - - - oz. 16 ounces - - - 1 pound, - - - - Ib. 28 pounds - - - 1 quarter, - - - qr. 4 quarters - - - 1 hundred weight, - cwt. 20 hundred weight, 1 ton, T.
Page 226 - A sum of money was divided between two persons, A and B, so that the share of A was to that of B as 5 to 3.
Page 245 - A body near the earth falling by its own weight, if it were not resisted by the air, would descend in the first second of time through a space of 16 feet and 1 inch ; in the next second through 3 times that space ; in the third, through 5 times that space ; in the fourth, through 7 times that space, etc.
Page 220 - ... number contained in the first period, and place the cube root of it in the quotient. Subtract its cube from the first period, and bring down the next three figures ; divide the number thus brought down by 300 times the square of the first figure of the root, and it will give the second figure ; add 300 times the square of the first figure, 30 times the product of the first and second figures, and the square of the second figure together, for a divisor; then multiply...
Page 61 - A square inch is a square each of whose sides, is an inch long. A square foot is a square having each side 1 foot, or 12 inches long.