Elements of Arithmetic: For Schools and Academies. In which Decimal and Integral Arithmetic are Combined, and Taught Inductively, on the System of Pestalozzi. Part second |
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Page 15
... dollar $ being regarded as the unit , the cents as hundredths , and the mills as thousandths . 1. Add five thousand and thirty - one dollars ; two thou- sand eight hundred dollars and six cents ; nine hundred dollars and eleven cents ...
... dollar $ being regarded as the unit , the cents as hundredths , and the mills as thousandths . 1. Add five thousand and thirty - one dollars ; two thou- sand eight hundred dollars and six cents ; nine hundred dollars and eleven cents ...
Page 37
... dollars and cents , at a cent a groat . 21. Reduce 172843 to ft . , primes , & c . 22. The specific gravity * of gold is 19.258 . Then , what is the weight of a mass of gold that is 6 inches long , 5 inches wide , and 3 inches thick ...
... dollars and cents , at a cent a groat . 21. Reduce 172843 to ft . , primes , & c . 22. The specific gravity * of gold is 19.258 . Then , what is the weight of a mass of gold that is 6 inches long , 5 inches wide , and 3 inches thick ...
Page 38
... dollars and cents , at 83cts . per ducat . 10. Reduce 28C . 7C . ft . 4c . ft . to cords and decimals of a cord . 11. What is the value of 94 francs 79 centimes , at 18 cts . per franc ? 12. What is the value of 75 milrees 2 crusades ...
... dollars and cents , at 83cts . per ducat . 10. Reduce 28C . 7C . ft . 4c . ft . to cords and decimals of a cord . 11. What is the value of 94 francs 79 centimes , at 18 cts . per franc ? 12. What is the value of 75 milrees 2 crusades ...
Page 52
... dollars , what will 21 gills cost ? 104. A silversmith has 4 tea - pots , each weighing 176 . 8oz . 12dwt . 6gr .; 2 dozen silver spoons , each weighing 2oz . 19dwt . 18gr .; and 37 tea - spoons , each weighing 16dwt . 7gr . What is the ...
... dollars , what will 21 gills cost ? 104. A silversmith has 4 tea - pots , each weighing 176 . 8oz . 12dwt . 6gr .; 2 dozen silver spoons , each weighing 2oz . 19dwt . 18gr .; and 37 tea - spoons , each weighing 16dwt . 7gr . What is the ...
Page 70
... dollars on demand , without defalcation . WILLIAM BROWN . December 1st , 1841 , received $ 75.00 . July 17th , 1842 , re- ceived $ 15.50 . August 18th , 1843 , received $ 30.50 . December 11th , 1843 , received $ 500.00 . January 3d ...
... dollars on demand , without defalcation . WILLIAM BROWN . December 1st , 1841 , received $ 75.00 . July 17th , 1842 , re- ceived $ 15.50 . August 18th , 1843 , received $ 30.50 . December 11th , 1843 , received $ 500.00 . January 3d ...
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Common terms and phrases
5th power 9 hours acres amount annuity approximate values Arithmetic Avoirdupois bill BOARD bought bushel cents a pound column commence common difference compound interest contained continued fraction cost cube root cubic denominator diameter discount Divide dividend divisible dollars dominical letter equal example exchange Extract extremes feet fraction gain gallons Geometrical Progression given number greatest common divisor harmonical means hours a day hundred improper fraction inches last term least common multiple less lowest terms marcs mean proportional miles minuend months multiplicand Multiply number of terms obtained oxen paid payable payment piece present worth prime factors prime number PROBLEM quotient figure ratio Reduce remainder repetend rods root figure RULE sold square number square root subtract sugar tens third trial divisor undecillion units weeks weight whole number wide yards zeroes లు
Popular passages
Page 18 - Remove the decimal point as many places to the right as there are ciphers in the multiplier.
Page 177 - To find the solidity of a cylinder. RULE. — Multiply the area of the base by the altitude, and the product will be the solidity.
Page 30 - Reduce compound fractions to simple ones, and mixt numbers to improper fractions ; then multiply the numerators together for a new numerator, and the denominators for. a new denominator.
Page 106 - PROBLEM II. Any number of different things being given, to find how many changes can be made out of them by taking a given number of the things at a time.
Page 27 - RULE. Multiply all the numerators together for a new numerator, and all the denominators for a new denominator: then reduce the new fraction to its lowest terms.
Page 106 - To find the number of 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 one up to the given number, continually together, and the last product will be the answer required.
Page 9 - ... say one and one are two, two and one are three, three and one are four, four and one are five, five and one are six, six and two are eight ; in this way they go on until they are desired to stop.
Page 207 - A farmer has a stack of hay, from which he sells a quantity which is to the quantity remaining, as 4 to 5. He then uses 15 loads and finds that the quantity left, is to the quantity sold, as 1 to 2. Required the number of loads at first in the stack.
Page 130 - RULE. Divide the difference of the extremes by the common difference, and add 1 to the quotient.
Page 117 - All numbers between 1000 or 103, antj iQO0000 or 100», will have two figures in their root. And generally, if we divide a cube into periods of three figures each, by placing a point over units, and one over every third figure from units, the number of points will show the number of figures in the root. EXAMPLES FOR THE BOARD. In order properly to understand the principles of the cube root, the student should be provided with the following blocks : 1. A cubical block, each side measuring 3 inches,...