Higher Arithmetic: Designed for the Use of High Schools, Academies, and CollegesBennett, Backus & Hawley, 1841 - 252 σελίδες |
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Σελίδα 3
... place among the books which have been published upon the subject of mathematics . It seems admirably calculated to fill the vacancy which has existed between common arithmetic and algebra . In my opinion it is a work of peculiar ...
... place among the books which have been published upon the subject of mathematics . It seems admirably calculated to fill the vacancy which has existed between common arithmetic and algebra . In my opinion it is a work of peculiar ...
Σελίδα 21
... place the quotients with the undivided terms for a second horizontal line , proceed with this second line as with the first ; and so con- tinue until there are no two terms which can be divided . The * This rule is usually given as ...
... place the quotients with the undivided terms for a second horizontal line , proceed with this second line as with the first ; and so con- tinue until there are no two terms which can be divided . The * This rule is usually given as ...
Σελίδα 26
... places . Thus , the fractions 1 ,, and , when inverted , become 17 , 1 , and g . Any integer may take the form of an improper fraction , by writing a unit for its denominator . Thus , 6 , 5 , 3 , and 11 , are the same as the improper ...
... places . Thus , the fractions 1 ,, and , when inverted , become 17 , 1 , and g . Any integer may take the form of an improper fraction , by writing a unit for its denominator . Thus , 6 , 5 , 3 , and 11 , are the same as the improper ...
Σελίδα 29
... place the denominator of the fractional part . This rule is obviously correct , since it is the reverse of the rule under Art . 18 , where a reverse operation was required to be performed . Examples . 1. Reduce 13 to an improper ...
... place the denominator of the fractional part . This rule is obviously correct , since it is the reverse of the rule under Art . 18 , where a reverse operation was required to be performed . Examples . 1. Reduce 13 to an improper ...
Σελίδα 35
... place the common denom- inator , and it will give the sum required . Examples . 3 1. Add the fractions of , of V , and 54 . These fractions reduced to their least common denomina- 5 + 7 + 72 84 tor are , and 72 ; and their sum is -6 ...
... place the common denom- inator , and it will give the sum required . Examples . 3 1. Add the fractions of , of V , and 54 . These fractions reduced to their least common denomina- 5 + 7 + 72 84 tor are , and 72 ; and their sum is -6 ...
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1st column acre Alligation amount of $1 annex annuity approximative values arithmetical progression bushel canceling carats cents per pound ciphers common difference compound interest continued fraction cube root decimal figures denominate values denoting diameter diminished dividend dollars equivalent fraction example we find exponent find the number following RULE frac fraction is equivalent geometrical progression gives greatest common measure half the number Hence improper fraction inches individual things interest of $1 last term least common multiple less lowest terms miles mixed number multiplied number is equivalent number of individual number of terms numerator and denominator obtain old progression OPERATION partial fraction perfect repetend places of decimals present worth prime factors prime numbers quantity quotient rate per cent ratio Reduce remainder rule under Art second figure second term shillings simple fraction SOLUTION square root subtract third term total branches trial divisor vulgar fraction weeks whole number wine
Δημοφιλή αποσπάσματα
Σελίδα 35 - Then multiply all the numerators together for a new numerator, and all the denominators together for a new denominator...
Σελίδα 96 - Add to the first term the product of the common difference into the number of terms less one, and the sum will be the last term.
Σελίδα 164 - To raise a whole number or a decimal to any power, use it as a factor as many times as there are units in the exponent.
Σελίδα 98 - Hence, when the extremes and number of terms are given, to find the common difference, — Divide the difference of the extremes by the number of terms, less 1, and the quotient will be the common difference.
Σελίδα 173 - From the above proposition, it follows that the square of the hypotenuse, diminished by the square of one of the sides, equals the square of the other side. By means of these properties, it follows that two sides of a right-angled triangle being given, the third side can be found. Examples. 1. How long must a ladder be, to reach the top of a house, 40 feet high, when the foot of it is 30 feet from the house ? In this example it is obvious that the ladder forms the hypotenuse of a right-angled triangle,...
Σελίδα 30 - To reduce fractions to a common denominator, we have this RULE. Reduce mixed numbers to. improper fractions — compound fractions to their simplest form. Then multiply each numerator by all the denominators, except its own, for a new numerator, and all the denominators together for a common denominator. It is obvious that this process will give the same denominator to each fraction, viz : the product of all the denominators. It is also obvious that the values of the fractions will not be...
Σελίδα 139 - DISCOUNT is an allowance made for the payment of money before it is due. The present worth of a...
Σελίδα 91 - A wall was to be built 700 yards long in 29 days; after 12 men had been employed on it for 11 days, it was found they had built only 220 yards. How many more men must be put on, to finish it in the given time ? 54.
Σελίδα 91 - In how many days, working 9 hours a day, will 24 men dig a trench 420 yards long, 5 yards wide, and 3 yards deep, if 248 men, working...
Σελίδα 97 - Given the first term, last term, and common difference, to find the number of terms. RULE. — Divide the difference of the extremes by the common difference, and the quotient increased by 1 is the number of terms.