| Edward Brooks - 1877 - 564 σελίδες
...many 9's as there are places in the repetend, annex this to the finite part, and divide the result by 1 with as many ciphers annexed as there are places in the finite part. Rule II. — Subtract the finite part from the whole circulate, and write under the remainder... | |
| Edward Brooks - 1878 - 300 σελίδες
...many 9's as there ara places in the repetend, and annex this to the finite part. II. Divide this by 1 with as many ciphers annexed as there are places in the finite part, and reduce the result to a »imple fraction, in its lowest terms. Reduce the following... | |
| Joseph Ray - 1880 - 420 σελίδες
...'01 TiAnr " " -001 n*nr " " -0001 From this, it is evident that, The denominator of any decimal is 1 with as many ciphers annexed as there are places in the decimal. 151. A pure decimal consists of decimal places only ; as, .325 152. A mixed decimal consists of a whole... | |
| George E. Seymour - 1880 - 332 σελίδες
...decimal, omitting the decimal print and the ciphers prefixed to the decimal part; ax the denominator write 1 with as many ciphers annexed as there are places in the given decimal. Reduce to common fractions and to lowest terms : CASE II. 1. .5 11. .875 21. 33.22 2.... | |
| Joseph Ray - 1880 - 420 σελίδες
...written .1 Th " " .01 " .001 " .0001 From this, it is evident that, The denominator of any decimal is \ with as many ciphers annexed as there are places in the decimal. 151. A pure decimal consists of decimal places only ; as, .325 152. A mixed decimal consists of a whole... | |
| Joseph Ficklin - 1881 - 406 σελίδες
...there are ciphers in the denominator of the fraction ; and that every decimal has for its denominator 1, with as many ciphers annexed as there are places in the given decimal When the numerator does not contain as many places as there are ciphers in the denominator,... | |
| Henry Bartlett Maglathlin - 1882 - 398 σελίδες
...• 1 j „• : p • i § j o 3 g - -. -« • ja -5 s ^d a i 141. The Denominator of a decimal is 1, with as many ciphers annexed as there are places in the decimal. Thus, 0.6 is ft, 0.15 is J&, 0.011 is r^, and 0.06f- is WRITTEN EXERCISES. Eead the following : Write... | |
| John Homer French - 1889 - 512 σελίδες
...number expressed by the figures of the repetend and the terminal fraction, and for its denominator 1 with as many ciphers annexed as there are places in the repetend, — or for any reduction of such fraction ; and The fraction reduced to lower terms by subtracting... | |
| John Groesbeck - 1891 - 426 σελίδες
...fractions. Jin ft; — Omit the decimal point, and under the decimal write ike denominator, which is 1 with as many ciphers annexed as there are places in the numerator. Reduce the fraction to its lowest terms. EXAMPLES. 1. Change .25 to a common fraction. a,... | |
| Gordon Augustus Southworth - 1893 - 198 σελίδες
...decimal fractions generally written with or without denominators? How may we tell the denominator? The denominator of a decimal fraction is always 1, with as many ciphers as there are figures at the right of the point. 8. Why is our system of numbers called a decimal system?... | |
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