| J L. Ellenberger - 1854 - 338 pages
...expressed by the mixed decimal, and that expressed by the non-recurring part, and for the denominator as many nines as there are recurring figures followed...as many ciphers as there are non-recurring figures. 186. Another method, for the reduction of a recurring decimal into an equivalent vulgar fraction, which... | |
| John Hind - 1856 - 346 pages
...------ and -:£.- — • 2 32 that is, the vulgar fractions are - and —. 3 33 RULE. Make the repetend the numerator of a fraction whose denominator shall consist of as many nines as there are figures in the said repetend: and this reduced to its simplest terms will be the vulgar fraction required.... | |
| Isaac Todhunter - Algebra - 1858 - 530 pages
...integral number consisting of the non-recurring and recurring figures, and divide by a number consisting of as many nines as there are recurring figures followed by as many cyphers as there are non-recurring figures. 469. To insert a given number of Geometrical means between... | |
| Mathematics - 1860 - 294 pages
...integral number consisting of the non-recurring and recurring figures, and divide by a number consisting of as many nines as there are recurring figures followed...as many ciphers as there are non-recurring figures. V. Demonstration of the Binomial Theorem for any exponent, supposing the development for positive integer... | |
| Thomas Kimber - Mathematics - 1865 - 302 pages
...complete decimal ; the remainder forms the numerator, the denominator to which consists of as many 9s as there are recurring figures, followed by as many ciphers as there are figures which do not recur. Thus, for instance, (1) -2457 and (2) -572544642857Í. (1) From 2457 Take... | |
| John Purdue Bidlake - Arithmetic - 1866 - 232 pages
...the first period, subtracting the figures (if any) which do not recur. For the denominator, set down as many nines as there are recurring figures, followed...as many ciphers as there are non-recurring figures. EXAMPLE.— Express .3, .675, .06, .2457, as Vulgar Fractions. .3=J = i; .075 = -8W = ./ft = f|. .06'=... | |
| Isaac Todhunter - Algebra - 1866 - 580 pages
...integral number consisting of the non-recurring and recurring figures, and divide by a number consisting of as many nines as there are recurring figures followed by as many cyphers as there are non-recurring figures. 469. To insert a given number of Geometrical means between... | |
| William Harding Girdlestone - 1867 - 368 pages
...circulating decimal written as a whole number, minus the figures which do not recur ; and for the denominator as many nines as there are recurring figures, followed by as many ciphers as there are non-recurring^wres. §80. To reduce any quantity or fraction of one denomination to the decimal of... | |
| Francis Walkingame - 1868 - 154 pages
...(if any) which does not recur, and the remainder is the numerator. For the denominator, write down as many nines as there are recurring figures, followed...as many ciphers as there are non-recurring figures. Reduce this fraction to its lowest terms. EXAMPLES. - XXXVIII. (1) Reduce -5, 1-029, 2-85, -6, to vulgar... | |
| John William Colenso (bp. of Natal.) - 1869 - 240 pages
...period, and subtract from it the non-recurrimj part ; and for the denominator, set down as many 9's<H there are recurring figures, followed by as many ciphers as there are поп-recurring figures. 194. Let — be a proper fraction in its lowest terms. Then if b can be put... | |
| |