| Joseph Ray - Algebra - 1866 - 250 pages
...fraction by the prodvet of all the denominators except its own. REMARK. — This is the same as to multiply each numerator by all the denominators except its own, for the new numerators; and all the denominators together, for the common denominator. REVIEW. — 133. How do yon reduce fractions... | |
| Charles Davies - Algebra - 1866 - 314 pages
...each product over the common multiple, and the results will be the required fractions. GENERAL BULE. Multiply each numerator by all the denominators except its own, for the new numerators, and all the denominators together for a common denominator. EXAMPLES. ff C 1. Reduce — ^ ami = to their... | |
| Joseph Ray - Algebra - 1866 - 252 pages
...8+5c 6. . 5c— 45 Ans 10 8 a2+x2— 5 o— xi . . . . 2a2— 5 . . . . . Ans. — : — 11. CASE IV. TO REDUCE FRACTIONS OF DIFFERENT DENOMINATORS TO EQUIVALENT FRACTIONS HAVING A COMMON DENOMINATOR. 199, — 1. Reduce r and -. to a common denominator. bd Multiply both terms of the first fraction by... | |
| Benjamin Greenleaf - Arithmetic - 1871 - 350 pages
...numerator and denominator of a fraction by the same number does not alter the value of the fraction. RULE. — Multiply each numerator by all the denominators except its own, for the new numerators; and all the denominators together for a common denominator. NOTE 1. — Compound fractions, if any, must... | |
| Horatio Nelson Robinson - Algebra - 1874 - 340 pages
...because each new denominator is necessarily the ^ product of all the given denominators. Hence, the RULE. Multiply each numerator by all the denominators except its own, for the new numerators ; and all the denominators together for a common denominator. NOTE. — Mixed quantities must first be reduced... | |
| James Cahill (of Dublin.) - Algebra - 1875 - 230 pages
...Nom ' // no tao of the dmominaiori ham a common mensure, the Rule may ы thus expressed. Rule II. — Multiply each numerator by all the denominators except its own for the new numerator, under which write the continual product of all the denominators for the common denominator.... | |
| Benjamin Greenleaf - Algebra - 1879 - 322 pages
...-4- 4 -- — — to the form of a a -|- 4 , .. 4a?• fraction. . Ans. — .— vof b CASE IV. 128. To reduce fractions of- different denominators to equivalent fractions having a common denominator. Fractions are said to have a COMMON DENOMINATOR when they have the same quantity for a denominator.... | |
| Benjamin Greenleaf - Algebra - 1879 - 350 pages
...over the least common denominator, x 11, p;ive — , — and — - , the fractions rexy хj *U quired. RULE. Multiply each numerator by all the denominators except its own, for new numerators, and all the denominators toeIcther for a COMMON denominator. Or, Find the least common... | |
| Alexander Kennedy Isbister - 1882 - 190 pages
...ürí 40. 41. 42. Щ 43. TTff 44. 45. 40. 47. 48. 49. 50. 51. Case V. — То reduce fractions to a common denominator. RULE. — Multiply each numerator by all the denominators, except its own, for a new numerator; and multiply all the denominators together for a new denominator. Reduce f , \, and... | |
| Henry Bartlett Maglathlin - Arithmetic - 1882 - 398 pages
...NOTE. — When the denominators are mutually prime, take their product for the common denominator, and multiply each numerator by all the denominators except its own for the new numerator. Eeduce to fractions having the least common denominator : 135. f and ^. 141. -ft, Jfc and... | |
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