| Catharine Esther Beecher - 1833 - 296 páginas
...will be the same. In like manner, if we were to reduce £ f and 4 to a common denominator, we should multiply both terms of each fraction by the denominators of all the other fractions. But instead of each denominator separately, as multiplier, we can take the product of them for the... | |
| 1836 - 488 páginas
...the value of the fraction will not be altered. To reduce several fractions to a common denominator, multiply both terms of each fraction by the denominators of all the other fractions. A proper fraction is when the numerator is less than the denominator, as f . An improper fraction is... | |
| William Scott - 1844 - 568 páginas
...have different denominators to equivalent fractions having the same denominator, Rule. Multiply the terms of each fraction by the denominators of all the other fractions ; the results are equivalent fractions reduced to the same denominator. Examples of the reduction of... | |
| Stephen Chase - 1849 - 348 páginas
...denominator, and each numerator by all the denominators except its own, for a new numerator. a.) Otherwise, Multiply both terms of each fraction by the denominators of all the other fractions. 21 5 1. Reduce -, - and = to a common denominator. 2X4X7_56 1X3X7_21 5X3X4_60 3X4X7~84; 4X3X7~-84!... | |
| William Scott - 1854 - 230 páginas
...of fractions is considerable, and the denominators are large numbers, the method of multiplying the terms of each fraction by the denominators of all the other fractions, is laborious. In such" cases, it abridges labour to form the product of all the denominators, if they... | |
| Horatio Nelson Robinson - 1859 - 352 páginas
...each new denominator will be the product 5X4 " of the given denominators. Hence the RULE. Multiply the terms of each fraction by the denominators of all the other fractions. NoTE. Mixed numbers must first be reduced to improper fractions. EXAMPLES FOR PRACTICE. 2. Reduce $,... | |
| John Homer French - 1869 - 350 páginas
...fraction, and multiply both terms of the fraction by the quotient. III. Dissimilar to similar fractions. Multiply both terms of each fraction by the denominators of all the other fractions. IV. Dissimilar to least similar fractions. 1. For the least common denominator, find the least common... | |
| Edward Olney - 1873 - 354 páginas
...reduce fractions having different denominators to equivalent fractions having a common denominator. RULE. — MULTIPLY BOTH TERMS OF EACH FRACTION BY THE DENOMINATORS OF ALL THE OTHER FRACTIONS. DEM. — This gives a common denominator, because each denominator is the product of all the denominators... | |
| Edward Olney - 1874 - 228 páginas
...Keduce Fractions having different Denominators to Equivalent Fractions having a Common Denominator. 61. RULE,— Multiply both terms of each fraction by the denominators of all the other fractions. DEM. — This gives a common denominator, because each denominator is the product of all the denominators... | |
| Edward Olney - 1874 - 232 páginas
...having different Denominators to Equivalent Fractions having a Common Denominator. 61. RULE—Multiply both terms of each fraction by the denominators of all the other fractions. DEM.—This gives a common denominator, because each denominator is the product of all the denominators... | |
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