| Isaac Newton - 1769 - 638 str.
...(47), but that by the Denominators being equivalent to a Divifion (64. 63) ] Firft, By multiplying the Numerators, for a new Numerator ; and the Denominators, for a new Denominator. For thus the Multiplicand is multiplied by the Numerator of the Multiplier, and divided by its Denominator,... | |
| Daniel Adams - 1828 - 286 str.
...separately, and add their products together. HI. To multiply one fraction by another, — Multiply together the numerators for a new numerator, and the denominators for a new denominator. Note. If either or both are mixed numbers, they may first be reduced to improper fractions. EXAMPLES... | |
| Daniel Adams - 1828 - 266 str.
...separately, and add their products together. III. To multiply one fraction by another, — Multiply together the numerators for a new numerator, and the denominators for a new denominator. Note. If either or both are mixed numbers, they may first be reduced to improper fractions. i EXAMPLES... | |
| Daniel Adams - 1830 - 294 str.
...separately, and add, their products together. III. To multiply one fraction by another, — Multiply together the numerators for a new numerator, and the denominators for a new denominator. .Note. If either or both are mixed numbers^ they may firet be reduced to improper fractions. EXAMPLES... | |
| Daniel Adams - 1830 - 280 str.
...separately, and add their products together. III. To multiply one fraction by another, — Multiply together the numerators for a new numerator, and the denominators for a new denominator. Note. . If either or both are mixed numbers, they may first be reduced to improper fractions. EXAMPLES... | |
| Daniel Adams - 1831 - 276 str.
...separately, and add their products together. III. To multiply one fraction by another, — Multiply together the numerators for a new numerator, and the denominators for a new denominator. Note. If either or both are mixed numbers, they may first be reduced to improper fractions. EXAMPLES... | |
| Daniel Adams - 1833 - 268 str.
...separately, and add their products together. III. To multiply one fraction by another, — Multiply together the numerators for a new numerator, and the denominators for a new denominator. • Note. If either or both are mixed nwnbers, they may first be reduced to improper fractions. EXAMPLES... | |
| Ebenezer Bailey - 1835 - 258 str.
...evidently too large, and must be divided by d. To multiply a fraction by a fraction, therefore, we multiply the numerators for a new numerator, and the denominators for a new denominator. The value of a Compound Fraction, which is the fraction of a fraction, as % of f, is found by this... | |
| Benjamin Greenleaf - 1839 - 356 str.
...therefore |J is i of \. Hence the following RULE. Prepare the fractions as in Addition, and multiply the numerators for a new numerator, and the denominators for a new denominator; if the result be an improper fraction, reduce it to & equivalent whole number. 6. Multiply A by |.... | |
| Daniel Adams - 1839 - 268 str.
...separately, and add their products tojrether. III. To multiply one fraction by another, — Multiply togethti the numerators for a new numerator, and the denominators for a new denominator. Note. If either or both are mixed numbers, they may first be reduced to improper fractions. EXAMPLES... | |
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