 Multiply the integral part of the mixed number by the denominator of the fractional part ; to the product add the numerator of the fractional part ; the sum will be the numerator of the improper fraction ; under which place the denominator of the fractional...  Elements of arithmetic for the use of schools - Page 70by William Scott - 1854 - 215 pagesFull view - About this book
 | Alexander Malcolm - Arithmetic - 1718 - 396 pages
...Cafe 3. To reduce a mixt Fraftion to the Form of a fimple Fraftion. SUllf, multiply the integral Part by the Denominator of the fractional Part, and to the Product add the Numerator ; take this Sum for the Numerator fought, which fet over the forefaid Deneminator, and this is thefimple... | |
 | Thomas Weston (Master of the Academy at Grenwich.) - Arithmetic - 1729 - 460 pages
...the Number to be reduced is a MIX'D one} multiply the INTEGRAL Part ( of fucb MIX'D Number} by tbe DENOMINATOR of the FRACTIONAL Part, and to the PRODUCT, add the NUMERATOR ofthefaid FRACTIONAL Part } and then the SUM is the NUMERATOR, wbicb, with the fame DENOMINATOR, forms... | |
 | John Potter - Mathematics - 1753 - 568 pages
...VT") tne improper Fraction fought. Article 2. To reduce a mixed Number to an improper Faction. Rule. Multiply the integral Part of the mixed Number by the Denominator of the fractional Part, and then add to the Product the Numerator of the Fraction ; this Sum is the new Numerator ; under which... | |
 | James Ryan - Arithmetic - 1827 - 290 pages
...— To reduce a whole or mixed number to an improper fraction. . 106. RULE. — Multiply the whole number by the denominator of the fractional part, and to the product add the numerator ; the sum will be the required numerator; below which write the given denominator. A whole number may... | |
 | George Alfred - Arithmetic - 1834 - 336 pages
...denominator, for a new numerator. 2. Multiply the denominator of the fraction by the denominator of its fractional part, and to the product add the numerator of the* fractional part for a new denominator. NoTE. — This part of case the 10th proves the 8th case. EXAMPLES. 34 1. Reduce... | |
 | Silas Totten - Algebra - 1836 - 332 pages
...answer. J. /\ it I To reduce a mixed number to an improper fraction. RULE. (29.) Multiply the whole number by the denominator of the fractional part, and to the product add the numerator, and write the sum over the denominator. This rule depends upon the same principle as the preceding... | |
 | James Thomson (LL.D.) - Arithmetic - 1837 - 296 pages
...90tSSi 46. y£ 30 Problem VI. To reduce a mixed number to an improper fraction. RULE. Multiply the whole number by the denominator of the fractional part, and to the product add the numerator; the sum will be the required numerator, below which write the given denominator. A whole number may... | |
 | George Roberts Perkins - Arithmetic - 1841 - 274 pages
...equivalent to \ 19» To reduce a mixed number to its equivalent improper fraction, we have this RULE. Multiply the integral part of the mixed number "by the denominator of the fractional part, to the product add the numerator of the fractional part, the sum will be the numerator of the improper... | |
 | William Scott - Algebra - 1844 - 568 pages
...derived the following rule for the reduction of a mixed number to an equivalent improper fraction : Multiply the integral part of the mixed number by the denominator of the fractional part, and to this product add the numerator of the fractional part ; the result is the numerator of the improper... | |
 | George Roberts Perkins - Arithmetic - 1846 - 266 pages
.....io «> J o 6 72. To reduce a mixed number to an equivalent improper fraction, we have this RULE. Multiply the integral part of the mixed number by the denominator of the fractional part, to the product add the numerator of the fractional part, the sum will be the num^ator of the improper... | |
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