| Isaac Dalby - Mathematics - 1806 - 526 pages
...Reject the simple divisors in both terms of the fraction, then., Divide the greater by the less, and the last divisor by the last remainder, and so on till nothing remains ; then the last divisor is the greatest ommon measure, as in Arithmetic. (40. Arith.) Thus, to reduce... | |
| Samuel Webber - Mathematics - 1808 - 466 pages
...the dimensions of some letter, as is shown in division. 2. Divide the greater term by the less, and the last divisor by the last remainder, and so on till nothing remain ; then the divisor last used will be the common measure required. % N0TE. All the letters or... | |
| Nicolas Pike - Algebra - 1808 - 470 pages
...the dimensions of some letter, as was shewn in division. 2. Divide the greater term by the less,and the last divisor by the last remainder, and so on, till nothing remain, and the divisor last used, will be the common measure required. Note. All the letters or figures,... | |
| Charles Hutton - Mathematics - 1812 - 620 pages
...find tht Greatest Common Measure of the Terms of a Fraction. DIVIDE the greater term by the less, and the last divisor by the last remainder, and so on till nothing remains ; then the divisor last used will be the common measure required ; just the same as in common numbers.... | |
| Francis Walkingame - 1833 - 204 pages
...cannot be accomplished by this process, divide the greater term by the less, and that divisor by the remainder, and so on till nothing remains. The last divisor will be the greatest common measure ; by which divide both terms of the fraction, and the quotients will be the hrvest terms. (1)... | |
| Charles Davies - Arithmetic - 1833 - 284 pages
...the divisor by th remainder, and continuing to divide the last divisor by the last remainder until nothing remains. The last divisor will be the greatest common divisor sought. Ex. 3. Find the greatest common divisor of the two numbers 63 and 81. 63)81(1 PROOF. 63 9)63(7 18)63(3... | |
| Charles Potts - Arithmetic - 1835 - 202 pages
...only two numbers are given. Divide the greater number by the less ; then divide the divisor by the remainder, and so on till nothing remains. The last divisor will be the greatest divisor of the two numbers. EXAMPLE. 1. What is the greatest divisor of the numbers 72 and 96 ? Ans.... | |
| Charles Davies - Arithmetic - 1838 - 292 pages
...the divisor by the remainder, and continuing to divide the last divisor by the last remainder until nothing remains. The last divisor will be the greatest common divisor sought. Q. Will the common divisor of two numbers divide their remainder after division ? How do you find the... | |
| John D. Williams - Algebra - 1840 - 216 pages
...quantity which has the highest power by the other, whether it be the numerator or denominator ; and divide the last divisor by the last remainder, and so on...remains ; the last divisor will be the greatest common measure : but if such a divisor cannot be found, the fraction has no common measure. Having found the... | |
| John D. Williams - Algebra - 1840 - 634 pages
...quantity which has the highest power by the other, whether it be the numerator or denominator ; and divide the last divisor by the last remainder, and so on...remains ; the last divisor will be the greatest common measure : but if such a divisor cannot be found, the fraction has no common measure. Having found the... | |
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