| George Roberts Perkins - Arithmetic - 1841 - 274 pages
...factors, we have this RULE. Divide the number by any prime number, which will divide itwithimt any remainder; then divide the quotient in the same way;...continue until a quotient is obtained which is a prime. Then witt the successive divisors, together with the last quolknt,form the prime factors required.... | |
| Almon Ticknor - Arithmetic - 1846 - 276 pages
...least number which 'can be divided by the digits, separately, without a remainder? -Ans. 2520. RULE II. Divide the number by any prime number, which will...continue until a quotient is obtained which is a prime. Then will the successive divisors, together with the last quotient, form the prime factors required.... | |
| William Vogdes - Arithmetic - 1847 - 324 pages
...composite number ? Q. How do you prove division? CASE 5. § 17. To resolve any composite number into its prime factors. RULE. Divide the number by any prime...reason of this rule may be found in the fact, that all numbers which are not prime, are composed of prime factors. For, all numbers which are not prime are... | |
| George Roberts Perkins - Arithmetic - 1849 - 356 pages
...factors, we have this RULE. Divide the number by any prime number which will divide it without any remainder ; then divide the quotient in the same way,...continue until a quotient is obtained which is a prime. Then will the successive divisors, together with the last quotient, be the prime factors required.... | |
| George Roberts Perkins - Arithmetic - 1850 - 356 pages
...factors, we have this RULE. Divide the number by any prime number which will divide it without any remainder ; then divide the quotient in the same way,...continue until a quotient is obtained which is a prime. Then will the successive divisors, together with the last quotient, be the prime factors required.... | |
| George Roberts Perkins - Arithmetic - 1851 - 358 pages
...factors, we have this RULE. Divide the number by any prime number which will divide it without any remainder ; then divide the quotient in the same way, and so continue until a quotient w obtained which is a prime. Then will the successive divisors, together with the last quotient, be... | |
| Joseph Ray - Algebra - 1848 - 250 pages
...that will exactly divide it; divide th» quotient again in the same manner; and so continue to divide, until a quotient is obtained, which is a prime number; then, the last quotient and the several divisors, will constitute the prime factors of the (liven number. B»... | |
| Joseph Ray - Algebra - 1852 - 408 pages
...that will exactly divide it ; divide the quotient again in the same manner, and so continue to divide until a quotient is obtained which is a prime number ; then the last quotient and Ike several divisors are the prime factors of the given number. FACTORING OF ALGEBRAIC... | |
| Joseph Ray - Algebra - 1857 - 408 pages
...that will exactly divide it ; divide the quotient again in the same manner, and so continue to divide until a quotient is obtained which is a prime number ; then the last quotient and the several divisors are the prime factors of the given number. FACTORING OP ALGEBRAIC... | |
| Emerson Elbridge White - Arithmetic - 1870 - 350 pages
...number into its prime factors, Divide it by any prime divisor, and the quotient by any prime divisor, and so continue until a quotient is obtained which is a prime number. The several divisors and tlie lad quotient are Hie prime factors. • 2. To find the common factors... | |
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