| Benjamin Greenleaf - Arithmetic - 1858 - 456 pages
...number, in the same manner; and so continue dii-iditifj, until a prime number is obtained for a quotient. The several divisors and the last quotient will be the prime factors required. NOTE 1. — The composite factors of any number may bo found by multiplying together two or more of... | |
| Horatio Nelson Robinson - Arithmetic - 1859 - 352 pages
...the quotient in the same manner, and so continue ike division until the quotient is a prime number. The several divisors and the last quotient will be the prime factors required. PROOF. The product of all the prime factors will be the given number. EXAMPLES FOR PRACTICE. 2. What... | |
| James B. Dodd - Arithmetic - 1859 - 368 pages
...remainder. 2. Divide the quotient in like manner; and so on, until the quotient becomes a. prime number. The several divisors and the last quotient will be the prime factors of the given number. EXAMPLE. To resolve 210 into its prime factors. 2)210 3)105 5)35 ~T 1 2 3 5 7... | |
| Benjamin Greenleaf - Arithmetic - 1860 - 324 pages
...number, in the same 'manner; and continue dividing until a prime number is obtained for a quotient. The several divisors and the last quotient will be the prime factors required. NOTE. __ rp ne composite factors of any number may be found by multiplying together two or more of... | |
| Horatio Nelson Robinson - Arithmetic - 1860 - 444 pages
...the quotient in the same manner, and so continue the division until the quotient is a prime number. The several divisors and the last quotient will be the prime factors required. PROOF. The product of all the prime factors wil1 be the given number. EXAMPLES FOR PRACTICE. 1. What... | |
| Benjamin Greenleaf - Arithmetic - 1871 - 350 pages
...number, in the same manner; and continue dividing until a prime number is obtained for a quotient. The several divisors and the last quotient will be the prime factors required. NOTE. — The composite factors of any number may be found by multiplying together two or more of its... | |
| Daniel W. Fish - 1874 - 320 pages
...the resulting quotient by another, and so continue to divide until the quotient is a prime number. The several divisors and the last quotient will be the prime factors. PROOF. — The product of all the prime factors will be the given number, (PRIS. 4.) What are the prime... | |
| Daniel W. Fish - Arithmetic - 1875 - 350 pages
...the resulting quotient by another, and so continue to divide until the quotient is a prime number. The several divisors and the last quotient will be the prime factors. PKOOF. — The product of all the prime factors will be the given number. (Ркш. 4.) What are the... | |
| Benjamin Greenleaf - Arithmetic - 1876 - 344 pages
...number, in the same manner; and continue dividing until a prime number is obtained for a quotient. The several divisors and the last quotient will be the prime factors required. NOTE. — The composite factors of any number may be found by multi plying together two or more of... | |
| Horatio Nelson Robinson, Daniel W. Fish - Arithmetic - 1877 - 372 pages
...quotient in the same manner, and so continue the division until the quotient is a prime number. Tlw several divisors and the last quotient will be the prime factors required. PROOF. The product of all the prime factors will be the given number. EXAMPLES FOR PRACTICE. 2. What... | |
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