A common multiple of two or more expressions is an expression which can be divided by each of them without a remainder. Beginners' Algebra - Page 217by Clarence Elmer Comstock, Mabel Sykes - 1922 - 303 pagesFull view - About this book
| Webster Wells - Algebra - 1897 - 422 pages
...or more expressions is an expression which can be divided by each of them without a remainder. 120. The Lowest Common Multiple (LCM) of two or more expressions is the product of all their different prime factors (§ 109), each taken the greatest number of times that it occurs as a... | |
| Arthur Schultze - Algebra - 1905 - 674 pages
...or more expressions is an expression which can be divided by each of them without a remainder. 133. The lowest common multiple (LCM) of two or more expressions is the common multiple of lowest degree; thus, ж3.!/3 is the LCM of аЛ/ and xy*. 134. The LCM of two or... | |
| Arthur Schultze - Algebra - 1905 - 396 pages
...or more expressions is an expression which can be divided by each of them without a remainder. 133. The lowest common multiple (LCM) of two or more expressions is the common multiple of lowest degree; thus, is the LCM of я?у and xy3. 134. The LCM of two or more monomials... | |
| Arthur Schultze - Algebra - 1906 - 584 pages
...or more expressions is an expression which can be divided by each of them without a remainder. 133. The lowest common multiple (LCM) of two or more expressions is the common multiple of lowest degree; thus, is the LC М. of я?y and x¡f. 134. The LCM of two or more... | |
| Jacob William Albert Young, Lambert Lincoln Jackson - Algebra - 1908 - 460 pages
...a common multiple of these expressions. Thus, 12 ж'y2 is a common multiple of 3 xy and 6 x3. 144. Lowest Common Multiple. The lowest common multiple...(lcm) of two or more expressions is the product of their literal common multiple of lowest degree, and the least common multiple of their numerical coefficients,... | |
| Jacob William Albert Young - 1908 - 344 pages
...called a common multiple of these expressions. Thus, 12 xsy2 is a common multiple of 3xy and Ox2. 144. Lowest Common Multiple. The lowest common multiple...(lcm) of two or more expressions is the product of their literal common multiple of lowest degree, and the least common multiple of their numerical coefficients,... | |
| Herbert Edwin Hawkes, Frank Charles Touton, William Arthur Luby - Algebra - 1910 - 368 pages
...and 2ab + 6b — 2 aс — 6 e. 23. c2 + 3 cd + 2 d2, c2 + 5 cd + 6 d2, and с2 + еrf - 2 r/2. 59. Lowest common multiple. The lowest common multiple (LCM) of two or more rational, integral expressions is the rational, integral expression of lowest degree which will exactly... | |
| Jacob William Albert Young, Lambert Lincoln Jackson - Algebra - 1913 - 312 pages
...a common multiple of these expressions. Thus, 12 ж2y2 is a common multiple of 3 xy and 6 ж3. 192. Lowest Common Multiple. The lowest common multiple (lcm) of two or more algebraic expressions is the algebraic expression of lowest degree that is divisible, without a remainder,... | |
| Henry Lewis Rietz, Arthur Robert Crathorne, Edson Homer Taylor - Algebra - 1915 - 266 pages
...y9. 19. x2n - xny", x2" - 2xnyn + y2", and x2" - y*n. 20. (x2 - I)2, x4 - 1, and x3 + x2 - x - 1. 33. Lowest common multiple. . The lowest common multiple (LCM) of two or more expressions has been defined to be the product of all of their different prime factors, each taken the greatest... | |
| Herbert Ellsworth Slaught, Nels Johann Lennes - Algebra - 1916 - 280 pages
...хг - у3, хг + ху+у'*. 8. х2 — 2х - 3, хг - 6х + 9. 17. ж3 + f, х2 — ху + У2. 73. Lowest Common Multiple. The Lowest Common Multiple (LCM) of two or more expressions is readily found if the expressions are resolved into prime factors. Example 1. Given 6 abx — 6 aby... | |
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