 | Dionysius Lardner - Arithmetic - 1834 - 378 pages
...the divisor. The quotient which is obtained in such cases is a partial quotient, expressing merely the number of times which the divisor is contained in the dividend (129.). In such cases there will always be a remainder, being that part of the dividend which would... | |
 | Frederick Emerson - Arithmetic - 1834 - 204 pages
...Divisor is a number by which we divide; such is the number 3 in the above example. The Quotient is the number of times which the divisor is contained in the dividend; such is the number 132 in the above example. Find the quotient in each of the following examples. (-2).... | |
 | Frederick Emerson - Arithmetic - 1846 - 266 pages
...A Divisor is a number by which we divide; such is the number 3 in the above example The Quotient is the number of times which the divisor is contained in the dividend; such is the number 132 in the above example. Find the quotient in each of the following examples. (2).... | |
 | Samuel Maunder - 1853 - 880 pages
...find how often a less number, called the divisor, is contained in a greater, called the dividend ; the number of times which the divisor is contained in the dividend being termed the qttotient. Dirision, in music, the dividing the interval of an octave into a number... | |
 | William Frederick Greenfield - 1853 - 228 pages
...sum of the quotients of parts of the dividend divided by the divisor. Since the quotient expresses the number of times which the divisor is contained in the dividend ; or, in the case of a concrete dividend, is the part of it denoted by the divisor, therefore the dividend... | |
 | Philotus Dean - Arithmetic - 1874 - 472 pages
...13.17638° THIRD METHOD.— 13° 10' 35") 94° 52' 12"(7;Пи'11 = 7¿. 92 14 5 2° 38' 7" Rule. — When the number of times which the divisor is contained in the dividend cannot be found by inspection, I. — Reduce both to the lowest denomination in either of them; then... | |
 | Thomas K. Brown - Algebra - 1879 - 292 pages
...The quantity by which we divide is called the Divisor ; the quantity divided is called the Dividend. The number of times which the divisor is contained in the dividend is called the Quotient. Ex. Divide 27 ж2 by - 3. SOLUTION. Since the quotient shows how many times... | |
 | United States. Office of Education - Agricultural colleges - 1917 - 1404 pages
...divisor is a number by which we divide; such as the number 3 in the above example. The quotient is the number of times which the divisor is contained in the dividend ; such as the number 132 in the above example. Long division comes four pages later. The topic is introduced... | |
 | Walter Scott Monroe - Arithmetic - 1917 - 182 pages
...divisor is a number by which we divide; such as the number 3 in the above example. The quotient is the number of times which the divisor is contained in the dividend; such as the number 132 in the above example. Long division comes four pages later. The topic is introduced... | |
 | Education - 1917 - 904 pages
...divisor is a number by which we divide; such as the number 3 in the above example. The quotient is the number of times which the divisor is contained in the dividend; such as the number 132 in the above example. Long division comes four pages later. The topic is introduced... | |
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... means 9 tens, and the 3 which we place under it means 3 tens, showing, that 3 is contained in 90, 30 times. A Dividend is a number which is to be divided; such is the number 396 in the above example. 