Multiplication.
Multiplication.—An operation which consists in repeating a number called multiplicand (M) as many times as there are units in another column called multiplier (m); the result is called the product (p) of the numbers, and the numbers themselves are called factors of the product. This definition may be extended to the case where the factors are not whole numbers.
Sign of Multiplication.—The sign of multiplication is the oblique or St. Andrew’s cross ×, called multiplied by, and placed between the factors written one after the other.
Thus: 35 × 7 = p; 35 × 7 = 245. Generally M × m = p.
To Prove a Multiplication.—Multiplication may be proved by a second multiplication in which the factors are inverted.
This is the surest but the longest method.
Another Proof of the Multiplication.—Find the residue of the multiplicand and multiplier. Multiply them and find the residue of their product; this is equal to the residue of the product of the multiplication.
| 64327 | 4 | Residue of the multiplicand. |
| 781 | 7 | Residue of the multiplier. |
| ———— | — | |
| 28 | 1 Residue of the product of the residues | |
| 64327 | ||
| 514616 | ||
| 450289 | ||
| ———— | ||
| 50239387 | 1 Residue of the product of multiplication. |
Proof Not Absolute.—Practically a proof is not absolute, because an error may be committed in its use, and also it may not work well in all cases.