...multiplication between them. Powers of the same root may be multiplied, by adding their expoDents. The product of the sum and difference of two quantities is equal to the difference of their squares. Powers may be divided, by rejecting from the dividend, a factor equal to the divisor ; or by placing...

...product, and + a 6 — a 6 is =0, and may be left out in adding. Hence we have this principle : — the product of the sum and difference of two quantities is equal to the difference of their squares. If we subtract the square of a — 6 from that of a +6, we have, 4ab — difference. Therefore, four...

...of this rule is evident from 47. I. and from a Cor. to 5. II. which says, that the rectangle under the sum and difference of two quantities is equal to the difference of their squares. (Page 33.) 17. By the 8. VI. AB X BD = BC2. Hence, BD B С2 = -T~D, which is one part of the rule....

...minus twice the product of the first and second. 3°. That (a + i) (a — i) = a3 — i3 ; or, that the product of the sum and difference of two quantities is equal to the difference of their squares. These examples are of very frequent occurrence in algebra, and their results should be well remembered,...

...example ; and therefore а + x is the sum, and а—x the difference of a and x, hence; — (70.) 1 The product of the sum and difference of two quantities is equal to the difference of their squares.1 * EXERCISES. 1. Multiply 2a2 — 4 ая: + 2 ж2 by За — Zx 2. Multiply 3 a4 + 3ж4 by...

...Required the square of a + b. a -\-b a +b a?+ ab (4) Multiply a + b by a — b. Hence it appears, that the product of the sum and difference of two quantities is equal to the difference of their squares, which is proved in Prop. 5, Book n. of Euclid's Elements, and furnishes a most useful rule for the...

...or a+^/b, are called binomial surds, and may be reduced to rational quantities on the principle that the product of the sum and difference of two quantities...is equal to the difference of their squares. Thus the binomial surd v/a+v/6 Multiplied by - . v/o — -J/b — Vab+b Gives - - . a +b, n. rational quantity....

...y"y3. 20. If a-\-b be multiplied into a — b, the product will be a2— 62, (Art. 86 ;) that is, 19 1. The product of the sum and difference of two quantities, is equal to the difference of their squares. This is an instance of the facility with which general truths are demonstrated in algebra. If the sum...

...parts. Also, that («-|-i)(a — i)=a2 — b-. Or (a4+i4)O4— J4)=a2— b2. That is, the rectangle of the sum and difference of two quantities is equal to the difference of their squares. By this last observation we readily perceive that a4— b4, or any other binomial having a minus sign...

...multiplied into a — 6, the product will be a2— b2, (Art. 86 ;) that is, 191. The product ofthesum and difference of two quantities, is equal to the difference of their squares. This is an instance of the facility with which general truths are demonstrated in algebra. If the sum...