...quantities, when one of the equations is of the second degree, and the other of the first. For, we can find the value of one of the unknown quantities in terms of the other and known quantities, from the latter equation, and by substituting this in the former, we shall have...

...48+9a; = 28, whence, x = 4. Substituting the value of x in (8), y = 2. Hence the following EULE. I. Find the value of one of the unknown quantities, in terms of the other, from either of the given equations. II. Substitute this value for the same unknown quantity ш the...

...substitution. (1.) If necessary, clear the equations of fractions. (2.) Find, in either of the equations, the value of one of the unknown quantities in terms of the other, and substitute this value for the same unknown quantity in the other equation. (3.) From the equation...

...elimination by substitution, and the rule may be stated as follows ij(83.) RULE. — Find from one equation the value of one of the unknown quantities in terms of the others, and substitute this value in the other equations. You will then have one equation less ; continue...

...called that of equating values. 59. Third Method— Given 3z+4'/=43 1 5x — 7y= — 24 J Rule. — Find the value of one of the unknown quantities in terms of the other unknown and the known quantities from one of the equations. Substitute this value in the other equation,...

...28 ; whence, x = 4. Substituting the value of x in (3), y = 2. Hence the following RULE. — I. Find the value of one of the unknown quantities, in terms of the other, from either of the given equations. II. Substitute this value for the same unknown quantity in the...

...the signs. II. Another method frequently employed is that of substitution. This consists in finding the value of one of the unknown quantities in terms of the other from one equation, and substituting the expression so found for the first quantity in the other equation....

...789 i By subtraction 153y = 459, or y = 3, and.'.z = 2. The method which depends upon substituting the value of one of the unknown quantities in terms of the other, may be used witli advantage whenever either of the unknown quantities, x or y, has a coefficient unity...

...may be determined from these equations, a¡x+bly = ol, a¿c+b¿y = cíl. First method : By finding the value of one of the unknown quantities in terms of the other and known quantities, from one equatiou, and substituting it in the other equation. Let the value of...

...у=1-3 = -2. When x = -2, y = l + 2 = 3. In solving examples under Case II, we find an expression for the value of one of the unknown quantities in terms of the other from the simple equation, which we substitute for that quantity in the other equation, thus producing...