...exponent of the dividend. (67.) Hence, for the division of monomials, we have the following RULE. 1. Divide the coefficient of the dividend by the coefficient of the divisor. 2. Subtract the exponent of each letter in the divisor from the exponent of the same letter in the...

...divisor from the exponent of the dividend. Hence, for the division of monomials, we have the following RULE. I. Divide the coefficient of the dividend by the coefficient of the divisor. 2' Subtract the exponent of each letter in the divisor from the exponent of the same letter in the...

...verification of division, see Properties of the 9'». n. ALGEBRAICAL DIVISION. lit. Division of monomials. Divide the co-efficient of the dividend by the co-efficient of the divisor, for the co-efficient of the quotient ; after this, write all the letters which enter the dividend and divisor,...

...have, for the multiplication of monomials, the following RULE. I, Multiply the co-efficients together for a new co-efficient. II. Write after this co-efficient all the letters which enter into iht multiplicand and multiplier, giving to each an exponent equpl to the sum of its...

...one radical by another. RULE. Reduce the radicals to equivalent ones expressing the same root, and divide the coefficient of the dividend by the coefficient of the divisor for the coefficient of the quotient, and the radical part of the dividend by the radical part of the divisor...

...Radical quantities are divided like other algebraic quantities ; hence, we have the following RULR. L Divide the coefficient of the dividend by the coefficient of the divisor, for а neto coefficient : П. Divide the quantities under the radicals, in the same amter : Ш. Т lien...

...5a3 l№ lc—5a?bc, 8a36с - , = 7a6c. Hence, for the division of monomials we have the following RULE. I. Divide the co-efficient of the dividend by...dividend, and affect each with an exponent, equal io the excess of its exponent in the dividend over that in the divisor. From this rule we find . ,,,...

...an exponent equal to 5 minus 3. Hence, for dividing one monomial by another, we have the following RULE. I. Divide the coefficient of the dividend by...coefficient of the divisor, for a new coefficient : II. After this coefficient write all the letters of the dividend, giving to each an exponent equal to the...

...fb~ hence Hence, to divide one radical of the second degree by another, we have the following RULE. Divide the co-efficient of the dividend by the co-efficient of the divisor for a new co-efficient ; after this, write the radical sign, placing under it the quotient obtained by dividing the quantity...

...have, for the multiplication of mono inials, the following RULE. I. Multiply the co-efficients together for a new co-efficient. II. Write after this co-efficient all the letters which enter into iht multiplicand and multiplier, giving to each an exponent equal to the sum of its...