...divisor, might have been obtained at once, by taking the difierence of the exponents, 5 and 3. Hence, The exponent of a letter in the quotient is equal to its exponent in the dividend, diminished by its exponent in the divisor. In division what do like signs produce ? Unlike signs ?...

...divisor, might have been obtained at once, by taking the difference of the exponents, 5 and 3. Hence, Tfie exponent of a letter in the quotient is equal to its exponent in the dividend, diminished by its exponent in the divisor. In division what do like signs produce ? Unlike signs ?...

...divisor, might have been obtained at once, by taking the difference of the exponents, 5 and 3. Hence, The exponent of a letter in the quotient is equal to its exponent in the dividend, diminished by its exponent in the divisor. In division what do like signs produce ? Unlike signs ?...

...be such a quantity as when multiplied by a3 will produce a3. That quantity is evidently a2. Hence, The exponent of a letter in the quotient is equal to its exponent in the dividend diminished by its exponent in the divisor. Or, in general, am -=- a" = am~n. 94. If we apply the rule...

...a quantity as when multiplied by «3 \vill produce a6. That quantity is evidently a'2. Hence, T/ie exponent of a letter in the quotient is equal to its exponent in the dividend diminished by its exponent in. the divisor. Or, in general, am -;- a" = am~n. 94. If we apply the rule...

...principles already established. (Art. i28.) That is, The quotient will have the sign —, with an exponent equal to its exponent in the dividend minus its exponent in the divisor. Take the following example : , quotient. SOLUTION. — Cancelling or removing the factors of this divisor...

...quantity which, when multiplied by «3, will produce cf. That quantity is evidently a? ; hence That is, the exponent of a letter in the quotient is equal...in the dividend minus its exponent in the divisor. For example, — = ara~". a" DIVISION OF MONOMIALS. 90. We derive from Arts. 87, 88, and 89 the following...

...quantity which, when multiplied by will produce as. That quantity is evidently a2 ; hence That is, the exponent of a letter in the quotient is equal...in the dividend minus its exponent in the divisor. For example, — = a*~". DIVISION OF MONOMIALS. 90. We derive from Arts. 87, 88, and 89 the following...

...multiplied by a3, will produce cf. That quantity is evidently a2 ; hence a5 « — = a2. a3 That is, the exponent of a letter in the quotient is equal...in the dividend minus its exponent in the divisor. am For example, — = a"-*, a" DIVISION OF MONOMIALS. 90. We derive from Arts. 87, 88, and 89 the following...

...coefficient of the quotient. II. Write the letters of the dividend in the quotient, giving each an exponent equal to its exponent in the dividend minus its exponent in the divisor. If I. Make the quotient positive when the two terms have like fi, and negative when they have unlike...