My answer to DQ:Law #1 multiplication of like bases: When you multiply two exponential terms with the same base you add the exponent. The formula is m^a * m^b = m^(a+b). Example: 2^3 * 2^3 = 2^(3+3) = 2^6 = 64Law #2 division of like bases. When you divide two terms with like bases you subtract the exponents: m^a / m^b = m^(a-b). Example: 2^6 / 2^4 = 2^(6-4) = 2^2 = 4The above laws are unchanged for fractional exponents you can still add the exponents for products and subtract them for quotients.Example:3^(1/3) * 3^(2/3)Response:Excellent response What (if anything) happens if the exponent in the denominator is zero? Do these rules apply if the exponents are negative?