What is the quotient rule of integer exponents?
The quotient rule of integer exponents states that when dividing two variables with the same base but different exponents, the exponents should be subtracted from each other. Mathematically, for any positive integer a, and any integers m and n, the quotient of a^m divided by a^n is equal to a^(m-n).
In equation form, (a^m) / (a^n) = a^(m-n)
The quotient rule of integer exponents states that when dividing two numbers with the same base raised to different exponents, you subtract the exponents to find the resulting exponent of the quotient. In mathematical notation, the quotient rule can be written as:
a^m / a^n = a^(m-n)
where "a" represents the base and "m" and "n" are the exponents. By subtracting the exponents, you simplify the expression and obtain the resulting exponent of the quotient.