What is the Quotient Rule of Integer Exponents?(1 point)
Responses
xaxb=xa+b
the fraction with numerator x to the A th power and denominator x to the b th power is equal to x raised to the A plus b power
xaxb=xb−a
the fraction with numerator x to the A th power and denominator x to the b th power is equal to x raised to the b minus A power
xaxb=xab
the fraction with numerator x to the A th power and denominator x to the b th power is equal to x raised to the A b power
xaxb=xa−b
the fraction with numerator x to the A th power and denominator x to the b th power is equal to x raised to the A minus b power
the fraction with numerator x to the A th power and denominator x to the b th power is equal to x raised to the A minus b power
The Quotient Rule of Integer Exponents states that when you have a fraction with a numerator raised to an exponent A and a denominator raised to an exponent B, you can simplify it by subtracting the exponents. The rule is written as follows:
x^A / x^B = x^(A-B)
In other words, when dividing two powers of the same base, you can subtract the exponents. For example:
x^3 / x^2 = x^(3-2) = x^1 = x
To apply the Quotient Rule, you need to have the same base in the numerator and denominator, and then subtract the exponent of the denominator from the exponent of the numerator.