Apply the Property of Negative Integer Exponents to generate an expression equivalent to (3^(-17))/(8^(-14)) with positive exponents only. (1 point)
(3^(-17))/(8^(-14))=
(8^14)/(3^17)
To apply the Property of Negative Integer Exponents, we can rewrite the given expression as follows:
(3^(-17))/(8^(-14)) = (8^14)/(3^17)
By flipping the base with the negative exponent, we obtain the equivalent expression with positive exponents.
To apply the property of negative integer exponents, we can rewrite the expression using positive exponents. Here's how we do it:
Step 1: Start with the given expression: (3^(-17))/(8^(-14))
Step 2: Move the exponents to the opposite side of the fraction. This means that if a term has a negative exponent in the numerator, it will move to the denominator with a positive exponent, and vice versa.
(3^(-17))/(8^(-14)) = (8^14)/(3^17)
So, the expression equivalent to (3^(-17))/(8^(-14)) with positive exponents only is (8^14)/(3^17).