Rewrite using a single positive exponent 9^5/9
9^5/9 can be rewritten as (9^5)/(9^1) since any number raised to the power of 1 is itself.
Applying the exponent rule for division, we subtract the exponents of the numerator and the denominator:
9^5/9^1 = 9^(5-1) = 9^4
Therefore, 9^5/9 can be simplified to 9^4.
To rewrite the expression 9^5/9 using a single positive exponent, we can use the property of exponents which states that dividing two exponents with the same base is equivalent to subtracting their exponents.
Therefore, we can rewrite 9^5/9 as 9^(5-1).
Simplifying further, 9^(5-1) becomes 9^4.
So, the expression 9^5/9 can be rewritten as 9^4 using a single positive exponent.
To rewrite the expression 9^5/9 using a single positive exponent, we need to simplify the division first.
When dividing two exponents with the same base, we subtract the exponents.
So, in this case, we subtract the exponent of 9 in the numerator, which is 5, from the exponent of 9 in the denominator, which is 1.
9^5/9 = 9^(5-1)
Simplifying further, we have:
9^5/9 = 9^4
Therefore, the expression 9^5/9 can be rewritten as 9^4 using a single positive exponent.