write a single positive exponent.
9^3/9
9^3/9 = 9^(3-1) = 9^2
Rewrite using a single positive exponent.
6^7/6^2
Using the property of exponents that states (a^m)/(a^n) = a^(m-n), we can rewrite the expression as:
6^7/6^2 = 6^(7-2) = 6^5
To simplify the expression 9^3/9 with a single positive exponent, we can rewrite it as:
9^(3-1)
Now, simplify the exponent:
9^2
This is the final answer.
To simplify the expression 9^3/9, we can use the rules of exponents.
When dividing two exponential expressions with the same base, we subtract the exponents.
In this case, we have 9^3 divided by 9. Since both the base and the divisor have the same base of 9, we can subtract the exponents to simplify it:
9^3 - 1
The exponent 3 comes from the numerator, and we subtract the exponent 1 from the denominator.
So the simplified expression 9^3/9 becomes 9^(3-1)
And further simplifying, 3 - 1 is equal to 2, so the final answer is:
9^2
Thus, a single positive exponent for the expression 9^3/9 is 9^2.