Using the Product Rule of Exponents, what is an equivalent form of 1^9⋅1^8 ?(1 point) base = , exponent =
Using the Product Rule of Exponents, an equivalent form of 1^9⋅1^8 is 1^(9+8).
Base = 1
Exponent = 9+8 = 17
To find an equivalent form of 1^9⋅1^8 using the Product Rule of Exponents, we add the exponents of the same base. In this case, the base is 1.
According to the Product Rule of Exponents, a^m ⋅ a^n = a^(m+n).
Therefore, 1^9⋅1^8 is equal to 1^(9+8).
Simplifying the exponent, we get 1^17.
So, an equivalent form of 1^9⋅1^8 is 1^17.
To find an equivalent form of 1^9 * 1^8 using the Product Rule of Exponents, we add the exponents of the same base. In this case, the base is 1 and the exponents are 9 and 8.
The Product Rule states that when multiplying two numbers with the same base, you add the exponents. So in this case, we add 9 and 8:
1^9 * 1^8 = 1^(9+8) = 1^17
Therefore, an equivalent form of 1^9 * 1^8 is 1^17.