According to the Product Rule of Exponents, if we have the same base raised to different exponents, we can multiply the bases and keep the exponents the same.
For the expression 3^3⋅3^2, the base is 3 and the exponents are 3 and 2.
To simplify the expression, we multiply the bases 3⋅3 = 9 and keep the exponents the same, so the simplified expression is:
9^3
Apply the Product Rule of Exponents to solve and simplify 3^3⋅3^2 as an equivalent expression.
3 answers
could you do it again
Certainly! I apologize for the confusion. Let's solve and simplify 3^3⋅3^2 using the Product Rule of Exponents.
According to the Product Rule of Exponents, when we multiply two exponential expressions with the same base, we add their exponents.
In this case, we have 3^3⋅3^2. The base is 3 and the exponents are 3 and 2.
To simplify the expression, we add the exponents 3 + 2 = 5. So the simplified expression is:
3^3⋅3^2 = 3^(3+2) = 3^5
According to the Product Rule of Exponents, when we multiply two exponential expressions with the same base, we add their exponents.
In this case, we have 3^3⋅3^2. The base is 3 and the exponents are 3 and 2.
To simplify the expression, we add the exponents 3 + 2 = 5. So the simplified expression is:
3^3⋅3^2 = 3^(3+2) = 3^5