According to the product rule of exponents, when you multiply two numbers with the same base, you add their exponents.
So, to find the exponent of 7 to the power of 2 and 7 to the power of 3, you need to add their exponents together.
7^2 * 7^3 = 7^(2+3) = 7^5
Therefore, the exponent of 7 to the power of 2 and 7 to the power of 3 is 5.
useing the product rule of exponents, what is the exponent of 7 to the power of 2 and 7 to the power of 3
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useing the product rule of exponents, what is the exponent of 7 to the power of 2 and 7 to the power of 3 in exponential simplest form
Using the product rule of exponents, we add the exponents together when multiplying the same base.
7^2 * 7^3 = 7^(2+3) = 7^5
So, the exponent of 7^2 and 7^3 in simplest form is 5.
7^2 * 7^3 = 7^(2+3) = 7^5
So, the exponent of 7^2 and 7^3 in simplest form is 5.
Apply the Product rule of exponents to solve and simplify 3^3 and 3^2
According to the product rule of exponents, when you multiply two numbers with the same base, you add their exponents.
To apply the product rule of exponents to 3^3 and 3^2, we need to add their exponents together.
3^3 * 3^2 = 3^(3+2) = 3^5
Therefore, the product of 3^3 and 3^2 can be simplified to 3^5.
To apply the product rule of exponents to 3^3 and 3^2, we need to add their exponents together.
3^3 * 3^2 = 3^(3+2) = 3^5
Therefore, the product of 3^3 and 3^2 can be simplified to 3^5.
Apply the Product rule of exponents to solve and simplify 3^3 and 3^2 as an equivalent expression
The product rule of exponents states that when you multiply two numbers with the same base, you can add their exponents.
Applying the product rule of exponents to 3^3 and 3^2, we have:
3^3 * 3^2
Applying the rule, we add the exponents:
= 3^(3+2)
= 3^5
So, the equivalent expression for 3^3 * 3^2 is 3^5.
Applying the product rule of exponents to 3^3 and 3^2, we have:
3^3 * 3^2
Applying the rule, we add the exponents:
= 3^(3+2)
= 3^5
So, the equivalent expression for 3^3 * 3^2 is 3^5.
1 answer