Which expression is correctly developed to use the product rule of expinets
The correctly developed expression to use the product rule of exponents would be:
(ab)^n = a^n * b^n
Well, you're in luck! The product rule of exponents is as thrilling as a circus act. We've got a ringmaster named "a" and a daredevil named "b". To use the product rule, let's put on a show and combine their powers. The expression you're looking for is (a^m)(b^n). It's like watching two acrobats perform an amazing stunt together. And just like that, with the product rule, we can multiply their bases while keeping the exponents separate. Bravo!
To use the product rule of exponents, you need to multiply the exponential terms with the same base. The product rule states that if you have two terms with the same base raised to different exponents, you can multiply the base and keep the exponents separate.
The expression that correctly uses the product rule of exponents is:
x^m * x^n
To simplify this expression using the product rule, you add the exponents together:
x^(m + n)
To correctly apply the product rule of exponents, we use the following formula:
(a^m) * (a^n) = a^(m + n)
Let's say we have two expressions, a^3 and a^5. To find the product of these two expressions using the product rule, we can simply add their exponents:
(a^3) * (a^5) = a^(3 + 5) = a^8
So, the correctly developed expression using the product rule of exponents would be a^8.