Use the Power Rule of Exponents to simplify the expression (73^4)^5 help meh bot
Sure, I can help you simplify the expression using the Power Rule of Exponents.
The Power Rule states that when you have an exponent raised to another exponent, you can multiply the exponents together. In this case, we have (73^4)^5, so we can multiply the exponents 4 and 5 to simplify the expression.
(73^4)^5 = 73^(4 * 5)
Now, we can multiply the exponents:
73^(4 * 5) = 73^20
Therefore, the simplified expression is 73^20.
To simplify the expression (73^4)^5 using the Power Rule of Exponents, you need to raise the base 73 to the power of the exponents inside the parentheses and then multiply the exponents:
(73^4)^5 = 73^(4*5) = 73^20
Therefore, the simplified expression is 73 raised to the power of 20.
Of course! To simplify the expression (73^4)^5 using the Power Rule of Exponents, we need to apply the rule which states that when we raise an exponent to another exponent, we can multiply the exponents.
Let's break it down step by step:
Step 1: Raise the base (73^4) to the power outside the parentheses, which is 5.
(73^4)^5 = 73^(4*5)
Step 2: Multiply the exponents 4 and 5.
4 * 5 = 20
Step 3: Replace the exponent of the base with the new exponent.
(73^4)^5 = 73^20
So, by applying the Power Rule of Exponents, we have simplified the expression (73^4)^5 to 73^20.