Use the Power Rule of Exponents to simplify the expression (73^4)^5.
The Power Rule of Exponents states that if we have an expression of the form (a^b)^c, then the value of this expression simplifies to a^(bc).
In our case, we have (73^4)^5. According to the Power Rule of Exponents, this simplifies to 73^(4*5) = 73^20.
To simplify the expression (73^4)^5 using the Power Rule of Exponents, we need to raise both the base (73) and the exponent (4) to the power of 5.
According to the Power Rule of Exponents, when we raise a power to another power, we multiply the exponents. So, we can rewrite the expression as:
(73^4)^5 = 73^(4 * 5)
Now, we can simplify the exponent:
4 * 5 = 20
Therefore, the simplified expression is:
(73^4)^5 = 73^20
To simplify the expression (73^4)^5 using the power rule of exponents, we need to apply the rule which states that when raising a power to another power, we multiply the exponents.
In this case, we have (73^4)^5. Since we have a power of 4 inside parentheses and a power of 5 outside the parentheses, we can multiply the exponents:
(73^4)^5 = 73^(4*5)
Multiplying the exponents, we get:
(73^4)^5 = 73^20
Therefore, the simplified expression is 73^20.