Final answer:
To solve log(x) = 12, you take the inverse log of 12 by raising 10 to the power of 12, resulting in x = 10^12, which can be computed using a graphing calculator that is 1000000000000.
Step-by-step explanation:
To solve the equation log(x) = 12, you need to understand that the logarithm function is the inverse of the exponentiation function. This means that if you have log base 10 (which is the common logarithm), you can reverse the operation by raising 10 to the power of the logarithm. In this case, we're trying to find x such that 10 to the power of x equals 12.
To solve for x, you take the inverse log of 12, which is done by calculating 10^12. This means:
x = 10^12
You can perform this calculation using a graphing calculator or scientific calculator that has the capability to compute exponents.