Solve the equation log(x) = 2.

The solution to the equation log(x) = 2 is x = 100.

To solve the equation log(x) = 2, we need to understand what logarithms are. A logarithm is the power to which a base must be raised to produce a given number. In this case, the base is not specified, so we assume it to be 10, which is the most commonly used base in mathematics.

Using the definition of logarithms, we can rewrite the equation log(x) = 2 as 10^2 = x. This is because 10^2 is the power to which 10 must be raised to produce x.

Simplifying 10^2, we get x = 100. Therefore, the solution to the equation log(x) = 2 is x = 100.

It is important to note that logarithms are only defined for positive numbers. Therefore, x must be a positive number for the equation log(x) = 2 to have a solution.

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