log100
In mathematics, “log” typically refers to the logarithm function, which is the inverse of exponentiation
In mathematics, “log” typically refers to the logarithm function, which is the inverse of exponentiation. The general form of the logarithm function is written as “log(base) (number)”, where “base” represents the base of the logarithm and “number” represents the value being logarithmically evaluated.
In your specific case, “log100” is written without a specified base, which commonly means that the logarithm has a base of 10. Therefore, “log100” can be rewritten as “log(base 10) 100”. This is equivalent to asking: “What power of 10 equals 100?”.
To solve this logarithmic equation, we need to find the exponent to which we must raise 10 to obtain 100. In other words, we are solving for “x” in the equation 10^x = 100. By inspection, we can see that 10 raised to the power of 2 equals 100, so the solution is x = 2. Thus, “log100” is equal to 2.
In summary, “log100” with a base of 10 is equal to 2.
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