The Logarithm of a number is the converse of its logarithmic value..
An antilogarithm is the number of which the given number is the logarithm (to a given base). If x is the logarithm of y, then y is the antilogarithm of x.
The antilogarithm of 1.7 is the inverse operation of taking the logarithm base 10 of a number. To find the antilogarithm, you would raise 10 to the power of 1.7, which equals approximately 50.12. In mathematical notation, the antilogarithm of 1.7 can be expressed as 10^1.7 = 50.12.
Shift+log
0.69897 Natural Log of 5 = 1.6094379
Besides using a calculator, there are tables of logarithms. You can find the antilog that way. See the related link.
The antilogarithm of -0.9 can be calculated using the formula (10^{-0.9}). This evaluates to approximately 0.1259. Therefore, the antilog of -0.9 is about 0.1259.
The antilogarithm (or antilog) of a number is found by raising 10 to that number if it's a common logarithm (base 10). Therefore, the antilog of 4.33206 is calculated as (10^{4.33206}), which equals approximately 21,436.49.
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To find the antilogarithm (antilog) on a Casio fx-115ES calculator, you can use the exponentiation function. First, enter the value for which you want to find the antilog. Then, press the "SHIFT" key followed by the "10^x" button. This will calculate (10) raised to the power of your entered value, giving you the antilog.
Log of 1, Log Equaling 1; Log as Inverse; What's “ln”? ... The logarithm is the exponent, and the antilogarithm raises the base to that exponent. ... read that as “the logarithm of x in base b is the exponent you put on b to get x as a result.” ... In fact, when you divide two logs to the same base, you're working the ...
To take the antilogarithm of a number, you raise the base of the logarithm to the power of that number. For example, if you have a logarithm with base 10 and you want to find the antilog of ( x ), you would calculate ( 10^x ). Similarly, for a natural logarithm (base ( e )), you would compute ( e^x ). This process effectively reverses the logarithmic operation, yielding the original value before the logarithm was applied.
2 x 10-10 M