The antilogarithms of the number -2.4191 is .............?
Log N = -2.4191.
N = 10^(-2.4191) = 0.00380978 = Antilog.
To find the antilogarithm of a number, we need to raise the base (usually 10) to the power of the given number.
In this case, the base is 10. So, to find the antilogarithm of -2.4191, we need to calculate 10 raised to the power of -2.4191.
The formula to compute the antilogarithm is:
Antilogarithm = Base^Power
Using this formula, the calculation would be:
Antilogarithm = 10^-2.4191
Now let's solve this:
Antilogarithm = 0.003871
Therefore, the antilogarithm of -2.4191 is approximately 0.003871.
To find the antilogarithm of a given number, you need to raise the base of the logarithm to that number. However, you haven't specified the base of the logarithm you are working with.
In general, if the base is not specified, the default assumption is that it is a base 10 logarithm, denoted as log10.
So, to find the antilogarithm of -2.4191 with base 10, you need to raise 10 to the power of -2.4191.
Mathematically, it can be represented as:
Antilogarithm = 10^(-2.4191)
To calculate this using a calculator, follow these steps:
1. Press the number '2' and the change sign button to make it negative (-2).
2. Enter 2.4191.
3. Press the exponentiation button or the "^" symbol.
4. Enter 10.
5. Press the equals "=" button.
The final result will be the antilogarithm of -2.4191 with base 10.