How do I take the antilog of -0.05?
To take the antilog of a number, you will need to use the exponentiation function. The antilogarithm of a given number is the inverse operation of taking the logarithm.
In this case, you want to find the antilogarithm of -0.05. The antilogarithm of any number x is found by raising the base of the logarithm to the power of x. The base of the logarithm can vary depending on the context.
If you are using a base 10 logarithm, you can calculate the antilogarithm by using the formula: antilog(x) = 10^x
For your specific question, to find the antilog of -0.05, you can use the formula:
antilog(-0.05) = 10^(-0.05)
Using a calculator, you can evaluate this expression to find the antilog of -0.05.
To take the antilog of -0.05, you can use exponentiation. The antilog of a number is essentially raising a specific base to the power of that number. In this case, the base will be 10, as antilogarithms are commonly taken with base 10.
To take the antilog of -0.05 using base 10, you would do the following:
1. Write down the negative exponent as a positive exponent: -0.05 becomes +0.05.
2. Raise 10 to the power of 0.05.
To do this, you can use a scientific calculator or an online calculator with a exponential function. Enter 10 as the base and 0.05 as the exponent. The result will be the antilogarithm, which is the answer you are looking for.
Keep in mind that the antilogarithm of -0.05 will result in a positive value, as the antilog of a negative number is always positive.
I don't understand it
Assuming the log base is 10, then
antilog (-0.05) = 10^.05 = 1/10^.05 = 1.1,2202 = 0.89125