This Antilog calculator (Antilogarithm calculator) can find the inverse logarithmic value of any number with any base. You can calculate the antilog of any real integer number in terms of its base here in a fraction of a second. Any number's antilogarithm can be found by considering its base value.

**Antilog Tools:** The inverse logarithm function can be calculated with this antilog
calculator and determine the antilogarithm of any number using any base 10, natural antilog, or any other
number. If you're not sure what the antilogarithm is, see the description below for a step-by-step explanation.

The natural logarithm function's inverse is the procedure that is the opposite process of the natural logarithm
function. The process will begin at point A and end at point B in the main function, while it will begin at
point B and end at point A in the reverse function. Antilog or Inverse log is the inverse function of the
logarithm. if the logarithm X with base b is Y (log_{b}X = Y) then Antilog is X antilog_{b}Y=X

The logarithm x and base are known in some problems, but x is unknown. An **antilogarithm** is
the inverse or opposing function of a logarithm. Because the root of an exponential function is never
negative, an antilog base is always a positive integer. Because the inverse of a logarithm is an exponential
function,

When

*y* = log_{b }x

Raising the base b to the logarithm y gives the anti-logarithm (or inverse logarithm):

**X = log_{b}^{-1}(y) = b^{ y}**

**X = Antilog _{a}(b) = a^{b}**

Hopefully, you now understand the definition of Antilogarithm. In the following section, you can read about the examples using antilog concepts.

Make use of this free and handy online Antilog calculator, you can also try other math concepts calculator tools by visiting this trusted portal called arithmeticcalculator.com

**Examples on finding Antilogarithm with any Base**

1. Calculate the antilog of 2 by using the base 10.

**Solution:**

Consider the question, we have

Antilog a = 2

Base b = 10

The formula for calculate antilog: **X = Antilog _{a}(b) = a^{b}**

X = Antilog_{10}(2)

X = 10^{2}

X = 100

Therefore, the antilog of 2 by using the base 10 is 100.

2. Calculate the antilog of 2 by using the base 5.

**Solution:**

Consider the question, we have

Antilog a = 2

Base b = 5

The formula for calculate the antilog: **X = Antilog _{a}(b) = a^{b}**

X = Antilog_{5}(2)

X = 5^{2}

X = 25

Therefore, the antilog of 2 by using the base 5 is 25.

**1. What is the definition of Antilogarithm?**

The inverse of the logarithm operation is an antilogarithm, also known as inverse logarithm. It's the same as exponentiation, which is raising a number to a certain power.

**2. What is the formula for calculating an antilog?**

Simply raise the base to that number and apply exponentiation to determine the antilog of a given log number with a particular base.

The formula for calculate the antilog: **X = Antilog _{a}(b) = a^{b}**

**3. What is the procedure for converting log to antilog?**

Make a note of the base of your logarithm.

Raise the value of both sides of the equation to that level.
This gets remove of the logarithm. y = log_{10}(9), for example, yields 10^{y} = 9.

**4. Calculate the antilog of 4**

The antilog of 4 will change: y = b^{4} depending on the base of the original logarithm by using the
antilog formula for solving this problem.

Where,

- b is the logarithmic base
- y is the result