How To Find The Base Of a Logarithm

Finding the base of a log is very simple.Before coming to the topic it is very important to
know the parts of a logarithm.The logarithm has three parts. Which are base, power and
exponent. If power and exponent are given in the problem, we can find the base.

For example: Logₓ 36=2
Here base is x, 36 is power, and 2 is exponent.


To find the base follow these four steps.

1.Write the given problem into exponential form.

First of all convert the logarithmic form into exponential form.
For Example:


Logₓ  16 = 2


x²=16

2. Convert the power into exponential form.

In our example the power is 16. So it will be equal to  4² or 2⁴.
x²=4²

3. Multiply the exponent of unknown base with its multiplicative

inverse on both sides.

The exponent of x is 2 in the above example. So its multiplicative inverse will be 1⁄2 .
(x²)1⁄2 =(4²)1⁄2

4. Solve the multiplication of the exponents to get the answer.

So exponent 2 and ½  will cancel each other and we will get our answer.
x=4

 So the base of the above logarithmic problem is 4.

Logarithm Formula or Logarithm Rules


Logarithm is inverse of exponent.To solve problem related to logarithm you need to know its rules or properties.Without these rules you can not solve logarithm problems.To have all the rules of logarithm at one place would be very helpful for you.These all logarithm formula or logarithm rules are given below for your reference.