# Average Calculator

A free online Calculator that can be helpful for you to Calculate Averages within a second. With MTool Online tool, you can use various free calculators, software, and converter that can help you to use online.

Here you can online calculate an Arithmetic average, Geometric average, and Harmonic average free of cost.

## Arithmetic Average Calculator Online

calculates the arithmetic average (also known as the mean), and follows these steps:

Add up all the numbers you want to average.

Count how many numbers there are.

Divide the sum by the count.

Here's the formula:

Arithmetic average = sum of numbers/count of numbers

**For example,** let's say you want to find the average of the numbers 4, 6, and 8.

Add them up: 4 + 6 + 8 = 18

Count how many numbers there are: 3

Divide the sum by the count: 18 / 3 = 6

So the arithmetic average of 4, 6, and 8 is 6.

If you have a set of numbers you want to find the arithmetic average of and would like me to calculate it for you, just let me know!

## Free Geometric Average Calculator

Certainly! To calculate the geometric average (also known as the geometric mean), follow these steps:

Multiply all the numbers you want to average.

Take the n(number) root of the result, where n is the count of numbers.

Here's the formula:

Geometric average = (product of numbers)^(1/n)

**For example,** let's say you want to find the geometric average of the numbers 2, 4, and 8.

Multiply them: 2 x 4 x 8 = 64

Take the cube root of 64 since there are three numbers: (64)^(1/3) = 4

So the geometric average of 2, 4, and 8 is 4.

If you have a set of numbers you want to find the geometric average of and would like me to calculate it for you.

## Harmonic Average Calculator

Sure, I can help you with that! To calculate the harmonic average (also known as the subcontrary mean), follow these steps:

Add up the reciprocals of all the numbers you want to average.

Divide the count of numbers by the result from step 1.

Here's the formula:

Harmonic average = n / (sum of (1/x))

where n is the count of numbers.

**For example,** let's say you want to find the harmonic average of the numbers 2, 4, and 8.

Find the reciprocals and add them up:

1/2 + 1/4 + 1/8 = 0.875

Divide the count of numbers (3) by the result from step 1:

3 / 0.875 = 3.4286 (rounded to 4 decimal places)

So the harmonic average of 2, 4, and 8 is approximately 3.4286.

If you have a set of numbers you want to find the harmonic average of and would like me to calculate it for you, just let me know!

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