Mridul Sharma
Indian Institute of Information Technology (IIIT), Bhopal
Mridul Sharma has created this Calculator and 100+ more calculators!
Mona Gladys
St Joseph's College (St Joseph's College), Bengaluru
Mona Gladys has verified this Calculator and 400+ more calculators!

2 Other formulas that you can solve using the same Inputs

Geometric Mean when Harmonic Mean and Arithmetic Mean is given
Geometric Mean=(Arithmetic Mean*Harmonic Mean)^0.5 GO
Arithmetic Mean when Harmonic Mean and Geometric Mean is given
Arithmetic Mean=(Geometric Mean^2)/Harmonic Mean GO

1 Other formulas that calculate the same Output

Harmonic Mean of two numbers
Harmonic Mean=(2*term 1*Term 2)/(term 1+Term 2) GO

Harmonic Mean when Geometric Mean and Arithmetic Mean is given Formula

Harmonic Mean=(Geometric Mean)^2/Arithmetic Mean
h=(GM)^2/AM
More formulas
Nth term of AP GO
Number of terms of in an Arithematic Progression GO
Sum of first n terms in an AP when common difference is given GO
Sum of first n terms in an AP when last term is given GO
Calculate nth term of AP when pth & qth terms are given GO
Common Difference when first term & pth term are given GO
Position of pth term when pth term, first term & common difference is given GO
Last term when number of terms, first term & common difference are given GO
Common Difference when first term, last term & number of terms are given GO
Number of terms when Sum of first n terms, first term & last term are given GO
Common Difference when pth & qth terms are given GO
First term when pth & qth terms are given GO
Nth term of GP GO
Sum of first n terms in a finite GP GO
Sum infinite GP when r is less than one GO
nth term from end in a finite GP GO
Sum of first n natural numbers GO
Sum of squares of first n natural numbers GO
Sum of cubes of first n natural numbers GO
nth term from the end of finite GP when last term and common ratio is given GO
Sum of last n terms in a finite AP with last term given GO
Nth term of a HP GO
Harmonic Mean of two numbers GO
Nth term of AGP GO
Sum of first n terms of AGP GO
Sum of infinite AGP where (-1 < r < 1) GO
Sum of last n terms in a finite AP with first term, total terms given GO
Sum of all terms from position p to position q in an AP GO
Common Ratio GO
Sum of Squares first n odd numbers GO
Sum of squares of first n even numbers GO
Sum of first n even natural numbers GO
Sum of first n odd natural numbers GO
Sum of cubes of first n even numbers GO
Arithmetic Mean of two numbers GO
Geometric Mean of two numbers GO
Sum of infinite GP except first n terms when r<1 GO
Arithmetic Mean when Harmonic Mean and Geometric Mean is given GO
Geometric Mean when Harmonic Mean and Arithmetic Mean is given GO
Sum of first n terms of Harmonic Progression GO
Sum of n natural numbers taken power of 4(four) GO

Relation between Arithmetic Mean,Geometric Mean and Harmonic Mean?

Relation between Arithmetic Mean,Geometric Mean and Harmonic Mean can be expressed as square of ,Geometric Mean is equals to the product of Arithmetic Mean and Harmonic Mean i.e GM^2=AM*HM.

How to Calculate Harmonic Mean when Geometric Mean and Arithmetic Mean is given?

Harmonic Mean when Geometric Mean and Arithmetic Mean is given calculator uses Harmonic Mean=(Geometric Mean)^2/Arithmetic Mean to calculate the Harmonic Mean, The Harmonic Mean when Geometric Mean and Arithmetic Mean is given formula can be find out using the relation between AM,GM and HM which is GM^2=AM*HM. Harmonic Mean and is denoted by h symbol.

How to calculate Harmonic Mean when Geometric Mean and Arithmetic Mean is given using this online calculator? To use this online calculator for Harmonic Mean when Geometric Mean and Arithmetic Mean is given, enter Geometric Mean (GM) and Arithmetic Mean (AM) and hit the calculate button. Here is how the Harmonic Mean when Geometric Mean and Arithmetic Mean is given calculation can be explained with given input values -> 1 = (1)^2/1.

FAQ

What is Harmonic Mean when Geometric Mean and Arithmetic Mean is given?
The Harmonic Mean when Geometric Mean and Arithmetic Mean is given formula can be find out using the relation between AM,GM and HM which is GM^2=AM*HM and is represented as h=(GM)^2/AM or Harmonic Mean=(Geometric Mean)^2/Arithmetic Mean. Geometric Mean is defined as the nth root of the product of n numbers and Arithmetic mean of given set of integers can be calculated by dividing the sum of all given integers by total count of the integers.
How to calculate Harmonic Mean when Geometric Mean and Arithmetic Mean is given?
The Harmonic Mean when Geometric Mean and Arithmetic Mean is given formula can be find out using the relation between AM,GM and HM which is GM^2=AM*HM is calculated using Harmonic Mean=(Geometric Mean)^2/Arithmetic Mean. To calculate Harmonic Mean when Geometric Mean and Arithmetic Mean is given, you need Geometric Mean (GM) and Arithmetic Mean (AM). With our tool, you need to enter the respective value for Geometric Mean and Arithmetic Mean and hit the calculate button. You can also select the units (if any) for Input(s) and the Output as well.
How many ways are there to calculate Harmonic Mean?
In this formula, Harmonic Mean uses Geometric Mean and Arithmetic Mean. We can use 1 other way(s) to calculate the same, which is/are as follows -
  • Harmonic Mean=(2*term 1*Term 2)/(term 1+Term 2)
Share Image
Let Others Know
Facebook
Twitter
Reddit
LinkedIn
Email
WhatsApp
Copied!