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Arithmetic Mean given Geometric and Harmonic Means Formula

GoArithmetic Mean of Two Numbers Formula

GoArithmetic Mean of Four Numbers Formula

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Arithmetic Mean is the average value or mean which signifies the central tendency of the set of numbers by finding the sum of their values. Check FAQs

AM = \frac{{GM}^{2}}{HM}

AM - Arithmetic Mean?GM - Geometric Mean?HM - Harmonic Mean?

Arithmetic Mean given Geometric and Harmonic Means Example

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Here is how the Arithmetic Mean given Geometric and Harmonic Means equation looks like with Values.

Here is how the Arithmetic Mean given Geometric and Harmonic Means equation looks like with Units.

Here is how the Arithmetic Mean given Geometric and Harmonic Means equation looks like.

50.0208 = \frac{49^{2}}{48}

50.0208 = \frac{49^{2}}{48}

50.0208 = \frac{49^{2}}{48}

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Arithmetic Mean given Geometric and Harmonic Means Solution

Follow our step by step solution on how to calculate Arithmetic Mean given Geometric and Harmonic Means?

FIRST Step Consider the formula

AM = \frac{{GM}^{2}}{HM}

Next Step Substitute values of Variables

∴

AM = \frac{49^{2}}{48}

Next Step Prepare to Evaluate

∴

AM = \frac{49^{2}}{48}

Next Step Evaluate

∴

AM = 50.0208333333333

LAST Step Rounding Answer

∴

AM = 50.0208

Arithmetic Mean given Geometric and Harmonic Means Formula Elements

Variables

Arithmetic Mean

Arithmetic Mean is the average value or mean which signifies the central tendency of the set of numbers by finding the sum of their values.

Symbol: AM

Measurement: NAUnit: Unitless

Note: Value can be positive or negative.

Formulas to find Arithmetic Mean

Geometric Mean

Geometric Mean is the average value or mean which signifies the central tendency of the set of numbers by finding the product of their values.

Symbol: GM

Measurement: NAUnit: Unitless

Note: Value can be positive or negative.

Formulas to find Geometric Mean

Harmonic Mean

Harmonic Mean is the average value or mean which signifies the central tendency of the set of numbers by finding the reciprocal of their values.

Symbol: HM

Measurement: NAUnit: Unitless

Note: Value can be positive or negative.

Formulas to find Harmonic Mean

Other Formulas to find Arithmetic Mean

Go Arithmetic Mean of Two Numbers

AM = \frac{n 1 + n 2}{2}

Go Arithmetic Mean of Four Numbers

AM = \frac{n 1 + n 2 + n 3 + n 4}{4}

Go Arithmetic Mean of N Numbers

AM = \frac{S Arithmetic}{n}

Go Arithmetic Mean of Three Numbers

AM = \frac{n 1 + n 2 + n 3}{3}

How to Evaluate Arithmetic Mean given Geometric and Harmonic Means?

Arithmetic Mean given Geometric and Harmonic Means evaluator uses Arithmetic Mean = (Geometric Mean^2)/Harmonic Mean to evaluate the Arithmetic Mean, Arithmetic Mean given Geometric and Harmonic Means formula is defined as the average value or mean which signifies the central tendency of the set of numbers by finding the sum of their values, and calculated using the geometric mean and harmonic mean of them. Arithmetic Mean is denoted by AM symbol.

How to evaluate Arithmetic Mean given Geometric and Harmonic Means using this online evaluator? To use this online evaluator for Arithmetic Mean given Geometric and Harmonic Means, enter Geometric Mean (GM) & Harmonic Mean (HM) and hit the calculate button.

FAQs on Arithmetic Mean given Geometric and Harmonic Means

What is the formula to find Arithmetic Mean given Geometric and Harmonic Means?

The formula of Arithmetic Mean given Geometric and Harmonic Means is expressed as Arithmetic Mean = (Geometric Mean^2)/Harmonic Mean. Here is an example- 50.02083 = (49^2)/48.

How to calculate Arithmetic Mean given Geometric and Harmonic Means?

With Geometric Mean (GM) & Harmonic Mean (HM) we can find Arithmetic Mean given Geometric and Harmonic Means using the formula - Arithmetic Mean = (Geometric Mean^2)/Harmonic Mean.

What are the other ways to Calculate Arithmetic Mean?

Here are the different ways to Calculate Arithmetic Mean-

Arithmetic Mean=(First Number+Second Number)/2
Arithmetic Mean=(First Number+Second Number+Third Number+Fourth Number)/4
Arithmetic Mean=Arithmetic Sum of Numbers/Total Numbers

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: Unit

Arithmetic Mean given Geometric and Harmonic Means Formula

​GoArithmetic Mean of Two Numbers Formula

​GoArithmetic Mean of Four Numbers Formula

Arithmetic Mean given Geometric and Harmonic Means Example

Arithmetic Mean given Geometric and Harmonic Means Solution

Arithmetic Mean given Geometric and Harmonic Means Formula Elements

Other Formulas to find Arithmetic Mean

How to Evaluate Arithmetic Mean given Geometric and Harmonic Means?

FAQs on Arithmetic Mean given Geometric and Harmonic Means

Variable Name

GoArithmetic Mean of Two Numbers Formula

GoArithmetic Mean of Four Numbers Formula