Atomic radius given atomic volume Calculator

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Electronegativity

✖Atomic Volume is the volume one mole of an element occupies at room temperature.ⓘ Atomic Volume [V]

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✖Atomic Radius is the radius of the atom which forms the metallic crystal.ⓘ Atomic radius given atomic volume [r]

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Formula

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Atomic radius given atomic volume

Formula

`"r" = (("V"*3)/(4*pi))^(1/3)`

Example

`"2.8E^10A"=(("95.5m³/mol"*3)/(4*pi))^(1/3)`

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Atomic radius given atomic volume Solution

STEP 0: Pre-Calculation Summary

Formula Used

Atomic Radius = ((Atomic Volume*3)/(4*pi))^(1/3)
r = ((V*3)/(4*pi))^(1/3)
This formula uses 1 Constants, 2 Variables

Constants Used

pi - Archimedes' constant Value Taken As 3.14159265358979323846264338327950288

Variables Used

Atomic Radius - (Measured in Meter) - Atomic Radius is the radius of the atom which forms the metallic crystal.
Atomic Volume - (Measured in Cubic Meter per Mole) - Atomic Volume is the volume one mole of an element occupies at room temperature.

STEP 1: Convert Input(s) to Base Unit

Atomic Volume: 95.5 Cubic Meter per Mole --> 95.5 Cubic Meter per Mole No Conversion Required

STEP 2: Evaluate Formula

Substituting Input Values in Formula

r = ((V*3)/(4*pi))^(1/3) --> ((95.5*3)/(4*pi))^(1/3)

Evaluating ... ...

r = 2.83555616592256

STEP 3: Convert Result to Output's Unit

2.83555616592256 Meter -->28355561659.2256 Angstrom (Check conversion here)

FINAL ANSWER

28355561659.2256 ≈ 2.8E+10 Angstrom <-- Atomic Radius

(Calculation completed in 00.004 seconds)

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Created by Akshada Kulkarni

National Institute of Information Technology (NIIT), Neemrana

Akshada Kulkarni has created this Calculator and 500+ more calculators!

Verified by Prashant Singh

K J Somaiya College of science (K J Somaiya), Mumbai

Prashant Singh has verified this Calculator and 500+ more calculators!

< 19 Periodic Table and Periodicity Calculators

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Frequency of characteristic X-ray

Go X ray Frequency = (Moseley Proportionality Constant^2)*((Atomic Number-Shielding Constant)^2)

Bond energy of elements A and B

Go Bond energy in Kcal per mole = ((Electronegativity of Element A-Electronegativity of Element B)/0.208)^2

Ionization energy in KJ mole

Go Ionization Energy in KJmole = (Electronegativity*544)-Electron Affinity in KJmole

Electron Affinity in KJ mole

Go Electron Affinity in KJmole = (Electronegativity*544)-Ionization Energy in KJmole

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Go Ionic Radius = sqrt(Ionic Charge/Polarising Power)

Ionization energy given electronegativity

Go Ionization Energy = (Electronegativity*5.6)-Electron Affinity

Atomic radius given atomic volume

Go Atomic Radius = ((Atomic Volume*3)/(4*pi))^(1/3)

Ionic Charge of Element

Go Ionic Charge = Polarising Power*(Ionic Radius^2)

Polarizing Power

Go Polarising Power = Ionic Charge/(Ionic Radius^2)

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Go Atomic Volume = (4/3)*pi*(Atomic Radius^3)

Pauling electronegativity given Mulliken electronegativity

Go Pauling's Electronegativity = Mulliken's Electronegativity/2.8

Relation between Mulliken and Pauling electronegativity

Go Mulliken's Electronegativity = Pauling's Electronegativity*2.8

Distance between two atoms of different molecules

Go Distance between Two Molecules = 2*Vander Waal radius

Vander Waal's radius

Go Vander Waal radius = Distance between Two Molecules/2

Distance between Two Covalently Bonded Atoms

Go Distance between Covalent Atoms = 2*Covalent Radius

Covalent radius

Go Covalent Radius = Distance between Covalent Atoms/2

Distance between two metal atoms

Go Distance between Two Atoms = 2*Crystal Radius

Crystal Radius

Go Crystal Radius = Distance between Two Atoms/2

Atomic radius given atomic volume Formula

Atomic Radius = ((Atomic Volume*3)/(4*pi))^(1/3)
r = ((V*3)/(4*pi))^(1/3)

How do we find the atomic volume of an element?

Atomic volume is used to the atomic or ionic radius of an atom (depending on whether or not you are dealing with an ion). This calculation is based on the idea of an atom as a sphere, which isn't precisely accurate. However, it's a decent approximation.
In this case, the formula for the volume of a sphere is used, where r is the atomic radius:
volume = (4/3)(π)(r^3).

How to Calculate Atomic radius given atomic volume?

Atomic radius given atomic volume calculator uses Atomic Radius = ((Atomic Volume*3)/(4*pi))^(1/3) to calculate the Atomic Radius, The Atomic radius given atomic volume formula is a measure of the size of its atoms, usually the mean or typical distance from the center of the nucleus to the boundary of the surrounding shells of electrons. Atomic Radius is denoted by r symbol.

How to calculate Atomic radius given atomic volume using this online calculator? To use this online calculator for Atomic radius given atomic volume, enter Atomic Volume (V) and hit the calculate button. Here is how the Atomic radius given atomic volume calculation can be explained with given input values -> 2.8E+20 = ((95.5*3)/(4*pi))^(1/3).

FAQ

What is Atomic radius given atomic volume?

The Atomic radius given atomic volume formula is a measure of the size of its atoms, usually the mean or typical distance from the center of the nucleus to the boundary of the surrounding shells of electrons and is represented as r = ((V*3)/(4*pi))^(1/3) or Atomic Radius = ((Atomic Volume*3)/(4*pi))^(1/3). Atomic Volume is the volume one mole of an element occupies at room temperature.

How to calculate Atomic radius given atomic volume?

The Atomic radius given atomic volume formula is a measure of the size of its atoms, usually the mean or typical distance from the center of the nucleus to the boundary of the surrounding shells of electrons is calculated using Atomic Radius = ((Atomic Volume*3)/(4*pi))^(1/3). To calculate Atomic radius given atomic volume, you need Atomic Volume (V). With our tool, you need to enter the respective value for Atomic Volume and hit the calculate button. You can also select the units (if any) for Input(s) and the Output as well.

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