Molar Mass of Gas given Temperature and Average Velocity in 1D Solution

STEP 0: Pre-Calculation Summary
Formula Used
Molar Mass given AV and T = (pi*[R]*Temperature of Gas)/(2*(Average Velocity of Gas)^2)
MAV_T = (pi*[R]*Tg)/(2*(Cav)^2)
This formula uses 2 Constants, 3 Variables
Constants Used
[R] - Universal gas constant Value Taken As 8.31446261815324
pi - Archimedes' constant Value Taken As 3.14159265358979323846264338327950288
Variables Used
Molar Mass given AV and T - (Measured in Kilogram Per Mole) - Molar Mass given AV and T is the mass of a given substance divided by the amount of substance.
Temperature of Gas - (Measured in Kelvin) - The temperature of Gas is the measure of hotness or coldness of a gas.
Average Velocity of Gas - (Measured in Meter per Second) - The Average Velocity of Gas is the mean of all the velocities of the gas molecule.
STEP 1: Convert Input(s) to Base Unit
Temperature of Gas: 30 Kelvin --> 30 Kelvin No Conversion Required
Average Velocity of Gas: 5 Meter per Second --> 5 Meter per Second No Conversion Required
STEP 2: Evaluate Formula
Substituting Input Values in Formula
MAV_T = (pi*[R]*Tg)/(2*(Cav)^2) --> (pi*[R]*30)/(2*(5)^2)
Evaluating ... ...
MAV_T = 15.6723928078423
STEP 3: Convert Result to Output's Unit
15.6723928078423 Kilogram Per Mole -->15672.3928078423 Gram Per Mole (Check conversion here)
FINAL ANSWER
15672.3928078423 15672.39 Gram Per Mole <-- Molar Mass given AV and T
(Calculation completed in 00.004 seconds)

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14 Molar Mass of Gas Calculators

Molar Mass of Gas given Average Velocity, Pressure, and Volume
Go Molar Mass given AV and P = (8*Pressure of Gas*Volume of Gas)/(pi*((Average Velocity of Gas)^2))
Molar Mass of Gas given Temperature and Average Velocity in 1D
Go Molar Mass given AV and T = (pi*[R]*Temperature of Gas)/(2*(Average Velocity of Gas)^2)
Molar Mass of Gas given Average Velocity, Pressure, and Volume in 2D
Go Molar Mass 2D = (pi*Pressure of Gas*Volume of Gas)/(2*((Average Velocity of Gas)^2))
Molar Mass of Gas given Temperature and Average Velocity
Go Molar Mass of a Gas = (8*[R]*Temperature of Gas)/(pi*(Average Velocity of Gas)^2)
Molar Mass of gas given most probable Speed, Pressure and Volume
Go Molar Mass given S and P = (2*Pressure of Gas*Volume of Gas)/((Most Probable Velocity)^2)
Molar Mass of Gas given Root Mean Square Speed and Pressure
Go Molar Mass given S and V = (3*Pressure of Gas*Volume of Gas)/((Root Mean Square Speed)^2)
Molar Mass given Most probable Speed and Temperature
Go Molar Mass given V and P = (2*[R]*Temperature of Gas)/((Most Probable Velocity)^2)
Molar Mass of Gas given most probable Speed, Pressure and Volume in 2D
Go Molar Mass of a Gas = (Pressure of Gas*Volume of Gas)/((Most Probable Velocity)^2)
Molar Mass of Gas given Root Mean Square Speed and Pressure in 1D
Go Molar Mass of a Gas = (Pressure of Gas*Volume of Gas)/((Root Mean Square Speed)^2)
Molar Mass of Gas given Root Mean Square Speed and Temperature in 2D
Go Molar Mass of a Gas = (2*[R]*Temperature of Gas)/((Root Mean Square Speed)^2)
Molar Mass of Gas given Root Mean Square Speed and Temperature
Go Molar Mass of a Gas = (3*[R]*Temperature of Gas)/((Root Mean Square Speed)^2)
Molar Mass of Gas given Root Mean Square Speed and Temperature in 1D
Go Molar Mass of a Gas = ([R]*Temperature of Gas)/((Root Mean Square Speed)^2)
Molar Mass given Most Probable Speed and Temperature in 2D
Go Molar Mass in 2D = ([R]*Temperature of Gas)/((Most Probable Velocity)^2)
Molar Volume of Perfect Gas given Compressibility Factor
Go Molar Volume given CE = Molar Volume of Real Gas/Compressibility Factor

15 Important Formulae on 1D Calculators

Pressure of Gas given Average Velocity and Volume
Go Pressure of Gas given AV and V = (Molar Mass*pi*((Average Velocity of Gas)^2))/(8*Volume of Gas for 1D and 2D)
Mean Square Speed of Gas Molecule given Pressure and Volume of Gas in 1D
Go Root Mean Square of Speed = (Pressure of Gas*Volume of Gas)/(Number of Molecules*Mass of Each Molecule)
Molar Mass of Gas given Average Velocity, Pressure, and Volume
Go Molar Mass given AV and P = (8*Pressure of Gas*Volume of Gas)/(pi*((Average Velocity of Gas)^2))
Molar Mass of Gas given Temperature and Average Velocity in 1D
Go Molar Mass given AV and T = (pi*[R]*Temperature of Gas)/(2*(Average Velocity of Gas)^2)
Most Probable Velocity of Gas given Pressure and Volume
Go Most Probable Velocity given P and V = sqrt((2*Pressure of Gas*Volume of Gas)/Molar Mass)
Most Probable Velocity of Gas given Temperature
Go Most Probable Velocity given T = sqrt((2*[R]*Temperature of Gas)/Molar Mass)
Pressure of Gas given most probable Speed and Volume
Go Pressure of Gas given CMS and V = (Molar Mass*(Most Probable Velocity)^2)/(2*Volume of Gas for 1D and 2D)
Molar Mass of Gas given Root Mean Square Speed and Pressure in 2D
Go Molar Mass given S and V = (2*Pressure of Gas*Volume of Gas)/((Root Mean Square Speed)^2)
Molar Mass of gas given most probable Speed, Pressure and Volume
Go Molar Mass given S and P = (2*Pressure of Gas*Volume of Gas)/((Most Probable Velocity)^2)
Molar Mass of Gas given Root Mean Square Speed and Pressure
Go Molar Mass given S and V = (3*Pressure of Gas*Volume of Gas)/((Root Mean Square Speed)^2)
Pressure of Gas given Average Velocity and Density
Go Pressure of Gas given AV and D = (Density of Gas*pi*((Average Velocity of Gas)^2))/8
Molar Mass given Most probable Speed and Temperature
Go Molar Mass given V and P = (2*[R]*Temperature of Gas)/((Most Probable Velocity)^2)
Most Probable Velocity of Gas given Pressure and Density
Go Most Probable Velocity given P and D = sqrt((2*Pressure of Gas)/Density of Gas)
Pressure of Gas given most probable Speed and Density
Go Pressure of Gas given CMS and D = (Density of Gas*((Most Probable Velocity)^2))/2
Most Probable Velocity of Gas given RMS Velocity
Go Most Probable Velocity given RMS = (0.8166*Root Mean Square Speed)

Molar Mass of Gas given Temperature and Average Velocity in 1D Formula

Molar Mass given AV and T = (pi*[R]*Temperature of Gas)/(2*(Average Velocity of Gas)^2)
MAV_T = (pi*[R]*Tg)/(2*(Cav)^2)

What are the postulates of kinetic theory of gases?

1) Actual volume of gas molecules is negligible in comparison to the total volume of the gas. 2) no force of attraction between the gas molecules. 3) Particles of gas are in constant random motion. 4) Particles of gas collide with each other and with the walls of the container. 5)Collisions are perfectly elastic. 6) Different particles of the gas, have different speeds. 7) The average kinetic energy of the gas molecule is directly proportional to the absolute temperature.

How to Calculate Molar Mass of Gas given Temperature and Average Velocity in 1D?

Molar Mass of Gas given Temperature and Average Velocity in 1D calculator uses Molar Mass given AV and T = (pi*[R]*Temperature of Gas)/(2*(Average Velocity of Gas)^2) to calculate the Molar Mass given AV and T, The Molar mass of gas given temperature and average velocity in 1D formula is defined as the direct proportion of the molar mass of gas with temperature and inverse proportion of molar mass with the square of the most probable velocity. Molar Mass given AV and T is denoted by MAV_T symbol.

How to calculate Molar Mass of Gas given Temperature and Average Velocity in 1D using this online calculator? To use this online calculator for Molar Mass of Gas given Temperature and Average Velocity in 1D, enter Temperature of Gas (Tg) & Average Velocity of Gas (Cav) and hit the calculate button. Here is how the Molar Mass of Gas given Temperature and Average Velocity in 1D calculation can be explained with given input values -> 1.6E+7 = (pi*[R]*30)/(2*(5)^2).

FAQ

What is Molar Mass of Gas given Temperature and Average Velocity in 1D?
The Molar mass of gas given temperature and average velocity in 1D formula is defined as the direct proportion of the molar mass of gas with temperature and inverse proportion of molar mass with the square of the most probable velocity and is represented as MAV_T = (pi*[R]*Tg)/(2*(Cav)^2) or Molar Mass given AV and T = (pi*[R]*Temperature of Gas)/(2*(Average Velocity of Gas)^2). The temperature of Gas is the measure of hotness or coldness of a gas & The Average Velocity of Gas is the mean of all the velocities of the gas molecule.
How to calculate Molar Mass of Gas given Temperature and Average Velocity in 1D?
The Molar mass of gas given temperature and average velocity in 1D formula is defined as the direct proportion of the molar mass of gas with temperature and inverse proportion of molar mass with the square of the most probable velocity is calculated using Molar Mass given AV and T = (pi*[R]*Temperature of Gas)/(2*(Average Velocity of Gas)^2). To calculate Molar Mass of Gas given Temperature and Average Velocity in 1D, you need Temperature of Gas (Tg) & Average Velocity of Gas (Cav). With our tool, you need to enter the respective value for Temperature of Gas & Average Velocity of Gas 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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