What is the average speed of oxygen gas, molar mass 32 g/mol, at a temperature of 300 K?

What formula can be used to calculate the average speed of oxygen gas at a temperature of 300 K with a molar mass of 32 g/mol?

The average speed of oxygen gas at a temperature of 300 K is approximately 484.47 m/s.

Calculation of Average Speed:

The average speed of a gas particle can be calculated using the root mean square (RMS) speed formula: RMS speed = √(3RT/M) Where: - R is the gas constant, - T is the temperature in Kelvin, and - M is the molar mass of the gas. In the case of oxygen gas: - Molar mass of oxygen gas (O2) = 32 g/mol - Temperature (T) = 300 K Plugging in these values into the formula, we get: RMS speed = √(3 * 8.314 J/mol·K * 300 K / 32 g/mol) Simplifying the equation gives us: RMS speed ≈ 484.47 m/s Therefore, the average speed of oxygen gas at a temperature of 300 K is approximately 484.47 m/s.
← Understanding series circuits equivalent resistance and current flow A windmill blade centripetal acceleration calculation →