The deviations from ideal gas behaviour ...

The deviations from ideal gas behaviour `PV =RT` were successfully explained by van der Waals he pointed out that it is not advisable to neglect the volume of molecules and attractions between themselves at all the conditions He proposed volume correction and pressure correction as `(V -b) and ( P+(a)/(V^(2)))` for 1 mole of gas in ideal gas equation .
The volume occupied by molecules in motion for one mole of gas at `NTP` if molecules are spherical having radius `10^(-8) cm` is .

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The deviations from ideal gas behaviour PV =RT were successfully explained by van der Waals he pointed out that it is not advisable to neglect the volume of molecules and attractions between themselves at all the conditions He proposed volume correction and pressure correction as (V -b) and ( P+(a)/(V^(2))) for 1 mole of gas in ideal gas equation . van der Waals' equation for 'n' moles of a real gas is .

The deviations from ideal gas behaviour PV =RT were successfully explained by van der Waals he pointed out that it is not advisable to neglect the volume of molecules and attractions between themselves at all the conditions He proposed volume correction and pressure correction as (V -b) and ( P+(a)/(V^(2))) for 1 mole of gas in ideal gas equation . For a real gas PV gtRT at all pressure ranges then .

The deviations from ideal gas behaviour PV =RT were successfully explained by van der Waals he pointed out that it is not advisable to neglect the volume of molecules and attractions between themselves at all the conditions He proposed volume correction and pressure correction as (V -b) and ( P+(a)/(V^(2))) for 1 mole of gas in ideal gas equation . The compressibility factor Z is greater than unity the at STP,V_(m) in litre is .

In a gas equation, PV = RT, V refers to the volume of

If v is the volume of one molecule of a gas under given conditions, then van der Waals constant b is

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