According to Maxwell-distribution law, t...

According to Maxwell`-`distribution law, the probability function representing the ratio of molecules at a particular velocity to the total number of molecules is given by
`f(v)=k_(1)sqrt(((m)/(2piKT^(2)))^(3))4piv^(2)e^(-(mv^(2))/(2KT))`
Where `m` is the mass of the molecule, `v` is the velocity of the molecule, `T` is the temperature `k` and `k_(1)` are constant. The dimensional formulae of `k_(1)` is

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According to Maxwell - distribution law, the probability function representing the ratio of molecules at a particular velocity to the total number of molecules is given by f(v)=k_(1)sqrt(((m)/(2piKT^(2))))4piv^(2)e^(-(mv^(2))/(2KT)) Where m is the mass of the molecule, v is the velocity of the molecule, T is the temperature k and k_(1) are constant. The dimensional formulae of k_(1) is

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