Given p=βαln(βxkT)
We know that expression inside log is dimensionless.
Therefore,[βxkT] is dimensionless
⇒[β]=[xkT]=ML2T−2K−1×K×L−1=MLT−2
Since p is dimensionless ∴[p]=[βα]=M0L0T0 ⇒[α]=[β] ⇒[α]=MLT−2
An expression for a dimensionless quantity P is given by P=βαloge(βxkT); where α and β are constants, x is distance; k is Boltzmann constant and T is the temperature. Then the dimensions of α will be
Held on 26 Jun 2022 · Verified 6 Jul 2026.
[M0L−1T0]
[ML0T−2]
[MLT−2]
[ML2T−2]
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