Force of interaction between two atoms, F=αβe(αkT−x2) Since exponential terms are dimensionless ∴[αkTx2]=M0 L0 T0 ⇒[α]ML2 T−2L2=M0 L0 T0 ⇒[α]=M−1 T2 [F]=[α][β] MLT−2=M−1 T2[β] ⇒[β]=M2LT−4
The force of interaction between two atoms is given by F=αβexp(−αkTx2); where x is the distance, k is the Boltzmann constant and T is temperature and α and β are two constants. The dimensions of β is:
Held on 11 Jan 2019 · Verified 6 Jul 2026.
M0 L2 T−4
M2LT−4
MLT−2
M2 L2 T−2
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