Let 4πϵ0e2=A=ML3T−2
L=CxGy(A)z
[ L ]=LT-1x M-1 L3 T-2y ML3 T-2z
−y+z=0⇒y=z ......(i)
x+3y+3z=1 ......(ii)
−x−4z=0 ......(iii)
From (i), (ii) and (iii)
z=y=21,x=−2
A physical quantity of the dimensions of length that can be formed out of c,G and 4πϵ0e2, where [c is velocity of light, G is universal constant of gravitation, e is charge & ϵ0 is permittivity of free space]:
Held on 30 Apr 2017 · Verified 9 Jul 2026.
c21[G4πϵ0e2]21
c2[G4πϵ0e2]21
c21[G4πϵ0e2]21
c1G4πϵ0e2
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