Question

An electron with charge e enters a uniform magnetic field `vec"B"` with a velocity `vec"v"`. The velocity is perpendicular to the magnetic field. The force on the charge is given by `|vec"F"|`= B e v. 
Obtain the dimensions of `vec"B"`.

Answer 1

Given: `|vec"F"|`= B e v

Considering only magnitude, given equation is simplified to,

F = B e v

where, F = Force
B = Magnetic field
e = Charge
v = velocity

∴ B = `"F"/"e v"`

but, F = ma

∴ `["F"] = ["M"^1] xx ["L"^1"M"^0"T"^-2]`

∴ [F] = [L¹M¹T^-2]

Electric charge, (e) = current × time

∴ [e] = [I¹T¹]

Velocity (v) = `"Displacement"/"time"`

∴ `["v"] = ["L"/"T"] = ["L"^1"M"^0"T"^-1]`

Now, [B] = `["F"/"e v"]`

`= (["L"^1"M"^1"T"^-2])/(["T"^1"I"^1]["L"^1"M"^0"T"^-1])`

∴ [B] = [L⁰M¹T^-2I^-1]