Currents in solids

Some copper fuse wire has a diameter of 0.22mm and is designed to carry currents of up to 5.0 A. If there are 1.0 x 10²⁹ electrons per m³ of copper, what is the mean drift speed of the electrons in the fuse wire when it carries a current of 5.0A?

I = nAve rearranging v = I/nAe             Area = ∏r² r = 0.22 x 10^-3 /2 so ∏r² = ∏(0.11 x 10^-3)² = 3.8 x 10^-8 m²

So v = 5.0/ (1.0 x 10²⁹)( 3.8 x 10^-8)(1.6 x 10^-19) = 8.2 x 10^-3 ms^-1

A wire carrying an electric current will overheat if there is too large a current: the accepted value for the maximum allowable current in a copper wire is 1.2 x 10⁷ A per square metre of cross-section of the wire. If there are 1.0 x 10²⁹ electrons per m³ of copper, calculate the mean drift speed of the electrons in the wire when the current reaches this value.

I = nAve rearranging v = I/nAe            

So v = 1.2 x 10⁷ / (1.0 x 10²⁹)(1)(1.6 x 10^-19) =  7.5 x 10 ^-4 ms^-1 = 0.75 mms^-1

Two copper wires of diameter 2.00 mm and 1.00mm are joined end-to-end. What is the ratio of the average drift speeds of the electrons in the two wires when a steady current passes through them? In which wire are the electrons moving faster?

I = nAve rearranging v = I/nAe             Area = ∏r² r

For d = 1.00 mm r = 1 x 10^-3 /2 so ∏r² = ∏(0.5 x 10^-3)² = 7.85 x 10^-7 m²

I don’t know the current so I, but I do know it is the same in both so let’s say it is 1A

So v = 1/ (1.0 x 10²⁹)( 7.85 x 10^-7)(1.6 x 10^-19) = 7.9  x 10^-5ms^-1

For d = 2.00 mm r = 2 x 10^-3 /2 so ∏r² = ∏(1 x 10^-3)² = 3.14 x 10^-6 m²

I don’t know the current so I, but I do know it is the same in both so let’s say it is 1A

So v = 1/ (1.0 x 10²⁹ (3.14 x 10^-6)(1.6 x 10^-19) = 1.99  x 10^-5ms^-1

Ratio of 2mm/1mm = 1.99/7.9 = 0.25 = 1:4

Alternate

I = n₁A₁v₁e₁ = n₂A₂v₂e₂           As e and n are constant A₁v₁ = A₂v₂ and v₂/v₁ = A₁/A₂ 

as A = ∏r² = ∏(d/2)²               then A₁ = ∏(1/2)²  and A₂ =∏(2/2)² so A₁/A₂ = ∏(1/2)²/∏(2/2)² = 1/4

A copper wire joins a car battery to one of the tail lamps and carries a current of 1.8A. The wire has a cross-sectional area of 1.0 mm² (1x 10^-6m²)and is 6.0 m long. If there are 1.0 X 10²⁹ electrons per m³ of copper, calculate how long it takes an electron to travel along this length of wire.

I = nAve rearranging v = I/nAe            

So v = 1.8 / (1.0 x 10²⁹)(1 x 10^-6)(1.6 x 10^-19) = 8.2 x 10^-3 ms^-1 = 1.125 x 10 ^-4 ms^-1

 v = s/t rearranging t = s/v = 6m / 1.125 x 10 ^-4 ms^-1 = 5.33 x 10⁴ s = 14.8 hrs