Question

A copper wire of length `L1 = 6m` and cross sectional area of `A1 = 4mm^2` has the same resistance as another copper wire of length `L2 = 18mm.` What is the ratio between the masses of the two wires, m2/m1?

Answer 1

The ratio is `=9*10^-6`

Explanation:

The mass and the volume are related by

`m=d*v`

The density is `=d`

The ratio of the masses is the same as the ratio of the volumes

`m_2/m_1=(d*v_2)/(d*v_1)=v_2/v_1`

The volume is

`v=l*a`

`v_1=l_1*a_1=6*4*10^-6=24*10^-6m^3`

If the wires have the same resistance,

`R=rho l/a`

`rhol_1/a_1=rho l_2/a_2`

`a_2=l_2/l_1*a_1=0.018/6*4*10^-6=12*10^-9m^2`

`v_2=l_2*a_2=0.018*12*10^-9=216*10^-12m^3`

Therefore,

`m_2/m_1=(216*10^-12)/(24*10^-6)=910^-6`