Respuesta :
Answer:
(a) Jc = 5.81×10⁵A/m²
(b) λ = mass per unit length = 8960×8.60×10-⁵ = 0.771kg/m
(c) Ja = 3.62×10⁵A/m²
(d) λ = mass per unit length = 2700××1.38×10-⁴= 0.373kg/m
Explanation:
Given:
the current to be carried in the conductors I = 50.0A
Densities of copper and aluminum, 8960kg/m³ and 2700kg/m³ respectively.
R/L = 0.2Ω/km = 0.2×10-³Ω/m
Required to find
(a) J the current density in A/m² for copper
We don't know the Cross sectional area of the conductors but we know the current flowing through them and the current density is J = I/A. So we need to find the cross sectional area first. A relation that can help us is that of the resistance of a conductor which is
R = ρL/A
Where R is the resistance of the conductor in Ohms (Ω)
ρ is the resistivity of the (a property) conductor in (Ωm)
L is the length of the conductor
A is the cross sectional area of the conductor
From the formula, the resistance per unit length R/L = ρ/A
So A = ρ ÷ (R/L)
For copper, resistivity is ρ = 1.72×10-⁸Ωm
So Ac = cross sectional area for copper = 1.72×10-⁸/(0.2×10‐³)= 8.6×10-⁵ m²
Ac = 8.6×10-⁵m²
I = 50.0A
Jc = I/Ac = current density
Jc = 50.0/(8.6×10-⁵) = 5.81×10⁵A/m²
(b) λ = mass per unit length = density × Area
Copper: density = 8960kg/m³, Ac = 8.6×10-⁵ m²
λ = mass per unit length = 8960×8.6×10-⁵ = 0.771kg/m
(c) For aluminium, ρ = 2.75×10-⁸Ωm
So Aa = 2.75×10-⁸/0.200×10‐³ = 1.38×10-⁴ m²
Aa = 1.38×10-⁴ m²
Ja = I/Aa= current density
Ja = 50.0/(1.38×10-⁴) = 3.62×10⁵A/m²
(d) Aluminium: density = 2700kg/m³, Ac = 1.38×10-⁴m²
λ = mass per unit length = 2700×1.38×10-⁴ = 0.373kg/m
Answer:
Jc = i/Ac = 50/8.45 x 10⁻⁵ = 5.91 x 10⁵ A.m⁻²
λc = density x area = 8960 x 8.45 x 10⁻⁵ = 0.75kg.m⁻¹
Ja = i/Aa = 50/13.7 x 10⁻⁵ A.m⁻² =3.65 x 10⁻⁵
λa = density x area = 2700 x 13.7 x 10⁻⁵ = 0.37kg.m⁻¹
Explanation:
The resistance of the wire is defined as
R = ρL/A
where ρ is the resistivity of the material, L is the length of the wire and A is the cross-section area of the wire
so the resistance per length is given by
R/L = ρ/A
The value of the resistance per unit length has to be 0.200Ω/km = 0.20 x 10⁻³Ω/m
so the cross sectional area of the wire is given by
A = ρ/0.20 x 10⁻³ = ρ/0.20 x 10³m³
for copper ρc = 1.69 x 10⁻⁸Ωm
and the cross sectional area of the copper wire has to be
Ac = 1.69 x 10⁻⁸/0.20 x 10³ = 8.45 x 10⁻⁵m²
a) The current density Jc = i/Ac = 50/8.45 x 10⁻⁵ = 5.91 x 10⁵ A.m⁻²
b) Mass per unit length of the copper wire is given by
λc = density x area = 8960 x 8.45 x 10⁻⁵ = 0.75kg.m⁻¹
For aluminium ρa = 2.75 x 10⁻⁸Ω.m
so the cross sectional area of the aluminium wire has to be Aa = 2.75 x 10⁻⁸/0.20 x 10³ = 13.7 x 10⁻⁵m²
c) The current density Ja = i/Aa = 50/13.7 x 10⁻⁵ = 3.65 x 10⁻⁵A.m⁻²
d) Mass per unit length of the aluminium wire is given by
λa = density x area = 2700 x 13.7 x 10⁻⁵ = 0.37kg.m⁻¹
