1 Answer

Carl Parker · Answer 1 · 2023-12-29T12:44:48+0000

Hi there!

We can begin by using Lenz's Law:

$\epsilon = -N(d\Phi _B)/(dt)$

N = Number of Loops

Ф = Magnetic Flux (Wb)
t = time (s)

Also, we can rewrite this as:

$\epsilon = -NA(dB)/(dt)$

A = Area (m²)

Since the area is constant, we can take it out of the derivative.

This is a single wire loop, so N = 1.

Now, we can develop an expression for the induced emf.

We can begin by solving for the area:

$A = \pi r^2 \\\\d = r/2 r = 0.05cm \\\\A = \pi (0.05^2) = 0.007854 m^2$

We can also express dB/dt as:

$(dB)/(dt) = (\Delta B)/(t) = (0-0.5)/(t) = (-0.5)/(t)$

Now, we can create an equation.

$\epsilon = -(1)(0.007854)(-0.5)/(t) = (0.003927)/(t)$

To solve the system, we must now develop an expression for current given an emf and resistance.

Begin by calculating the resistance of the copper wire:

$R = (\rho L)/(A)$

ρ = Resistivity of copper (1.72 * 10⁻⁸ Ωm)
L = Length of wire (0.01 m)

A = cross section area (m²)

Solve:

$R = ((1.72*10^(-8))(0.01))/(\pi (0.001^2)) = 5.475 * 10^(-5) \Omega m$

Now, we can use the following relation (Ohm's Law):

$\epsilon = iR\\\\\epsilon = (Q)/(t)R$

*Since current is equivalent to Q/t.

Plug in the value of R and set the two equations equal to each other.

(Q)/(t)(5.475 * 10^(-5)) = (0.003927)/(t)

Cancel out 't'.

$Q (5.475 * 10^(-5)) = 0.003927 \\\\Q = (0.003927)/(5.475*10^(-5)) = \boxed{71.73 C}$

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