1 Answer

Lamefun · Answer 1 · 2020-03-28T09:55:14+0000

Answer:

The magnetic field at the center of flat coil is
$(\mu_(0)I)/(8a)$ .

Step-by-step explanation:

Given that,

Radius
$r = a(1+\theta^2)$

We need to calculate the magnetic field at the center of flat coil

Using Biot-savart law

$dB=(\mu_(0)Idl\sin\alpha)/(4\pi* r^2)$

Here,
$\alpha =90^(/circ)$

$dl=rd\theta$

Then, the magnetic field

$dB=(\mu_(0)Ird\theta\sin90)/(4\pi* r^2)$

$dB=(\mu_(0)Id\theta)/(4\pi* r)$

Put the value of r

$dB=(\mu_(0)Id\theta)/(4\pi* a(1+\theta^2))$

$dB=(\mu_(0)I)/(4\pi a)\int_(0)^(\infty){(d\theta)/((1+\theta^2))}$

$dB=(\mu_(0)I)/(4\pi a)(1(\tan^2\theta))_(0)^(\infty)$

$dB=(\mu_(0)I)/(4\pi a)((\pi)/(2)-0)$

$dB=(\mu_(0)I)/(4\pi a)*(\pi)/(2)$

$dB=(\mu_(0)I)/(8a)$

Hence, The magnetic field at the center of flat coil is
$(\mu_(0)I)/(8a)$ .

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