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Grade 12th PassElectromagnetic Induction

If the magnetic induction at the centre of a circular coil carrying current I is 5SQRT5 times the magnetic induction at a point on its axis. Find the distance of the point on the axis from the centre of the coil. The radius of the coil is 10 cm.

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14 Years agoGrade 12th Pass
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ApprovedApproved Tutor Answer0 Years ago

To solve the problem of finding the distance from the center of a circular coil to a point on its axis where the magnetic induction is related to the magnetic induction at the center, we can use the formulas for magnetic induction due to a circular coil. Let's break this down step by step.

Understanding Magnetic Induction

Magnetic induction (or magnetic field strength) at the center of a circular coil carrying current can be calculated using the formula:

B_center = (μ₀ * I) / (2 * R)

Where:

  • B_center is the magnetic induction at the center of the coil.
  • μ₀ is the permeability of free space (approximately 4π x 10-7 T·m/A).
  • I is the current flowing through the coil.
  • R is the radius of the coil.

Magnetic Induction on the Axis

The magnetic induction at a point along the axis of the coil at a distance x from the center is given by:

B_axis = (μ₀ * I * R2) / (2 * (R2 + x2)^(3/2))

Setting Up the Equation

According to the problem, the magnetic induction at the center is 5√5 times the magnetic induction at the point on the axis. Therefore, we can set up the equation:

B_center = 5√5 * B_axis

Substituting the Formulas

Now, substituting the expressions for B_center and B_axis into the equation gives:

(μ₀ * I) / (2 * R) = 5√5 * (μ₀ * I * R2) / (2 * (R2 + x2)^(3/2))

Simplifying the Equation

We can cancel out common terms (μ₀ and I) from both sides:

1 / (2 * R) = 5√5 * (R2) / (2 * (R2 + x2)^(3/2))

Now, simplifying further, we get:

1 = 5√5 * R2 / (R2 + x2)^(3/2)

Cross-Multiplying and Rearranging

Cross-multiplying gives:

(R2 + x2)^(3/2) = 5√5 * R2

Next, we can cube both sides to eliminate the exponent:

R2 + x2 = (5√5 * R2)^(2/3)

Substituting the Radius

Given that the radius R is 10 cm (or 0.1 m), we can substitute this value into the equation:

0.12 + x2 = (5√5 * 0.12)^(2/3)

Calculating this gives:

0.01 + x2 = (5√5 * 0.01)^(2/3)

Now, calculate the right side:

5√5 * 0.01 = 0.1118

Then, raise it to the power of 2/3:

(0.1118)^(2/3) ≈ 0.046

Final Steps to Solve for x

Now we have:

0.01 + x2 = 0.046

Subtracting 0.01 from both sides gives:

x2 = 0.046 - 0.01 = 0.036

Taking the square root of both sides results in:

x ≈ 0.6 m

Conclusion

The distance from the center of the coil to the point on its axis where the magnetic induction is 5√5 times that at the center is approximately 0.6 meters, or 60 cm.