Gauss' Law with a Insulating Shell

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PenDraconis
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Homework Statement


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An insulator in the shape of a spherical shell is shown in cross-section above. The insulator is defined by an inner radius a = 4 cm and an outer radius b = 6 cm and carries a total charge of Q = + 9 μC(You may assume that the charge is distributed uniformly throughout the volume of the insulator).

What is Ey, the y-component of the electric field at point P which is located at (x,y) = (0, -5 cm) as shown in the diagram?

Homework Equations


$$E\oint dA = \frac{Q_{enclosed}}{\epsilon_0}$$


The Attempt at a Solution


I'm confused on where the boundries of the shell lie, is it between the end of a and the end of b (thus making the shell have a width of b-a)?

If it IS the above, then we'd have to do analyze the problem with a Gaussian surface that ends at point P, located between the two.

We already know:
$$\rho = \frac{+Q}{\frac{4}{3}\pi r^3}$$​

$$E\oint dA = \frac{Q_{enclosed}}{\epsilon_0}$$​
$$EA = \frac{Q_{enclosed}}{\epsilon_0}$$​
$$E(4\pi r^2) = \frac{Q_{enclosed}}{\epsilon_0}$$​
$$E(4\pi r^2) = \frac{\rho \frac{4}{3}\pi r^3}{\epsilon_0}$$​
$$E = \frac{\rho r}{3\epsilon_0}$$​

However, when I attempt to use the above expression, I'm not getting a correct answer. What am I doing incorrectly, I'm definitely confused on what "r" should I be using (i.e. is "r" the .05 m given to us in the problem or is, for some reason, the sphere with radius P minus the sphere with a radius of a)?
 
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PenDraconis said:
I'm confused on where the boundries of the shell lie, is it between the end of a and the end of b (thus making the shell have a width of b-a)?
Right.

We already know:
$$\rho = \frac{+Q}{\frac{4}{3}\pi r^3}$$​
That is an equation for a uniform sphere, not for a spherical shell.
What is the volume of the spherical shell?

You'll need another volume of a (different) spherical shell for the electric field afterwards.
 
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Thank you!

I understood my error basically as soon as I wrote out the question despite struggling for a while.

For anyone else with a similar problem looking at this, basically there's only charge in the "shell" between b and a. So to find the charge density you'd have to do the equation for a shell with radius b and subtract from that the shell with radius a, basically netting you with:

$$\rho = \frac{Q}{\frac{4}{3}\pi (b^3-a^3)}$$​
 
I keep on getting the density correct, but the Qenclosed incorrect whe tryign to solve this problem.I think I am going wrong with the radius or something
 
shaniespins said:
I keep on getting the density correct, but the Qenclosed incorrect whe tryign to solve this problem.I think I am going wrong with the radius or something
Welcome to PF.

This is a 10 year old thread, but we can still try to help you with your question about the problem. You will need to show your work explicitly before we can help you, preferably posting your math using LaTeX. I will send you a Private Message (PM) with tips on how to use LaTeX (also see the "LaTeX Guide" link below the edit window).
 
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