To Practice Problem solving Strategy 23 2 for Continuous Charge Distribution Problems
Electric Potential
Practice
practice problem 1
A charge of −1.0 μC is located on the y-axis 1.0 m from the origin at the coordinates (0,1) while a second charge of +1.0 μC is located on the x-axis 1.0 m from the origin at the coordinates (1,0). Determine the value of the following quantities at the origin…
- the magnitude of the electric field
- the direction of the electric field
- the electric potential (assuming the potential is zero at infinite distance)
- the energy needed to bring a +1.0 μC charge to this position from infinitely far away
solution
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Since the charges are identical in magnitude and equally far from the origin, we can do one computation for both charges.
E = (9.0 × 109 N m2/C2)(1.0 × 10−6 C) (1.0 m)2 Electric field lines come out of positive charges and go into negative charges. At the origin, this results in an electric field that points "left" (away from the positive change) and "up" (toward the negative charge). These two vectors form the legs of a 45°–45°–90° triangle whose sides are in the ratio 1:1:√2.
∑E =√2 × 9,000 N/C =12,700 N/C
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Moving "up" and to the "left" in equal amounts results in a 135° standard angle.
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Once again, since the charges are identical in magnitude and equally far from the origin, we only need to compute one number.
V = (9.0 × 109 N m2/C2)(1.0 × 10−6 C) (1.0 m) Electric potential is a scalar quantity. It doesn't have direction, but it does have sign. The positive charge contributes a positive potential and the negative charge contributes a negative potential. Add them up and watch them cancel.
∑V =9,000 V − 9,000 V =0 V
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The electric potential at a point in space is defined as the work per unit charge required to move a test charge to that location from infinitely far away.
Algebra shows that work is charge times potential difference. Since the potential at the origin is zero, no work is required to move a charge to this point.
∆UE =q∆V
∆UE =(1.0 × 10−6 C)(0 V)
∆UE =0 J
practice problem 2
A proton (mass m, charge +e ) and an alpha particle (mass 4m , charge +2e ) approach one another with the same initial speed v from an initially large distance. How close will these two particles get to one another before turning around?
solution
The kinetic energy of the moving particles is completely transformed into electric potential energy at the point of closest approach.
| Ue | = | K | |||
| k(e)(2e) | = | 1 | (m)v 2 + | 1 | (4m)v 2 |
| r | 2 | 2 | |||
Finish the algebra.
practice problem 3
sketch-v.pdf
The diagram below shows the location and charge of four identical small spheres. Find the electric potential at the five points indicated with open circles. Use these results and symmetry to find the potential at as many points as possible without additional calculation. Write your results on or near the points. Sketch at least 4 equipotential lines. Pick round values seperated by a uniform interval. At least one of the lines should be disconnected.
solution
Use the equation for the electric potential from a set of point charges.
Since each charge is the same size, we can factor it out.
In order to save screen real estate, let's compute the product of the constants once…
kq =(9 × 109 N m2/C2)(1 × 10−6 C) = (9,000 N m2/C)
and the sum of the distances to the four charges five times…
| ∑ | 1 | = | ⎛ ⎜ ⎝ | 1 | + | 1 | + | 1 | + | 1 | ⎞ ⎟ ⎠ |
| r 1 | √8 m | √8 m | √8 m | √8 m | |||||||
| ∑ | 1 | = 1.41421…m−1 | |||||||||
| r 1 | |||||||||||
| ∑ | 1 | = | ⎛ ⎜ ⎝ | 1 | + | 1 | + | 1 | + | 1 | ⎞ ⎟ ⎠ |
| r 2 | √8 m | √8 m | √40 m | √40 m | |||||||
| ∑ | 1 | = 1.02333…m−1 | |||||||||
| r 2 | |||||||||||
| ∑ | 1 | = | ⎛ ⎜ ⎝ | 1 | + | 1 | + | 1 | + | 1 | ⎞ ⎟ ⎠ |
| r 3 | √20 m | √20 m | √68 m | √68 m | |||||||
| ∑ | 1 | = 0.68974…m−1 | |||||||||
| r 3 | |||||||||||
| ∑ | 1 | = | ⎛ ⎜ ⎝ | 1 | + | 1 | + | 1 | + | 1 | ⎞ ⎟ ⎠ |
| r 4 | 2 m | 2 m | √20 m | √20 m | |||||||
| ∑ | 1 | = 1.44721…m−1 | |||||||||
| r 4 | |||||||||||
| ∑ | 1 | = | ⎛ ⎜ ⎝ | 1 | + | 1 | + | 1 | + | 1 | ⎞ ⎟ ⎠ |
| r 5 | 2 m | √20 m | 6 m | √52 m | |||||||
| ∑ | 1 | = 1.02894…m−1 | |||||||||
| r 5 | |||||||||||
Apply it at each of the five locations, summing up the contributions of the four point charges.
| V 1 = (9,000 N m2/C)(1.41421…m−1) |
| V 1 = 12,700 V |
| V 2 = (9,000 N m2/C)(1.02333…m−1) |
| V 2 = 9,210 V |
| V 3 = (9,000 N m2/C)(0.68974…m−1) |
| V 3 = 6,210 V |
| V 4 = (9,000 N m2/C)(1.44721…m−1) |
| V 4 = 13,000 V |
| V 5 = (9,000 N m2/C)(1.23605…m−1) |
| V 5 = 9,260 V |
Record the numbers at as many symmetric locations as possible.
Sketch in the equipotentials.
practice problem 4
Fission is the splitting of a heavy atomic nucleus into two roughly equal halves accompanied by the release of a large amount of energy. An atomic nucleus can be modeled as a sphere whose charge is distributed uniformly across its entire volume. Determine the energy released when a heavy nucleus undergoes nuclear fission using electrostatic principles.
- Derive an equation for the electrostatic energy needed to assemble a charged sphere from an infinite swarm of infinitesimal charges located infinitely far away. (In other words, use calculus.) Let R be the sphere's radius, Q be its total charge, V be its volume, and ρ be its charge density.
- Express the total energy of two half-sized spheres in terms of the energy of one whole sphere. Half-sized spheres have half the volume and half the charge of a whole sphere (because charge density is assumed to be constant).
- Calculate the energy released when a nucleus of uranium 235 (the isotope responsible for powering some nuclear reactors and nuclear weapons) splits into two identical daughter nuclei. Give your final answer in the preferred unit for nuclear reactions, the megaelectronvolt. (A nucleus of 235 92 U has a radius of 5.8337 fm.)
solution
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One way to make a big sphere to add layers to an already existing smaller sphere. Calculus allows us to start with an initial sphere with zero radius ( r 0 = 0), add layers to it of infinitesimal thickness (dr), and end up with a sphere with nonzero radius ( r =R ) by repeating the process an infinite number of times (∫). This calculus thing is pretty amazing.
The electrostatic potential energy of two point charges is given by…
where…
U = electric potential energy k = the electrostatic constant q 1 = one point charge q 1 = another point charge r = the separation between charges In our sphere built up layer by layer, the first charge is a solid sphere with uniform charge density.
The second charge is a thin spherical shell with the same charge density.
q 2 = ρ(4πr 2 dr)
These two charges are effectively separated by the radius of the solid sphere. The energy equation then becomes a mess…
R
⌠
⌡
0U = k (ρ 4 πr 3) ρ(4πr 2 dr) 1 3 r begging to be simplified…
R
⌠
⌡
0U = 16π2ρ2 k r 4 dr 3 and solved.
We should now replace charge density with a more useful expression.
ρ = Q = Q = 3Q V 4 3 πR 3 4πR 3 Actually, it's the square of charge density we should eliminate.
So let's do it.
U = 16π2 kR 5 9Q 2 15 16π2 R 6 Yay algebra!
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A half sized sphere has half the charge and half the volume but not half the radius. It's the cube root of a half the radius.
⇒ V = 4 π ⎛
⎜
⎝r ⎞3
⎟
⎠2 3 ∛2 A half sphere then has energy equal to…
U ½ = 3k(Q/2)2 = ∛2 U 5(R/∛2) 4 and two of them have energy equal to…
I think it's more interesting to express the weird fraction as a decimal.
2U ½ = ∛2 = 0.62996… U 2 Splitting a charged sphere in half reduces potential energy to 63% — or results in a loss of 37%, if you prefer. (This assumes the two spheres are infinitely far away from each other, so their interaction adds no additional potential energy.)
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Here's how I'd like to approach this problem. Start by determining the electric potential energy of a 235 92U nucleus using the equation derived in part a.
U = 3(8.99 × 109 N m2/C2)(92 × 1.60 × 10−19 C)2 5(5.8337 ×10−15 m) Convert that into megaelectronvolts by dividing by the elementary charge (to get it into electronvolts) and also by a million (since the prefix mega means a million).
U = 2.00 × 10−10 J (1.60 × 10−19 C)(1,000,000) Then take 37% of that.
∆U =0.370(1252 MeV) = 463 MeV
This is about twice what I expected, but I'll have to figure out the discrepancy some other time.
No condition is permanent.
Source: https://physics.info/electric-potential/practice.shtml
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