ch 22: electric force & field; gauss'...
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PHYSICS - CLUTCH
CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
CONCEPT: ELECTRIC CHARGE ● Atoms are made of protons, neutrons and electrons.
● ELECTRIC CHARGE is a property of matter, similar to MASS:
MASS (m) ELECTRIC CHARGE (Q)
- Mass → Gravitational Force - More Mass → More Gravity - Mass → ONLY _____
- Electric Charge → Electric Force - More Charge → More Electric Force - Charge → _____ and _____
● ELEMENTARY charge → (_____________)
- Charge of protons = _______ - Charge of electrons = _______
______ ______ ______ ● Notice these charges are in WHOLE MULTIPLES of e.
→
- MOST materials are NEUTRAL → #Protons _____ #Electrons → Qnet = ____
e
p p
e
p p
p p
e
e
e
p p
e e
e
p, n
e
e
𝐞 = ________________ 𝐂
● The CHARGE of an object is the quantity of _______________ of protons and electrons in it:
𝐐 = (#𝐩𝐫𝐨𝐭 − #𝐞𝐥𝐞𝐜) × 𝐞
e
PHYSICS - CLUTCH
CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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PRACTICE: CHARGE OF ATOM
What is the charge of an atom with 16 protons and 7 electrons?
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CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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EXAMPLE: NUMBER OF ELECTRONS
How many electrons make up −1.5 × 10−5 𝐶?
PHYSICS - CLUTCH
CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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PRACTICE: ADDING ELECTRONS
How many electrons do you have to add to decrease the charge of an object by 16C?
PHYSICS - CLUTCH
CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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CONCEPT: CHARGING OBJECTS ● Electricity: The ___________ of electrons & electric charge.
● Materials come in two types: _________________ and _________________
- Conductors ( ALLOW | DON’T ALLOW ) electrons/charges to move (e.g. metals)
- Insulators ( ALLOW | DON’T ALLOW ) electrons/charges to move (e.g. plastics, rubber)
● Rubbing objects together strips electrons from one and gives to the other
- Fur & plastic rod = rod has ― charge - Fur & glass rod = rod has + charge
● POLARIZATION = separation of charges → NO NET CHARGE
- In CONDUCTORS:
___________ ___________
- In INSULATORS:
___________ ___________
● CONDUCTION = transfer of charges through physical contact → NET CHARGE
● Like charges ( ATTRACT | REPEL ) and unlike charges ( ATTRACT | REPEL ).
PHYSICS - CLUTCH
CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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CONCEPT: CHARGING BY INDUCTION ● INDUCTION charges object WITHOUT touching, CONDUCTION charges object WITH touching.
- Object is left with a NET CHARGE.
Steps for CHARGING BY INDUCTION
1. Connect neutral conductor to ground
- Ground = _____________ and _____________ of charges
- Sources (receive | give), sinks (receive | give)
2. Bring + charged rod near conductor → pulls charges:
[ INTO / FROM ] ground
[ INTO / FROM ] conductor
- If rod was ― charged, the opposite would happen.
3. Cut connection between ground and conductor
→ _____________ escape of charges!
4. Remove charged rod
- Conductor is now __________________
Neutral conductor
PHYSICS - CLUTCH
CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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CONCEPT: CONSERVATION OF CHARGE
- Charge can only be MOVED from one object to another
- This means if one object gains 1 C, the other object loses 1 C
● When conductors are brought together, charges move until they reach _______________. → QA __ QB
EXAMPLE: In the following scenarios, each pair of conducting spheres is brought into contact and allowed to reach
equilibrium. What is the amount of charge transferred, and the direction of transfer, in each of the cases?
EXAMPLE: Two charged, metal balls move around an insulated box, colliding and randomly exchanging charge, but
not necessarily reaching equilibrium. Initially, one ball has a charge of 1C while the other has a charge of 3C. After some
time, you find that one ball has a charge of –2C. What is the charge of the other ball at this time?
BEFORE AFTER
A B C
-1 C 3 C -3 C -5 C 3 C -2 C
● Charge [ CAN | CANNOT ] be created or destroyed → Known as “charge _______________________”
QTotal = _____
QEquil = _____
QTotal = _____
QEquil = _____
QTotal = _____
QEquil = _____
PHYSICS - CLUTCH
CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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CONCEPT: COULOMB’S LAW ● Electric forces can be _________________ or _________________.
- Consequence of UNLIKE (+ - / - +) and LIKE (++ / - -) charges
- Force always points along _______________________________________
- Like charges [ ATTRACT / REPEL ], unlike charges [ ATTRACT / REPEL ]
- PRO-TIP: Always find magnitude of Coulomb force by using + numbers → find direction using attract/repel rules. EXAMPLE: What is the ratio of the electric to the gravitational forces in a hydrogen atom?
EXAMPLE: If two identical charges are connected by a 5 cm wire with a 10 N tension, what is magnitude of the charges?
Hydrogen Atom
G = 6.67×10-11 𝐦𝟑
𝐤𝐠⋅𝐬𝟐
MElectron = 9.11×10-31
MProton = 1.67×10-27
rprot-elec = 5.3×10-11 m
+
-
● COULOMB’S LAW gives the force between charges:
- F = __________ - k = ____________ (Coulomb’s constant)
- Units: ________
q1
q2
r
q1
q2
r
q1 q2
PHYSICS - CLUTCH
CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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PRACTICE: CHANGING DISTANCE If the force between two charges is F when the distance is d, what will the force between the two charges be if they were moved to a distance of 2d? EXAMPLE: CHARGES IN A LINE Where should we put a 1C charge so that the force on it is zero?
x
2 C 3 C
10 cm
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CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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PRACTICE: 3 CHARGES IN A LINE In which direction will the – 1 C charge move? If it has a mass of 10 g, what will its initial acceleration be?
EXAMPLE: CHARGES IN A TRIANGLE Rank all of the possible pairs of charges in the following figure by which pair has the greatest electric force.
x
1 C 2C
10 cm
4 cm
- 1C
e
2e 3e
d
d d
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CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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EXAMPLE: CHARGES IN A PLANE Find the net force on the 3 C charge in the following figure.
EXAMPLE: EXPLOITING SYMMETRY IN ELECTRIC FORCES For each of the following, what is the direction of the net force on the 1 C charge:
x
y
1C
- 2C 3C
8 cm
6 cm
2 C 2 C
1 C
d d
2 C -2 C
1 C
d d
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CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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PRACTICE: DIRECTION OF NET FORCE What is the direction of the net force on the charge at the center of the square in the following figure?
EXAMPLE: ELECTROSCOPE Two identical charges at the end of an electroscope’s leaves each have a mass of 50 g. If the electroscope leaves are deflected by 30o as shown in the figure, what is the charge at the end of each leaf?
-2C
-2C 2C
2C
30o 30
o
50 g 50 g
0.5m 0.5m
2C
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CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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CONCEPT: ELECTRIC FIELD
● A single charge will produce an electric field in all directions that any second charge can feel at some distance r.
EXAMPLE: A 2C and a 3C charge are separated by some distance r such that the electric field at the 2C charge is 10 N/C. What is the force on the 2C charge? PRACTICE: BALANCING GRAVITY
A 1.5C charge, with a mass of 50g, is in the presence of an electric field that perfectly balances its gravity. What magnitude does the electric field need to be, and in what direction does it need to point?
● Charge q feels a force in an ELECTRIC FIELD, E (set up by Q): - F = _______ → Units = _____
Q q
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CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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CONCEPT: ELECTRIC FIELD DUE TO POINT CHARGES ● Positive charges produce fields [ OUTWARD | INWARD ], negative charges produce fields [ OUTWARD | INWARD ].
● A second charge q feels the force F from the Electric Field E → 𝐅 = 𝐪𝐄 = _____________. EXAMPLE: At a distance x from a charge Q, the electric field is 20 N/C. At a distance y, the electric field is 10 N/C. What is the ratio, x/y? Assume x and y lie on the same axis from the electric field source. EXAMPLE: Two charges lie on the x-axis as shown below. At what point on the x-axis is the electric field zero?
x
2C -3C
7 cm
● A single charge Q will produce an ELECTRIC FIELD E of magnitude:
E = __________
- r → distance to point of interest. “What is the E-field at ___?”
PHYSICS - CLUTCH
CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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PRACTICE: ELECTRIC DIPOLE
If two equal charges are separated by some distance, they form an electric dipole. Find the electric field at the center of an electric dipole, given by the point P in the following figure, formed by a 1C and a – 1C charge separated by 1 cm.
EXAMPLE: ELECTRIC FIELD ABOVE 2 CHARGES
What is the electric field at the point above the two charges, indicated as P in the following figure?
x
1C - 1C
1 cm
P
x
1C - 1C
5 cm
P
5 cm
8 cm
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CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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PRACTICE: FIELD AT THE CENTER OF 4 CHARGES
4 charges are arranged as shown in the following figure. Find the electric field at the center of the arrangement, indicated by the point P.
EXAMPLE: PENDULUM IN ELECTRIC FIELD
A pendulum is at equilibrium in a uniform electric field as shown in the following figure. If the electric field magnitude is 100N/C, what is the charge on the end of the pendulum, q?
P
1C
-1C
4C
-3C
E
15O
30g
q
1m
PHYSICS - CLUTCH
CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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PRACTICE: BALANCING MASS IN UNIFORM ELECTRIC FIELD
In the following figure, a mass m with charge q is balanced such that its tether is perfectly horizontal. If the mass is m and the angle of the electric field is 𝜃, what is the magnitude of the electric field, E, expressed in terms of m, q, and Θ?
E
q, m
PHYSICS - CLUTCH
CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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CONCEPT: CAPACITORS
● Two parallel plates of equal and opposite charge produce a ________________ electric field between them.
- UNIFORM = same magnitude everywhere always.
- Electric field points ( FROM | TO ) positive plate ( FROM | TO ) negative plate.
EXAMPLE: The electric field between two parallel plates is 1000 N/C. If the plates have an area of 5 cm2, what is the charge on each plate?
EXAMPLE: A capacitor produces an electric field E when it is formed by two plates that have charges Q and –Q. What happens to the electric field is the charge doubles, but the area of the plates half?
● These are known as CAPACITORS → Things that __________________. - Between plates, 𝐄 = _________ - Outside of plates, 𝐄 = ________
- 𝜖0 is the VACUUM PERMITTIVITY, and 𝜖0 = _________________
- Q is the charge on each plate, A is the area of each plate.
PHYSICS - CLUTCH
CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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PRACTICE: KINEMATICS IN A CAPACITOR
An electron moves into a capacitor at an initial speed of 150 m/s. If the electron enters exactly halfway between the plates, how far will the electron move horizontally before it strikes one of the plates? Which plate will it strike?
E = 100 N/C
150 m/s
h = 5 cm
PHYSICS - CLUTCH
CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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CONCEPT: ELECTRIC FIELD LINES
● Recall that electric field lines point [ FROM | TO ] positive charges and [ FROM | TO ] negative charges.
● Electric Field lines give the direction a positive charge would go:
Positive Charges
F⃗ points ___________ as E⃗⃗
Negative Charges
F⃗ points ___________ as E⃗⃗
EXAMPLE: a) Draw the field lines for an electric dipole. b) In what direction would an electron directly between this electric dipole be accelerated?
�⃗� �⃗�
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CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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PRACTICE: FIELD LINES OF TWO IDENTICAL, POSITIVE CHARGES
Draw the field lines for a pair of identical, positive charges.
PHYSICS - CLUTCH
CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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EXAMPLE: FIELD LINES OF ELECTRIC QUADRUPOLE
Draw the electric field lines for the four charges shown below. This arrangement is known as an electric quadrupole.
+q
-q
+q
-q
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CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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CONCEPT: INTRO TO DIPOLE MOMENTS
● Two equal charges q with opposite signs (+ and -) form an electric dipole.
- Dipole moment is a vector →
- 𝐝 is a vector that points [ FROM | TO ] positive charge [ FROM | TO ] negative charge. EXAMPLE: What is the vector dipole moment of the following dipole?
x
y
-2C
2C 0.5m
1m
�⃗⃗⃗� = 𝐪 𝐝
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CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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CONCEPT: ENERGY AND TORQUE OF DIPOLE MOMENTS
● A dipole in an electric field has potential energy → ● A dipole experiences a torque due to an electric field → EXAMPLE: The dipole depicted in the figure below is in a uniform electric field of 200 N/C. What is the potential energy of
the dipole? What is the magnitude of the torque the dipole experiences?
𝐔 = −�⃗⃗⃗� ⋅ �⃗⃗� = −𝐩𝐄𝐜𝐨𝐬𝛉
�⃗⃗� = �⃗⃗⃗� × �⃗⃗� = 𝐩𝐄𝐬𝐢𝐧𝛉
1C
-1C
1 cm
E
30o
PHYSICS - CLUTCH
CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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CONCEPT: CONDUCTORS AND ELECTRIC FIELDS
● Electrons are [ ALLOWED | NOT ALLOWED ] to move within conductors.
- Electrons want to get as far apart as possible.
→
● CHARGE ARRANGEMENT in conductors: Net CHARGED Without External Electric Field UNCHARGED In External Electric Field
→ Net charges ALWAYS move to and distribute on the __________________ of conductors.
● Outside a conducting CHARGED sphere with charge Q, the electric field is: 𝐄 = ________ EXAMPLE: A spherical conductor with a radius of 0.5m has a net charge of 2.0µC. What is the electric field a) 0.8m from the center of the conductor b) 0.4 m from the center of the conductor?
Net Electric field INSIDE conductor = ______
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CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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CONCEPT: ELECTRIC FLUX
[ ALL | NONE | SOME ] [ ALL | NONE | SOME ] [ ALL | NONE | SOME ] ● ELECTRIC FLUX depends upon the ANGLE of the surface
- Normal → ___________________ to the surface
- → between the Electric Field and the ____________ of the surface
→
● The TOTAL FLUX through a closed surface is the ________ of fluxes through each individual surface.
- Positive fluxes: when E⃗⃗ and the normal point in the [ SAME | OPPOSITE ] direction.
- Negative fluxes: when E⃗⃗ and the normal point in the [ SAME | OPPOSITE ] direction.
EXAMPLE: The electric flux through each surface of a cube is given below. What is the total flux through the cube?
𝛷1 = 100 𝑁𝑚2/𝐶 𝛷2 = 20 𝑁𝑚2/𝐶
𝛷3 = 0 𝑁𝑚2/𝐶 𝛷4 = 0 𝑁𝑚2/𝐶
𝛷5 = −40 𝑁𝑚2/𝐶 𝛷6 = −80 𝑁𝑚2/𝐶
𝚽𝐄 = ____________ - Units: 𝐍⋅𝐦𝟐
𝐂
● Flux is a measure of HOW MUCH of a field passes through a surface.
- ELECTRIC FLUX is how much of the ELECTRIC FIELD passes through a surface.
�⃗� θ
A
Normal
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CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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PRACTICE: TOTAL ELECTRIC FLUX
The electric flux through each surface of a cube is given below. Which surfaces of the cube does the electric field run parallel to? 𝛷1 = 100 𝑁𝑚2/𝐶 𝛷2 = 20 𝑁𝑚2/𝐶
𝛷3 = 0 𝑁𝑚2/𝐶 𝛷4 = 0 𝑁𝑚2/𝐶
𝛷5 = −40 𝑁𝑚2/𝐶 𝛷6 = −80 𝑁𝑚2/𝐶
EXAMPLE: FLUX THROUGH ANGLED SURFACE
What is the magnitude of the electric flux through the surface depicted below?
EXAMPLE: FLUX THROUGH CUBE
A cube of side length 2 cm is placed in an electric field of magnitude 100 N/C as shown below. What is the electric flux through each side of the cube?
30o
E
A = 1m2
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CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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PRACTICE: NORMAL OF A SPHERICAL SHELL
Where does the normal vector point for a spherical shell?
EXAMPLE: FLUX THROUGH SPHERICAL SHELL BY POINT CHARGE
What is the electric flux through a spherical shell of radius R due to a point charge, q, at the center?
PRACTICE: FLUX THROUGH TWO SURFACES
What is the total flux through the two surfaces depicted in the following figure? Note that surface 1 has an area of 50 cm2
and surface 2 has an area of 100 cm2, and E = 500 N/C.
q R
Surface 1
Surface 2
E
40o
PHYSICS - CLUTCH
CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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CONCEPT: GAUSS’ LAW
● Use Gauss’ Law when:
1) Given Total Flux (𝚽𝐍𝐄𝐓) and asked for charge (Q or q)
2) Given net charge (Q) and asked for total flux or flux across 1 surface (𝚽𝐄)
3) Given charge in a conductor or insulator and asked for Electric Field (�⃗� ) in a particular region
● When solving for Electric Field, choose a “Gaussian surface” with symmetry → where �⃗� will be _____________. EXAMPLE: What is the flux through the surface A?
EXAMPLE: The flux through the four surfaces of a pyramid are given below. What is the net charge within the pyramid?
𝛷1 = 10 𝑁𝑚2/𝐶 𝛷2 = 20 𝑁𝑚2/𝐶
𝛷3 = 8 𝑁𝑚2/𝐶 𝛷4 = −15 𝑁𝑚2/𝐶
EXAMPLE: Using Gauss’ Law, find the electric field due to a point charge q at some distance r. →
- 4C
5C
A
𝒌 = ______________
● GAUSS’ LAW = the total flux through a closed surface depends ONLY on the charge enclosed within that surface.
→ 𝚽𝐍𝐄𝐓 =
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CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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EXAMPLE: ELECTRIC FIELD WITHIN SPHERICAL CONDUCTOR
Using Gauss’s law, find the electric field inside a spherical conductor with some charge -Q. PRACTICE: FLUX THROUGH MULTIPLE SURFACES
Rank the flux through surfaces A, B and C in the figure below from greatest to smallest.
3e -e
e
A
B
C
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CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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EXAMPLE: ELECTRIC FIELD DUE TO A HOLLOW SHELL
What is the electric field in the following three regions due to the conducting spherical shell:
a) r < a
b) a < r < b
c) r > b
EXAMPLE: SURFACE CHARGE DENSITIES
What is the surface charge density on the inner and outer surface of the hollow shell in the following figure?
q
a
b
3 C
3 cm
5 cm
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CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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PRACTICE: ELECTRIC FIELD DUE TO A SHELL
A spherical, thin conducting shell of radius 8cm has a charge of –6C. If a 4C charge were placed at the center of the shell,
what is the electric field 4 cm from the center? At 12 cm?
4C
8 cm
- 6C
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CH 22: ELECTRIC FORCE & FIELD; GAUSS' LAW
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