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Question 1 Which of the following statements is true? A charged object is always repelled by a neutral object? A charged object is always attracted to a neutral object? A charged object is sometimes attracted and sometimes repelled by a neutral object? D) A charged object is not affected by a neutral object? B

Yes, this can be done without changing the order of blocks B & C. You have three metal blocks marked A, B, and C, sitting on insulating stands. Block A is charged +, but blocks B and C are neutral. Without using any additional equipment, and without altering the amount of charge on block A, can you make block B be charged + and block C be charged -? Do demo. Ask Tammi for electronic electrometer. Ask students what is in the blue box. Yes, but one must change the ordering of blocks B & C as an intermediate step. Yes, this can be done without changing the order of blocks B & C. No way!

Exercise An object can be both charged and polarized + On a negatively charged metal ball excess charge is spread uniformly all over the surface. What happens if a positive charge is brought near?

When the Field Concept is not Useful Splitting universe into two parts does not always work. +q If q is so small that it does not appreciably alter the charge distribution on the sphere, then we can still use the original field: Otherwise, we must calculate new field: If even the smallest charge affects original charge distribution use small polarizable atom to probe the field

Chapter 16 Electric Field of Distributed Charges

Distributed Charges

Uniformly Charged Thin Rod Length: L Charge: Q What is the pattern of electric field around the rod? Cylindrical symmetry Rod – dielectric, not metal! (Ask: can it be metal?)

Step 1: Divide Distribution into Pieces Apply superposition principle: Divide rod into small sections Dy with charge DQ Assumptions: Rod is so thin that we can ignore its thickness. Ask: Why do we require the rod to be so thin that we can disregard its thickness? If Dy is very small – DQ can be considered as a point charge

Step 2: E due to one Piece What variables should remain in our answer? ⇒ origin location, Q, x, y0 What variables should not remain in our answer? ⇒ rod segment location y, DQ y – integration variable Vector r from the source to the observation location: Remind class that we do not need to know if Q is + or – at this point.

Step 2: E due to one Piece Magnitude of r: Unit vector r: Magnitude of E:

Step 2: E due to one Piece Vector ΔE:

Step 2: E due to one Piece DQ in terms of integration variable y:

Step 2: E due to one Piece Components of DE:

Step 3: Add up Contribution of all Pieces Simplified problem: find electric field at the location <x,0,0> Show students how the y-component integrad, being odd in y, must give zero upon integration.

Step 3: Add up Contribution of all Pieces Integration: taking an infinite number of slices  definite integral dy – infinitesimal increment along y axis

Step 3: Add up Contribution of all Pieces Evaluating integral: Cylindrical symmetry: replace xr

E of Uniformly Charged Thin Rod At center plane In vector form: Check the results:  Direction:  Units:  Special case r>>L:  Compare with numerical calculation: L=1 m, r=0.5 m

Special Case: A Very Long Rod Very long rod: L>>r For a very long (infinite) rod, it does not make sense to keep Q and L separately. Let both Q and L approach infinity while the ratio, Q/L remains constant. Q/L – linear charge density 1/r dependence!

E of Uniformly Charged Rod At distance r from midpoint along a line perpendicular to the rod: For very long rod: Field at the ends: Numerical calculation

E of Uniformly Charged Rod At distance r from midpoint along a line perpendicular to the rod: For very long rod: Field at the ends: Numerical calculation

General Procedure for Calculating Electric Field of Distributed Charges Cut the charge distribution into pieces for which the field is known Write an expression for the electric field due to one piece (i) Choose origin (ii) Write an expression for E and its components Add up the contributions of all the pieces (i) Try to integrate symbolically (ii) If impossible – integrate numerically Check the results: (i) Direction (ii) Units (iii) Special cases

A Uniformly Charged Thin Ring Origin: along the center of the ring Location of piece: described by q, where q = 0 is along the x axis. Step 1: Cut up the charge distribution into small pieces Step 2: Write E due to one piece Can it be metal?

A Uniformly Charged Thin Ring Step 2: Write DE due to one piece

A Uniformly Charged Thin Ring Step 2: Write DE due to one piece Components x and y:

A Uniformly Charged Thin Ring Step 2: Write DE due to one piece Component z:

A Uniformly Charged Thin Ring Step 3: Add up the contributions of all the pieces

A Uniformly Charged Thin Ring Step 4: Check the results  Direction  Units Special cases:  Center of the ring (z=0): Ez=0  Far from the ring (z>>R):

A Uniformly Charged Thin Ring Distance dependence: Far from the ring (z>>R): Ez~1/z2 Close to the ring (z<<R): Ez~z Ask students where in z does the maximum field strength occur? Z = R/sqrt(2).

A Uniformly Charged Thin Ring Electric field at other locations: needs numerical calculation