In a certain region of space, a uniform electric field is in the x direction. A particle with ...

In a certain region of space, a uniform electric field is in the x direction. A particle with negative charge is carried from x = 20.0 cm to x = 60.0 cm. The electric potential energy of the charge-field system:
   
  1.increases.
  2.remains constant.
  3.decreases.
  4.changes unpredictably.

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[Ques. 2] State the law of reflection, and give an example showing its relevance to this experiment.

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[Ques. 3] Rank the potential energies of the four systems of particles shown in Figure OQ25.5 from largest to smallest. Include equalities if appropriate.
 

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[Ques. 4]

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[Ques. 5] x5BjSNIHnh0AYwA86kMY5IImRsNJ3 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 />
  1.c > a > b = d
  2.b > c = d > a
  3.d > a > c > b
  4.a > b = d > c"

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[Ques. 6] How does the separation of maxima on the screen vary with slit separation?

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[Ques. 7] Distinguish between the terms slit width and slit separation.

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[Ques. 8] The electric potential at x = 3.00 m is 120 V, and the electric potential at x = 5.00 m is 190 V. What is the x component of the electric field in this region, assuming the field is uniform?
  1.140 N/C
  2.-140 N/C
  3.35.0 N/C
  4.-35.0 N/C
  5.75.0 N/C

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[Ques. 9] What conditions must be met for complete destructive interference between two waves?

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[Ques. 10] A helium nucleus (charge = 2e, mass = 6.63  10-27 kg) traveling at 6.20  105 m/s enters an electric field, traveling from point A, at a potential of 1.50  103 V, to point B, at 4.00  103 V. What is its speed at point B?
  1.7.91  105 m/s
  2.3.78  105 m/s
  3.2.13  105 m/s
  4.2.52  106 m/s
  5.3.01  108 m/s