Estimate the net force between the CO group and the HN group shown in Fig. 16–63. The C

1. (I) Calculate the magnitude of the force between two 3.60-/xC point charges 9.3 cm apart.

2. (I) How many electrons make up a charge of -30.0/xC?

3. (I) What is the magnitude of the electric force of attraction between an iron nucleus (q = + 26e) and its innermost electron if the distance between them is 1.5 X 10",2m?

4. (I) What is the repulsive electrical force between two protons 5.0 x 10-,5m apart from each other in an atomic nucleus?

5. (I) What is the magnitude of the force a +25 ^C charge exerts on a +3.0 mC charge 35 cm away?

6. (II) Two charged dust particles exert a force of 3.2 x 10 1N on each other. What will be the force if they are moved so they are only one-eighth as far apart?

7. (II) Two charged spheres are 8.45 cm apart.They are moved, and the force on each of them is found to have been tripled. How far apart are they now?

8. (II) A person scuffing her feet on a wool rug on a dry day accumulates a net charge of -42 nC. How many excess electrons does she get. and by how much does her mass increase?

9. (II) What is the total charge of all the electrons in 1.0kg of H20?

10. (II) Compare the electric force holding the electron in orbit (r = 0.53 x 10_,om) around the proton nucleus of the hydrogen atom, with the gravitational force between the same electron and proton. What is the ratio of these two forces?

11. (II) Two positive point charges are a fixed distance apart. The sum of their charges is QT. What charge must each have in order to (a) maximize the electric force between them, and (b) minimize it?

12. (II) Particles of charge +75. +48. and -85 /xC are placed in a line (Fig. 1649). The center one is 0.35 m from each of the others. Calculate the net force on each charge due to the other two.

13. (II) Three positive particles of equal charge. + 11.0/xC. are located at the corners of an equilateral triangle of side 15.0 cm (Fig. 16-50). Calculate the magnitude and direction of the net force on each particle.

14. (II) A charge of 6.00 mC is placed at each corner of a square 0.100 m on a side. Determine the magnitude and direction of the force on each charge.

15. (II) Repeat Problem 14 for the case when two of the positive charges, on opposite corners, are replaced by negative charges of the same magnitude (Fig. 16-51).

16. (II) At each corner of a square of side / there are point charges of magnitude Q. 2Q. 3Q. and 4Q (Fig. 16-52). Determine the force on (a) the charge 20. and (/>) the charge 3Q. due to the other three charges.

17. (II) Three charged particles are placed at the comers of an equilateral triangle of side 1.20 m (Fig. 16-53). The charges are +4.0 juG. -8.0/xC, and -6.0/xC. Calculate the magnitude and direction of the net force on each due to the other two.

18. (Ill) Two point charges have a total charge of 560 /xC. When placed 1.10 m apart, the force each exerts on the other is 22.8 N and is repulsive. What is the charge on each?

19. (Ill) Two charges. -Q, and -3Qq, are a distance / apart. Ibese two charges are free to move but do not because there is a third charge nearby. What must be the charge and placement of the third charge for the first two to be in equilibrium?

20. (Ill) A +4.75 /xC and a -3.55 /xC charge are placed 18.5 cm apart. Where can a third charge be placed so that it experiences no net force?

21. (Ill) Two small nonconducting spheres have a total charge of 90.0 /xC. (<?) When placed 1.06 m apart, the force each exerts on the other is 12.0 N and is repulsive. What is the charge on each? (/>) What if the force were attractive?

22. (Ill) A charge Q is transferred from an initially uncharged plastic ball to an identical ball 12 cm away. The force of attraction is then 17 mN. How many electrons were transferred from one ball to the other?

23. (I) What are the magnitude and direction of the electric force on an electron in a uniform electric field of strength 2360 N/C that points due east?

24. (I) A proton is released in a uniform electric field, and it experiences an electric force of 3.75 x 10M N toward the south. What are the magnitude and direction of the electric field?

25. (I) A downward force of 8.4 N is exerted on a -8.8/^C charge. What arc the magnitude and direction of the electric field at this point?

26. (I) What are the magnitude and direction of the electric field 20.0 cm directly above an isolated 33.0 x 10_6C charge?

(II) What is the magnitude of the acceleration experienced by an electron in an electric field of 750 N/C? How does the direction of the acceleration depend on the direction of the field at that point?

(II) What are the magnitude and direction of the electric field at a point midway between a -8.0/tC and a +7.0/xC charge 8.0 cm apart? Assume no other charges are nearby.

(II) Draw, approximately, the electric field lines about two point charges. + Q and -3Q. which arc a distance / apart.

(II) What is the electric field strength at a point in space where a proton (m = 1.67 x 10-27kg) experiences an acceleration of 1 million gs?

(II) An electron is released from rest in a uniform electric field and accelerates to the north at a rate of 115 m/s2. What arc the magnitude and direction of the electric field?

(II) The electric field midway between two equal but opposite point charges is 745 N/C, and the distance between the charges is 16.0 cm. What is the magnitude of the charge on each?

(II) Calculate the electric field at the center of a square 52.5 cm on a side if one corner is occupied by a +45.0 /xC charge and the other three are occupied by -27.0/tC charges.

(II) Calculate the electric field at one corner of a square 1.00 m on a side if the other three comers are occupied by 2.25 x 10_6C charges.

(II) Determine the direction and magnitude of the electric field at the point P in Fig. 16-54. The charges are separated by a distance 2a. and point P is a distance .v from the midpoint between the two charges. Express your answer in terms of Q, x, a. and k.

(II) Two point charges, Q\ = -25 ixC and Q2 = + 50juC, are separated by a distance of I2cm. The electric field at the point P (see Fig. 16-55) is zero. How far from (>i is P?

(II) (a) Determine the electric field E at the origin 0 in Fig. 16-56 due to the two charges at A and B. (b) Repeat, but let the charge at B be reversed in sign.

38. (II) Use Coulombs law to determine the magnitude and direction of the electric field at points A and B in Fig. 16-57 due to the two positive charges (Q = 7.0 nC) shown. Are your results consistent with Fig. 1631 b?

39. (II) You are given two unknown point charges, (7| and Q2 At a point on the line joining them, one- third of the way from 0\ to Q2. the electric field is zero (Fig. 16-58). What is the ratio Q\iQ-p-

40. (Ill) Determine the direction and magnitude of the electric field at the point P shown in Fig. 16-59. The two charges are separated by a distance of 2a. Point P is on the perpendicular bisector of the line joining the charges, a distance .v from the midpoint between them. Express your answers in terms of Q, x, <7. and k.

41. (Ill) An electron (mass m = 9.11 ated in the uniform field E x 10 31 kg) is acceler-(E = 1.45 x 104 N/C)

42. (Ill) An electron moving to the right at 1.0% the speed of light enters a uniform electric field parallel to its direction of motion. If the electron is to be brought to rest in the space of 4.0 cm. (a) what direction is required for the electric field, and (b) what is the strength of the field?

43. (I) The total electric flux from a cubical box 28.0 cm on a side is 1.45 x 103N-m2/C. What charge is enclosed by the box?

44. (II) A flat circle of radius 18cm is placed in a uniform electric field of magnitude 5.8 x 102N/C. What is the electric flux through the circle when its face is (a) perpendicular to the field lines, (b) at 45 to the field lines, and (c) parallel to the field lines?

45. (II) In Fig. 16-61, two objects. Oi and 02, have charges + 1.0/xC and -2.0 /xC. respectively, and a third object. O3, is electrically neutral, (a) What is the electric flux through the surface that encloses all three objects? (b) What is the electric flux through the surface A2 that encloses the third object only?

*46. (II) A cube of side / is placed in a uniform field E = 6.50 X 103N/C with edges parallel to the field lines. (a) What is the net flux through the cube? (b) What is the flux through each of its six faces?

* 47. (II) The electric field between two square metal plates is 130 N/C. The plates are 1.0 m on a side and are separated by 3.0 cm. What is the charge on each plate (assume equal and opposite)? Neglect edge effects.

*48. (II) The field just outside a 3.50-cm-radius metal ball is 2.75 x 102N/C and points toward the ball. What charge resides on the ball?

*49. (II) A solid metal sphere of radius 3.00 m carries a total charge of -3.50/xC. What is the magnitude of the electric field at a distance from the spheres center of (a) 0.15 m, (b) 2.90 m. (c) 3.10 m, and (d) 6.00 m? (e) How would the answers differ if the sphere were a thin shell?

* 50. (Ill) A point charge Q rests at the center of an uncharged thin spherical conducting shell. (See Fig. 16-33.) What is the electric field E as a function of r (a) for r less than the inner radius of the shell, (b) inside the shell, and (c) beyond the shell? (d) Does the shell affect the field due to Q alone? Docs the charge Q affect the shell?

*51. (Ill) Hie two strands of the helix-shaped DNA molecule are held together by electrostatic forces as shown in Fig. 16-44. Assume that the net average charge (due to electron sharing) indicated on H and N atoms is 0.2e and on the indicated C and O atoms is OAc. Assume also that atoms on each molecule are separated by 1.0 X 10_H,m. Estimate the net force between (a) a thymine and an adenine; and (b) a cytosine and a guanine. For each bond (red dots) consider only the three atoms in a line (two atoms on one molecule, one atom on the other), (c) Estimate the total force for a DNA molecule containing 105 pairs of such molecules.

52. How close must two electrons be if the electric force between them is equal to the weight of either at the Earth's surface?

53. A 3.0-g copper penny has a positive charge of 38 fiC. What fraction of its electrons has it lost?

54. A proton (m = 1.67 X 10-27kg) is suspended at rest in a uniform electric field E. Take into account gravity at the Earth's surface, and determine E.

55. Measurements indicate that there is an electric field surrounding the Earth. Its magnitude is about 150 N/C at the Earths surface and points inward toward the Earths center. What is the magnitude of the electric charge on the Earth? Is it positive or negative? [Hint: the electric field outside a uniformly charged sphere is the same as if all the charge were concentrated at its center.]

56. (a) Given the local electric field of 150 N/C. what is the acceleration experienced by an electron near the surface of the Earth? (b) What about a proton? (c) Calculate the ratio of each acceleration to g = 9.8 m/s2.

57. A water droplet of radius 0.018 mm remains stationary in the air. If the downward-directed electric field of the Earth is 150 N/C. how many excess electron charges must the water droplet have?

58. Estimate the net force between the CO group and the HN group shown in Eig. 16-62. Hie C and O have charges 0.40e. and the H and N have charges 0.20e. where e = 1.6 x 10-,9C. [Hint: do not include the internal forces between C and O. or between H and N.]

59. In a simple model of the hydrogen atom, the electron revolves in a circular orbit around the proton with a speed of 1.1 X It/m/s. Determine the radius of the electrons orbit. [Hint, see Chapter 5 on circular motion.]

60. Suppose that electrical attraction, rather than gravity, were responsible for holding the Moon in orbit around the Earth. If equal and opposite charges Q were placed on the Earth and the Moon, what should be the value of Q to maintain the present orbit? Use these data: mass of Earth = 5.98 x 1024kg. mass of Moon = 7.35 X lO22 kg. radius of orbit = 3.84 x 10s m. Treat the Earth and Moon as point particles.

61. An electron with speed v() = 21.5 x 106 m/s is traveling parallel to an electric field of magnitude E = 11.4 X 103N/C. (a) How far will the electron travel before it stops? (b) How much time will elapse before it returns to its starting point?

62. A positive point charge <2i = 2.5 X 10_5C is fixed at the origin of coordinates, and a negative charge Qi = -5.0 X 10-6 C is fixed to the .v axis at x = +2.0 m. Find the location of the place(s) along the x axis where the electric field due to these two charges is zero.

63. A small lead sphere is encased in insulating plastic and suspended vertically from an ideal spring (k = 126 N/m) above a lab table. Eig. 16-63. The total mass of the coated sphere is 0.800 kg. and its center lies 15.0 cm above the tabletop when in equilibrium. The sphere is pulled down 5.00 cm below equilibrium, an electric charge Q = -3.00 X 10-6C is deposited on it and then it is released. Using what you know about harmonic oscillation, write an expression for the electric field strength as a function of time that would be measured at the point on the tabletop (?) directly below the sphere.

64. A large electroscope is made with leaves" that are 78-cm-long wires with tiny 24-g spheres at the ends. When charged, nearly all the charge resides on the spheres. If the wires each make a 30 angle with the vertical (Fig. 16-64), what total charge Q must have been applied to the electroscope? Ignore the mass of the wires.

65. Dry air will break down and generate a spark if the electric field exceeds about 3 x 106N/C. How much charge could lie packed onto a green pea (diameter 0.75 cm) before the pea spontaneously discharges? [Hint: Eqs. 16-4 work outside a sphere if r is measured from its center.]

66. Two point charges, Q\ = -6.7 fiC and Q2 = l.8/*C arc located between two oppositely charged parallel plates, as shown in Fig. 16-65. The two charges are separated by a distance of x = 0.34 m. Assume that the electric field produced by the charged plates is uniform and equal to E = 73,000 N/C. Calculate the net electrostatic force on (7[ and give its direction.

67. A point charge (m = 1.0 g) at the end of an insulating string of length 55 cm is observed to be in equilibrium in a uniform horizontal electric field of 12.000 N/C, when the pendulum's position is as shown in Fig. 16-66. with the charge 12 cm above the lowest (vertical) position. If the field points to the right in Fig. 16-66, determine the magnitude and sign of the point charge.

68. A point charge of mass 0.210 kg. and net charge +0.340/zC. hangs at rest at the end of an insulating string above a large sheet of charge. The horizontal sheet of uniform charge creates a uniform vertical electric field in the vicinity of the point charge.The tension in the string is measured to be 5.67 N. Calculate the magnitude and direction of the electric field due to the sheet of charge (Fig. 16-67).

69. What is the total charge of all the electrons in a 15-kg bar of aluminum? What is the net charge of the bar? (Aluminum has 13 electrons per atom and an atomic mass of 27 u.)

70. Two small, identical conducting spheres A and B are a distance R apart: each carries the same charge O. (a) What is the force sphere B exerts on sphere A? (/>) An identical sphere with zero charge, sphere C, makes contact with sphere B and is then moved very far away. What is the net force now acting on sphere A? (c) Sphere C next makes contact with sphere A and is then moved far away. What is the force on sphere A in this third case?

71. Given the two charges shown in Fig. 16-68, at what position^) x is the electric field zero? Is the field zero at any other points, not on the x axis?

72. Two point charges. + Q and -Q of mass m. are placed on the ends of a massless rod of length L, which is fixed to a table by a pin through its center. If the apparatus is then subjected to a uniform electric field E parallel to the table and perpendicular to the rod. find the net torque on the system of rod plus charges.

73. Four equal positive point charges, each of charge 8.0/xC, are at the corners of a square of side 9.2 cm. What charge should be placed at the center of the square so that all charges are at equilibrium? Is this a stable or unstable equilibrium (Section 9-4) in the plane?

Problem 14P [1 mC = 10–3 C, 1 ?C = 10–6 C, 1 nC = 10–9 C.] A charge of 6.00 mC is placed at each corner of a square 0.100 m on a side. Determine the magnitude and direction of the force on each charge.

Problem 14Q When determining an electric field, must we use a positive test charge, or would a negative one do as well? Explain.

(II) Repeat Problem 14 for the case when two of the positive charges, on opposite corners, are replaced by negative charges of the same magnitude (Fig. 16-51).

Problem 33P Calculate the electric field at the center of a square 52.5 cm on a side if one corner is occupied by a +45.0 ?C charge and the other three are occupied by –27.0 ?C charges.

Problem 34P Calculate the electric field at one corner of a square 1.00 m on a side if the other three corners are occupied by 2.25 × 10–6 C charges.

(II) Determine the direction and magnitude of the electric field at the point P in Fig. 16–54. The charges are separated by a distance 2, and point P is a distance x from the midpoint between the two charges. Express your answer in terms of Q, x, a, and k.

A small lead sphere is encased in insulating plastic and suspended vertically from an ideal spring (k = 126N/m) above a lab table, Figure 16–63. The total mass of the coated sphere is 0.800 kg, and its center lies 15.0 cm above the tabletop when in equilibrium. The sphere is pulled down 5.00 cm below equilibrium, an electric charge Q = –3.00 X 10-6 C is deposited on it and then it is released. Using what you know about harmonic oscillation write an expression for the electric field strength as a function of time that would be measured at the point on the tabletop (P) directly below the sphere.

Problem 64GP A large electroscope is made with “leaves” that are 78-cm-long wires with tiny 24-g spheres at the ends. When charged, nearly all the charge resides on the spheres. If the wires each make a 30° angle with the vertical (Figure 16–64), what total charge Q must have been applied to the electroscope? Ignore the mass of the wires. Figure 16–64

Problem 65GP Dry air will break down and generate a spark if the electric field exceeds about 3*106 N/C. How much charge could be packed onto a green pea (diameter 0.75 cm) before the pea spontaneously discharges? [Hint: Eqs. 16–4 work outside a sphere if r is measured from its center.]

Problem 1P [1 mC = 10–3 C, 1 ?C = 10–6 C, 1 nC = 10–9 C.] Calculate the magnitude of the force between two 3.60-?C point charges 9.3 cm apart.

Problem 1Q If you charge a pocket comb by rubbing it with a silk scarf, how can you determine if the comb is positively or negatively charged?

Problem 15Q Draw the electric field lines surrounding two negative electric charges a distance apart.

(II) At each corner of a square of side l there are point charges of magnitude Q, 2Q, 3Q, and 4Q (Fig. 16–52). Determine the force on (a) the charge 2Q, and (b) the charge 3Q, due to the other three charges.

Assume that the two opposite charges in Fig. 16–31a are 12.0 cm apart. Consider the magnitude of the electric field 2.5 cm from the positive charge. On which side of this charge—top, bottom, left, or right—is the electric field the strongest? The weakest? Explain.

(II) Two point charges, and , are separated by a distance of The electric field at the point P (see Fig. 16-55) is zero. How far from is ?

Problem 37P (a) Determine the electric field at the origin 0 in Figure 16–56 due to the two charges at A and B. (b) Repeat, but let the charge at B be reversed in sign. Figure 16–56

Problem 38P Use Coulomb’s law to determine the magnitude and direction of the electric field at points A and B in Figure 16–57 due to the two positive charges (Q = 7.0 ?C) shown. Are your results consistent with Figure 16–31 b? Figure 16–57 Figure 16–31 Electric field lines for four arrangements of charges. (a) (b) ________________ (c) ________________ (d)

Two point charges, Q1 = –6.7 ?C and Q2 = 1.8 ?C are located between two oppositely charged parallel plates as shown in Figure 16–65. The two charges are separated by a distance of x = 0.34 m. Assume that the electric field produced by the charged plates is uniform and equal to E = 73,000 N/C. Calculate the net electrostatic force on Q1 and give its direction.

Problem 67GP A point charge (m = 1.0 g) at the end of an insulating string of length 55 cm is observed to be in equilibrium in a uniform horizontal electric field of 12,000 N/C, when the pendulum’s position is as shown in Fig. 16–66, with the charge 12 cm above the lowest (vertical) position. If the field points to the right in Fig. 16–66, determine the magnitude and sign of the point charge. Figure 16–66

Problem 68GP A point charge of mass 0.210 kg, and net charge +0.340 ?C, hangs at rest at the end of an insulating string above a large sheet of charge. The horizontal sheet of uniform charge creates a uniform vertical electric field in the vicinity of the point charge. The tension in the string is measured to be 5.67 N. Calculate the magnitude and direction of the electric field due to the sheet of charge (Figure 16–67). Figure 16–67

Problem 2P [1 mC = 10–3 C, 1 ?C = 10–6 C, 1 nC = 10–9 C.] How many electrons make up a charge of –30.0 ?C?

Problem 2Q Why does a shirt or blouse taken from a clothes dryer sometimes cling to your body?

Problem 3P (I) What is the magnitude of the electric force of attraction between an iron nucleus ( q = +26e) and its innermost electron if the distance between them is 1.5 X 10-12 m?

(II) Three charged particles are placed at the corners of an equilateral triangle of side (Fig. 16-53). The charges are , and . Calculate the magnitude and direction of the net force on each due to the other two.

Consider the electric field at points , and in Fig. 16-48. First draw an arrow at each point indicating the direction of the net force that a positive test charge would experience if placed at that point, then list the points in order of decreasing field strength (strongest first).

Problem 18P [1 mC = 10–3 C, 1 ?C = 10–6 C, 1 nC = 10–9 C.] Two point charges have a total charge of 560 ?C. When placed 1.10 m apart, the force each exerts on the other is 22.8 N and is repulsive. What is the charge on each?

(II) You are given two unknown point charges, and At a point on the line joining them, one-third of the way from to , the electric field is zero (Fig. 16-58). What is the ratio ?

(III) Determine the direction and magnitude of the electric field at the point P shown in Fig. 16 - 59. The two charges are separated by a distance of 2a. Point \(P^{-}\) is on the perpendicular bisector of the line joining the charges, a distance from the midpoint between them. Express your answers in terms of Q, x, a, and k. Equation Transcription: Text Transcription: P^-

(III) An electron (mass ) is accelerated in the uniform field between two parallel charged plates. The separation of the plates is . The electron is accelerated from rest near the negative plate and passes through a tiny hole in the positive plate, Fig. 16-60. (a) With what speed does it leave the hole? (b) Show that the gravitational force can be ignored.

Problem 69GP What is the total charge of all the electrons in a 15-kg bar of aluminum? What is the net charge of the bar? (Aluminum has 13 electrons per atom and an atomic mass of 27 u.)

Problem 70GP Two small, identical conducting spheres A and B are a distance R apart; each carries the same charge Q. (a) What is the force sphere B exerts on sphere A? (b) An identical sphere with zero charge, sphere C, makes contact with sphere B and is then moved very far away. What is the net force now acting on sphere A? (c) Sphere C next makes contact with sphere A and is then moved far away. What is the force on sphere A in this third case?

Given the two charges shown in Fig. , at what position(s) is the electric field zero? Is the field zero at any other points, not on the axis?

Problem 3Q Explain why fog or rain droplets tend to form around ions or electrons in the air.

Problem 4P [1 mC = 10–3 C, 1 ?C = 10–6 C, 1 nC = 10–9 C.] What is the repulsive electrical force between two protons 5.0 × 10–15 m apart from each other in an atomic nucleus?

Problem 18Q Why can electric field lines never cross?

Problem 19P [1 mC = 10–3 C, 1 ?C = 10–6 C, 1 nC = 10–9 C.] Two charges, –Q0 and –3Q0, are a distance l apart. These two charges are free to move but do not because there is a third charge nearby. What must be the charge and placement of the third charge for the first two to be in equilibrium?

Problem 4Q A positively charged rod is brought close to a neutral piece of paper, which it attracts. Draw a diagram showing the separation of charge in the paper, and explain why attraction occurs.

Problem 19Q Show, using the three rules for field lines given in Section 16–8, that the electric field lines starting or ending on a single point charge must be symmetrically spaced around the charge.

Problem 42P An electron moving to the right at 1.0% the speed of light enters a uniform electric field parallel to its direction of motion. If the electron is to be brought to rest in the space of 4.0 cm, (a) what direction is required for the electric field, and (b) what is the strength of the field?

Problem 43P The total electric flux from a cubical box 28.0 cm on a side is 1.45 × 103N·m2/C. What charge is enclosed by the box?

Problem 44P A flat circle of radius 18 cm is placed in a uniform electric field of magnitude 5.8 × 102 N/C. What is the electric flux through the circle when its face is (a) perpendicular to the field lines, (b) at 45° to the field lines, and (c) parallel to the field lines?

Problem 72GP Two point charges, +Q and -Q of mass m, are placed on the ends of a massless rod of length l, which is fixed to a table by a pin through its center. If the apparatus is then subjected to a uniform electric field E parallel to the table and perpendicular to the rod, find the net torque on the system of rod plus charges.

Problem 73GP Four equal positive point charges, each of charge 8.0 ?C, are at the corners of a square of side 9.2 cm. What charge should be placed at the center of the square so that all charges are at equilibrium? Is this a stable or unstable equilibrium (Section 9–4) in the plane?

Problem 5P [1 mC = 10–3 C, 1 ?C = 10–6 C, 1 nC = 10–9 C.] What is the magnitude of the force a +25 ?C charge exerts on a +3.0 mC charge 35 cm away?

Problem 5Q Why does a plastic ruler that has been rubbed with a cloth have the ability to pick up small pieces of paper? Why is this difficult to do on a humid day?

Problem 6P [1 mC = 10–3 C, 1 ?C = 10–6 C, 1 nC = 10–9 C.] Two charged dust particles exert a force of 3.2 × 10–2 N on each other. What will be the force if they are moved so they are only one-eighth as far apart?

Problem 20P [1 mC = 10–3 C, 1 ?C = 10–6 C, 1 nC = 10–9 C.] A +4.75 ?C and a –3.55 ?C charge are placed 18.5 cm apart. Where can a third charge be placed so that it experiences no net force?

Problem 20Q Given two point charges, Q and 2Q, a distance l apart, is there a point along the straight line that passes through them where E = 0 when their signs are (a) opposite, (b) the same? If yes, state roughly where this point will be.

Problem 21P [1 mC = 10–3 C, 1 ?C = 10–6 C, 1 nC = 10–9 C.] Two small nonconducting spheres have a total charge of 90.0 ?C. (a) When placed 1.06 m apart, the force each exerts on the other is 12.0 N and is repulsive. What is the charge on each? (b) What if the force were attractive?

(II) In Fig. , two objects, and , have charges and , respectively, and a third object, , is electrically neutral. (a) What is the electric flux through the surface that encloses all three objects? (b) What is the electric flux through the surface that encloses the third object only?

Problem 46P (II) A cube of side 8.50 cm is placed in a uniform field E =7.50 X 103 N/C with edges parallel to the field lines. (a) What is the net flux through the cube? (b) What is the flux through each of its six faces?

Problem 47P The electric field between two square metal plates is 130 N/C. The plates are 1.0 m on a side and are separated by 3.0 cm. What is the charge on each plate (assume equal and opposite)? Neglect edge effects.

Problem 6Q Contrast the net charge on a conductor to the “free charges” in the conductor.

Problem 7P [1 mC = 10–3 C, 1 ?C = 10–6 C, 1 nC = 10–9 C.] Two charged spheres are 8.45 cm apart. They are moved, and the force on each of them is found to have been tripled. How far apart are they now?

Problem 7Q Figures 16–7 and 16–8 show how a charged rod placed near an uncharged metal object can attract (or repel) electrons. There are a great many electrons in the metal, yet only some of them move as shown. Why not all of them?

Consider a small positive test charge located on an electric field line at some point, such as point P in Fig. 16–31a. Is the direction of the velocity and/or acceleration of the test charge along this line? Discuss.

Problem 22P [1 mC = 10–3 C, 1 ?C = 10–6 C, 1 nC = 10–9 C.] A charge Q is transferred from an initially uncharged plastic ball to an identical ball 12 cm away. The force of attraction is then 17 mN. How many electrons were transferred from one ball to the other?

Problem 22Q Sketch the electric field lines for a uniform line of charge which is infinitely long. (Hint: Use symmetry.) Is the electric field uniform in strength?

Problem 48P The field just outside a 3.50-cm-radius metal ball is 2.75 × 102 N/C and points toward the ball. What charge resides on the ball?

Problem 49P A solid metal sphere of radius 3.00 m carries a total charge of –3.50 ?C. What is the magnitude of the electric field at a distance from the sphere’s center of (a) 0.15 m, (b) 2.90 m, (c) 3.10 m, and (d) 6.00 m? (e) How would the answers differ if the sphere were a thin shell?

Problem 50P (III) A point charge Q rests at the center of an uncharged thin spherical conducting shell. (See Fig. 16–34.) What is the electric field E as a function of r (a) for r less than the inner radius of the shell, (b) inside the shell, and (c) beyond the shell? (d) How does the shell affect the field due to Q alone? How does the charge Q affect the shell?

Problem 8P [1 mC = 10–3 C, 1 ?C = 10–6 C, 1 nC = 10–9 C.] A person scuffing her feet on a wool rug on a dry day accumulates a net charge of –42 ?C. How many excess electrons does she get, and by how much does her mass increase?

Problem 8Q When an electroscope is charged, its two leaves repel each other and remain at an angle. What balances the electric force of repulsion so that the leaves don’t separate further?

Problem 9P [1 mC = 10–3 C, 1 ?C = 10–6 C, 1 nC = 10–9 C.] What is the total charge of all the electrons in 1.0 kg of H2O?

Problem 23P What are the magnitude and direction of the electric force on an electron in a uniform electric field of strength 2360 N/C that points due east?

If the electric flux through a closed surface is zero, is the electric field necessarily zero at all points on the surface? Explain. What about the converse: If at all points on the surface is the flux through the surface zero?

Problem 24P A proton is released in a uniform electric field, and it experiences an electric force of 3.75 × 10–14 N toward the south. What are the magnitude and direction of the electric field?

The two strands of the helix-shaped DNA molecule are held together by electrostatic forces as shown in Figure 16–44. Assume that the net average charge (due to electron sharing) indicated on H and N atoms is 0.2e and on the indicated C and O atoms is 0.4e. Assume also that atoms on each molecule are separated by 1.0 × 10–10 m. Estimate the net force between (a) a thymine and an adenine; and (b) a cytosine and a guanine. For each bond (red dots) consider only the three atoms in a line (two atoms on one molecule, one atom on the other), (c) Estimate the total force for a DNA molecule containing 105 pairs of such molecules.

Problem 52GP How close must two electrons be if the magnitude of the electric force between them is equal to the weight of either at the Earth’s surface?

Problem 53GP A 3.0-g copper Penny has a positive charge of 38 ?C. What traction of its electrons has it lost?

Problem 9Q The form of Coulomb’s law is very similar to that for Newton’s law of universal gravitation. What are the differences between these two laws? Compare also gravitational mass and electric charge.

Problem 10P (II) Compare the electric force holding the electron in orbit (r =0.53 X 10-10 m) around the proton nucleus of the hydrogen atom, with the gravitational force between the same electron and proton. What is the ratio of these two forces?

Problem 10Q We are not normally aware of the gravitational or electric force between two ordinary objects. What is the reason in each case? Give an example where we are aware of each one and why.

Problem 24Q A point charge is surrounded by a spherical gaussian surface of radius r. If the sphere is replaced by a cube of side r, will ?E be larger, smaller, or the same? Explain.

Problem 25P A downward force of 8.4 N is exerted on a –8.8 ?C charge. What are the magnitude and direction of the electric field at this point?

Problem 26P What are the magnitude and direction of the electric field 20.0 cm directly above an isolated 33.0 × 10–6 C charge?

A proton (m = 1.67 × 10–27 kg) is suspended at rest in a uniform electric field . Take into account gravity at the Earth’s surface, and determine .

Problem 55GP Measurements indicate that there is an electric field surrounding the Earth. Its magnitude is about 150 N/C at the Earth’s surface and points inward toward the Earth’s center. What is the magnitude of the electric charge on the Earth? Is it positive or negative? [Hint: The electric field outside a uniformly charged sphere is the same as if all the charge were concentrated at its center.]

Problem 56GP (a) The electric field near the Earth’s surface has magnitude of about 150 N/C. What is the acceleration experienced by an electron near the surface of the Earth? (b) What about a proton? (c) Calculate the ratio of each acceleration to g=9.8 m/s2

Problem 11P [1 mC = 10–3 C, 1 ?C = 10–6 C, 1 nC = 10–9 C.] Two positive point charges are a fixed distance apart. The sum of their charges is QT. What charge must each have in order to (a) maximize the electric force between them, and (b) minimize it?

Problem 11Q Is the electric force a conservative force? Why or why not? (See Chapter 6.)

(II) Particles of charge , and are placed in a line (Fig. 16-49). The center one is from each of the others. Calculate the net force on each charge due to the other two.

Problem 27P What is the magnitude of the acceleration experienced by an electron in an electric field of 750 N/C? How does the direction of the acceleration depend on the direction of the field at that point?

Problem 28P What are the magnitude and direction of the electric field at a point midway between a –8.0 ?C and a +7.0 ?C charge 8.0 cm apart? Assume no other charges are nearby.

Problem 29P (II) Draw, approximately, the electric field lines about two point charges, +Q and –3Q, which are a distance l apart.

Problem 57GP A water droplet of radius 0.018 mm remains stationary in the air. If the downward-directed electric field of the Earth is 150 N/C, how many excess electron charges must the water droplet have?

Estimate the net force between the CO group and the HN group shown in Fig. 16-62. The and have charges , and the and have charges , where . [Hint: do not include the "internal" forces between and , or between and .]

Problem 59GP In a simple model of the hydrogen atom, the electron revolves in a circular orbit around the proton with a speed of 1.1 × 106 m/s. Determine the radius of the electron s orbit. [Hint: see Chapter 5 on circular motion.]

Problem 12Q When a charged ruler attracts small pieces of paper, sometimes a piece jumps quickly away after touching the ruler. Explain.

(II) Three positive particles of equal charge, , are located at the corners of an equilateral triangle of side (Fig. ). Calculate the magnitude and direction of the net force on each particle.

Problem 13Q Explain why the test charges we use when measuring electric fields must be small.

Problem 30P What is the electric field strength at a point in space where a proton (m = 1.67 × 10–27 kg) experiences an acceleration of 1 million “g’s”?

]Problem 31P An electron is released from rest in a uniform electric field and accelerates to the north at a rate of 115 m/s2. What are the magnitude and direction of the electric field?

Problem 32P The electric field midway between two equal but opposite point charges is 745 N/C, and the distance between the charges is 16.0 cm. What is the magnitude of the charge on each?

Problem 60GP Suppose that electrical attraction, rather than gravity were responsible for holding the Moon in orbit around the Earth. If equal and opposite charges Q were placed on the Earth and the Moon, what should be the value of Q to maintain the Present Orbit? Use these data: mass of Earth = 5.98 × 1024 kg, mass of Moon = 7 35 × 1022 kg, radius of orbit = 3.84 × 108 m. Treat the Earth and Moon as point particles.

Problem 61GP An electron with speed v0 = 21.5 × 106m/s is traveling parallel to an electric field of magnitude E= 11.4 × 103 N/C. (a) How far will the electron travel before it stops? (b) How much time will elapse before it returns to its starting point?

\Problem 62GP A positive point charge Q1 = 2.5 × 10–5 C is fixed at origin of coordinates, and a negative charge Q2 = –5.0 × 10–6 C is fixed to the x axis at x = +2.0 m. Find the location of the place(s) along the x axis where the electric field due to these two charges is zero.