Quizbank/calcPhyEMqAll/c05

${\displaystyle b=2a}$

${\displaystyle a=2\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle q_{1}=1e}$

${\displaystyle q_{2}=-7e}$

${\displaystyle q_{3}=2e}$

a) 3.391E-14 N

b) 3.731E-14 N

c) 4.104E-14 N

d) 4.514E-14 N

e) 4.965E-14 N

${\displaystyle b=2a}$

${\displaystyle a=2\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle -x}$

${\displaystyle q_{1}=2e}$

${\displaystyle q_{2}=-9e}$

${\displaystyle q_{3}=4e}$

a) 5.243E+01 degrees

b) 5.767E+01 degrees

c) 6.343E+01 degrees

d) 6.978E+01 degrees

e) 7.676E+01 degrees

${\displaystyle E_{z}(x=0,z)=\int _{-a}^{b}f(x,z)dx}$

${\displaystyle f(x,y)}$

a) 3.161E+00 V/m²

b) 3.477E+00 V/m²

c) 3.825E+00 V/m²

d) 4.208E+00 V/m²

e) 4.628E+00 V/m²

a) 7.119E+09 N/C²

b) 7.831E+09 N/C²

c) 8.614E+09 N/C²

d) 9.476E+09 N/C²

e) 1.042E+10 N/C²

5)  ${\displaystyle E(z)=\int _{0}^{R}f(r',z)dr'}$
is an integral that calculates the magnitude of the electric field at a distance ${\displaystyle z}$ fromthe center of a thin circular disk as measured along a line normal to the plane of the disk. The disk's radius is ${\displaystyle R=7.2{\text{ m}}}$ and the surface charge density is ${\displaystyle \sigma =3{\text{ nC/m}}^{3}}$. Evaluate ${\displaystyle f(r',z)}$ at ${\displaystyle r'=3.6{\text{ m}}}$.

a) 1.606E+00 V/m²

b) 1.767E+00 V/m²

c) 1.943E+00 V/m²

d) 2.138E+00 V/m²

e) 2.351E+00 V/m²

6) A large thin isolated square plate has an area of 6 m². It is uniformly charged with 6 nC of charge. What is the magnitude of the electric field 2 mm from the center of the plate's surface?

a) 5.647E+01 N/C

b) 6.212E+01 N/C

c) 6.833E+01 N/C

d) 7.516E+01 N/C

e) 8.268E+01 N/C

1) A large thin isolated square plate has an area of 8 m². It is uniformly charged with 6 nC of charge. What is the magnitude of the electric field 1 mm from the center of the plate's surface?

a) 3.500E+01 N/C

b) 3.850E+01 N/C

c) 4.235E+01 N/C

d) 4.659E+01 N/C

e) 5.125E+01 N/C

${\displaystyle b=2a}$

${\displaystyle a=4\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle q_{1}=1e}$

${\displaystyle q_{2}=-7e}$

${\displaystyle q_{3}=4e}$

a) 9.750E-15 N

b) 1.072E-14 N

c) 1.180E-14 N

d) 1.298E-14 N

e) 1.427E-14 N

3)  ${\displaystyle E(z)=\int _{0}^{R}f(r',z)dr'}$
is an integral that calculates the magnitude of the electric field at a distance ${\displaystyle z}$ fromthe center of a thin circular disk as measured along a line normal to the plane of the disk. The disk's radius is ${\displaystyle R=3.0{\text{ m}}}$ and the surface charge density is ${\displaystyle \sigma =8{\text{ nC/m}}^{3}}$. Evaluate ${\displaystyle f(r',z)}$ at ${\displaystyle r'=2.0{\text{ m}}}$.

a) 9.459E+00 V/m²

b) 1.040E+01 V/m²

c) 1.145E+01 V/m²

d) 1.259E+01 V/m²

e) 1.385E+01 V/m²

a) 5.352E+09 N/C²

b) 5.887E+09 N/C²

c) 6.476E+09 N/C²

d) 7.124E+09 N/C²

e) 7.836E+09 N/C²

${\displaystyle E_{z}(x=0,z)=\int _{-a}^{b}f(x,z)dx}$

${\displaystyle f(x,y)}$

a) 4.602E+00 V/m²

b) 5.062E+00 V/m²

c) 5.568E+00 V/m²

d) 6.125E+00 V/m²

e) 6.738E+00 V/m²

${\displaystyle b=2a}$

${\displaystyle a=6\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle -x}$

${\displaystyle q_{1}=2e}$

${\displaystyle q_{2}=-9e}$

${\displaystyle q_{3}=4e}$

a) 4.766E+01 degrees

b) 5.243E+01 degrees

c) 5.767E+01 degrees

d) 6.343E+01 degrees

e) 6.978E+01 degrees

1)  ${\displaystyle E(z)=\int _{0}^{R}f(r',z)dr'}$
is an integral that calculates the magnitude of the electric field at a distance ${\displaystyle z}$ fromthe center of a thin circular disk as measured along a line normal to the plane of the disk. The disk's radius is ${\displaystyle R=8.1{\text{ m}}}$ and the surface charge density is ${\displaystyle \sigma =3{\text{ nC/m}}^{3}}$. Evaluate ${\displaystyle f(r',z)}$ at ${\displaystyle r'=4.2{\text{ m}}}$.

a) 5.134E-01 V/m²

b) 5.648E-01 V/m²

c) 6.212E-01 V/m²

d) 6.834E-01 V/m²

e) 7.517E-01 V/m²

${\displaystyle b=2a}$

${\displaystyle a=2\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle -x}$

${\displaystyle q_{1}=2e}$

${\displaystyle q_{2}=-7e}$

${\displaystyle q_{3}=5e}$

a) 4.357E+01 degrees

b) 4.793E+01 degrees

c) 5.272E+01 degrees

d) 5.799E+01 degrees

e) 6.379E+01 degrees

3) A large thin isolated square plate has an area of 5 m². It is uniformly charged with 8 nC of charge. What is the magnitude of the electric field 3 mm from the center of the plate's surface?

a) 6.171E+01 N/C

b) 6.788E+01 N/C

c) 7.467E+01 N/C

d) 8.214E+01 N/C

e) 9.035E+01 N/C

${\displaystyle E_{z}(x=0,z)=\int _{-a}^{b}f(x,z)dx}$

${\displaystyle f(x,y)}$

a) 9.655E+00 V/m²

b) 1.062E+01 V/m²

c) 1.168E+01 V/m²

d) 1.285E+01 V/m²

e) 1.414E+01 V/m²

a) 2.013E+09 N/C²

b) 2.214E+09 N/C²

c) 2.435E+09 N/C²

d) 2.679E+09 N/C²

e) 2.947E+09 N/C²

${\displaystyle b=2a}$

${\displaystyle a=6\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle q_{1}=2e}$

${\displaystyle q_{2}=-8e}$

${\displaystyle q_{3}=4e}$

a) 8.613E-15 N

b) 9.474E-15 N

c) 1.042E-14 N

d) 1.146E-14 N

e) 1.261E-14 N

${\displaystyle b=2a}$

${\displaystyle a=4\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle q_{1}=1e}$

${\displaystyle q_{2}=-7e}$

${\displaystyle q_{3}=4e}$

a) 9.750E-15 N

b) 1.072E-14 N

c) 1.180E-14 N

d) 1.298E-14 N

e) 1.427E-14 N

${\displaystyle b=2a}$

${\displaystyle a=4\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle -x}$

${\displaystyle q_{1}=3e}$

${\displaystyle q_{2}=-9e}$

${\displaystyle q_{3}=6e}$

a) 5.767E+01 degrees

b) 6.343E+01 degrees

c) 6.978E+01 degrees

d) 7.676E+01 degrees

e) 8.443E+01 degrees

${\displaystyle E_{z}(x=0,z)=\int _{-a}^{b}f(x,z)dx}$

${\displaystyle f(x,y)}$

a) 5.825E+00 V/m²

b) 6.407E+00 V/m²

c) 7.048E+00 V/m²

d) 7.753E+00 V/m²

e) 8.528E+00 V/m²

a) 1.764E+09 N/C²

b) 1.941E+09 N/C²

c) 2.135E+09 N/C²

d) 2.348E+09 N/C²

e) 2.583E+09 N/C²

5)  ${\displaystyle E(z)=\int _{0}^{R}f(r',z)dr'}$
is an integral that calculates the magnitude of the electric field at a distance ${\displaystyle z}$ fromthe center of a thin circular disk as measured along a line normal to the plane of the disk. The disk's radius is ${\displaystyle R=8.3{\text{ m}}}$ and the surface charge density is ${\displaystyle \sigma =5{\text{ nC/m}}^{3}}$. Evaluate ${\displaystyle f(r',z)}$ at ${\displaystyle r'=5.3{\text{ m}}}$.

a) 1.022E+00 V/m²

b) 1.125E+00 V/m²

c) 1.237E+00 V/m²

d) 1.361E+00 V/m²

e) 1.497E+00 V/m²

6) A large thin isolated square plate has an area of 9 m². It is uniformly charged with 8 nC of charge. What is the magnitude of the electric field 3 mm from the center of the plate's surface?

a) 3.428E+01 N/C

b) 3.771E+01 N/C

c) 4.148E+01 N/C

d) 4.563E+01 N/C

e) 5.020E+01 N/C

1)  ${\displaystyle E(z)=\int _{0}^{R}f(r',z)dr'}$
is an integral that calculates the magnitude of the electric field at a distance ${\displaystyle z}$ fromthe center of a thin circular disk as measured along a line normal to the plane of the disk. The disk's radius is ${\displaystyle R=6.8{\text{ m}}}$ and the surface charge density is ${\displaystyle \sigma =6{\text{ nC/m}}^{3}}$. Evaluate ${\displaystyle f(r',z)}$ at ${\displaystyle r'=3.6{\text{ m}}}$.

a) 1.258E+00 V/m²

b) 1.384E+00 V/m²

c) 1.522E+00 V/m²

d) 1.674E+00 V/m²

e) 1.842E+00 V/m²

a) 2.429E+09 N/C²

b) 2.672E+09 N/C²

c) 2.939E+09 N/C²

d) 3.233E+09 N/C²

e) 3.556E+09 N/C²

${\displaystyle E_{z}(x=0,z)=\int _{-a}^{b}f(x,z)dx}$

${\displaystyle f(x,y)}$

a) 3.719E+00 V/m²

b) 4.091E+00 V/m²

c) 4.500E+00 V/m²

d) 4.950E+00 V/m²

e) 5.445E+00 V/m²

${\displaystyle b=2a}$

${\displaystyle a=2\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle -x}$

${\displaystyle q_{1}=2e}$

${\displaystyle q_{2}=-7e}$

${\displaystyle q_{3}=5e}$

a) 4.357E+01 degrees

b) 4.793E+01 degrees

c) 5.272E+01 degrees

d) 5.799E+01 degrees

e) 6.379E+01 degrees

${\displaystyle b=2a}$

${\displaystyle a=6\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle q_{1}=1e}$

${\displaystyle q_{2}=-8e}$

${\displaystyle q_{3}=2e}$

a) 5.732E-15 N

b) 6.305E-15 N

c) 6.936E-15 N

d) 7.629E-15 N

e) 8.392E-15 N

6) A large thin isolated square plate has an area of 6 m². It is uniformly charged with 5 nC of charge. What is the magnitude of the electric field 1 mm from the center of the plate's surface?

a) 3.214E+01 N/C

b) 3.536E+01 N/C

c) 3.889E+01 N/C

d) 4.278E+01 N/C

e) 4.706E+01 N/C

${\displaystyle E_{z}(x=0,z)=\int _{-a}^{b}f(x,z)dx}$

${\displaystyle f(x,y)}$

a) 8.690E+00 V/m²

b) 9.559E+00 V/m²

c) 1.051E+01 V/m²

d) 1.157E+01 V/m²

e) 1.272E+01 V/m²

2)  ${\displaystyle E(z)=\int _{0}^{R}f(r',z)dr'}$
is an integral that calculates the magnitude of the electric field at a distance ${\displaystyle z}$ fromthe center of a thin circular disk as measured along a line normal to the plane of the disk. The disk's radius is ${\displaystyle R=4.3{\text{ m}}}$ and the surface charge density is ${\displaystyle \sigma =2{\text{ nC/m}}^{3}}$. Evaluate ${\displaystyle f(r',z)}$ at ${\displaystyle r'=2.4{\text{ m}}}$.

a) 5.647E+00 V/m²

b) 6.212E+00 V/m²

c) 6.833E+00 V/m²

d) 7.517E+00 V/m²

e) 8.268E+00 V/m²

${\displaystyle b=2a}$

${\displaystyle a=6\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle -x}$

${\displaystyle q_{1}=2e}$

${\displaystyle q_{2}=-9e}$

${\displaystyle q_{3}=5e}$

a) 5.272E+01 degrees

b) 5.799E+01 degrees

c) 6.379E+01 degrees

d) 7.017E+01 degrees

e) 7.719E+01 degrees

a) 7.119E+09 N/C²

b) 7.831E+09 N/C²

c) 8.614E+09 N/C²

d) 9.476E+09 N/C²

e) 1.042E+10 N/C²

${\displaystyle b=2a}$

${\displaystyle a=2\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle q_{1}=1e}$

${\displaystyle q_{2}=-8e}$

${\displaystyle q_{3}=2e}$

a) 3.876E-14 N

b) 4.263E-14 N

c) 4.690E-14 N

d) 5.159E-14 N

e) 5.675E-14 N

6) A large thin isolated square plate has an area of 5 m². It is uniformly charged with 8 nC of charge. What is the magnitude of the electric field 3 mm from the center of the plate's surface?

a) 6.171E+01 N/C

b) 6.788E+01 N/C

c) 7.467E+01 N/C

d) 8.214E+01 N/C

e) 9.035E+01 N/C

${\displaystyle b=2a}$

${\displaystyle a=2\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle q_{1}=1e}$

${\displaystyle q_{2}=-9e}$

${\displaystyle q_{3}=4e}$

a) 5.014E-14 N

b) 5.515E-14 N

c) 6.067E-14 N

d) 6.674E-14 N

e) 7.341E-14 N

${\displaystyle b=2a}$

${\displaystyle a=2\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle -x}$

${\displaystyle q_{1}=3e}$

${\displaystyle q_{2}=-9e}$

${\displaystyle q_{3}=5e}$

a) 6.125E+01 degrees

b) 6.738E+01 degrees

c) 7.412E+01 degrees

d) 8.153E+01 degrees

e) 8.968E+01 degrees

${\displaystyle E_{z}(x=0,z)=\int _{-a}^{b}f(x,z)dx}$

${\displaystyle f(x,y)}$

a) 3.959E+00 V/m²

b) 4.355E+00 V/m²

c) 4.790E+00 V/m²

d) 5.269E+00 V/m²

e) 5.796E+00 V/m²

a) 8.336E+09 N/C²

b) 9.170E+09 N/C²

c) 1.009E+10 N/C²

d) 1.110E+10 N/C²

e) 1.220E+10 N/C²

5)  ${\displaystyle E(z)=\int _{0}^{R}f(r',z)dr'}$
is an integral that calculates the magnitude of the electric field at a distance ${\displaystyle z}$ fromthe center of a thin circular disk as measured along a line normal to the plane of the disk. The disk's radius is ${\displaystyle R=3.0{\text{ m}}}$ and the surface charge density is ${\displaystyle \sigma =8{\text{ nC/m}}^{3}}$. Evaluate ${\displaystyle f(r',z)}$ at ${\displaystyle r'=2.0{\text{ m}}}$.

a) 9.459E+00 V/m²

b) 1.040E+01 V/m²

c) 1.145E+01 V/m²

d) 1.259E+01 V/m²

e) 1.385E+01 V/m²

6) A large thin isolated square plate has an area of 6 m². It is uniformly charged with 5 nC of charge. What is the magnitude of the electric field 1 mm from the center of the plate's surface?

a) 3.214E+01 N/C

b) 3.536E+01 N/C

c) 3.889E+01 N/C

d) 4.278E+01 N/C

e) 4.706E+01 N/C

1)  ${\displaystyle E(z)=\int _{0}^{R}f(r',z)dr'}$
is an integral that calculates the magnitude of the electric field at a distance ${\displaystyle z}$ fromthe center of a thin circular disk as measured along a line normal to the plane of the disk. The disk's radius is ${\displaystyle R=4.3{\text{ m}}}$ and the surface charge density is ${\displaystyle \sigma =2{\text{ nC/m}}^{3}}$. Evaluate ${\displaystyle f(r',z)}$ at ${\displaystyle r'=2.4{\text{ m}}}$.

a) 5.647E+00 V/m²

b) 6.212E+00 V/m²

c) 6.833E+00 V/m²

d) 7.517E+00 V/m²

e) 8.268E+00 V/m²

2) A large thin isolated square plate has an area of 3 m². It is uniformly charged with 5 nC of charge. What is the magnitude of the electric field 3 mm from the center of the plate's surface?

a) 9.412E+01 N/C

b) 1.035E+02 N/C

c) 1.139E+02 N/C

d) 1.253E+02 N/C

e) 1.378E+02 N/C

${\displaystyle b=2a}$

${\displaystyle a=2\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle q_{1}=3e}$

${\displaystyle q_{2}=-9e}$

${\displaystyle q_{3}=6e}$

a) 1.308E-13 N

b) 1.439E-13 N

c) 1.583E-13 N

d) 1.741E-13 N

e) 1.915E-13 N

${\displaystyle b=2a}$

${\displaystyle a=6\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle -x}$

${\displaystyle q_{1}=3e}$

${\displaystyle q_{2}=-7e}$

${\displaystyle q_{3}=4e}$

a) 5.914E+01 degrees

b) 6.506E+01 degrees

c) 7.157E+01 degrees

d) 7.872E+01 degrees

e) 8.659E+01 degrees

${\displaystyle E_{z}(x=0,z)=\int _{-a}^{b}f(x,z)dx}$

${\displaystyle f(x,y)}$

a) 9.655E+00 V/m²

b) 1.062E+01 V/m²

c) 1.168E+01 V/m²

d) 1.285E+01 V/m²

e) 1.414E+01 V/m²

a) 5.352E+09 N/C²

b) 5.887E+09 N/C²

c) 6.476E+09 N/C²

d) 7.124E+09 N/C²

e) 7.836E+09 N/C²

${\displaystyle b=2a}$

${\displaystyle a=6\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle q_{1}=1e}$

${\displaystyle q_{2}=-7e}$

${\displaystyle q_{3}=2e}$

a) 3.426E-15 N

b) 3.768E-15 N

c) 4.145E-15 N

d) 4.560E-15 N

e) 5.015E-15 N

${\displaystyle E_{z}(x=0,z)=\int _{-a}^{b}f(x,z)dx}$

${\displaystyle f(x,y)}$

a) 5.825E+00 V/m²

b) 6.407E+00 V/m²

c) 7.048E+00 V/m²

d) 7.753E+00 V/m²

e) 8.528E+00 V/m²

a) 1.202E+09 N/C²

b) 1.322E+09 N/C²

c) 1.454E+09 N/C²

d) 1.599E+09 N/C²

e) 1.759E+09 N/C²

${\displaystyle b=2a}$

${\displaystyle a=4\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle -x}$

${\displaystyle q_{1}=3e}$

${\displaystyle q_{2}=-7e}$

${\displaystyle q_{3}=5e}$

a) 5.569E+01 degrees

b) 6.125E+01 degrees

c) 6.738E+01 degrees

d) 7.412E+01 degrees

e) 8.153E+01 degrees

5) A large thin isolated square plate has an area of 5 m². It is uniformly charged with 7 nC of charge. What is the magnitude of the electric field 1 mm from the center of the plate's surface?

a) 6.534E+01 N/C

b) 7.187E+01 N/C

c) 7.906E+01 N/C

d) 8.696E+01 N/C

e) 9.566E+01 N/C

6)  ${\displaystyle E(z)=\int _{0}^{R}f(r',z)dr'}$
is an integral that calculates the magnitude of the electric field at a distance ${\displaystyle z}$ fromthe center of a thin circular disk as measured along a line normal to the plane of the disk. The disk's radius is ${\displaystyle R=6.8{\text{ m}}}$ and the surface charge density is ${\displaystyle \sigma =6{\text{ nC/m}}^{3}}$. Evaluate ${\displaystyle f(r',z)}$ at ${\displaystyle r'=3.6{\text{ m}}}$.

a) 1.258E+00 V/m²

b) 1.384E+00 V/m²

c) 1.522E+00 V/m²

d) 1.674E+00 V/m²

e) 1.842E+00 V/m²

${\displaystyle b=2a}$

${\displaystyle a=6\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle q_{1}=1e}$

${\displaystyle q_{2}=-7e}$

${\displaystyle q_{3}=2e}$

a) 3.426E-15 N

b) 3.768E-15 N

c) 4.145E-15 N

d) 4.560E-15 N

e) 5.015E-15 N

${\displaystyle b=2a}$

${\displaystyle a=2\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle -x}$

${\displaystyle q_{1}=3e}$

${\displaystyle q_{2}=-9e}$

${\displaystyle q_{3}=5e}$

a) 6.125E+01 degrees

b) 6.738E+01 degrees

c) 7.412E+01 degrees

d) 8.153E+01 degrees

e) 8.968E+01 degrees

${\displaystyle E_{z}(x=0,z)=\int _{-a}^{b}f(x,z)dx}$

${\displaystyle f(x,y)}$

a) 3.161E+00 V/m²

b) 3.477E+00 V/m²

c) 3.825E+00 V/m²

d) 4.208E+00 V/m²

e) 4.628E+00 V/m²

a) 1.764E+09 N/C²

b) 1.941E+09 N/C²

c) 2.135E+09 N/C²

d) 2.348E+09 N/C²

e) 2.583E+09 N/C²

5)  ${\displaystyle E(z)=\int _{0}^{R}f(r',z)dr'}$
is an integral that calculates the magnitude of the electric field at a distance ${\displaystyle z}$ fromthe center of a thin circular disk as measured along a line normal to the plane of the disk. The disk's radius is ${\displaystyle R=2.0{\text{ m}}}$ and the surface charge density is ${\displaystyle \sigma =9{\text{ nC/m}}^{3}}$. Evaluate ${\displaystyle f(r',z)}$ at ${\displaystyle r'=1.2{\text{ m}}}$.

a) 8.933E+00 V/m²

b) 9.826E+00 V/m²

c) 1.081E+01 V/m²

d) 1.189E+01 V/m²

e) 1.308E+01 V/m²

6) A large thin isolated square plate has an area of 9 m². It is uniformly charged with 5 nC of charge. What is the magnitude of the electric field 1 mm from the center of the plate's surface?

a) 2.357E+01 N/C

b) 2.593E+01 N/C

c) 2.852E+01 N/C

d) 3.137E+01 N/C

e) 3.451E+01 N/C

1)  ${\displaystyle E(z)=\int _{0}^{R}f(r',z)dr'}$
is an integral that calculates the magnitude of the electric field at a distance ${\displaystyle z}$ fromthe center of a thin circular disk as measured along a line normal to the plane of the disk. The disk's radius is ${\displaystyle R=9.1{\text{ m}}}$ and the surface charge density is ${\displaystyle \sigma =2{\text{ nC/m}}^{3}}$. Evaluate ${\displaystyle f(r',z)}$ at ${\displaystyle r'=6.2{\text{ m}}}$.

a) 4.961E-01 V/m²

b) 5.457E-01 V/m²

c) 6.002E-01 V/m²

d) 6.603E-01 V/m²

e) 7.263E-01 V/m²

${\displaystyle b=2a}$

${\displaystyle a=6\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle q_{1}=3e}$

${\displaystyle q_{2}=-7e}$

${\displaystyle q_{3}=6e}$

a) 1.028E-14 N

b) 1.130E-14 N

c) 1.244E-14 N

d) 1.368E-14 N

e) 1.505E-14 N

${\displaystyle E_{z}(x=0,z)=\int _{-a}^{b}f(x,z)dx}$

${\displaystyle f(x,y)}$

a) 3.610E+00 V/m²

b) 3.971E+00 V/m²

c) 4.368E+00 V/m²

d) 4.804E+00 V/m²

e) 5.285E+00 V/m²

4) A large thin isolated square plate has an area of 6 m². It is uniformly charged with 9 nC of charge. What is the magnitude of the electric field 1 mm from the center of the plate's surface?

a) 7.701E+01 N/C

b) 8.471E+01 N/C

c) 9.318E+01 N/C

d) 1.025E+02 N/C

e) 1.127E+02 N/C

a) 3.159E+09 N/C²

b) 3.475E+09 N/C²

c) 3.823E+09 N/C²

d) 4.205E+09 N/C²

e) 4.626E+09 N/C²

${\displaystyle b=2a}$

${\displaystyle a=2\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle -x}$

${\displaystyle q_{1}=2e}$

${\displaystyle q_{2}=-7e}$

${\displaystyle q_{3}=3e}$

a) 4.743E+01 degrees

b) 5.217E+01 degrees

c) 5.739E+01 degrees

d) 6.313E+01 degrees

e) 6.944E+01 degrees

${\displaystyle E_{z}(x=0,z)=\int _{-a}^{b}f(x,z)dx}$

${\displaystyle f(x,y)}$

a) 5.465E+00 V/m²

b) 6.012E+00 V/m²

c) 6.613E+00 V/m²

d) 7.274E+00 V/m²

e) 8.002E+00 V/m²

2)  ${\displaystyle E(z)=\int _{0}^{R}f(r',z)dr'}$
is an integral that calculates the magnitude of the electric field at a distance ${\displaystyle z}$ fromthe center of a thin circular disk as measured along a line normal to the plane of the disk. The disk's radius is ${\displaystyle R=6.9{\text{ m}}}$ and the surface charge density is ${\displaystyle \sigma =9{\text{ nC/m}}^{3}}$. Evaluate ${\displaystyle f(r',z)}$ at ${\displaystyle r'=4.3{\text{ m}}}$.

a) 8.924E-01 V/m²

b) 9.816E-01 V/m²

c) 1.080E+00 V/m²

d) 1.188E+00 V/m²

e) 1.307E+00 V/m²

${\displaystyle b=2a}$

${\displaystyle a=6\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle -x}$

${\displaystyle q_{1}=3e}$

${\displaystyle q_{2}=-7e}$

${\displaystyle q_{3}=6e}$

a) 6.343E+01 degrees

b) 6.978E+01 degrees

c) 7.676E+01 degrees

d) 8.443E+01 degrees

e) 9.288E+01 degrees

${\displaystyle b=2a}$

${\displaystyle a=2\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle q_{1}=1e}$

${\displaystyle q_{2}=-8e}$

${\displaystyle q_{3}=2e}$

a) 3.876E-14 N

b) 4.263E-14 N

c) 4.690E-14 N

d) 5.159E-14 N

e) 5.675E-14 N

a) 7.119E+09 N/C²

b) 7.831E+09 N/C²

c) 8.614E+09 N/C²

d) 9.476E+09 N/C²

e) 1.042E+10 N/C²

6) A large thin isolated square plate has an area of 9 m². It is uniformly charged with 5 nC of charge. What is the magnitude of the electric field 1 mm from the center of the plate's surface?

a) 2.357E+01 N/C

b) 2.593E+01 N/C

c) 2.852E+01 N/C

d) 3.137E+01 N/C

e) 3.451E+01 N/C

${\displaystyle b=2a}$

${\displaystyle a=2\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle q_{1}=1e}$

${\displaystyle q_{2}=-8e}$

${\displaystyle q_{3}=3e}$

a) 5.243E-14 N

b) 5.768E-14 N

c) 6.344E-14 N

d) 6.979E-14 N

e) 7.677E-14 N

${\displaystyle b=2a}$

${\displaystyle a=2\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle -x}$

${\displaystyle q_{1}=2e}$

${\displaystyle q_{2}=-9e}$

${\displaystyle q_{3}=4e}$

a) 5.243E+01 degrees

b) 5.767E+01 degrees

c) 6.343E+01 degrees

d) 6.978E+01 degrees

e) 7.676E+01 degrees

${\displaystyle E_{z}(x=0,z)=\int _{-a}^{b}f(x,z)dx}$

${\displaystyle f(x,y)}$

a) 6.311E+00 V/m²

b) 6.943E+00 V/m²

c) 7.637E+00 V/m²

d) 8.401E+00 V/m²

e) 9.241E+00 V/m²

a) 2.013E+09 N/C²

b) 2.214E+09 N/C²

c) 2.435E+09 N/C²

d) 2.679E+09 N/C²

e) 2.947E+09 N/C²

5)  ${\displaystyle E(z)=\int _{0}^{R}f(r',z)dr'}$
is an integral that calculates the magnitude of the electric field at a distance ${\displaystyle z}$ fromthe center of a thin circular disk as measured along a line normal to the plane of the disk. The disk's radius is ${\displaystyle R=3.2{\text{ m}}}$ and the surface charge density is ${\displaystyle \sigma =2{\text{ nC/m}}^{3}}$. Evaluate ${\displaystyle f(r',z)}$ at ${\displaystyle r'=2.2{\text{ m}}}$.

a) 3.228E+00 V/m²

b) 3.551E+00 V/m²

c) 3.906E+00 V/m²

d) 4.297E+00 V/m²

e) 4.727E+00 V/m²

6) A large thin isolated square plate has an area of 9 m². It is uniformly charged with 8 nC of charge. What is the magnitude of the electric field 3 mm from the center of the plate's surface?

a) 3.428E+01 N/C

b) 3.771E+01 N/C

c) 4.148E+01 N/C

d) 4.563E+01 N/C

e) 5.020E+01 N/C

${\displaystyle E_{z}(x=0,z)=\int _{-a}^{b}f(x,z)dx}$

${\displaystyle f(x,y)}$

a) 5.267E+00 V/m²

b) 5.794E+00 V/m²

c) 6.374E+00 V/m²

d) 7.011E+00 V/m²

e) 7.712E+00 V/m²

a) 3.339E+09 N/C²

b) 3.673E+09 N/C²

c) 4.041E+09 N/C²

d) 4.445E+09 N/C²

e) 4.889E+09 N/C²

${\displaystyle b=2a}$

${\displaystyle a=2\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle q_{1}=1e}$

${\displaystyle q_{2}=-8e}$

${\displaystyle q_{3}=2e}$

a) 3.876E-14 N

b) 4.263E-14 N

c) 4.690E-14 N

d) 5.159E-14 N

e) 5.675E-14 N

4)  ${\displaystyle E(z)=\int _{0}^{R}f(r',z)dr'}$
is an integral that calculates the magnitude of the electric field at a distance ${\displaystyle z}$ fromthe center of a thin circular disk as measured along a line normal to the plane of the disk. The disk's radius is ${\displaystyle R=1.8{\text{ m}}}$ and the surface charge density is ${\displaystyle \sigma =9{\text{ nC/m}}^{3}}$. Evaluate ${\displaystyle f(r',z)}$ at ${\displaystyle r'=0.83{\text{ m}}}$.

a) 2.898E+01 V/m²

b) 3.188E+01 V/m²

c) 3.507E+01 V/m²

d) 3.857E+01 V/m²

e) 4.243E+01 V/m²

${\displaystyle b=2a}$

${\displaystyle a=4\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle -x}$

${\displaystyle q_{1}=3e}$

${\displaystyle q_{2}=-7e}$

${\displaystyle q_{3}=5e}$

a) 5.569E+01 degrees

b) 6.125E+01 degrees

c) 6.738E+01 degrees

d) 7.412E+01 degrees

e) 8.153E+01 degrees

6) A large thin isolated square plate has an area of 6 m². It is uniformly charged with 9 nC of charge. What is the magnitude of the electric field 3 mm from the center of the plate's surface?

a) 8.471E+01 N/C

b) 9.318E+01 N/C

c) 1.025E+02 N/C

d) 1.127E+02 N/C

e) 1.240E+02 N/C

${\displaystyle E_{z}(x=0,z)=\int _{-a}^{b}f(x,z)dx}$

${\displaystyle f(x,y)}$

a) 6.804E+00 V/m²

b) 7.485E+00 V/m²

c) 8.233E+00 V/m²

d) 9.056E+00 V/m²

e) 9.962E+00 V/m²

${\displaystyle b=2a}$

${\displaystyle a=4\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle q_{1}=3e}$

${\displaystyle q_{2}=-7e}$

${\displaystyle q_{3}=6e}$

a) 2.544E-14 N

b) 2.798E-14 N

c) 3.078E-14 N

d) 3.385E-14 N

e) 3.724E-14 N

3) A large thin isolated square plate has an area of 9 m². It is uniformly charged with 6 nC of charge. What is the magnitude of the electric field 1 mm from the center of the plate's surface?

a) 2.571E+01 N/C

b) 2.828E+01 N/C

c) 3.111E+01 N/C

d) 3.422E+01 N/C

e) 3.765E+01 N/C

a) 3.159E+09 N/C²

b) 3.475E+09 N/C²

c) 3.823E+09 N/C²

d) 4.205E+09 N/C²

e) 4.626E+09 N/C²

5)  ${\displaystyle E(z)=\int _{0}^{R}f(r',z)dr'}$
is an integral that calculates the magnitude of the electric field at a distance ${\displaystyle z}$ fromthe center of a thin circular disk as measured along a line normal to the plane of the disk. The disk's radius is ${\displaystyle R=1.8{\text{ m}}}$ and the surface charge density is ${\displaystyle \sigma =3{\text{ nC/m}}^{3}}$. Evaluate ${\displaystyle f(r',z)}$ at ${\displaystyle r'=1.1{\text{ m}}}$.

a) 7.517E+00 V/m²

b) 8.269E+00 V/m²

c) 9.096E+00 V/m²

d) 1.001E+01 V/m²

e) 1.101E+01 V/m²

${\displaystyle b=2a}$

${\displaystyle a=4\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle -x}$

${\displaystyle q_{1}=3e}$

${\displaystyle q_{2}=-8e}$

${\displaystyle q_{3}=6e}$

a) 5.243E+01 degrees

b) 5.767E+01 degrees

c) 6.343E+01 degrees

d) 6.978E+01 degrees

e) 7.676E+01 degrees

${\displaystyle b=2a}$

${\displaystyle a=6\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle q_{1}=3e}$

${\displaystyle q_{2}=-7e}$

${\displaystyle q_{3}=5e}$

a) 9.958E-15 N

b) 1.095E-14 N

c) 1.205E-14 N

d) 1.325E-14 N

e) 1.458E-14 N

${\displaystyle b=2a}$

${\displaystyle a=2\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle -x}$

${\displaystyle q_{1}=2e}$

${\displaystyle q_{2}=-9e}$

${\displaystyle q_{3}=4e}$

a) 5.243E+01 degrees

b) 5.767E+01 degrees

c) 6.343E+01 degrees

d) 6.978E+01 degrees

e) 7.676E+01 degrees

${\displaystyle E_{z}(x=0,z)=\int _{-a}^{b}f(x,z)dx}$

${\displaystyle f(x,y)}$

a) 8.690E+00 V/m²

b) 9.559E+00 V/m²

c) 1.051E+01 V/m²

d) 1.157E+01 V/m²

e) 1.272E+01 V/m²

a) 4.142E+09 N/C²

b) 4.556E+09 N/C²

c) 5.012E+09 N/C²

d) 5.513E+09 N/C²

e) 6.064E+09 N/C²

5)  ${\displaystyle E(z)=\int _{0}^{R}f(r',z)dr'}$
is an integral that calculates the magnitude of the electric field at a distance ${\displaystyle z}$ fromthe center of a thin circular disk as measured along a line normal to the plane of the disk. The disk's radius is ${\displaystyle R=1.4{\text{ m}}}$ and the surface charge density is ${\displaystyle \sigma =6{\text{ nC/m}}^{3}}$. Evaluate ${\displaystyle f(r',z)}$ at ${\displaystyle r'=0.56{\text{ m}}}$.

a) 2.567E+01 V/m²

b) 2.824E+01 V/m²

c) 3.106E+01 V/m²

d) 3.417E+01 V/m²

e) 3.759E+01 V/m²

6) A large thin isolated square plate has an area of 8 m². It is uniformly charged with 7 nC of charge. What is the magnitude of the electric field 3 mm from the center of the plate's surface?

a) 4.492E+01 N/C

b) 4.941E+01 N/C

c) 5.435E+01 N/C

d) 5.979E+01 N/C

e) 6.577E+01 N/C

${\displaystyle b=2a}$

${\displaystyle a=2\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle q_{1}=3e}$

${\displaystyle q_{2}=-9e}$

${\displaystyle q_{3}=6e}$

a) 1.308E-13 N

b) 1.439E-13 N

c) 1.583E-13 N

d) 1.741E-13 N

e) 1.915E-13 N

2)  ${\displaystyle E(z)=\int _{0}^{R}f(r',z)dr'}$
is an integral that calculates the magnitude of the electric field at a distance ${\displaystyle z}$ fromthe center of a thin circular disk as measured along a line normal to the plane of the disk. The disk's radius is ${\displaystyle R=7.2{\text{ m}}}$ and the surface charge density is ${\displaystyle \sigma =3{\text{ nC/m}}^{3}}$. Evaluate ${\displaystyle f(r',z)}$ at ${\displaystyle r'=3.6{\text{ m}}}$.

a) 1.606E+00 V/m²

b) 1.767E+00 V/m²

c) 1.943E+00 V/m²

d) 2.138E+00 V/m²

e) 2.351E+00 V/m²

3) A large thin isolated square plate has an area of 6 m². It is uniformly charged with 9 nC of charge. What is the magnitude of the electric field 2 mm from the center of the plate's surface?

a) 7.000E+01 N/C

b) 7.701E+01 N/C

c) 8.471E+01 N/C

d) 9.318E+01 N/C

e) 1.025E+02 N/C

a) 4.142E+09 N/C²

b) 4.556E+09 N/C²

c) 5.012E+09 N/C²

d) 5.513E+09 N/C²

e) 6.064E+09 N/C²

${\displaystyle E_{z}(x=0,z)=\int _{-a}^{b}f(x,z)dx}$

${\displaystyle f(x,y)}$

a) 3.610E+00 V/m²

b) 3.971E+00 V/m²

c) 4.368E+00 V/m²

d) 4.804E+00 V/m²

e) 5.285E+00 V/m²

${\displaystyle b=2a}$

${\displaystyle a=6\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle -x}$

${\displaystyle q_{1}=3e}$

${\displaystyle q_{2}=-7e}$

${\displaystyle q_{3}=4e}$

a) 5.377E+01 degrees

b) 5.914E+01 degrees

c) 6.506E+01 degrees

d) 7.157E+01 degrees

e) 7.872E+01 degrees

a) 1.353E+09 N/C²

b) 1.488E+09 N/C²

c) 1.637E+09 N/C²

d) 1.801E+09 N/C²

e) 1.981E+09 N/C²

${\displaystyle b=2a}$

${\displaystyle a=2\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle q_{1}=1e}$

${\displaystyle q_{2}=-7e}$

${\displaystyle q_{3}=2e}$

a) 3.391E-14 N

b) 3.731E-14 N

c) 4.104E-14 N

d) 4.514E-14 N

e) 4.965E-14 N

${\displaystyle E_{z}(x=0,z)=\int _{-a}^{b}f(x,z)dx}$

${\displaystyle f(x,y)}$

a) 3.385E+00 V/m²

b) 3.724E+00 V/m²

c) 4.096E+00 V/m²

d) 4.506E+00 V/m²

e) 4.957E+00 V/m²

${\displaystyle b=2a}$

${\displaystyle a=4\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle -x}$

${\displaystyle q_{1}=1e}$

${\displaystyle q_{2}=-8e}$

${\displaystyle q_{3}=4e}$

a) 3.719E+01 degrees

b) 4.091E+01 degrees

c) 4.500E+01 degrees

d) 4.950E+01 degrees

e) 5.445E+01 degrees

5) A large thin isolated square plate has an area of 6 m². It is uniformly charged with 6 nC of charge. What is the magnitude of the electric field 2 mm from the center of the plate's surface?

a) 5.647E+01 N/C

b) 6.212E+01 N/C

c) 6.833E+01 N/C

d) 7.516E+01 N/C

e) 8.268E+01 N/C

6)  ${\displaystyle E(z)=\int _{0}^{R}f(r',z)dr'}$
is an integral that calculates the magnitude of the electric field at a distance ${\displaystyle z}$ fromthe center of a thin circular disk as measured along a line normal to the plane of the disk. The disk's radius is ${\displaystyle R=6.9{\text{ m}}}$ and the surface charge density is ${\displaystyle \sigma =9{\text{ nC/m}}^{3}}$. Evaluate ${\displaystyle f(r',z)}$ at ${\displaystyle r'=4.3{\text{ m}}}$.

a) 8.924E-01 V/m²

b) 9.816E-01 V/m²

c) 1.080E+00 V/m²

d) 1.188E+00 V/m²

e) 1.307E+00 V/m²

${\displaystyle b=2a}$

${\displaystyle a=2\times 10^{-7}{\text{m}}}$

${\displaystyle q_{2}}$

${\displaystyle q_{1}=1e}$

${\displaystyle q_{2}=-7e}$

${\displaystyle q_{3}=2e}$

a) 3.391E-14 N

b) 3.731E-14 N

c) 4.104E-14 N

d) 4.514E-14 N

e) 4.965E-14 N