IMP 113: Final Exam Part I (Union College: Spring 2008)

Instructions:

1. Read all directions.

2. In keeping with the Union College policy on academic honesty, you should neither accept nor provide unauthorized assistance in the completion of this work.

Name:______Date:______

Direction I: Solve the following Problems. In order to get full credit show all your work and justify your reasoning.

1. A charge q is enclosed by several surfaces as shown in the figure. Find

the total electrical flux through the surface S1 if the charge q = 2mC.

the total electrical flux through the surface S1 if the charge q = 4mC.

the total electrical flux through the surface S1 if the charge q = 6mC.

the total electrical flux through the surface S2 if the charge q = 2mC .

the total electrical flux through the surface S3 if the charge q = 2mC.

2. The potential in a region due to an Electric field is , where x,y, and z are the coordinates and are measured in meters, and the potential is measured in Volts.

a. Find the potential at the origin.

b. Find the potential at x=2m, y= 1 m, and z = 5 m.

c. Find the electric field at any point.

d. Find the electric field x=2m, y= 1 m, and z = 5 m.

3. Six capacitors are connected in a combination of series and parallel as shown in the figure below. All of the capacitors are measured in micro Farads. (mF)

Find the equivalent capacitance of the system

If a potential difference of 12 V is applied between terminal a and b, what is the charge stored in the capacitor measured 3 mF?

If a potential difference of 12 V is applied between terminal a and b, what is the charge stored in the capacitor measured 2 mF?

4. Given the circuit below.

Using Kirchhoff’s rules, write down the system of linear equations for the three currents in the circuit. Remember to show all of your work.

Using Gauss-Jordan elimination, solve I1, I2, and I3. If you do not wish to use your equations from part (a), use I1-I2+I3 = 0; I2+I3 = 6; and I1+2I2+I3 = 15.