- Solve the system of equations by the method of substitution. One linear system, one non-linear system. Look at problems 5.1.11 - 39.
- Find the system of linear equations which has the given solution. There is more than one possible solution. One part has an ordered pair, the other part has an ordered triplet.
- Use a graphing calculator to approximate all points of intersection of the graph of the system of equations. One system involving transcendental functions, one non-linear system. Look at problems 5.1.41 - 51.
- Write the system of linear equations necessary to find the equation of a circle passing through three points. The model is given to you. Look at problems 5.3.43 - 46. You do NOT need to solve the system, only set it up.
- Use back substitution to find the solution to the system of equations. Look at problems 5.3.1 - 6.
- Find the equation of a parabola passing through three points. Look at problems 5.3.39 - 42.
You will need to give the generic model (y=ax
^{2}+ bx + c), substitute in the values for x and y, solve the system of equations, and then write the final model. - Solve the system of equations by the method of elimination. Two parts. Look at problems 5.2.11 - 29.
- Solve the system of linear equations. Show your work. One is a three by three system of linear equations, the other is a two by three system of linear equations. Look at problems 5.3.9 - 25.
- Choose the appropriate form of the partial fraction decomposition. Look at problems 5.4.1-5.4.6. Multiple choice.
- Choose the appropriate form of the partial fraction decomposition. Look at problems 5.4.1-5.4.6. Multiple choice.
- Expand the basic equation from a partial fraction decomposition problem and write a system of equations that could be used to find the constants by equating equal powers of both sides. Do NOT solve the system of equations.
- Given the form of a partial fraction decomposition, write the basic equation. Then pick convenient values and find the constants.
- Derive a system of inequalities to describe the region. Two parts. One of the systems is non-linear. Look at problems 5.5.51 - 60. The equations are given, all you have to do is put in the correct inequality.
- Maximize and minimize the objective function subject to the given constraints. Look at
*all*problems 5.6.1 - 5.6.12. - True or False.
- Know what consistent / inconsistent systems are.
- Know when a unique solution is possible and when it isn't.
- Know how to write a dependent solution
- Know the fundamental theorem of linear programming
- Know when a maximum and minimum will occur in a linear programming problem.

- None of the problems are directly from the text.
- When a specific method is required, half of the points are for using the proper method and half for obtaining the correct answer.
- Show work on all problems except where otherwise indicated.

# | 1 | 2 | 3 | 4 | 5 | 6 | 7 | 8 | 9 | 10 | 11 | 12 | 13 | 14 | 15 | Tot |

Pts | 12 | 6 | 6 | 4 | 3 | 6 | 12 | 10 | 2 | 2 | 4 | 6 | 8 | 9 | 10 | 100 |