On the list below are indicated a number of topics from the Notes that will be included
and that will not be included (left out) in the Final Examination:

Chapter 1 Lines, Parabolas and Systems of Equations
pp.1-5, 1.1 Lines
pp. 6-13, 1.2 Linear Functions
pp. 14-31, 1.3 Quadratic Functions
pp. 32-37, 1.4 Systems of Linear Equations
pp. 38-40, 1.5 Nonlinear Systems of Equations
pp. 41-49, 1.6 Equilibrium, Break-Even Points

Chapter 14 An Introduction to Linear Programming
pp. 1-2, 14.1  An Introduction to Linear Programming
pp. 3-16, 14.1  An Introduction to Linear Programming
pp. 17-22, 14.1  An Introduction to Linear Programming

Chapter 10  Matrices and Determinants
pp. 1-4, 10.1  Matrices
pp. 5-10, 10.2  Matrix Operations
pp. 11-23, 10.3 Matrix Multiplication
pp. 24-47, 10.4 Matrix Reduction
pp. 48-52, 10.5 Homogeneous Systems
pp. 53-61, 10.6  Inverse of a Matrix
pp. 62-71, 10.7 Elementary Row Matrices & Inverses
pp. 72-97, 10.8 Determinants
pp. 98-104, 10.9 Cramer's Rule
pp. 105-112, 10.10 Adjoint  Matrix
Leave out pp. 113-121, 10.11 Input Output Analysis

Chapter 2  Exponential and logarithmic functions
pp. 1-2, 2.1 Exponential Functions
pp. 3-6, 2.2  Compound Interest
pp. 7-10, 2.3 Continuous Compounding (Growth)
pp. 11-18,  2.4 Logarithms

Chapter 3 Limits and Continuity
pp. 1-6, 3.1 Limits and Continuity
pp. 7-15, 3.2 Finding Limits
pp. 16-27, 3.3 One Sided Limits
pp. 28-49, 3.4 Horizontal and Vertical Asymptotes
pp. 50-60, 3.5 Oblique Asymptotes
pp. 61-64, 3.6 More limits at Infinity
Leave out pp. 65-74, 3.7 Solving Inequalities Using Continuity
 

Chapter 4 The Derivative
pp. 1-12,  4.1 The Derivative
pp. 13-21,  4.2 Simple Rules for Differentiation
pp. 22-28,  4.3 Rate of Change
pp. 29-30,  4.4 Differentials
pp. 31-35,  4.5 Derivatives of a Higher Order
 

Chapter 5 More Differentiation
pp. 1-5, 5.1 The Chain and  Power Rules
pp. 6-10, 5.2 Continuity and Differentiability
pp. 11-15, 5.3 Implicit Differentiation
pp. 16-17, 5.4 Linear Approximation
pp. 18-20, 5.5 Elasticity
pp. 21-23, 5.6 L'Hopital's Rule

Chapter 6 Differentiation of Exp. and Log. Functions
pp. 1-4, 6.1 The Natural Exponential Function
pp. 5-10, 6.2 The Natural Logarithmic Function
pp. 11-15, 6.3 More Logarithmic Functions
pp. 16-20, 6.4 Applications of Exponentials and Logarithms

Chapter 7 Single-Variable Optimization
pp. 1-8, 7.1 Single Variable Optimization & Sketching Graphs
pp. 9-13, 7.2 First Derivative Test For Extreme Values
pp. 14-23, 7.3 Absolute Extreme Values On Closed Interval
pp. 24-29, 7.4 Second derivative Test & Inflection Points
pp. 30-45, 7.5 More Sketching Graphs
pp. 46-48, 7.6 Applied Maxima, Minima

Chapter 11 Functions of Several Variables
pp. 1-3, 11.1 Functions of Several Variables
pp. 4-9, 11.2  Graphs of Functions of Two Variables
pp. 10-14, 11.3 Partial Derivatives
pp. 15-20, 11.4 Higher Order Partial Derivatives
pp. 21-28, 11.5 Applications
pp. 29-33, 11.6 The Chain Rule
pp. 34-43, 11.7 Implicit Differentiation
pp. 44-51, 11.8 Implicit Differentiation Formula
Leave out pp. 52-56, 11.9 Homogeneous Functions
Leave out pp. 57-60, 11.10 Total Differential

Chapter 12 Multivariable Optimization
pp. 1-7, 12.1 Min-Max Functions of Several Variables
pp. 8-26, 12.2 Test For Local Extreme Points
Leave out  27 12.3 Convex Sets
pp. 28-32, 12.4 Convex and Concave Functions
pp. 33-42, 12.5 Extreme Value Theorem

Chapter 13 Constrained Optimization
pp. 1-4, 13.1 Optimization Using Substitution
pp. 5-7, 13.2 Lagrange Multipliers
pp. 8-17, 13.3 Test Using Lagrange Multipliers
Leave out 18-20 13.4 Interpretation for Lagrange Multiplier
pp. 21-23, 13.5 Multiple Constraints

Chapter 8 Sequences and Series
Leave out  pp. 1-3, 8.1 Sigma notation
pp. 4-11, 8.2  Sequences
Leave out  pp. 12-15, 8.3 Arithmetic Progression
Leave out pp. 16-19, 8.4 Geometric Progression
pp. 20-27, 8.5 Infinite Geometric Series
Leave out  pp. 28-35, 8.6 Other Infinite Series
Leave out  pp. 36-40, 8.7 Annuities and Perpetuities

Chapter 9 Integration
pp. 1-5, 9.1 Indefinite Integral
pp. 6-9, 9.2 Integration by Substitution
pp. 10-16, 9.3 The Definite Integral
pp. 17-26, 9.4 Finding Area Between Curves
only page 27,  27-33,  9.5 Applications of the Definite Integral
Leave out  pp.  34-39,  9.6 Consumers' and producers' Surplus
Leave out  pp.  40-43,  9.7 Integration by Parts
Leave out  pp.  44-48,  9.8 Improper Integrals